(* These are the 2498 CAD inputs extracted from Mathematica benchmark tests *) (* and 209 indices of examples for which at least one of the versions of CAD *) (* (with or without simplification) took between 50 ms and 5 min. The format *) (* is {{formula, variables},...}. This runs the 209 examples in Mathematica: *) (* Table[CylindricalDecomposition@@inp[[ind[[i]]]], {i, 209}] *) inp = {{u == 0 && x == 0, {x, y, z, u}}, {x == 0 && y == 0, {x, y, z}}, {x == 0 && y^2 == 0, {x, y, z}}, {x == 0 && x + y == 0, {x, y, z}}, {x == 0 && z == 0, {x, y, z}}, {x == 0 && y*z == 0, {x, y, z}}, {x == 0 && z^2 == 0, {x, y, z}}, {-1 + y == 0 && x == 0, {x, y, z}}, {y == 0 && -1 + x == 0, {x, y, z}}, {y == 0 && x == 0, {x, y, z}}, {y == 0 && z == 0, {x, y, z}}, {y == 0 && x*z == 0, {x, y, z}}, {y == 0 && -x + z == 0, {x, y, z, u}}, {y == 0 && x - y*z == 0, {x, y, z}}, {y == 0 && -x + y*z == 0, {x, y, z, u}}, {y == 0 && x + y*z == 0, {x, y, z, u}}, {y == 0 && -x + 5*y*z^2 == 0, {x, y, z, u}}, {y == 0 && u - x + 5*y*z^2 == 0, {x, y, z, u, v}}, {y == 0 && -5*x - 64*y + 5*y*z^2 == 0, {x, y, z}}, {y == 0 && x != 0, {x, y, z}}, {-1 + 4*y == 0 && x == 0, {x, y, z}}, {-59 + 72*y == 0 && x == 0, {x, y, z}}, {-1 + u*y == 0 && -1 - z <= 0, {x, y, z, u}}, {11 - 10*y + 2*y^2 == 0 && x == 0, {x, y, z}}, {Pi - z == 0 && 2*Pi*x - Pi*y - z < 0, {x, y, z}}, {Pi - z == 0 && -2*Pi*x + Pi*y - z < 0, {x, y, z}}, {Pi - z == 0 && 2*Pi*x - Pi*y + z < 0, {x, y, z}}, {Pi - z == 0 && -2*Pi - 2*Pi*x + Pi*y + z < 0, {x, y, z}}, {x - z == 0 && -y + 2*u*v^2*z == 0, {x, y, z, u, v}}, {z == 0 && x == 0, {x, y, z}}, {z == 0 && x == 0, {x, y, z, u}}, {z == 0 && y == 0, {x, y, z}}, {z == 0 && y == 0, {x, y, z, u}}, {z == 0 && -x + 10*y == 0, {x, y, z, u}}, {z == 0 && -x + y + 5*u^2*z == 0, {x, y, z, u, v}}, {z == 0 && x + y + 5*u^2*z == 0, {x, y, z, u, v}}, {z == 0 && x - u^2*y + 5*y*z^2 == 0, {x, y, z, u}}, {z == 0 && -(y*z) + 2*x*Log[2] == 0, {x, y, z, u}}, {z == 0 && y*z + 2*x*Log[2] == 0, {x, y, z, u}}, {z == 0 && -(y*z) - x*Log[2] + z*Log[2] == 0, {x, y, z, u}}, {z == 0 && 2*Pi*x - Pi*y - z < 0, {x, y, z}}, {z == 0 && -2*Pi*x + Pi*y - z < 0, {x, y, z}}, {z == 0 && 2*Pi*x - Pi*y + z < 0, {x, y, z}}, {z == 0 && -2*Pi - 2*Pi*x + Pi*y + z < 0, {x, y, z}}, {-x + z == 0 && y == 0, {x, y, z, u}}, {-1 + x + z == 0 && y == 0, {x, y, z, u}}, {x + z == 0 && y == 0, {x, y, z, u}}, {x - y + z == 0 && x + y - z == 0, {x, y, z, u}}, {x + y + 5*u^2*z == 0 && -u < 0, {x, y, z, u}}, {x^2 - y*z == 0 && -x <= 0, {x, y, z}}, {-1 + y*z == 0 && x < 0, {x, y, z}}, {-u^2 + x^2 - y^2 - z^2 == 0 && -u^3 + x^3 - y^3 - z^3 == 0, {x, y, z, u}}, {-1 + x^2 + y^2 - z^2 == 0 && y*z == 0, {x, y, z}}, {x^2 + y^2 - z^2 == 0 && -x <= 0, {x, y, z}}, {-25 + 16*x + z^2 == 0 && -24 + 14*y + 2*z + z^2 == 0, {x, y, z}}, {4 - 2*y + z^2 == 0 && -y + 2*z <= 0, {x, y, z}}, {-1 - x^2 + y^2 + z^2 == 0 && x*y == 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 == 0 && x^3 + y + x*z == 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 == 0 && y + x*z + z^3 == 0, {x, y, z}}, {-3 - x - 4*z + z^2 == 0 && -2 - y - 4*z + z^2 == 0, {x, y, z}}, {-10 + x - 3*z + z^2 == 0 && 64 - y - 32*z - 12*z^2 + 4*z^3 + z^4 == 0, {x, y, z}}, {x - 2*z + z^2 == 0 && -2 + 2*y + z^2 == 0, {x, y, z}}, {-3 - x + 2*z + z^2 == 0 && -2 - y + 2*z + z^2 == 0, {x, y, z}}, {14 + x + 8*z + z^2 == 0 && 4 - y + 4*z + z^2 == 0, {x, y, z}}, {11 - y + 2*z^2 == 0 && 11 - x + 2*z^2 == 0, {x, y, z}}, {1 - 2*y + 4*z^2 == 0 && y - 2*z <= 0, {x, y, z}}, {y - 2*z + y*z^2 == 0 && x + 2*z^2 + x*z^2 == 0, {x, y, z}}, {x^2*y - x*y^2 + x^2*z - 2*x*y*z + y^2*z - x*z^2 + y*z^2 == 0 && x*y - y^2 + x*z - y*z - z^2 == 0, {x, y, z}}, {-x + z^4 == 0 && z != 0, {x, y, z}}, {-x + Sqrt[u^2 + z^2] == 0 && y == 0, {x, y, z, u}}, {-x + z + Sqrt[y + z^2] == 0 && -x < 0, {x, y, z}}, {-x + z + Sqrt[y + z^2] == 0 && -y - z^2 <= 0, {x, y, z}}, {1 + x - 2*y + Sqrt[1 + 2*y + y^2 + z^2] == 0 && z == 0, {x, y, z}}, {x - 2*z + Sqrt[1 + u^2 + 2*z + z^2] == 0 && 2*u - y == 0, {x, y, z, u}}, {x - 2*z + Sqrt[1 + u^2 + 2*z + z^2] == 0 && 2*u + y == 0, {x, y, z, u}}, {1 + x - 2*z + Sqrt[1 + u^2 + 2*z + z^2] == 0 && u == 0, {x, y, z, u}}, {1 + x - 2*z + Sqrt[1 + u^2 + 2*z + z^2] == 0 && 2*u - y == 0, {x, y, z, u}}, {-x + Sqrt[1 + 4*u^2 + 4*u^4 - 4*z^2 + 8*u^2*z^2 + 4*z^4] == 0 && y == 0, {x, y, z, u}}, {-y + Log[2] == 0 && x == 0, {x, y, z}}, {-x + u*Log[2] == 0 && y == 0, {x, y, z, u}}, {-2*z^2 + x*Log[2] == 0 && y*Log[2]^2 + z^2*Log[5] == 0, {x, y, z}}, {-x + 2*y*Log[2] == 0 && -x - 2*z*Log[2] < 0, {x, y, z}}, {-y - 4*z*Log[2] + z^2*Log[2] == 0 && -x < 0, {x, y, z}}, {y*z - 6*Log[Root[-2 + #1^2 - #1^3 + #1^12 & , 2, 0]] == 0 && -x < 0, {x, y, z}}, {-u < 0 && -(u*z) + u*Log[2] - x*Log[2] <= 0, {x, y, z, u}}, {u < 0 && u*z - x*Log[2] <= 0, {x, y, z, u}}, {1 + u < 0 && -x + 2*u*z < 0, {x, y, z, u}}, {1 + v < 0 && 2*u*v - x < 0, {x, y, z, u, v}}, {u*v - x < 0 && -y + v*z <= 0, {x, y, z, u, v}}, {x < 0 && 2*y - z <= 0, {x, y, z}}, {-y < 0 && -(x*y) - 2*y*z*Log[2] < 0, {x, y, z}}, {-y < 0 && -1 + E*y <= 0, {x, y, z}}, {-y < 0 && -x - y*z <= 0, {x, y, z}}, {y < 0 && x*y + z - y*z < 0, {x, y, z}}, {y < 0 && x*y + 2*y*z*Log[2] < 0, {x, y, z}}, {y < 0 && -x + 2*y*z <= 0, {x, y, z}}, {1 + y < 0 && x - 2*y*z < 0, {x, y, z}}, {-u + 2*Pi*x + y < 0 && u - 2*Pi*x - z < 0, {x, y, z, u}}, {-7*Pi + 6*u - 12*Pi*y < 0 && Pi - u + 2*Pi*y < 0, {x, y, z, u}}, {-Pi + u - 2*Pi*y < 0 && 5*Pi - 6*u + 12*Pi*y < 0, {x, y, z, u}}, {-Pi - 6*u + 12*Pi*y < 0 && -Pi + 6*u - 12*Pi*y < 0, {x, y, z, u}}, {-672 + 2*y + 21*Sqrt[2]*Sqrt[-71 + z] < 0 && 71 - z <= 0, {x, y, z}}, {-Pi - 4*Pi*x - 2*z < 0 && -Pi + 4*Pi*x + 2*z <= 0, {x, y, z}}, {2*Pi*x - z < 0 && -2*Pi*x - y + z < 0, {x, y, z}}, {Pi + 2*Pi*x - z < 0 && -Pi - 2*Pi*x + y + z < 0, {x, y, z}}, {Pi - u + 2*Pi*x - z < 0 && -Pi + u - 2*Pi*x + y < 0, {x, y, z, u}}, {-y - z < 0 && x - y*Log[2] - z*Log[2] < 0, {x, y, z}}, {-Pi - y - z < 0 && -Pi + y + z <= 0, {x, y, z, u}}, {-Pi + 2*Pi*x - y - z < 0 && -2*Pi*x - y + z < 0, {x, y, z}}, {Pi + 2*Pi*x - y - z < 0 && -Pi - 2*Pi*x + z < 0, {x, y, z}}, {2*Pi*x + y - z < 0 && -2*Pi*x + z < 0, {x, y, z}}, {2*Pi*x + y - z < 0 && -Pi - 2*Pi*x + y + z < 0, {x, y, z}}, {-Pi + 2*Pi*x - 2*Pi*y - z < 0 && -2*Pi*x + 2*Pi*y + z < 0, {x, y, z}}, {-z < 0 && -1 + E*x*y*z <= 0, {x, y, z}}, {-z < 0 && -(y*z) - x*Log[2] + z*Log[2] <= 0, {x, y, z}}, {z < 0 && y < 0, {x, y, z}}, {z < 0 && y*z - x*Log[2] <= 0, {x, y, z}}, {1 + z < 0 && -x + 2*y*z < 0, {x, y, z}}, {-Pi + 2*Pi*x + z < 0 && -Pi - 2*Pi*x - z <= 0, {x, y, z}}, {-y + z < 0 && x - z <= 0, {x, y, z}}, {-2*Pi*x - y + z < 0 && -Pi + 2*Pi*x - y - z < 0, {x, y, z}}, {y - u*z < 0 && -x + Log[2] < 0, {x, y, z, u}}, {-(x*y) - x*z < 0 && -x < 0, {x, y, z}}, {x*y + x*z < 0 && x < 0, {x, y, z}}, {x^2 - 2*y*z < 0 && z < 0, {x, y, z}}, {-x^2 + 2*y*z < 0 && z < 0, {x, y, z}}, {4*x*y - z^2 < 0 && -4*x + 2*y - z < 0, {x, y, z}}, {4*x*y - z^2 < 0 && 4*x - 2*y + z < 0, {x, y, z}}, {-4*x*y + z^2 < 0 && -4*x + 2*y - z < 0, {x, y, z}}, {-4*x*y + z^2 < 0 && 4*x - 2*y + z < 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 < 0 && 2 - 2*x + x^2 - 2*y + y^2 - 2*z + z^2 < 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 < 0 && 3 + x^2 - 4*y + y^2 - 4*z + 2*y*z + z^2 < 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 < 0 && 21 - 12*x + 4*x^2 - 16*y + 4*y^2 + 4*z^2 < 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 < 0 && 21 + 4*x^2 - 16*y + 4*y^2 - 12*z + 4*z^2 < 0, {x, y, z}}, {x - 5*y*z^2 < 0 && -1 - E*x + 5*E*y*z^2 <= 0, {x, y, z}}, {x + 64*y - 5*y*z^2 < 0 && -1 - E*x - 64*E*y + 5*E*y*z^2 <= 0, {x, y, z}}, {5*x + 64*y - 5*y*z^2 < 0 && -1 - 5*E*x - 64*E*y + 5*E*y*z^2 <= 0, {x, y, z}}, {-x + y*z^2 < 0 && -1/5 - E*x + E*y*z^2 <= 0, {x, y, z}}, {-(x^2*z) + 2*y*z^2 < 0 && z < 0, {x, y, z}}, {-69*x + 5*y*z^2 < 0 && -1 - 69*E*x + 5*E*y*z^2 <= 0, {x, y, z}}, {-x + 5*y*z^2 < 0 && -1 - E*x + 5*E*y*z^2 <= 0, {x, y, z}}, {-5*x - 64*y + 5*y*z^2 < 0 && -1 - 5*E*x - 64*E*y + 5*E*y*z^2 <= 0, {x, y, z}}, {-x - 64*y + 5*y*z^2 < 0 && -1 - E*x - 64*E*y + 5*E*y*z^2 <= 0, {x, y, z}}, {9 + 6*x^2 + x^4 - 10*y^2 + 2*x^2*y^2 + y^4 - 10*z^2 + 2*x^2*z^2 + 2*y^2*z^2 + z^4 < 0 && 2 - 2*x + x^2 - 2*y + y^2 - 2*z + z^2 < 0, {x, y, z}}, {82 + 322*y + 487*y^2 + 324*y^3 + 81*y^4 - 214*z - 650*y*z - 648*y^2*z - 216*y^3*z + 217*z^2 + 432*y*z^2 + 216*y^2*z^2 - 96*z^3 - 96*y*z^3 + 16*z^4 < 0 && -1 + x == 0, {x, y, z}}, {x^2 - Sqrt[y^2 + z^2] < 0 && -y^2 - z^2 <= 0, {x, y, z}}, {y - Log[2] < 0 && -(y*z) + z*Log[2] < 0, {x, y, z}}, {y*z - Log[2] < 0 && x + 4*z <= 0, {x, y, z}}, {-Pi + 4*Pi*x - 2*z*Log[2] < 0 && -Pi - 4*Pi*x + 2*z*Log[2] < 0, {x, y, z}}, {-(Pi*Log[2]) - 2*Pi*x*Log[2] - z*Log[2] - Pi*Log[3] - 2*Pi*x*Log[3] - z*Log[3] < 0 && -(Pi*Log[2]) + 2*Pi*x*Log[2] + z*Log[2] - Pi*Log[3] + 2*Pi*x*Log[3] + z*Log[3] <= 0, {x, y, z}}, {-(Pi*Log[2]) + 2*Pi*x*Log[2] + z*Log[2] - Pi*Log[3] + 2*Pi*x*Log[3] + z*Log[3] < 0 && -(Pi*Log[2]) - 2*Pi*x*Log[2] - z*Log[2] - Pi*Log[3] - 2*Pi*x*Log[3] - z*Log[3] <= 0, {x, y, z}}, {y*Log[2] - Log[7] < 0 && -(Pi*x) + z*Log[2] == 0, {x, y, z}}, {-u <= 0 && x - 69*y + 5*u*z == 0, {x, y, z, u}}, {-u <= 0 && x - 5*y + 5*u*z == 0, {x, y, z, u}}, {-u <= 0 && x - y + 5*u*z == 0, {x, y, z, u}}, {-u <= 0 && x - 5*y - 64*z + 5*u*z == 0, {x, y, z, u}}, {-u <= 0 && x - y - 64*z + 5*u*z == 0, {x, y, z, u}}, {-x <= 0 && x*y*z < 0, {x, y, z}}, {-x <= 0 && -(x*y*z) <= 0, {x, y, z}}, {-y <= 0 && u^2 - 8*u*x + 16*x^2 + 6*u*y - 24*x*y + 9*y^2 - 4*u*z + 16*x*z - 12*y*z + 4*z^2 < 0, {x, y, z, u}}, {1 + E*y <= 0 && x - 2*y*z < 0, {x, y, z}}, {-1 + x^2 + y^2 <= 0 && -1 + y^2 + z^2 <= 0, {x, y, z}}, {-1 - z <= 0 && -x + y + z <= 0, {x, y, z}}, {x^2 + y^2 - z <= 0 && -1 + z <= 0, {x, y, z}}, {-z <= 0 && x - 69*y + 5*y*z == 0, {x, y, z}}, {-z <= 0 && x - 5*y + 5*y*z == 0, {x, y, z}}, {-z <= 0 && -1 - y + x*z < 0, {x, y, z}}, {-z <= 0 && -1 - x + y*z < 0, {x, y, z}}, {-z <= 0 && -x + Sqrt[16 - 40*y + 33*y^2 - 10*y^3 + y^4 + 17*z - 10*y*z + 2*y^2*z + z^2] < 0, {x, y, z}}, {-z <= 0 && -1 - E*x + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && -1 - 5*E*x - 64*E*y + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && -1 - E*x - 64*E*y + 5*E*y*z <= 0, {x, y, z}}, {1 + z <= 0 && -x + y + z <= 0, {x, y, z}}, {x^2 - 2*y*z <= 0 && z < 0, {x, y, z}}, {x - y*z <= 0 && -4 - u + 2*z == 0, {x, y, z, u}}, {-x^2 + 2*y*z <= 0 && z < 0, {x, y, z}}, {1 - z^2 <= 0 && 1 + z < 0, {x, y, z}}, {-x^2 + y^2 + z^2 <= 0 && y*z < 0, {x, y, z}}, {-x^2 + y^2 + z^2 <= 0 && -(y*z) <= 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 <= 0 && 3*x^2 + 3*y^2 - z^2 <= 0, {x, y, z}}, {-x^2 + 3*y^2 + 3*z^2 <= 0 && -1 + x^2 + y^2 + z^2 <= 0, {x, y, z}}, {-36 + x^2 + 4*y^2 + 9*z^2 <= 0 && 3 - x - 4*y - 6*z <= 0, {x, y, z}}, {-Pi + x^3 + y^3 + z^3 <= 0 && E - x^2 - y^2 - z^2 < 0, {x, y, z}}, {-245850922 + 78256779*x^3 + 78256779*y^3 + 78256779*z^3 <= 0 && 381859583 - 140478290*x^2 - 140478290*y^2 - 140478290*z^2 < 0, {x, y, z}}, {81 + 322*y + 487*y^2 + 324*y^3 + 81*y^4 - 214*z - 650*y*z - 648*y^2*z - 216*y^3*z + 217*z^2 + 432*y*z^2 + 216*y^2*z^2 - 96*z^3 - 96*y*z^3 + 16*z^4 <= 0 && -1 + x == 0, {x, y, z}}, {82 + 322*y + 487*y^2 + 324*y^3 + 81*y^4 - 214*z - 650*y*z - 648*y^2*z - 216*y^3*z + 217*z^2 + 432*y*z^2 + 216*y^2*z^2 - 96*z^3 - 96*y*z^3 + 16*z^4 <= 0 && -1 + x == 0, {x, y, z}}, {-y + z^2 + Sqrt[-1 - x^2 + z] <= 0 && 1 + x^2 - z <= 0, {x, y, z}}, {Pi + 4*Pi*x - 2*z*Log[2] <= 0 && -3*Pi - 4*Pi*x + 2*z*Log[2] <= 0, {x, y, z}}, {2*Pi*x*Log[2] + z*Log[2] + 2*Pi*x*Log[3] + z*Log[3] - Pi*Log[6] <= 0 && -2*Pi*x*Log[2] - z*Log[2] - 2*Pi*x*Log[3] - z*Log[3] - Pi*Log[6] < 0, {x, y, z}}, {1 + u^2 != 0 && 2*u*x + y - u^2*y - z - u^2*z == 0, {x, y, z, u}}, {-5*u + u^2 != 0 && -20*u*x + 4*u^2*x - y - z == 0, {x, y, z, u}}, {x != 0 && x^2 + y^2 + z^2 == 0, {x, y, z}}, {x != 0 && -(y*Log[3]) + x*Log[7] == 0, {x, y, z}}, {v*x != 0 && u*y < 0, {x, y, z, u, v}}, {y != 0 && y + z == 0, {x, y, z, u}}, {y != 0 && x^2 + y^2 + z^2 == 0, {x, y, z}}, {y != 0 && -(x*y^2) + Log[2]^2 == 0, {x, y, z}}, {y != 0 && -y < 0, {x, y, z}}, {y != 0 && y < 0, {x, y, z}}, {y^2 != 0 && y != 0, {x, y, z}}, {1 - v^2 + v*x - v^3*x - v*y + v^3*y - v^2*x*y + v^4*x*y != 0 && 1 + u - u*v^2 + v*x - v*y - u*v*y + u*v^3*y - v^2*x*y - z + v^2*z - v*x*z + v^3*x*z == 0, {x, y, z, u, v}}, {z != 0 && x == 0, {x, y, z}}, {z != 0 && x + y == 0, {x, y, z, u}}, {z != 0 && x^2 + y^2 + z^2 == 0, {x, y, z}}, {z != 0 && y + y*z - x*z^2 == 0, {x, y, z}}, {z != 0 && -y + x*z^2 == 0, {x, y, z}}, {z != 0 && -9*y^2 + x*z^2 == 0, {x, y, z}}, {z != 0 && -(x*z) - y*z + x*z^2 == 0, {x, y, z}}, {z != 0 && y - 2*x*z + y*z^2 == 0, {x, y, z}}, {z != 0 && -205891132094649*y^30 + x*z^30 == 0, {x, y, z}}, {z != 0 && z < 0, {x, y, z}}, {z != 0 && -(u*z) < 0, {x, y, z, u}}, {z != 0 && u*z < 0, {x, y, z, u}}, {z != 0 && z != 0, {x, y, z}}, {x*z != 0 && v*y < 0, {x, y, z, u, v, w}}, {1 + z != 0 && x + x*z - y*z^2 == 0, {x, y, z}}, {y + z != 0 && -1 + x*y^2 + 2*x*y*z + x*z^2 == 0, {x, y, z}}, {1 - u*v - v^2 + u*v^3 + v*z - u*v^2*z - v^3*z + u*v^4*z != 0 && 1 - u*v + x - u*v*x - v^2*x + u*v^3*x - y + v^2*y + v*z - u*v^2*z - v*y*z + v^3*y*z == 0, {x, y, z, u, v}}, {-1 + z^2 != 0 && -2*x + y - Pi*z^2 + 4*x*z^2 - 2*y*z^2 - 2*x*z^4 + y*z^4 == 0, {x, y, z}}, {-1 + z^2 != 0 && Pi - 4*Pi*x + 2*y - 4*Pi*z^2 + 8*Pi*x*z^2 - 4*y*z^2 + Pi*z^4 - 4*Pi*x*z^4 + 2*y*z^4 == 0, {x, y, z}}, {11 - 10*z + 2*z^2 != 0 && 22*x - y - 20*x*z + 4*x*z^2 == 0, {x, y, z}}, {-x + 5*y*z^2 != 0 && -1 - E*x + 5*E*y*z^2 <= 0, {x, y, z}}, {-5*x - 64*y + 5*y*z^2 != 0 && -1 - 5*E*x - 64*E*y + 5*E*y*z^2 <= 0, {x, y, z}}, {-x - 64*y + 5*y*z^2 != 0 && -1 - E*x - 64*E*y + 5*E*y*z^2 <= 0, {x, y, z}}, {1 + x^2 + y^2 + x^2*y^2 + z^2 + x^2*z^2 + y^2*z^2 + x^2*y^2*z^2 != 0 && 3 - 18*x^2 + 11*x^4 + 16*x*y - 48*x^3*y - 2*y^2 + 60*x^2*y^2 - 2*x^4*y^2 - 48*x*y^3 + 16*x^3*y^3 + 11*y^4 - 18*x^2*y^4 + 3*x^4*y^4 - 16*x*z - 16*x^3*z - 16*y*z + 192*x^2*y*z - 48*x^4*y*z - 256*x*y^2*z + 256*x^3*y^2*z + 48*y^3*z - 192*x^2*y^3*z + 16*x^4*y^3*z + 16*x*y^4*z + 16*x^3*y^4*z - 18*z^2 + 156*x^2*z^2 - 18*x^4*z^2 - 192*x*y*z^2 + 192*x^3*y*z^2 + 60*y^2*z^2 - 264*x^2*y^2*z^2 + 60*x^4*y^2*z^2 + 192*x*y^3*z^2 - 192*x^3*y^3*z^2 - 18*y^4*z^2 + 156*x^2*y^4*z^2 - 18*x^4*y^4*z^2 - 16*x*z^3 - 16*x^3*z^3 + 48*y*z^3 - 192*x^2*y*z^3 + 16*x^4*y*z^3 + 256*x*y^2*z^3 - 256*x^3*y^2*z^3 - 16*y^3*z^3 + 192*x^2*y^3*z^3 - 48*x^4*y^3*z^3 + 16*x*y^4*z^3 + 16*x^3*y^4*z^3 + 11*z^4 - 18*x^2*z^4 + 3*x^4*z^4 + 48*x*y*z^4 - 16*x^3*y*z^4 - 2*y^2*z^4 + 60*x^2*y^2*z^4 - 2*x^4*y^2*z^4 - 16*x*y^3*z^4 + 48*x^3*y^3*z^4 + 3*y^4*z^4 - 18*x^2*y^4*z^4 + 11*x^4*y^4*z^4 == 0, {x, y, z}}, {-z + z^3 != 0 && y + 4*x*z + 2*y*z^2 - 4*x*z^3 + y*z^4 == 0, {x, y, z}}, {-z + z^3 != 0 && y - 4*x*z + 2*y*z^2 + 4*x*z^3 + y*z^4 == 0, {x, y, z}}, {z*Log[2] != 0 && -z < 0, {x, y, z}}, {z*Log[2] != 0 && z < 0, {x, y, z}}, {u == 0 && x == 0 && u != 0, {x, y, z, u}}, {v^2 == 0 && u^2 == 0 && v == 0, {x, y, z, u, v}}, {x == 0 && u == 0 && x*y != 0, {x, y, z, u}}, {x == 0 && y == 0 && x < 0, {x, y, z}}, {x == 0 && y == 0 && z < 0, {x, y, z}}, {x == 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {x == 0 && y == 0 && -1/4 + E*y*z <= 0, {x, y, z}}, {x == 0 && y == 0 && z != 0, {x, y, z}}, {x == 0 && -x + y == 0 && -1 + 4*z != 0, {x, y, z}}, {x == 0 && -1 + x*y == 0 && y + z != 0, {x, y, z}}, {x == 0 && -1 + x^2 + y^2 + z^2 == 0 && x^3 + y == 0, {x, y, z}}, {x == 0 && z*Log[11] - Log[21] < 0 && y == 0, {x, y, z}}, {x == 0 && -1 - E*y <= 0 && z != 0, {x, y, z}}, {x == 0 && -1 + E*u*y <= 0 && z == 0, {x, y, z, u}}, {x^2 == 0 && u^2*y^2 + y^2*z^2 == 0 && x*y != 0, {x, y, z, u}}, {x - y == 0 && x == 0 && -1 + z != 0, {x, y, z}}, {-1 + y == 0 && z*Log[11] - Log[21] < 0 && x == 0, {x, y, z}}, {-1 + y == 0 && y != 0 && x == 0, {x, y, z}}, {x*Sqrt[-y] == 0 && Sqrt[-y]*y^2 == 0 && y <= 0, {x, y, z}}, {Sqrt[y] == 0 && x == 0 && -y <= 0, {x, y, z}}, {y == 0 && u - x == 0 && y + z == 0, {x, y, z, u, v}}, {y == 0 && -1 + x == 0 && -y < 0, {x, y, z}}, {y == 0 && -1 + x == 0 && y < 0, {x, y, z}}, {y == 0 && x == 0 && y == 0, {x, y, z}}, {y == 0 && x == 0 && 2 + y == 0, {x, y, z}}, {y == 0 && x == 0 && -y < 0, {x, y, z}}, {y == 0 && x == 0 && y < 0, {x, y, z}}, {y == 0 && x == 0 && -z < 0, {x, y, z}}, {y == 0 && x == 0 && z < 0, {x, y, z}}, {y == 0 && x == 0 && Sqrt[345] + 5*z < 0, {x, y, z}}, {y == 0 && x == 0 && 1 - y <= 0, {x, y, z}}, {y == 0 && x == 0 && 5 + y <= 0, {x, y, z}}, {y == 0 && x == 0 && y != 0, {x, y, z}}, {y == 0 && x == 0 && z != 0, {x, y, z}}, {y == 0 && -1 + 2*x == 0 && -2 + y == 0, {x, y, z}}, {y == 0 && 1 + 2*x == 0 && -2 + y == 0, {x, y, z}}, {y == 0 && z == 0 && -x < 0, {x, y, z}}, {y == 0 && z == 0 && x < 0, {x, y, z}}, {y == 0 && z == 0 && -z <= 0, {x, y, z}}, {y == 0 && -x + y*z == 0 && -y < 0, {x, y, z, u}}, {y == 0 && x + y*z == 0 && y < 0, {x, y, z, u}}, {y == 0 && -x + 5*y*z^2 == 0 && z == 0, {x, y, z, u}}, {y == 0 && -x + 5*y*z^2 == 0 && -u < 0, {x, y, z, u}}, {y == 0 && x*y + 45*Log[2]^2 == 0 && y != 0, {x, y, z}}, {y == 0 && x*y + 5*Log[8]^2 == 0 && y != 0, {x, y, z}}, {y == 0 && z*Log[11] - Log[21] < 0 && x == 0, {x, y, z}}, {x^2*y^2 == 0 && v^2*x^2 - u^2*y^2 - y^2*z^2 == 0 && x*y != 0, {x, y, z, u, v}}, {Sqrt[y^3] == 0 && x == 0 && -y^3 <= 0, {x, y, z}}, {-(Pi*x) + y == 0 && -Pi - y < 0 && -Pi + y <= 0, {x, y, z}}, {-1 + u*x^2 + y^2 == 0 && x^2*z == 0 && -x + y < 0, {x, y, z, u}}, {x^4 - 2*x^2*y^2 + y^4 == 0 && u^2*y^4 == 0 && x*y != 0, {x, y, z, u}}, {x^4*y^2 + x^2*y^4 == 0 && -(v^2*x^4) + u^2*x^2*y^2 + v^2*x^2*y^2 - 3*u^2*y^4 + x^2*y^2*z^2 - y^4*z^2 == 0 && x*y != 0, {x, y, z, u, v}}, {u - 2*y + Sqrt[1 + x^2 + 2*y + y^2] == 0 && 2*x + z == 0 && -1 - x^2 - 2*y - y^2 <= 0, {x, y, z, u}}, {1 + u - 2*y + Sqrt[1 + x^2 + 2*y + y^2] == 0 && x == 0 && -1 - x^2 - 2*y - y^2 <= 0, {x, y, z, u}}, {-2*Pi*x - y + Sqrt[z] == 0 && -z < 0 && -z <= 0, {x, y, z}}, {-Pi - 2*Pi*x + y + Sqrt[z] == 0 && -z < 0 && -z <= 0, {x, y, z}}, {2 + v - z == 0 && -u + 2*v == 0 && x - v*y <= 0, {x, y, z, u, v}}, {x^2 - y - z == 0 && -z < 0 && -x <= 0, {x, y, z}}, {z == 0 && u == 0 && -u <= 0, {x, y, z, u}}, {z == 0 && x == 0 && z < 0, {x, y, z}}, {z == 0 && y == 0 && x - 2*z == 0, {x, y, z, u}}, {z == 0 && y == 0 && x - z == 0, {x, y, z, u}}, {z == 0 && y == 0 && x + 4*z == 0, {x, y, z, u}}, {z == 0 && y == 0 && -x + 2*u*z == 0, {x, y, z, u, v}}, {z == 0 && y == 0 && x + z*Log[10] == 0, {x, y, z, u}}, {z == 0 && y == 0 && z < 0, {x, y, z}}, {z == 0 && x + y == 0 && z < 0, {x, y, z}}, {z == 0 && -x + 10*y == 0 && z < 0, {x, y, z, u}}, {z == 0 && y - u*z == 0 && -x < 0, {x, y, z, u}}, {z == 0 && x + u*z == 0 && -y + u*z == 0, {x, y, z, u, v}}, {z == 0 && -(y*z) + 2*x*Log[2] == 0 && -z < 0, {x, y, z, u}}, {z == 0 && y*z + 2*x*Log[2] == 0 && z < 0, {x, y, z, u}}, {z == 0 && -(y*z) - x*Log[2] + z*Log[2] == 0 && z < 0, {x, y, z, u}}, {y*z == 0 && -69*y + 5*y*z^2 == 0 && -x < 0, {x, y, z}}, {z^2 == 0 && y^2 == 0 && -z <= 0, {x, y, z}}, {z^2 == 0 && -x^2 + y^2 + z^2 == 0 && y^2 == 0, {x, y, z}}, {-y + z == 0 && -z < 0 && -x < 0, {x, y, z}}, {-(v*y) - 5*z + u*z == 0 && v + 2*u^2*v + 2*v^3 - 2*z == 0 && -5 + u + 2*u^3 + 2*u*v^2 - 2*y == 0, {x, y, z, u, v}}, {-(u^2*x) + 9*y^2 - 6*u*y*Sqrt[z] + u^2*z == 0 && u^2 != 0 && -z <= 0, {x, y, z, u}}, {Sqrt[y] - 3*x*z == 0 && z != 0 && -y <= 0, {x, y, z}}, {-(y*Sqrt[z]) + x*z == 0 && z != 0 && -z <= 0, {x, y, z}}, {-(y*Sqrt[z]) + 2*x*z == 0 && z != 0 && -z <= 0, {x, y, z}}, {-2*y*Sqrt[z] + 5*x*z == 0 && z != 0 && -z <= 0, {x, y, z}}, {-(y*Sqrt[z]) + 5*x*z == 0 && z != 0 && -z <= 0, {x, y, z}}, {-3*x + Sqrt[u]*z + Sqrt[y]*z == 0 && -y <= 0 && -u <= 0, {x, y, z, u}}, {-3*x + 2*Sqrt[y]*z == 0 && z == 0 && -y <= 0, {x, y, z, u}}, {x^2 - y*z == 0 && -x < 0 && -x <= 0, {x, y, z}}, {-2 + y^2 + x*z - y*z == 0 && -2 + x^2 == 0 && -2 + y^2 == 0, {x, y, z}}, {-1 + y*z == 0 && z == 0 && -z < 0, {x, y, z}}, {x + y + x^3*y + x*y^3 + y*z == 0 && 5 - z < 0 && x^2 + y^2 <= 0, {x, y, z}}, {-1 - 9*x + 12*y - 6*x*y + z + 14*x*z + 3*y*z + 7*x*y*z == 0 && 14*x + 14*y - x*y - 15*z + 15*y*z + 2*x*y*z == 0 && 14 + 5*x - 2*y - 11*x*y - 10*z + 12*x*z - 15*y*z + 8*x*y*z == 0, {x, y, z}}, {-1 + x^2 + y^2 - z^2 == 0 && y*z == 0 && -x + Sqrt[y^2 + z^2] < 0, {x, y, z}}, {x^2 + y^2 - z^2 == 0 && y*z == 0 && z != 0, {x, y, z}}, {x^2 + y^2 - z^2 == 0 && -x < 0 && -x <= 0, {x, y, z}}, {-1 + u^2*x + z^2 == 0 && u^2*y == 0 && -u + z < 0, {x, y, z, u}}, {-2*Pi*x - y + z^2 == 0 && -z <= 0 && z <= 0, {x, y, z}}, {-Pi - 2*Pi*x + y + z^2 == 0 && -z <= 0 && z <= 0, {x, y, z}}, {-x^2 + y^2 + z^2 == 0 && x*y == 0 && x != 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 == 0 && -x < 0 && -x^3 + y + z < 0, {x, y, z}}, {100 - x - 20*z + z^2 == 0 && -2 + z != 0 && -7 + 4*y - 2*y*z + 2*z^3 == 0, {x, y, z}}, {1 + x*y - x*z - y*z + z^2 == 0 && 9 + 3*x^2*y + 3*x*y^2 - 3*x^2*z - 6*x*y*z - 3*y^2*z + 3*x*z^2 + 3*y*z^2 - 2*z^3 == 0 && 29 + 4*x^3*y + 6*x^2*y^2 + 4*x*y^3 - 4*x^3*z - 12*x^2*y*z - 12*x*y^2*z - 4*y^3*z + 6*x^2*z^2 + 12*x*y*z^2 + 6*y^2*z^2 - 4*x*z^3 - 4*y*z^3 == 0, {x, y, z}}, {-11 + x - 2*y^2 + 2*z^2 == 0 && y*z == 0 && 1 - x <= 0, {x, y, z}}, {9*y^2 - 6*Sqrt[u]*y*z + u*z^2 - x*z^2 == 0 && z^2 != 0 && -u <= 0, {x, y, z, u}}, {9*y^2 + 6*Sqrt[u]*y*z + u*z^2 - x*z^2 == 0 && z^2 != 0 && -u <= 0, {x, y, z, u}}, {x + x*z - y*z^2 == 0 && -1 - z < 0 && -1 + z <= 0, {x, y, z}}, {16 - x - 32*z + 24*z^2 - 8*z^3 + z^4 == 0 && -2*z + z^2 != 0 && -12 + z - 8*y*z + 12*y*z^2 - 6*y*z^3 + y*z^4 == 0, {x, y, z}}, {x + y^2*z^5 == 0 && y*z != 0 && -1 - z <= 0, {x, y, z}}, {x^5 + y^2*z^5 == 0 && y*z != 0 && -1 - z <= 0, {x, y, z}}, {x*z^3 - y*Sqrt[z^3] == 0 && z^3 != 0 && -z^3 <= 0, {x, y, z}}, {2*x*z^3 - y*Sqrt[z^3] == 0 && z^3 != 0 && -z^3 <= 0, {x, y, z}}, {-1 + x + Sqrt[1 + z] == 0 && -3 + y + Sqrt[1 + z] == 0 && -1 - z <= 0, {x, y, z}}, {x + z - Sqrt[1 + z^2] == 0 && -y + z + Sqrt[1 + z^2] == 0 && -1 - z^2 <= 0, {x, y, z}}, {-1 - u^2 + 2*x - z^2 + Sqrt[u^2 + z^2] + x*Sqrt[u^2 + z^2] == 0 && 2 + Sqrt[u^2 + z^2] != 0 && y == 0, {x, y, z, u}}, {1 - 4*x*y + 2*Sqrt[y^2 + z^2] == 0 && -x + 4*x*z == 0 && -x <= 0, {x, y, z}}, {y + x*Sqrt[1 + 2*y + y^2 + z^2] == 0 && 1 + z == 0 && 1 - x <= 0, {x, y, z}}, {-4 - 2*x - Sqrt[1 + u^2 - 2*z + z^2] + x*Sqrt[1 + u^2 - 2*z + z^2] == 0 && -2 + Sqrt[1 + u^2 - 2*z + z^2] != 0 && y == 0, {x, y, z, u}}, {-(Pi*y) + u*Log[2] == 0 && -3*Pi - 4*Pi*x + 2*u*Log[2] <= 0 && Pi + 4*Pi*x - 2*u*Log[2] <= 0, {x, y, z, u}}, {-3*x*z + Sqrt[y]*Log[2] == 0 && z != 0 && -y <= 0, {x, y, z}}, {z - Log[2] + x*Log[2] - y*Log[2] == 0 && y != 0 && -y < 0, {x, y, z}}, {-x + 2*y*Log[2] == 0 && y - z != 0 && -y - z < 0, {x, y, z}}, {-y + Log[AlgebraicNumber[Root[-5625 + #1^5 & , 1, 0], {0, 1/5, 0, 0, 0}]] == 0 && y*z - Log[AlgebraicNumber[Root[-5625 + #1^5 & , 1, 0], {0, 0, 0, 1/75, 0}]] == 0 && -x < 0, {x, y, z}}, {-Root[y - 4*#1 + 2*y*#1^2 + 4*#1^3 + y*#1^4 & , 2] + Root[y - 4*#1 + 2*y*#1^2 + 4*#1^3 + y*#1^4 & , 2]^3 == 0 && x + 2*x*Root[y - 4*#1 + 2*y*#1^2 + 4*#1^3 + y*#1^4 & , 2]^2 + x*Root[y - 4*#1 + 2*y*#1^2 + 4*#1^3 + y*#1^4 & , 2]^4 == 0 && y - 4*Root[y - 4*#1 + 2*y*#1^2 + 4*#1^3 + y*#1^4 & , 2] + 2*y*Root[y - 4*#1 + 2*y*#1^2 + 4*#1^3 + y*#1^4 & , 2]^2 + 4*Root[y - 4*#1 + 2*y*#1^2 + 4*#1^3 + y*#1^4 & , 2]^3 + y*Root[y - 4*#1 + 2*y*#1^2 + 4*#1^3 + y*#1^4 & , 2]^4 == 0, {x, y, z}}, {-u < 0 && u + 16*x*y^2*z <= 0 && y < 0, {x, y, z, u}}, {-u < 0 && -x - u*y + 5*y*z^2 != 0 && -1 - E*x - E*u*y + 5*E*y*z^2 <= 0, {x, y, z, u}}, {-u < 0 && -x + u*y + 5*y*z^2 != 0 && -1 - E*x + E*u*y + 5*E*y*z^2 <= 0, {x, y, z, u}}, {u < 0 && -y + u*z < 0 && -x + 5*u^2*z <= 0, {x, y, z, u}}, {1 + u < 0 && -x + 2*u*z < 0 && 1 - u^2 <= 0, {x, y, z, u}}, {1 + v < 0 && -x + 2*v*z < 0 && 1 - v^2 <= 0, {x, y, z, u, v}}, {-1 - x < 0 && -3/2 + E*z <= 0 && 3*y + 2*z <= 0, {x, y, z}}, {1 - x < 0 && z - x*Log[21] < 0 && -(x*y) - z + x*z < 0, {x, y, z}}, {71 - x < 0 && z*Log[5] - 2*Log[15] == 0 && y - z*Log[5] < 0, {x, y, z}}, {71 - x < 0 && z*Log[5] - 2*Log[335/21] < 0 && y - z*Log[5] < 0, {x, y, z}}, {-1 + x < 0 && -x < 0 && y*z < 0, {x, y, z}}, {-x < 0 && -1 - y + z <= 0 && z < 0, {x, y, z}}, {-x < 0 && -69*y + 5*y*z^2 != 0 && -1 - 69*E*y + 5*E*y*z^2 <= 0, {x, y, z}}, {x < 0 && -z < 0 && -(x*z) < 0, {x, y, z}}, {x < 0 && -z + x*Log[3] + x*Log[7] < 0 && -(x*y) + z - x*z < 0, {x, y, z}}, {x < 0 && -z + x*Log[3] + x*Log[7] < 0 && x*y + z - x*z < 0, {x, y, z}}, {x < 0 && -z + x*Log[21] < 0 && -(x*y) + z - x*z < 0, {x, y, z}}, {x < 0 && -z + x*Log[21] < 0 && x*y + z - x*z < 0, {x, y, z}}, {x < 0 && -y + 2*x*z != 0 && 1 + y <= 0, {x, y, z}}, {-y < 0 && -(y*z) < 0 && z < 0, {x, y, z}}, {-y < 0 && 20*z - 5*x^2*z + 4*y*z < 0 && -4 - 20*E*z + 5*E*x^2*z - 4*E*y*z <= 0, {x, y, z}}, {-y < 0 && 1 - x + y + z <= 0 && -1 - z <= 0, {x, y, z}}, {-y < 0 && 1 - x + y + z <= 0 && 1 + z <= 0, {x, y, z}}, {y < 0 && z < 0 && -1 - x*y <= 0, {x, y, z}}, {y < 0 && -(y*z) < 0 && y*z - x*Log[2] <= 0, {x, y, z}}, {y < 0 && -x + z < 0 && -z + y*Log[21] < 0, {x, y, z}}, {y < 0 && -z + y*Log[3] + y*Log[7] < 0 && x*y + z - y*z < 0, {x, y, z}}, {y < 0 && -z + y*Log[21] < 0 && x*y + z - y*z < 0, {x, y, z}}, {y < 0 && -x + 2*y*z != 0 && x < 0, {x, y, z}}, {1 + y < 0 && -x + 2*y*z < 0 && x < 0, {x, y, z}}, {-u + 2*y < 0 && u - 2*z < 0 && 1 - x < 0, {x, y, z, u}}, {-u + 2*y < 0 && u - 2*z < 0 && x < 0, {x, y, z, u}}, {-1 + Sqrt[x^2 + y^2] < 0 && u^2 + x - z^2 == 0 && y - 2*u*z == 0, {x, y, z, u}}, {u - 2*z < 0 && -u + 2*y < 0 && 1 - x < 0, {x, y, z, u}}, {u - 2*z < 0 && -u + 2*y < 0 && x < 0, {x, y, z, u}}, {-1 - z < 0 && -1 + z < 0 && x - y*z < 0, {x, y, z}}, {2*Pi*x - z < 0 && -2*Pi*x - y + z < 0 && -Pi - 2*Pi*x + z < 0, {x, y, z}}, {-z < 0 && x + 3*Sqrt[z^(-1)] == 0 && y + 3*Sqrt[z^(-1)] == 0, {x, y, z}}, {-z < 0 && y < 0 && u*y + Log[2] - x*Log[2] < 0, {x, y, z, u}}, {-z < 0 && -Sqrt[z] < 0 && -y + x*Sqrt[z] == 0, {x, y, z}}, {-z < 0 && -Pi + z < 0 && 2*Pi*x - Pi*y - z < 0, {x, y, z}}, {-z < 0 && -Pi + z < 0 && -2*Pi*x + Pi*y - z < 0, {x, y, z}}, {-z < 0 && -Pi + z < 0 && 2*Pi*x - Pi*y + z < 0, {x, y, z}}, {-z < 0 && -Pi + z < 0 && -2*Pi - 2*Pi*x + Pi*y + z < 0, {x, y, z}}, {-z < 0 && 4*x - 5*u*y^2 + 4*u*z < 0 && -4 - 4*E*x + 5*E*u*y^2 - 4*E*u*z <= 0, {x, y, z, u}}, {-z < 0 && x - z*Log[3] < 0 && y*Log[2] + x*Log[3] - z*Log[3]^2 + z*Log[2]*Log[12] == 0, {x, y, z}}, {-z < 0 && 3^(2/(5*(1 + Log[3])))*E^(-(Log[3]^2/(1 + Log[3])) - (Log[3]*Log[Pi])/(1 + Log[3]))*Pi^(-1 - Log[3])^(-1) - z <= 0 && -(3^(2/(1 + Log[3]))*E^(-(Log[3]^2/(1 + Log[3])) - (Log[3]*Log[Pi])/ (1 + Log[3]))*Pi^(-1 - Log[3])^(-1)) + z <= 0, {x, y, z}}, {-z < 0 && -1/4 + E*x*z <= 0 && -y < 0, {x, y, z}}, {-z < 0 && -5*x + 5*x*y^2 - x*z != 0 && -1 - 5*E*x + 5*E*x*y^2 - E*x*z <= 0, {x, y, z}}, {-z < 0 && z*Log[2] != 0 && -1 + E*z <= 0, {x, y, z}}, {z < 0 && u < 0 && -1 - x*z <= 0, {x, y, z, u}}, {z < 0 && -y < 0 && u*y + Log[2] - x*Log[2] < 0, {x, y, z, u}}, {z < 0 && -y < 0 && -(u*y) - Log[2] + x*Log[2] < 0, {x, y, z, u}}, {z < 0 && -(u*z) < 0 && u*z - x*Log[2] <= 0, {x, y, z, u}}, {z < 0 && -5*y - Sqrt[345]*Sqrt[x/z]*z < 0 && x <= 0, {x, y, z}}, {z < 0 && -5*y - Sqrt[5]*z*Sqrt[(5*x + 64*z)/z] < 0 && 5*x + 64*z <= 0, {x, y, z}}, {z < 0 && y*z + 2*u*z*Log[2] < 0 && x != 0, {x, y, z, u}}, {z < 0 && x + 64*z <= 0 && -5*y - Sqrt[5]*z*Sqrt[(x + 64*z)/z] < 0, {x, y, z}}, {-(u*z) < 0 && -y + u*z < 0 && -x + 5*u^2*z <= 0, {x, y, z, u}}, {x*z < 0 && z < 0 && u*y*z != 0, {x, y, z, u}}, {-(y*z) < 0 && y < 0 && -z < 0, {x, y, z}}, {1 + z < 0 && -x + y*z < 0 && -y + y*z^2 <= 0, {x, y, z}}, {1 + z < 0 && -x + 2*y*z < 0 && 1 - z^2 <= 0, {x, y, z}}, {-y + 2*z < 0 && -y < 0 && -x + y*Log[2] == 0, {x, y, z}}, {u*x + y - u*z < 0 && -1 - x <= 0 && -1 + x <= 0, {x, y, z, u}}, {x^2*y*z + y^3*z < 0 && -z < 0 && y^2 - 2*y*z <= 0, {x, y, z}}, {-4*x*y + z^2 < 0 && -4*x + 2*y - z < 0 && -x < 0, {x, y, z}}, {-4*x*y + z^2 < 0 && 4*x - 2*y + z < 0 && x < 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 < 0 && 2 - 2*x + x^2 - 2*y + y^2 - 2*z + z^2 < 0 && 21 - 12*x + 4*x^2 - 16*y + 4*y^2 + 4*z^2 < 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 < 0 && 2 - 2*x + x^2 - 2*y + y^2 - 2*z + z^2 < 0 && 5 + 4*x + 4*x^2 - 8*y + 4*y^2 - 8*z + 4*z^2 < 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 < 0 && 2 - 2*x + x^2 - 2*y + y^2 - 2*z + z^2 < 0 && 5 - 8*x + 4*x^2 - 8*y + 4*y^2 + 4*z + 4*z^2 < 0, {x, y, z}}, {-Sqrt[x^2 + y^2] + z^2 < 0 && -3 - 2*x - x^2 + y^2 == 0 && y + x*y == 0, {x, y, z}}, {y - Log[2] < 0 && y*z - z*Log[2] < 0 && -(y*z) - x*Log[2] + z*Log[2] <= 0, {x, y, z}}, {z - Log[2] < 0 && u*z - u*Log[2] < 0 && -(u*z) + u*Log[2] - x*Log[2] <= 0, {x, y, z, u}}, {-u <= 0 && z == 0 && -x + y + 5*u*z == 0, {x, y, z, u, v}}, {-u <= 0 && z == 0 && x + y + 5*u*z == 0, {x, y, z, u, v}}, {-u <= 0 && z == 0 && x - u*y + 5*y*z^2 == 0, {x, y, z, u}}, {-v <= 0 && x - z == 0 && -y + 2*u*v*z == 0, {x, y, z, u, v}}, {-x <= 0 && -1 + x + y^2 - z^2 == 0 && y*z == 0, {x, y, z}}, {-x <= 0 && x - 2*y*z < 0 && z < 0, {x, y, z}}, {-x <= 0 && -x + 2*y*z < 0 && z < 0, {x, y, z}}, {-x <= 0 && -1 + x + y^2 + z^2 < 0 && 3 + x - 4*y + y^2 - 4*z + 2*y*z + z^2 < 0, {x, y, z}}, {-x <= 0 && -1 + x + y^2 + z^2 < 0 && 21 + 4*x - 16*y + 4*y^2 - 12*z + 4*z^2 < 0, {x, y, z}}, {-x <= 0 && -(x*z) + 2*y*z^2 < 0 && z < 0, {x, y, z}}, {-x <= 0 && x - 2*y*z <= 0 && z < 0, {x, y, z}}, {-x <= 0 && -x + 2*y*z <= 0 && z < 0, {x, y, z}}, {-x <= 0 && -x + y^2 + z^2 <= 0 && y*z < 0, {x, y, z}}, {-x <= 0 && -x + y^2 + z^2 <= 0 && -(y*z) <= 0, {x, y, z}}, {-x <= 0 && -y + z^2 + Sqrt[-1 - x + z] <= 0 && 1 + x - z <= 0, {x, y, z}}, {x <= 0 && z < 0 && -5*y - Sqrt[5]*Sqrt[x/z]*z < 0, {x, y, z}}, {-1 - E*x <= 0 && -z < 0 && x + 4*y*z <= 0, {x, y, z}}, {-1 - E*x <= 0 && z < 0 && -x - 4*y*z <= 0, {x, y, z}}, {1 - y <= 0 && -1/2 + y*z < 0 && -x + y == 0, {x, y, z}}, {-y <= 0 && x == 0 && y == 0, {x, y, z}}, {-y <= 0 && -z <= 0 && x - y - z == 0, {x, y, z}}, {-y <= 0 && z != 0 && -9*y + x*z^2 == 0, {x, y, z}}, {-y <= 0 && z != 0 && -205891132094649*y + x*z^30 == 0, {x, y, z}}, {1 + y <= 0 && 1/2 - y*z < 0 && -x + y == 0, {x, y, z}}, {-1 - E*y <= 0 && -1 - x + z <= 0 && z != 0, {x, y, z}}, {1 + E*y <= 0 && -x + 2*y*z < 0 && x < 0, {x, y, z}}, {2*y - z <= 0 && z - 2*Log[16] < 0 && 1 - 16*x < 0, {x, y, z}}, {x^2 + y^2 - z <= 0 && -Sqrt[x^2 + y^2] + z <= 0 && -x^2 - y^2 <= 0, {x, y, z}}, {-z <= 0 && x == 0 && z == 0, {x, y, z}}, {-z <= 0 && y == 0 && -x + 5*y*z == 0, {x, y, z, u}}, {-z <= 0 && y == 0 && u - x + 5*y*z == 0, {x, y, z, u, v}}, {-z <= 0 && y == 0 && -5*x - 64*y + 5*y*z == 0, {x, y, z}}, {-z <= 0 && -1 - x^2 + y^2 + z == 0 && x*y == 0, {x, y, z}}, {-z <= 0 && 11 - y + 2*z == 0 && 11 - x + 2*z == 0, {x, y, z}}, {-z <= 0 && -2*z + x*Log[2] == 0 && y*Log[2]^2 + z*Log[5] == 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + y^2 + z < 0 && 21 - 12*x + 4*x^2 - 16*y + 4*y^2 + 4*z < 0, {x, y, z}}, {-z <= 0 && x - 5*y*z < 0 && -1 - E*x + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && x + 64*y - 5*y*z < 0 && -1 - E*x - 64*E*y + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && 5*x + 64*y - 5*y*z < 0 && -1 - 5*E*x - 64*E*y + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && -x + y*z < 0 && -1/5 - E*x + E*y*z <= 0, {x, y, z}}, {-z <= 0 && -69*x + 5*y*z < 0 && -1 - 69*E*x + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && -x + 5*y*z < 0 && -1 - E*x + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && -5*x - 64*y + 5*y*z < 0 && -1 - 5*E*x - 64*E*y + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && -x - 64*y + 5*y*z < 0 && -1 - E*x - 64*E*y + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && -1 + z <= 0 && x^2 + y^2 - z^2 <= 0, {x, y, z}}, {-z <= 0 && -1 + z != 0 && -2*x + y - Pi*z + 4*x*z - 2*y*z - 2*x*z^2 + y*z^2 == 0, {x, y, z}}, {-z <= 0 && -1 + z != 0 && Pi - 4*Pi*x + 2*y - 4*Pi*z + 8*Pi*x*z - 4*y*z + Pi*z^2 - 4*Pi*x*z^2 + 2*y*z^2 == 0, {x, y, z}}, {-z <= 0 && -x + 5*y*z != 0 && -1 - E*x + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && -5*x - 64*y + 5*y*z != 0 && -1 - 5*E*x - 64*E*y + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && -x - 64*y + 5*y*z != 0 && -1 - E*x - 64*E*y + 5*E*y*z <= 0, {x, y, z}}, {-Pi + z <= 0 && -Pi - z < 0 && Pi*x - z == 0, {x, y, z}}, {-1/2 - x + z <= 0 && -1/2 + x - z <= 0 && -7 + x^2 + y^2 <= 0, {x, y, z}}, {-3/2 + E*z <= 0 && 3*y + 2*z <= 0 && -1 - x < 0, {x, y, z}}, {-(x^2*z) - y^2*z <= 0 && x^2 + y^2 != 0 && y^2 - 2*y*z <= 0, {x, y, z}}, {x^2*z - 2*y*z^2 <= 0 && z != 0 && z < 0, {x, y, z}}, {u != 0 && u*y - x*z == 0 && u != 0, {x, y, z, u}}, {u != 0 && -1 - E*u <= 0 && u + x - v^2*y + 5*y*z^2 == 0, {x, y, z, u, v}}, {u != 0 && -1 - E*u <= 0 && y != 0, {x, y, z, u}}, {-1 + x != 0 && x == 0 && y == 0, {x, y, z}}, {x != 0 && -5 + x + y == 0 && x^2 - z == 0, {x, y, z, u}}, {x != 0 && x^2*y - y*z^2 == 0 && x != 0, {x, y, z}}, {x != 0 && x^4*z - x^2*y^2*z + x^2*y*z^3 + y^3*z^3 - 3*y^2*z^5 + 3*y*z^7 - z^9 == 0 && x^3 != 0, {x, y, z}}, {x != 0 && y < 0 && u*y + y*z < 0, {x, y, z, u}}, {x != 0 && y*z != 0 && -1 - z <= 0, {x, y, z}}, {y != 0 && 1 + x^4 - y^4 + 6*y^2*z^2 - z^4 == 0 && y^3*z - y*z^3 == 0, {x, y, z}}, {y != 0 && 1 - x^4 + 6*x^2*y^2 - y^4 + z^4 == 0 && -(x^3*y) + x*y^3 == 0, {x, y, z}}, {y != 0 && -(x^2*y^2*z) + y^4*z + x^3*z^3 + x*y^2*z^3 - 3*x^2*z^5 + 3*x*z^7 - z^9 == 0 && y^3 != 0, {x, y, z}}, {y != 0 && -x < 0 && -(y*z) < 0, {x, y, z}}, {y != 0 && -x < 0 && y*z < 0, {x, y, z}}, {y != 0 && -y < 0 && y < 0, {x, y, z}}, {y != 0 && -y < 0 && -(u*y) - y*z < 0, {x, y, z, u}}, {y != 0 && y < 0 && y*z < 0, {x, y, z}}, {y != 0 && y < 0 && u*y + y*z < 0, {x, y, z, u}}, {y != 0 && y + z < 0 && -1 + x*y == 0, {x, y, z}}, {y != 0 && -(x*y) - x*z < 0 && -x < 0, {x, y, z}}, {y != 0 && x*y + x*z < 0 && x < 0, {x, y, z}}, {y != 0 && u != 0 && -1 - E*u <= 0, {x, y, z, u}}, {y - z != 0 && -y - z < 0 && -x + 2*y*Log[2] == 0, {x, y, z}}, {-1 + z != 0 && y + x*z - y*z == 0 && -1 + z != 0, {x, y, z}}, {z != 0 && x - Log[2] - y*Log[2] + z*Log[2] == 0 && -y < 0, {x, y, z}}, {z != 0 && z < 0 && u*z < 0, {x, y, z, u}}, {z != 0 && z*Log[3] != 0 && -(y*z*Log[3]) + x*z*Log[5] - Log[5]*Log[64] + Log[3]*Log[512] == 0, {x, y, z}}, {u*y*z != 0 && x*z < 0 && z < 0, {x, y, z, u}}, {y + z != 0 && -y^2 - 2*y*z - z^2 < 0 && x - y*Log[2] - z*Log[2] < 0, {x, y, z}}, {-y + 2*z != 0 && -x + y*Log[2] == 0 && -y < 0, {x, y, z}}, {-y + 2*z != 0 && -y < 0 && -x + y*Log[2] == 0, {x, y, z}}, {-u^2 + v*z != 0 && -u^2 + v*z != 0 && -v < 0, {x, y, z, u, v}}, {-u^2 + v*z != 0 && -u^2 + v*z != 0 && v < 0, {x, y, z, u, v}}, {-3*x + 2*Sqrt[y]*z != 0 && -Sqrt[y] <= 0 && -y <= 0, {x, y, z}}, {u*y - z^2 != 0 && u*y - z^2 != 0 && -u < 0, {x, y, z, u}}, {u*y - z^2 != 0 && u*y - z^2 != 0 && u < 0, {x, y, z, u}}, {z*Log[2] != 0 && -z < 0 && -u + E*z <= 0, {x, y, z, u}}, {z*Log[2] != 0 && z < 0 && -z < 0, {x, y, z}}, {-1 + u == 0 && 2*w - x == 0 && 2*w - y == 0 && u < 0, {x, y, z, u, v, w}}, {u == 0 && x == 0 && u != 0 && u < 0, {x, y, z, u}}, {v - x == 0 && -4 + 2*v - w == 0 && -4 + 2*v - y == 0 && -(u*v) + z <= 0, {x, y, z, u, v, w}}, {2*w - x == 0 && 1 + w < 0 && 2*u*w - y < 0 && 1 - w^2 <= 0, {x, y, z, u, v, w}}, {-1 + x == 0 && x - y == 0 && x == 0 && -1 + x*y == 0, {x, y, z}}, {-1 + x == 0 && z == 0 && x == 0 && y == 0, {x, y, z, u}}, {x == 0 && -5 + y == 0 && z == 0 && u == 0, {x, y, z, u, v}}, {x == 0 && y == 0 && Pi - 2*z == 0 && u <= 0, {x, y, z, u}}, {x == 0 && y == 0 && Pi + 2*z == 0 && -u <= 0, {x, y, z, u}}, {x == 0 && y == 0 && -Pi - u < 0 && -Pi + u <= 0, {x, y, z, u}}, {x == 0 && y == 0 && -Pi - 2*z < 0 && -Pi + 2*z < 0, {x, y, z, u}}, {x == 0 && y == 0 && -z < 0 && z != 0, {x, y, z}}, {x == 0 && y == 0 && -(y*z) < 0 && -1 + E*y*z <= 0, {x, y, z}}, {x == 0 && y == 0 && -(y*z) < 0 && -1/4 + E*y*z <= 0, {x, y, z}}, {x == 0 && y == 0 && -5*z + 12*Log[2] - 3*Sqrt[41]*Log[2] < 0 && z < 0, {x, y, z}}, {x == 0 && y == 0 && -x - Log[21] < 0 && -y < 0, {x, y, z}}, {x == 0 && y == 0 && x != 0 && y < 0, {x, y, z}}, {x == 0 && y == 0 && z != 0 && -z < 0, {x, y, z}}, {x == 0 && y == 0 && z != 0 && -1 - E*z <= 0, {x, y, z}}, {x == 0 && -1 + x*y == 0 && y - z != 0 && y + z < 0, {x, y, z}}, {x == 0 && -3 - 2*x + x*y == 0 && x == 0 && -1 + y == 0, {x, y, z}}, {x == 0 && -1 + 2*x*y == 0 && z != 0 && -z < 0, {x, y, z}}, {x == 0 && z == 0 && -1/4 + E*u*z <= 0 && -u + y <= 0, {x, y, z, u}}, {x == 0 && -x < 0 && -z < 0 && -y + y*z^2 < 0, {x, y, z}}, {x^2 == 0 && u*x == 0 && u^2 + z^2 == 0 && x*y != 0, {x, y, z, u}}, {x^4 == 0 && -(u^2*x^2) + v^2*x^2 - x^2*z^2 == 0 && u^4 + 2*u^2*v^2 + v^4 + 2*u^2*z^2 - 2*v^2*z^2 + z^4 == 0 && x*y != 0, {x, y, z, u, v}}, {1 + x == 0 && -z < 0 && x < 0 && -16*x*y + z <= 0, {x, y, z}}, {-5 + 3*x == 0 && -x + y + x*y == 0 && -1 + x == 0 && -1 + x*y == 0, {x, y, z}}, {u - y == 0 && -z < 0 && -z^2 < 0 && u - z^2 <= 0, {x, y, z, u}}, {u - y == 0 && -z < 0 && -z^2 < 0 && -u + z^2 <= 0, {x, y, z, u}}, {-1 + x - y == 0 && -1 + y - z == 0 && 1 + u - z == 0 && 1 - u - y < 0, {x, y, z, u}}, {-4 + y == 0 && -5 + 2*y == 0 && -x + z^2 == 0 && -2 + z != 0, {x, y, z}}, {-1 + y == 0 && x == 0 && 1 - y < 0 && -1 + y != 0, {x, y, z}}, {-1 + y == 0 && x == 0 && -1 + y < 0 && -1 + y != 0, {x, y, z}}, {Sqrt[y] == 0 && y != 0 && x == 0 && -y <= 0, {x, y, z}}, {y == 0 && Sqrt[x] == 0 && -1 - z <= 0 && -x <= 0, {x, y, z}}, {y == 0 && x == 0 && -y < 0 && -y^3 < 0, {x, y, z}}, {y == 0 && x == 0 && -y < 0 && -z < 0, {x, y, z}}, {y == 0 && x == 0 && -4*y - y^2 < 0 && 1 - y <= 0, {x, y, z}}, {y == 0 && x == 0 && 4*y - y^2 < 0 && 1 + y <= 0, {x, y, z}}, {y == 0 && x == 0 && -z < 0 && -y < 0, {x, y, z}}, {y == 0 && x == 0 && -z < 0 && y < 0, {x, y, z}}, {y == 0 && x == 0 && -z < 0 && z != 0, {x, y, z}}, {y == 0 && x == 0 && z < 0 && -y < 0, {x, y, z}}, {y == 0 && x == 0 && Sqrt[345] + 5*z < 0 && 69*y - 5*y*z^2 < 0, {x, y, z}}, {y == 0 && x == 0 && -Pi - 2*y <= 0 && -Pi + 2*y <= 0, {x, y, z}}, {y == 0 && x == 0 && -1 - y <= 0 && -1 + y <= 0, {x, y, z}}, {y == 0 && x == 0 && z != 0 && -z < 0, {x, y, z}}, {y == 0 && x == 0 && z != 0 && -1 - E*z <= 0, {x, y, z}}, {y == 0 && z == 0 && -x + z^4 == 0 && u != 0, {x, y, z, u}}, {y == 0 && -1 + x*z == 0 && -z < 0 && z != 0, {x, y, z}}, {y == 0 && 1 + x*z == 0 && -z < 0 && z != 0, {x, y, z}}, {y == 0 && x + y*z == 0 && -y < 0 && y < 0, {x, y, z, u}}, {y == 0 && -x + 5*y*z^2 == 0 && z == 0 && -u < 0, {x, y, z, u}}, {y == 0 && 4*x*y + x^2*z + y^2*z + 2*z^3 == 0 && 21 + 5*x^2*z - 11*x*y*z + 27*x*y*z^2 == 0 && -1 + y < 0, {x, y, z}}, {y == 0 && x*y + 45*Log[2]^2 == 0 && y != 0 && -z < 0, {x, y, z}}, {y == 0 && x*y + 5*Log[8]^2 == 0 && y != 0 && -z < 0, {x, y, z}}, {y == 0 && u*Log[11] - Log[21] < 0 && z == 0 && x == 0, {x, y, z, u}}, {y == 0 && -1 - x + z <= 0 && z == 0 && -1/4 + E*u*z <= 0, {x, y, z, u}}, {y == 0 && u != 0 && u*x == 0 && u*z != 0, {x, y, z, u}}, {y == 0 && u != 0 && -1 - E*u <= 0 && u - x + 5*y*z^2 == 0, {x, y, z, u, v}}, {x^2*y^2 == 0 && v*x^2*y == 0 && v^2*x^2 - u^2*y^2 - y^2*z^2 == 0 && x*y != 0, {x, y, z, u, v}}, {x^2*y^2 == 0 && u*x*y^2 == 0 && u^2*y^2 - x^2*z^2 + y^2*z^2 == 0 && x*y != 0, {x, y, z, u}}, {y^4 == 0 && u^2*y^2 + v^2*y^2 - y^2*z^2 == 0 && u^4 + 2*u^2*v^2 + v^4 + 2*u^2*z^2 - 2*v^2*z^2 + z^4 == 0 && x*y != 0, {x, y, z, u, v}}, {Sqrt[y^3] == 0 && y^3 != 0 && x == 0 && -y^3 <= 0, {x, y, z}}, {1 + y == 0 && 1/2 + y*z <= 0 && -x + 2*y*z != 0 && x < 0, {x, y, z}}, {4 + y == 0 && 5 + 2*y == 0 && -x + z^2 == 0 && -2 + z != 0, {x, y, z}}, {1 + x*y == 0 && x == 0 && z != 0 && -z < 0, {x, y, z}}, {-x + Pi*Sqrt[-4 + z] == 0 && -y + Pi*Sqrt[z] == 0 && 4 - z <= 0 && -z <= 0, {x, y, z}}, {Sqrt[x] + Sqrt[z] == 0 && y == 0 && -x <= 0 && -z <= 0, {x, y, z, u}}, {-x + Sqrt[z] == 0 && -y + Sqrt[3 - 3*z + z^2] == 0 && -z <= 0 && -3 + 3*z - z^2 <= 0, {x, y, z}}, {Sqrt[y] + Sqrt[z] == 0 && x == 0 && -y <= 0 && -z <= 0, {x, y, z, u}}, {x^2 - y - z == 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -z <= 0 && -x <= 0, {x, y, z}}, {-1 + z == 0 && x^3 - z^5 == 0 && y == 0 && -x < 0, {x, y, z}}, {-1 + z == 0 && z != 0 && y == 0 && -x + z*Log[3] + z*Log[7] == 0, {x, y, z, u}}, {z == 0 && x == 0 && z < 0 && x < 0, {x, y, z}}, {z == 0 && x == 0 && z < 0 && x <= 0, {x, y, z}}, {z == 0 && x == 0 && 1 + z < 0 && x < 0, {x, y, z}}, {z == 0 && -1 + y == 0 && z < 0 && x < 0, {x, y, z}}, {z == 0 && y == 0 && u == 0 && x == 0, {x, y, z, u, v}}, {z == 0 && y == 0 && -1 + z == 0 && x == 0, {x, y, z, u}}, {z == 0 && y == 0 && -Pi - u + 2*Pi*x < 0 && u - 2*Pi*x < 0, {x, y, z, u}}, {z == 0 && y == 0 && z < 0 && x <= 0, {x, y, z}}, {z == 0 && y == 0 && x - Log[2] <= 0 && -x + Log[2] - u*Log[2] < 0, {x, y, z, u}}, {z == 0 && y == 0 && z != 0 && -(x*z) + 8*Log[3] == 0, {x, y, z, u}}, {z == 0 && 1 + y*z == 0 && 1 + z < 0 && x < 0, {x, y, z}}, {z == 0 && y*z + 2*x*Log[2] == 0 && z < 0 && -z < 0, {x, y, z, u}}, {z == 0 && -(y*z) - x*Log[2] + z*Log[2] == 0 && -z < 0 && -u + E*z <= 0, {x, y, z, u, v}}, {z == 0 && -(y*z) - x*Log[2] + z*Log[2] == 0 && u != 0 && z < 0, {x, y, z, u}}, {z == 0 && -y < 0 && x < 0 && -1 - E*x <= 0, {x, y, z}}, {z == 0 && y <= 0 && -y - 2*u*Log[2] < 0 && -(y*z) + 2*x*Log[2] == 0, {x, y, z, u}}, {z == 0 && y <= 0 && -y - 2*u*Log[2] < 0 && y*z + 2*x*Log[2] == 0, {x, y, z, u}}, {z == 0 && x != 0 && -1 - E*x <= 0 && -y < 0, {x, y, z}}, {z == 0 && y != 0 && -1 - E*y <= 0 && -x < 0, {x, y, z}}, {u*z == 0 && -11 + 2*u^2 + x - 2*z^2 == 0 && -11 + 2*u^2 + y - 2*z^2 == 0 && 1 - y <= 0, {x, y, z, u}}, {Sqrt[y^2*z] == 0 && x*z^(3/2) == 0 && -z <= 0 && -(y^2*z) <= 0, {x, y, z, u}}, {-u^2 + v^2 - 2*v*w + w^2 + z == 0 && u^2 - v^2 - 2*u*w + w^2 + y == 0 && u^2 - 2*u*v + v^2 - w^2 + x == 0 && x*y*z != 0, {x, y, z, u, v, w}}, {-y + z == 0 && -z < 0 && z < 0 && -x < 0, {x, y, z}}, {x*y + z == 0 && -z < 0 && -y < 0 && -x < 0, {x, y, z}}, {-3*x^2 - 11*x*y + 7*z == 0 && 4*x*y + x^2*z + y^2*z + 2*z^3 == 0 && 21 + 5*x^2*z - 11*x*y*z + 27*x*y*z^2 == 0 && -1 + y < 0, {x, y, z}}, {-1 + E^(1/(5*E))*z == 0 && 2*u - x == 0 && 2*u - y == 0 && z < 0, {x, y, z, u}}, {-x + Sqrt[u]*z + y^(1/4)*z == 0 && -u < 0 && -y <= 0 && -u <= 0, {x, y, z, u}}, {-3*x + Sqrt[u]*z + Sqrt[y]*z == 0 && -u < 0 && -y <= 0 && -u <= 0, {x, y, z, u}}, {x^2 + y^2 - 2*y*z == 0 && -y < 0 && y^2 - 2*y*z <= 0 && -x <= 0, {x, y, z}}, {x^2 + y^2 - 2*y*z == 0 && y < 0 && y^2 - 2*y*z <= 0 && -x <= 0, {x, y, z}}, {x^2 + y^2 - 2*y*z == 0 && -z < 0 && y^2 - 2*y*z <= 0 && -x <= 0, {x, y, z}}, {x^2 + y^2 - 2*y*z == 0 && z < 0 && y^2 - 2*y*z <= 0 && -x <= 0, {x, y, z}}, {x^2 + y^2 - 2*y*z == 0 && -y <= 0 && y^2 - 2*y*z <= 0 && -x <= 0, {x, y, z}}, {x^2 + y^2 - 2*y*z == 0 && y <= 0 && y^2 - 2*y*z <= 0 && -x <= 0, {x, y, z}}, {x^2 + y^2 - 2*y*z == 0 && -z <= 0 && y^2 - 2*y*z <= 0 && -x <= 0, {x, y, z}}, {x^2 + y^2 - 2*y*z == 0 && z <= 0 && y^2 - 2*y*z <= 0 && -x <= 0, {x, y, z}}, {-3*x*Sqrt[-z] + 2*Sqrt[y]*Sqrt[-z]*z == 0 && Sqrt[-z]*z^2 == 0 && -y <= 0 && z <= 0, {x, y, z, u}}, {-1 + x^2 + y^2 - z^2 == 0 && y*z == 0 && -x + Sqrt[y^2 + z^2] < 0 && -y^2 - z^2 <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && 2*x*y - y^2 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && -x <= 0 && -2*x*y + y^2 <= 0, {x, y, z}}, {y^2 + z^2 == 0 && y + x*y + y^3 + y*z^2 == 0 && 1 + 2*x + x^2 + 2*y^2 + 2*x*y^2 + y^4 - 2*z^2 + 2*x*z^2 + 2*y^2*z^2 + z^4 == 0 && -1 + y^2 + z^2 < 0, {x, y, z}}, {y^2 + z^2 == 0 && y + x*y + y^3 + y*z^2 == 0 && 1 + 2*x + x^2 + 2*y^2 + 2*x*y^2 + y^4 - 2*z^2 + 2*x*z^2 + 2*y^2*z^2 + z^4 == 0 && -1 + y^2 + z^2 <= 0, {x, y, z}}, {-1 + u^2 + x^2 + y^2 + z^2 == 0 && -2 + 2*u^2 + 5*x^2 + 4*y^2 + 3*z^2 == 0 && -3 + 6*u^2 + 9*x^2 + 8*y^2 + 7*z^2 == 0 && 21 - u - x - y - z < 0, {x, y, z, u}}, {-1 + u^2 + x^2 + y^2 + z^2 == 0 && -2 + 5*u^2 + 2*x^2 + 3*y^2 + 4*z^2 == 0 && -3 + 9*u^2 + 6*x^2 + 7*y^2 + 8*z^2 == 0 && 21 - u - x - y - z < 0, {x, y, z, u}}, {-x - x*z + z^2 == 0 && -1 + z <= 0 && -1 - z < 0 && -y - y*z + z^2 == 0, {x, y, z}}, {-x - x*z + z^2 == 0 && -1 + z <= 0 && -1 - z < 0 && y + y*z + z^2 == 0, {x, y, z}}, {-x + y*z^2 == 0 && -y < 0 && -z < 0 && -x < 0, {x, y, z}}, {x^3 - 3*x*y^2 + 5*u^4*z - 10*u^2*z^3 + z^5 == 0 && u^5 + 3*x^2*y - y^3 - 10*u^3*z^2 + 5*u*z^4 == 0 && 1 - u^4*x^2 + u^4*y^2 + 8*u^3*x*y*z + 6*u^2*x^2*z^2 - 6*u^2*y^2*z^2 - 8*u*x*y*z^3 - x^2*z^4 + y^2*z^4 == 0 && u^4*x*y + 2*u^3*x^2*z - 2*u^3*y^2*z - 6*u^2*x*y*z^2 - 2*u*x^2*z^3 + 2*u*y^2*z^3 + x*y*z^4 == 0, {x, y, z, u}}, {x^5 + y^2*z^5 == 0 && x != 0 && y*z != 0 && -1 - z <= 0, {x, y, z}}, {-x + Sqrt[1 + z + z^2] == 0 && -3*y + 2*Sqrt[3]*Sqrt[-z - z^2] == 0 && z + z^2 <= 0 && -1 - z - z^2 <= 0, {x, y, z}}, {-y^2 + z^2 + 8*Log[2]^2 == 0 && y*z + 4*Pi*x*Log[2] == 0 && -Pi - z < 0 && -Pi + z <= 0, {x, y, z}}, {u^2 - z^2 - 4*x*Log[2] + 8*Log[2]^2 == 0 && u*z + 2*y*Log[2] == 0 && -Pi - u < 0 && -Pi + u <= 0, {x, y, z, u}}, {-x + Root[z - 4*#1 + 2*z*#1^2 + 4*#1^3 + z*#1^4 & , 3] == 0 && -y + Root[-1 + z + (6 + 2*z)*#1^2 + (-1 + z)*#1^4 & , 2] == 0 && -1 + z + 6*Root[-1 + z + (6 + 2*z)*#1^2 + (-1 + z)*#1^4 & , 2]^2 + 2*z*Root[-1 + z + (6 + 2*z)*#1^2 + (-1 + z)*#1^4 & , 2]^2 - Root[-1 + z + (6 + 2*z)*#1^2 + (-1 + z)*#1^4 & , 2]^4 + z*Root[-1 + z + (6 + 2*z)*#1^2 + (-1 + z)*#1^4 & , 2]^4 == 0 && z - 4*Root[z - 4*#1 + 2*z*#1^2 + 4*#1^3 + z*#1^4 & , 3] + 2*z*Root[z - 4*#1 + 2*z*#1^2 + 4*#1^3 + z*#1^4 & , 3]^2 + 4*Root[z - 4*#1 + 2*z*#1^2 + 4*#1^3 + z*#1^4 & , 3]^3 + z*Root[z - 4*#1 + 2*z*#1^2 + 4*#1^3 + z*#1^4 & , 3]^4 == 0, {x, y, z}}, {-u < 0 && -3*x + Sqrt[u]*z + Sqrt[y]*z == 0 && -y <= 0 && -u <= 0, {x, y, z, u}}, {-u < 0 && -(E*u) + y <= 0 && z == 0 && -1/4 + E*u*z <= 0, {x, y, z, u}}, {-u < 0 && z != 0 && y == 0 && -x < 0, {x, y, z, u}}, {-u < 0 && z != 0 && -1 - E*z <= 0 && u*z != 0, {x, y, z, u}}, {u < 0 && u*x - y*Log[2] <= 0 && u*z < 0 && -1 - E*u*z <= 0, {x, y, z, u}}, {-1 + x < 0 && -x < 0 && z - x*Log[3] - x*Log[7] < 0 && -(x*y) - z + x*z < 0, {x, y, z}}, {-1 + x < 0 && -x < 0 && z - x*Log[21] < 0 && -(x*y) - z + x*z < 0, {x, y, z}}, {-Sqrt[x] < 0 && -x < 0 && -y < 0 && -(y*z) < 0, {x, y, z}}, {-Sqrt[x] < 0 && -x < 0 && -y < 0 && y*z != 0, {x, y, z}}, {-x < 0 && -x^5 < 0 && y*z == 0 && -69*y + 5*y*z^2 == 0, {x, y, z}}, {-x < 0 && -y < 0 && -z < 0 && x^5 - x^4*y - x*y^4 + y^5 - x^4*z + x^3*y*z + x*y^3*z - y^4*z + x*y*z^3 - x*z^4 - y*z^4 + z^5 < 0, {x, y, z}}, {-x < 0 && 1 + z < 0 && -1 + E^(1/(5*E))*x < 0 && y*z < 0, {x, y, z}}, {x < 0 && -y < 0 && -y^2 <= 0 && z != 0, {x, y, z}}, {x < 0 && -1 - E*x <= 0 && -z < 0 && -(y*z) < 0, {x, y, z}}, {x < 0 && -1 - E*x <= 0 && -z < 0 && -x - 4*y*z <= 0, {x, y, z}}, {x < 0 && -1 - E*x <= 0 && z < 0 && -(y*z) < 0, {x, y, z}}, {x < 0 && -1 - E*x <= 0 && -1 - y + z <= 0 && -z < 0, {x, y, z}}, {x - y < 0 && y - 2*z < 0 && -3*u + z < 0 && u - 4*x < 0, {x, y, z, u}}, {-y < 0 && -y^3 < 0 && z < 0 && -(Sqrt[y^3]*z) < 0, {x, y, z}}, {-y < 0 && -z < 0 && -x + y*z^2 == 0 && -x < 0, {x, y, z}}, {-y < 0 && z < 0 && y^3 - z^2 == 0 && -x + y == 0, {x, y, z}}, {-y < 0 && z < 0 && y^3 - z^5 == 0 && -x + y == 0, {x, y, z}}, {-y < 0 && -y^3 <= 0 && -z < 0 && -2*Sqrt[y^3] + 3*E*z <= 0, {x, y, z}}, {-y < 0 && -1 - E*y <= 0 && -1 - x + z <= 0 && z < 0, {x, y, z}}, {-y < 0 && x != 0 && x*y != 0 && -v < 0, {x, y, z, u, v}}, {-y < 0 && x != 0 && x*y != 0 && -z < 0, {x, y, z}}, {y < 0 && -1 - y < 0 && -x + 2*y*z < 0 && x < 0, {x, y, z}}, {y < 0 && -x + z < 0 && -z + y*Log[21] < 0 && z - y*z + 4*y*Log[2] < 0, {x, y, z}}, {y < 0 && -1 - E*y <= 0 && 1 + x - z <= 0 && -z < 0, {x, y, z}}, {y < 0 && -1 - E*y <= 0 && 1 + x - z <= 0 && z != 0, {x, y, z}}, {y < 0 && -1 - E*y <= 0 && -1 - x + z <= 0 && -z < 0, {x, y, z}}, {y < 0 && 1/2 + y*z <= 0 && -x + 2*y*z != 0 && x < 0, {x, y, z}}, {y < 0 && y*Log[2] != 0 && 1 + z <= 0 && -(x*y) + z*Log[2] != 0, {x, y, z}}, {1 - z < 0 && 1 - z^2 < 0 && x + 2*z + x*z^2 == 0 && y - 2*z + y*z^2 == 0, {x, y, z}}, {x - z < 0 && -3*x + z < 0 && -y + z < 0 && x + y - z < 0, {x, y, z}}, {x - z < 0 && -y + z < 0 && -1 - z <= 0 && -1 + z <= 0, {x, y, z}}, {x - z < 0 && -x <= 0 && -4 + 4*x + z^2 <= 0 && -4 + 4*x + y^2 <= 0, {x, y, z}}, {-1 + z < 0 && -z < 0 && -x < 0 && -x + E*y <= 0, {x, y, z}}, {-z < 0 && x == 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {-z < 0 && x == 0 && y == 0 && -1/4 + E*y*z <= 0, {x, y, z}}, {-z < 0 && 1 + y == 0 && 1/2 + y*z <= 0 && x - 2*y*z < 0, {x, y, z}}, {-z < 0 && u < 0 && -1 - u*z <= 0 && y < 0, {x, y, z, u}}, {-z < 0 && -z^3 < 0 && -x < 0 && x*Sqrt[z^3] < 0, {x, y, z}}, {-z < 0 && z*Log[2] != 0 && -u + E*z <= 0 && -u < 0, {x, y, z, u}}, {z < 0 && x == 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {z < 0 && x == 0 && y == 0 && -1/4 + E*y*z <= 0, {x, y, z}}, {z < 0 && -(u*z) < 0 && -y + u*z < 0 && -x + u^2*z <= 0, {x, y, z, u}}, {z < 0 && -1 - E*z < 0 && x - u*z - v*z < 0 && -y + u*z + v*z < 0, {x, y, z, u, v}}, {z < 0 && -1 - E*z < 0 && -y + u*z + v*z < 0 && x - u*z - v*z < 0, {x, y, z, u, v}}, {z < 0 && -5*y - Sqrt[345]*Sqrt[x/z]*z < 0 && x <= 0 && 5*y^2 - 69*x*z < 0, {x, y, z}}, {z < 0 && -5*y - Sqrt[5]*z*Sqrt[(5*x + 64*z)/z] < 0 && 5*x + 64*z <= 0 && 5*y^2 - 5*x*z - 64*z^2 < 0, {x, y, z}}, {z < 0 && x + 64*z <= 0 && -5*y - Sqrt[5]*z*Sqrt[(x + 64*z)/z] < 0 && 5*y^2 - x*z - 64*z^2 < 0, {x, y, z}}, {z < 0 && -x + 2*u*z != 0 && x < 0 && 1 - y + 2*u*z <= 0, {x, y, z, u}}, {z < 0 && z*Log[2] != 0 && y < 0 && -(x*z) + y*Log[2] != 0, {x, y, z}}, {1 + z < 0 && -(y*z) < 0 && -x + y*z < 0 && -y + y*z^2 <= 0, {x, y, z}}, {1 + z < 0 && -1 + z^2 < 0 && x + 2*z + x*z^2 == 0 && y - 2*z + y*z^2 == 0, {x, y, z}}, {1 + z < 0 && y != 0 && y*z < 0 && 1/5 + E*y < 0, {x, y, z}}, {1 + z < 0 && -x + 2*u*z != 0 && x < 0 && 1 + 2*u*z + y*z <= 0, {x, y, z, u}}, {-1 - x + z < 0 && -z < 0 && -1/4 + E*u*z <= 0 && -y - 4*u*z <= 0, {x, y, z, u}}, {Sqrt[345] + 5*z < 0 && x == 0 && y == 0 && 1/69 + E*y <= 0, {x, y, z}}, {Sqrt[5]*Sqrt[x/y] + 5*z < 0 && x <= 0 && y < 0 && y*z < 0, {x, y, z}}, {x^2*y^2 + x*y*z < 0 && -z < 0 && -y < 0 && -x < 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 < 0 && 3 - 4*x + x^2 - 4*y + 2*x*y + y^2 + z^2 < 0 && -1 - x + y < 0 && -1 + x - y < 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 < 0 && 3 - 4*x + x^2 - 4*y + 2*x*y + y^2 + z^2 < 0 && 1 - x + y < 0 && -2 + x - y < 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 < 0 && 3 + x^2 - 4*y + y^2 - 4*z + 2*y*z + z^2 < 0 && -1 + y - z < 0 && -1 - y + z < 0, {x, y, z}}, {x*y*z + z^2 < 0 && -z < 0 && -y < 0 && -x < 0, {x, y, z}}, {x^4 + y^4 - x^2*y*z - x*y^2*z - x*y*z^2 + z^4 < 0 && -z < 0 && -y < 0 && -x < 0, {x, y, z}}, {9 + 6*x^2 + x^4 - 10*y^2 + 2*x^2*y^2 + y^4 - 10*z^2 + 2*x^2*z^2 + 2*y^2*z^2 + z^4 < 0 && 3 - 4*x + x^2 - 4*y + 2*x*y + y^2 + z^2 < 0 && -1 - x + y < 0 && -1 + x - y < 0, {x, y, z}}, {x^2 - Sqrt[y^2 + z^2] < 0 && -3 + y^2 - 2*z - z^2 == 0 && y + y*z == 0 && -y^2 - z^2 <= 0, {x, y, z}}, {-Pi - 4*Pi*y + 2*u*Log[2] < 0 && -Pi + 4*Pi*y - 2*u*Log[2] < 0 && -3*Pi - 4*Pi*x + 2*u*Log[2] < 0 && Pi + 4*Pi*x - 2*u*Log[2] < 0, {x, y, z, u}}, {-y + 2*z*Log[2] < 0 && -y < 0 && -x < 0 && -y + x*Log[2] == 0, {x, y, z}}, {-u <= 0 && v^2 == 0 && u == 0 && v == 0, {x, y, z, u, v}}, {-u <= 0 && x^4 - 2*x^2*y^2 + y^4 == 0 && u*y^4 == 0 && x*y != 0, {x, y, z, u}}, {-u <= 0 && -4 - 2*x - Sqrt[1 + u - 2*z + z^2] + x*Sqrt[1 + u - 2*z + z^2] == 0 && -2 + Sqrt[1 + u - 2*z + z^2] != 0 && y == 0, {x, y, z, u}}, {-u <= 0 && -u + v*z != 0 && -u + v*z != 0 && -v < 0, {x, y, z, u, v}}, {-u <= 0 && -u + v*z != 0 && -u + v*z != 0 && v < 0, {x, y, z, u, v}}, {-x <= 0 && x + y^2 - z^2 == 0 && y*z == 0 && z != 0, {x, y, z}}, {-x <= 0 && -y < 0 && 20*z - 5*x*z + 4*y*z < 0 && -4 - 20*E*z + 5*E*x*z - 4*E*y*z <= 0, {x, y, z}}, {-x <= 0 && x*y*z + y^3*z < 0 && -z < 0 && y^2 - 2*y*z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && y - z <= 0 && -4 + x^2 + z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && x + y - z <= 0 && -1 + z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && x - 3*y - 3*z < 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && 1 - x - y - z < 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && 100 - x - y - z < 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && x - y - z < 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && -x + y + z < 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && -Sqrt[x + y] + z < 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && x - y - z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && x + y - z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && -100 + x + y + z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && -1 + x + y + z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && -x + 3*y + 3*z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && -36 + x + 4*y + 9*z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && z != 0 && x + y + z^2 == 0, {x, y, z}}, {-x <= 0 && -z <= 0 && y != 0 && x + y^2 + z == 0, {x, y, z}}, {-x <= 0 && -(x*z) - y^2*z <= 0 && x + y^2 != 0 && y^2 - 2*y*z <= 0, {x, y, z}}, {-x <= 0 && x*z - 2*y*z^2 <= 0 && z != 0 && z < 0, {x, y, z}}, {-x <= 0 && y != 0 && 1 + x - y^4 + 6*y^2*z^2 - z^4 == 0 && y^3*z - y*z^3 == 0, {x, y, z}}, {x <= 0 && z < 0 && -5*y - Sqrt[5]*Sqrt[x/z]*z < 0 && 5*y^2 - x*z < 0, {x, y, z}}, {-y <= 0 && z^2 == 0 && y == 0 && -z <= 0, {x, y, z}}, {-y <= 0 && -z < 0 && 4*x - 5*u*y + 4*u*z < 0 && -4 - 4*E*x + 5*E*u*y - 4*E*u*z <= 0, {x, y, z, u}}, {-y <= 0 && -z < 0 && -5*x + 5*x*y - x*z != 0 && -1 - 5*E*x + 5*E*x*y - E*x*z <= 0, {x, y, z}}, {-y <= 0 && -z <= 0 && x^2 + y - z == 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -z <= 0 && x != 0 && x^2 + y + z == 0, {x, y, z}}, {-y <= 0 && -1/2 - x + z <= 0 && -1/2 + x - z <= 0 && -7 + x^2 + y <= 0, {x, y, z}}, {-1 - x + y <= 0 && -y < 0 && -(y*z) < 0 && -1/4 + E*y*z <= 0, {x, y, z}}, {1 - z <= 0 && 1 - z < 0 && -2*Pi*x - y + u*Log[2] < 0 && 2*Pi*x - y - u*Log[2] < 0, {x, y, z, u}}, {1 + y - z <= 0 && -z < 0 && x < 0 && -1 - E*x <= 0, {x, y, z}}, {2*y - z <= 0 && x^2*z - 2*y*z^2 <= 0 && z != 0 && z < 0, {x, y, z}}, {-Sqrt[z] <= 0 && -Sqrt[x] <= 0 && -x <= 0 && -z <= 0, {x, y, z}}, {-z <= 0 && x == 0 && -1 + x^2 + y^2 + z == 0 && x^3 + y == 0, {x, y, z}}, {-z <= 0 && y == 0 && -x + 5*y*z == 0 && -u < 0, {x, y, z, u}}, {-z <= 0 && -x^2 + y^2 + z == 0 && x*y == 0 && x != 0, {x, y, z}}, {-z <= 0 && -u < 0 && -x - u*y + 5*y*z != 0 && -1 - E*x - E*u*y + 5*E*y*z <= 0, {x, y, z, u}}, {-z <= 0 && -u < 0 && -x + u*y + 5*y*z != 0 && -1 - E*x + E*u*y + 5*E*y*z <= 0, {x, y, z, u}}, {-z <= 0 && -x < 0 && -69*y + 5*y*z != 0 && -1 - 69*E*y + 5*E*y*z <= 0, {x, y, z}}, {-z <= 0 && -Sqrt[x^2 + y^2] + z < 0 && -3 - 2*x - x^2 + y^2 == 0 && y + x*y == 0, {x, y, z}}, {-z <= 0 && -u <= 0 && -x + Sqrt[u + z] == 0 && y == 0, {x, y, z, u}}, {-z <= 0 && -u <= 0 && -x + Sqrt[1 + 4*u + 4*u^2 - 4*z + 8*u*z + 4*z^2] == 0 && y == 0, {x, y, z, u}}, {-z <= 0 && -(y*z) <= 0 && x - z^2 < 0 && -y^2 - 4*x*z^2 + 4*z^4 == 0, {x, y, z}}, {-z <= 0 && x != 0 && x^2*y - y*z == 0 && x != 0, {x, y, z}}, {-z <= 0 && y != 0 && 1 - x^4 + 6*x^2*y^2 - y^4 + z == 0 && -(x^3*y) + x*y^3 == 0, {x, y, z}}, {-z <= 0 && u*y - z != 0 && u*y - z != 0 && -u < 0, {x, y, z, u}}, {-z <= 0 && u*y - z != 0 && u*y - z != 0 && u < 0, {x, y, z, u}}, {z <= 0 && 1 + y == 0 && 1/2 + y*z <= 0 && x < 0, {x, y, z}}, {-x + z <= 0 && -x <= 0 && -4 + 4*x + z^2 <= 0 && -4 + 4*x + y^2 <= 0, {x, y, z}}, {-Sqrt[(x + y + 5*u^2*z)/z] <= 0 && z < 0 && u*z < 0 && x + y + 5*u^2*z <= 0, {x, y, z, u}}, {-x^2 + 4*y*z <= 0 && -x + y <= 0 && x - z <= 0 && -4*x - 4*y + 5*z < 0, {x, y, z}}, {-(x^2*y*z) - y^3*z <= 0 && x^2 + y^2 != 0 && -z < 0 && y^2 - 2*y*z <= 0, {x, y, z}}, {-(u*Log[2]) + Log[7] <= 0 && -(Pi*y) + v*Log[2] == 0 && -2*Pi - 2*Pi*x + z + v*Log[2] < 0 && 2*Pi*x + z - v*Log[2] < 0, {x, y, z, u, v}}, {u != 0 && z == 0 && y == 0 && -x + Log[2] - u*Log[2] < 0, {x, y, z, u}}, {u != 0 && v < 0 && u*v - y < 0 && 5*u*v^2 - x <= 0, {x, y, z, u, v}}, {u != 0 && -(u*v) < 0 && u*v - y < 0 && 5*u*v^2 - x <= 0, {x, y, z, u, v}}, {u != 0 && 1 + v < 0 && u*v - x < 0 && -u + u*v^2 <= 0, {x, y, z, u, v}}, {u != 0 && z < 0 && -y < 0 && x*z + y*Log[2] - z*Log[2] + u*z*Log[2] == 0, {x, y, z, u}}, {u != 0 && -1 - E*u <= 0 && y == 0 && u - x + 5*y*z^2 == 0, {x, y, z, u, v}}, {1 + u^2 != 0 && -2*u + y + u^2*y - 2*z - 2*u^2*z - 2*u*z^2 + y*z^2 + u^2*y*z^2 == 0 && 1 + u^2 != 0 && -2 + x + u^2*x + 2*u^2*z^2 + x*z^2 + u^2*x*z^2 == 0, {x, y, z, u}}, {1 + v^2 + w^2 + v^2*w^2 != 0 && -u - u*v^2 - u*w^2 - u*v^2*w^2 + 2*v*x + 2*v*w^2*x + 2*v*y + 2*w*y - 2*v^2*w*y - 2*v*w^2*y == 0 && 1 + v^2 + w^2 + v^2*w^2 != 0 && -x + v^2*x - w^2*x + v^2*w^2*x - y + v^2*y + 4*v*w*y + w^2*y - v^2*w^2*y + z + v^2*z + w^2*z + v^2*w^2*z == 0, {x, y, z, u, v, w}}, {-1 + x != 0 && y*z == 0 && -x < 0 && 1 - z^2 < 0, {x, y, z}}, {x != 0 && x != 0 && -(x*y) + Log[2] == 0 && x != 0, {x, y, z}}, {y != 0 && -x + z^4 == 0 && z != 0 && y != 0, {x, y, z}}, {y != 0 && u*y < 0 && -y < 0 && -u < 0, {x, y, z, u}}, {y != 0 && 1 + z < 0 && -x + y*z < 0 && -y + y*z^2 <= 0, {x, y, z}}, {y != 0 && -z + Log[2] - y*Log[2] < 0 && -x < 0 && z - Log[2] - x*Log[2] + y*Log[2] == 0, {x, y, z}}, {y != 0 && y != 0 && -(x*Log[2]^2) + 9*u^2*y^2*Log[2]^2 + 18*u*y^2*z*Log[2]^2 + 9*y^2*z^2*Log[2]^2 == 0 && y^2 != 0, {x, y, z, u}}, {y != 0 && y != 0 && y - z < 0 && y < 0, {x, y, z}}, {y != 0 && y != 0 && -y + z < 0 && -y < 0, {x, y, z}}, {z != 0 && Sqrt[z] == 0 && x == 0 && -z <= 0, {x, y, z}}, {z != 0 && -1 - u < 0 && -1 + u < 0 && x - u*z < 0, {x, y, z, u}}, {z != 0 && 1 + u < 0 && -x + u*z < 0 && -z + u^2*z <= 0, {x, y, z, u}}, {z != 0 && -y < 0 && -x < 0 && -y + x*Log[2] == 0, {x, y, z}}, {z != 0 && y < 0 && -(y*z) < 0 && y*z - x*Log[2] <= 0, {x, y, z}}, {z != 0 && y - Log[2] < 0 && y*z - z*Log[2] < 0 && -(y*z) - x*Log[2] + z*Log[2] <= 0, {x, y, z}}, {z != 0 && x != 0 && y < 0 && u*y + y*z < 0, {x, y, z, u}}, {z != 0 && y != 0 && x == 0 && -z < 0, {x, y, z}}, {-u + z != 0 && y == 0 && -x + y*z == 0 && -u - z < 0, {x, y, z, u}}, {-u + z != 0 && y == 0 && x + y*z == 0 && -u - z < 0, {x, y, z, u}}, {-1 + z^2 != 0 && -x + z + x*z^2 == 0 && z != 0 && -1 + y*z + z^2 == 0, {x, y, z}}, {-1 + z^2 != 0 && -x + 2*z + x*z^2 == 0 && z != 0 && -1 + 2*y*z + z^2 == 0, {x, y, z}}, {-1 + z^2 != 0 && -x + 2*z + x*z^2 == 0 && 1 + z^2 != 0 && -6 + y + 4*z^2 + 2*y*z^2 - 6*z^4 + y*z^4 == 0, {x, y, z}}, {-1 + z^2 != 0 && -x + 2*z + x*z^2 == 0 && 1 + z^2 != 0 && 5 + 12*y - 38*z^2 + 24*y*z^2 + 5*z^4 + 12*y*z^4 == 0, {x, y, z}}, {1 + z^2 != 0 && -3 + 2*x + 2*y*z - 3*z^2 == 0 && 1 + z^2 != 0 && -5 + 2*x*z - 5*z^2 + 2*y*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && -x + Pi*z - x*z^2 == 0 && 1 + z^2 != 0 && -Pi + 2*y + Pi*z^2 + 2*y*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && -x + Pi*z - x*z^2 == 0 && 1 + z^2 != 0 && -Pi + 2*y - 4*Pi*z + Pi*z^2 + 2*y*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && x - 2*z + x*z^2 == 0 && 1 + z^2 != 0 && 1 + y - z^2 + y*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && x - 2*z + x*z^2 == 0 && 1 + z^2 != 0 && y - 8*z^2 + 2*y*z^2 + y*z^4 == 0, {x, y, z}}, {1 + z^2 != 0 && 5 + x - 2*z - 5*z^2 + x*z^2 == 0 && 1 + z^2 != 0 && 1 + y - 2*z - z^2 + y*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && -Pi + 2*x + Pi*z^2 + 2*x*z^2 == 0 && 1 + z^2 != 0 && -y + Pi*z - y*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && -Pi + 2*x + Pi*z^2 + 2*x*z^2 == 0 && 1 + z^2 != 0 && -Pi + 2*y - 4*Pi*z + Pi*z^2 + 2*y*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && -Pi + 2*x - 4*Pi*z + Pi*z^2 + 2*x*z^2 == 0 && 1 + z^2 != 0 && -y + Pi*z - y*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && -2*Sqrt[3] + 3*x + 2*Sqrt[3]*z^2 + 3*x*z^2 == 0 && 1 + z^2 != 0 && -3 + y + 10*z^2 + 2*y*z^2 - 3*z^4 + y*z^4 == 0, {x, y, z}}, {1 + z^2 != 0 && y - 2*z + y*z^2 == 0 && 1 + z^2 != 0 && 1 + x - z^2 + x*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && y - 2*z + y*z^2 == 0 && 1 + z^2 != 0 && x + 2*z^2 + x*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && x + x*y^2 - 2*z + 2*y^2*z + x*z^2 + x*y^2*z^2 == 0 && 1 + z^2 != 0 && x^2 - 2*y + x^2*y^2 + x^2*z^2 + 2*y*z^2 + x^2*y^2*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && x - 8*z^2 + 2*x*z^2 + x*z^4 == 0 && 1 + z^2 != 0 && y - 2*z + y*z^2 == 0, {x, y, z}}, {1 + z^2 != 0 && x - 4*z + 2*x*z^2 + 4*z^3 + x*z^4 == 0 && 1 + z^2 != 0 && 1 + y - 6*z^2 + 2*y*z^2 + z^4 + y*z^4 == 0, {x, y, z}}, {1 + z^2 != 0 && x - 4*z + 2*x*z^2 + 4*z^3 + x*z^4 == 0 && 1 + z^2 != 0 && y - 32*z^2 + 4*y*z^2 + 64*z^4 + 6*y*z^4 - 32*z^6 + 4*y*z^6 + y*z^8 == 0, {x, y, z}}, {1 + z^2 != 0 && -1 + x + 2*z^2 + 2*x*z^2 - z^4 + x*z^4 == 0 && 1 + z^2 != 0 && -1 + y + 6*z^2 + 2*y*z^2 - z^4 + y*z^4 == 0, {x, y, z}}, {1 + z^2 != 0 && y - 16*z^2 + 2*y*z^2 + y*z^4 == 0 && 1 + z^2 != 0 && -2 + x + 12*z^2 + 2*x*z^2 - 2*z^4 + x*z^4 == 0, {x, y, z}}, {z*Log[2] != 0 && -z < 0 && u*z < 0 && -u < 0, {x, y, z, u}}, {z*Log[2] != 0 && -(y*z) - x*Log[2] + z*Log[2] != 0 && z*Log[2] != 0 && z < 0, {x, y, z}}, {z + x*Log[2] != 0 && z + x*Log[2] != 0 && -(x*Log[2]^2) + y*Log[2]^2 == 0 && z + x*Log[2] != 0, {x, y, z}}, {-y + 2*z*Log[2] != 0 && -y < 0 && -x < 0 && -y + x*Log[2] == 0, {x, y, z}}, {y*Log[11] != 0 && -1 + y == 0 && x == 0 && y < 0, {x, y, z}}, {-Log[11] + x*Log[11] != 0 && x == 0 && y == 0 && x < 0, {x, y, z}}, {u == 0 && 5*u*v^2 - x + z == 0 && v < 0 && u*v - y < 0 && 5*u*v^2 - x <= 0, {x, y, z, u, v, w}}, {u == 0 && 5*u*v^2 - y + z == 0 && 1 + v < 0 && u*v - x < 0 && -u + u*v^2 <= 0, {x, y, z, u, v, w}}, {u == 0 && 5*u*v^2 + y + z == 0 && 1 + v < 0 && u*v - x < 0 && -u + u*v^2 <= 0, {x, y, z, u, v, w}}, {u == 0 && -x < 0 && -z < 0 && y < 0 && -1 - E*y <= 0, {x, y, z, u}}, {u == 0 && -x < 0 && -z < 0 && y != 0 && -1 - E*y <= 0, {x, y, z, u}}, {2 + s - v == 0 && 2*s - w == 0 && 2 + s - x == 0 && 2*s - y == 0 && -(s*u) + z <= 0, {x, y, z, u, v, w, s}}, {v == 0 && x*y == 0 && -y < 0 && -z < 0 && -u < 0, {x, y, z, u, v}}, {u - x == 0 && 4 + v - 2*x == 0 && y + z <= 0 && z < 0 && -y < 0, {x, y, z, u, v}}, {-1 + x == 0 && z == 0 && x == 0 && y == 0 && x < 0, {x, y, z, u}}, {x == 0 && x == 0 && y == 0 && y == 0 && 1 + Sqrt[2] + z < 0, {x, y, z}}, {x == 0 && x - y == 0 && x == 0 && y == 0 && -z < 0, {x, y, z}}, {x == 0 && y == 0 && z == 0 && -1 + E*v*z <= 0 && u == 0, {x, y, z, u, v}}, {x == 0 && y == 0 && x != 0 && y - x*Log[3] - x*Log[7] < 0 && -x < 0, {x, y, z}}, {x == 0 && y == 0 && x != 0 && -y + x*Log[3] + x*Log[7] < 0 && x < 0, {x, y, z}}, {x == 0 && y == 0 && y != 0 && z != 0 && -z < 0, {x, y, z}}, {x == 0 && y == 0 && z != 0 && -5*z + 12*Log[2] - 3*Sqrt[41]*Log[2] < 0 && z < 0, {x, y, z}}, {x == 0 && y^2 == 0 && x < 0 && -y^2 <= 0 && -y < 0, {x, y, z}}, {x == 0 && -y + x*z == 0 && -u + z != 0 && -u - z < 0 && 1 + y <= 0, {x, y, z, u}}, {x == 0 && x*y + Log[2] == 0 && -y + 2*z*Log[2] != 0 && -y < 0 && y < 0, {x, y, z}}, {x == 0 && -u < 0 && z != 0 && -1 - E*z <= 0 && -5*x + 5*x*y^2 + z == 0, {x, y, z, u}}, {x == 0 && z != 0 && y == 0 && -5*z + 12*Log[2] - 3*Sqrt[41]*Log[2] < 0 && z < 0, {x, y, z}}, {x^2 == 0 && -(x^2*z) + y^2*z == 0 && x^8*y^8 == 0 && x*y != 0 && -z <= 0, {x, y, z}}, {x^4 == 0 && x^4*z - 2*x^2*y^2*z + y^4*z == 0 && x^8*y^8 == 0 && x*y != 0 && -z <= 0, {x, y, z}}, {-1 + y == 0 && -x < 0 && -x^2 <= 0 && 3*Sqrt[x^2/y] - z < 0 && z < 0, {x, y, z}}, {-1 + y == 0 && -x < 0 && -x^2 <= 0 && 3*Sqrt[x^2/y] + z < 0 && 3*x + z < 0, {x, y, z}}, {-1 + y == 0 && x < 0 && -x^2 <= 0 && 3*Sqrt[x^2/y] - z < 0 && z < 0, {x, y, z}}, {-1 + y == 0 && x < 0 && -x^2 <= 0 && -3*x + z < 0 && 3*Sqrt[x^2/y] + z < 0, {x, y, z}}, {y == 0 && x == 0 && -x < 0 && y != 0 && -y < 0, {x, y, z}}, {y == 0 && x == 0 && -y < 0 && y != 0 && -x < 0, {x, y, z}}, {y == 0 && x == 0 && -z < 0 && y < 0 && -y < 0, {x, y, z}}, {y == 0 && x == 0 && -z < 0 && z < 0 && -y < 0, {x, y, z}}, {y == 0 && x == 0 && y != 0 && -y < 0 && -x < 0, {x, y, z}}, {y == 0 && x == 0 && y != 0 && y - z < 0 && y < 0, {x, y, z, u}}, {y == 0 && x == 0 && y != 0 && -y + z < 0 && -y < 0, {x, y, z, u}}, {y == 0 && x == 0 && y != 0 && z != 0 && -z < 0, {x, y, z}}, {y == 0 && 2 + x == 0 && z != 0 && -x < 0 && -z < 0, {x, y, z}}, {y == 0 && z == 0 && -1 + y == 0 && x == 0 && y < 0, {x, y, z, u}}, {y == 0 && x*z == 0 && -x < 0 && -y < 0 && -z < 0, {x, y, z}}, {y == 0 && x*z == 0 && -x < 0 && -y < 0 && z < 0, {x, y, z}}, {y == 0 && x*z == 0 && -x < 0 && y < 0 && -z < 0, {x, y, z}}, {y == 0 && x*z == 0 && -x < 0 && y < 0 && z < 0, {x, y, z}}, {y == 0 && x*z == 0 && x < 0 && -y < 0 && -z < 0, {x, y, z}}, {y == 0 && x*z == 0 && x < 0 && -y < 0 && z < 0, {x, y, z}}, {y == 0 && x*z == 0 && x < 0 && y < 0 && -z < 0, {x, y, z}}, {y == 0 && x*z == 0 && x < 0 && y < 0 && z < 0, {x, y, z}}, {y == 0 && -x + y*z == 0 && u*y < 0 && -y < 0 && -u < 0, {x, y, z, u, v}}, {y == 0 && -v < 0 && u != 0 && -1 - E*u <= 0 && u - x + 5*y*z^2 == 0, {x, y, z, u, v}}, {y == 0 && 1 + x - z <= 0 && z == 0 && -(u*z) < 0 && -1/4 + E*u*z <= 0, {x, y, z, u}}, {-x + y == 0 && Pi + 12*Pi*y - 6*z < 0 && -2*Pi*y + z - ArcSin[2/3] < 0 && Pi + 2*Pi*x - z - ArcSin[2/3] < 0 && -5*Pi - 12*Pi*x + 6*z < 0, {x, y, z}}, {-3 + Sqrt[u] + 2*y == 0 && -1 + u - 3*z == 0 && -x < 0 && -x^2 < 0 && -u <= 0, {x, y, z, u}}, {5*u + Sqrt[5]*y == 0 && 1 - x < 0 && -x < 0 && -x^5 < 0 && -(u*z) < 0, {x, y, z, u}}, {-1 + x^2 + y^2 == 0 && -z < 0 && -1 + 4096*z < 0 && 2*x*z - z^2 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -x <= 0 && -2*x*z + z^2 <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -(x*z) < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && 1 - 2*x*z < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 + 2*x*z < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -z^2 + 2*x*z^3 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && -(x*z) <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && 1 - 2*x*z <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && -1 + 2*x*z <= 0, {x, y, z}}, {-x^2 + 3*y^2 == 0 && -(x^2*z) + y^2*z == 0 && x^4*y^2 + x^2*y^4 == 0 && x*y != 0 && -z <= 0, {x, y, z}}, {-x^6 - 2*x^4*y^2 + 2*x^2*y^4 == 0 && -(x^6*z) + 5*x^4*y^2*z - 5*x^2*y^4*z + y^6*z == 0 && x^8*y^8 == 0 && x*y != 0 && -z <= 0, {x, y, z}}, {y^(1/4) + Sqrt[z] == 0 && x == 0 && -1 + y == 0 && -y <= 0 && -z <= 0, {x, y, z, u}}, {x^2 + y - 2*z == 0 && y < 0 && -x <= 0 && -y < 0 && y - 2*z < 0, {x, y, z}}, {x^2 + y - 2*z == 0 && y < 0 && -x <= 0 && y < 0 && x^2 < 0, {x, y, z}}, {x^2 + y - 2*z == 0 && y <= 0 && -x <= 0 && -y < 0 && y - 2*z < 0, {x, y, z}}, {x^2 + y - 2*z == 0 && y <= 0 && -x <= 0 && y < 0 && x^2 < 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 4096*y < 0 && x - x*y < 0 && -x <= 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 4096*y < 0 && -x + x*y < 0 && -x <= 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && x - x*y <= 0, {x, y, z}}, {x^2 - y - z == 0 && -y < 0 && -1 + 4096*y < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {z == 0 && y == 0 && Sqrt[z] == 0 && x == 0 && -z <= 0, {x, y, z, u}}, {z == 0 && y - 5*z + 5*u^2*z == 0 && -1 - u < 0 && -1 + u < 0 && x - u*z < 0, {x, y, z, u, v}}, {z == 0 && y - 5*z + 5*u^2*z == 0 && 1 + u < 0 && -x + u*z < 0 && -z + u^2*z <= 0, {x, y, z, u, v}}, {z == 0 && 9*x^2*z - 6*Sqrt[x^2*y]*z^2 + y*z^3 == 0 && u != 0 && -u < 0 && -(x^2*y) <= 0, {x, y, z, u}}, {z == 0 && 9*x^2*z + 6*Sqrt[x^2*y]*z^2 + y*z^3 == 0 && u != 0 && -u < 0 && -(x^2*y) <= 0, {x, y, z, u}}, {z == 0 && -(y*z) + 2*x*Log[2] == 0 && -z < 0 && u*z < 0 && -u < 0, {x, y, z, u, v}}, {z^2 == 0 && x^2 == 0 && -y < 0 && -z <= 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z == 0 && z < 0 && -y + z < 0 && -1 + z <= 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z == 0 && z < 0 && y + z < 0 && -1 + z <= 0 && -x <= 0, {x, y, z}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -(x*y) < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && x*y < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -y <= 0 && -x <= 0 && -(x*y) <= 0, {x, y, z}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -y <= 0 && -x <= 0 && x*y <= 0, {x, y, z}}, {-1 + y^2 + z == 0 && x^2 - z == 0 && -(x*y) < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {x^2 + y^2 - 2*y*z == 0 && -z < 0 && -y < 0 && y - 2*z < 0 && -x <= 0, {x, y, z}}, {-16*y + 9*Sqrt[x]*y + 18*x^(1/4)*y*Sqrt[z] + 9*y*z == 0 && -Sqrt[z] <= 0 && -x^(1/4) <= 0 && -x <= 0 && -z <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && -1 + 4096*y < 0 && 2*x*y - y^2 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && -2*x*y + y^2 <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && 4096*y - y^2 < 0 && -(x*y) < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && 4096*y - y^2 < 0 && 1 - 2*x*y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && 4096*y - y^2 < 0 && -1 + 2*x*y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && 4096*y - y^2 < 0 && -y^2 + 2*x*y^3 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -(x*y) <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && 1 - 2*x*y <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -1 + 2*x*y <= 0, {x, y, z}}, {-x + y*z^2 == 0 && x != 0 && -y < 0 && -z < 0 && -x < 0, {x, y, z}}, {-x + z + Sqrt[y + z^2] == 0 && y + z^2 == 0 && -z - Sqrt[y + z^2] < 0 && -x < 0 && -y - z^2 <= 0, {x, y, z}}, {-x + z + Sqrt[y + z^2] == 0 && -y - z^2 < 0 && -z - Sqrt[y + z^2] < 0 && -x < 0 && -y - z^2 <= 0, {x, y, z}}, {-(Pi*z) + v*Log[2] == 0 && -Pi - 4*Pi*y + 2*v*Log[2] < 0 && -Pi + 4*Pi*y - 2*v*Log[2] < 0 && -3*Pi - 4*Pi*x + 2*v*Log[2] < 0 && Pi + 4*Pi*x - 2*v*Log[2] < 0, {x, y, z, u, v}}, {-y + x*Log[2] == 0 && -y + 2*z*Log[2] != 0 && -x < 0 && -y < 0 && -1 - y <= 0, {x, y, z}}, {u*y - Log[256] == 0 && u*z - Log[6561] == 0 && u*Log[6561] != 0 && -x < 0 && -x < 0, {x, y, z, u}}, {-u < 0 && x == 0 && z != 0 && -1 - E*z <= 0 && -5*x + 5*x*y^2 + z == 0, {x, y, z, u}}, {-u < 0 && y == 0 && -1 - x + z <= 0 && z == 0 && -1/4 + E*u*z <= 0, {x, y, z, u}}, {-u < 0 && -(E*u) + y <= 0 && -y < 0 && z == 0 && -1/4 + E*u*z <= 0, {x, y, z, u}}, {-u < 0 && z != 0 && -1 - E*z <= 0 && x == 0 && -5*x + 5*x*y^2 + z == 0, {x, y, z, u}}, {u < 0 && 2*u*v - x <= 0 && u*z < 0 && -1 - E*u*z <= 0 && 2*u*v - y != 0, {x, y, z, u, v}}, {1 - v < 0 && 1 - v^4 < 0 && -w < 0 && u != 0 && u*w + y*z == 0, {x, y, z, u, v, w}}, {-v < 0 && y == 0 && u != 0 && -1 - E*u <= 0 && u - x + 5*y*z^2 == 0, {x, y, z, u, v}}, {-v < 0 && 1 - v^4 < 0 && -w < 0 && u != 0 && u*w + y*z == 0, {x, y, z, u, v, w}}, {-v < 0 && u != 0 && -1 - E*u <= 0 && y == 0 && u - x + 5*y*z^2 == 0, {x, y, z, u, v}}, {v < 0 && v*Log[2] != 0 && v*x - y*Log[2] <= 0 && u*v < 0 && -1 - E*u*v <= 0, {x, y, z, u, v}}, {1 - x < 0 && -x < 0 && -x^5 < 0 && -(u*y) < 0 && 5*u + Sqrt[5/E]*z < 0, {x, y, z, u}}, {1 - x < 0 && -x < 0 && -x^5 < 0 && u*y < 0 && 5*u + Sqrt[5/E]*z < 0, {x, y, z, u}}, {71 - x < 0 && -y < 0 && -z < 0 && -16 + y*z < 0 && -583 + x + 64*y*z - 2*y^2*z^2 < 0, {x, y, z}}, {-x < 0 && -v < 0 && u != 0 && -1 - E*u <= 0 && u*v != 0, {x, y, z, u, v}}, {-x < 0 && -v < 0 && u != 0 && u*x != 0 && -1 - E*u <= 0, {x, y, z, u, v}}, {-x < 0 && -x^4 < 0 && -z < 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {-x < 0 && -y < 0 && -u < 0 && -z < 0 && u*y - x*z < 0, {x, y, z, u}}, {-x < 0 && -y < 0 && -u < 0 && -z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {-x < 0 && -y < 0 && -u < 0 && z < 0 && u*y - x*z < 0, {x, y, z, u}}, {-x < 0 && -y < 0 && u < 0 && -z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {-x < 0 && -y < 0 && u < 0 && z < 0 && u*y - x*z < 0, {x, y, z, u}}, {-x < 0 && -y < 0 && u < 0 && z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {-x < 0 && y < 0 && -u < 0 && -z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {-x < 0 && y < 0 && -u < 0 && z < 0 && u*y - x*z < 0, {x, y, z, u}}, {-x < 0 && y < 0 && -u < 0 && z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {-x < 0 && y < 0 && u < 0 && -z < 0 && u*y - x*z < 0, {x, y, z, u}}, {-x < 0 && y < 0 && u < 0 && -z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {-x < 0 && y < 0 && u < 0 && z < 0 && u*y - x*z < 0, {x, y, z, u}}, {-x < 0 && y < 0 && -1 - E*y <= 0 && -z < 0 && 1 - x*z <= 0, {x, y, z}}, {-x < 0 && y < 0 && -1 - E*y <= 0 && z < 0 && 1 - x*z <= 0, {x, y, z}}, {-x < 0 && -1 + x + y - z < 0 && -x - y + z <= 0 && -1 - 2*x^2 + 2*y <= 0 && -1 + 2*x^2 - 2*y <= 0, {x, y, z}}, {-x < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && y*z != 0, {x, y, z}}, {-x < 0 && -z < 0 && y != 0 && x*y != 0 && -1 - E*y <= 0, {x, y, z}}, {-x < 0 && -1 + x - y + z < 0 && -x + y - z <= 0 && -1 - 2*x^2 + 2*z <= 0 && -1 + 2*x^2 - 2*z <= 0, {x, y, z}}, {-x < 0 && -x + z <= 0 && 1 - z < 0 && -z^3 < 0 && -Sqrt[z^3] < 0, {x, y, z}}, {-x < 0 && -x + z <= 0 && 1 - z < 0 && -z^3 < 0 && -Sqrt[z^3] <= 0, {x, y, z}}, {-x < 0 && -1 + x != 0 && 1 + z < 0 && -1 + E^(1/(5*E))*x < 0 && y*z < 0, {x, y, z}}, {-x < 0 && y != 0 && -1 - E*y <= 0 && -z < 0 && y*z != 0, {x, y, z}}, {x < 0 && -x^4 < 0 && z < 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {x < 0 && -y < 0 && -u < 0 && -z < 0 && u*y - x*z < 0, {x, y, z, u}}, {x < 0 && -y < 0 && -u < 0 && z < 0 && u*y - x*z < 0, {x, y, z, u}}, {x < 0 && -y < 0 && -u < 0 && z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {x < 0 && -y < 0 && u < 0 && -z < 0 && u*y - x*z < 0, {x, y, z, u}}, {x < 0 && -y < 0 && u < 0 && -z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {x < 0 && -y < 0 && u < 0 && z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {x < 0 && y < 0 && -u < 0 && -z < 0 && u*y - x*z < 0, {x, y, z, u}}, {x < 0 && y < 0 && -u < 0 && -z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {x < 0 && y < 0 && -u < 0 && z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {x < 0 && y < 0 && u < 0 && -z < 0 && u*y - x*z < 0, {x, y, z, u}}, {x < 0 && y < 0 && u < 0 && z < 0 && u*y - x*z < 0, {x, y, z, u}}, {x < 0 && y < 0 && u < 0 && z < 0 && -(u*y) + x*z < 0, {x, y, z, u}}, {x < 0 && y < 0 && -1 - E*y <= 0 && -z < 0 && 1 - x*z <= 0, {x, y, z}}, {x < 0 && y < 0 && -1 - E*y <= 0 && z < 0 && 1 - x*z <= 0, {x, y, z}}, {x < 0 && -1 + x + y - z < 0 && -x - y + z <= 0 && -1 - 2*x^2 + 2*y <= 0 && -1 + 2*x^2 - 2*y <= 0, {x, y, z}}, {x < 0 && -1 + x - y + z < 0 && -x + y - z <= 0 && -1 - 2*x^2 + 2*z <= 0 && -1 + 2*x^2 - 2*z <= 0, {x, y, z}}, {x < 0 && -1 - E*x <= 0 && -z < 0 && -(y*z) < 0 && -(E*x) - y*z <= 0, {x, y, z}}, {x < 0 && -1 - E*x <= 0 && z < 0 && -(y*z) < 0 && -(E*x) - y*z <= 0, {x, y, z}}, {1 + x < 0 && -x^4 < 0 && z < 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {1 - y < 0 && -x < 0 && -x^2 <= 0 && 3*Sqrt[x^2/y] - z < 0 && z < 0, {x, y, z}}, {1 - y < 0 && x < 0 && -x^2 <= 0 && 3*Sqrt[x^2/y] - z < 0 && z < 0, {x, y, z}}, {x - y < 0 && y - 2*z < 0 && -3*u + z < 0 && u - 4*x < 0 && x <= 0, {x, y, z, u}}, {-21 + y < 0 && -y < 0 && -16*y + z < 0 && -z < 0 && -16*y + x*y + z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && -x < 0 && -x^2 <= 0 && 3*Sqrt[x^2/y] + z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && x < 0 && -x^2 <= 0 && 3*Sqrt[x^2/y] + z < 0, {x, y, z}}, {-y < 0 && 1 + x == 0 && -1/16 - x*y <= 0 && 16*x*y - z <= 0 && z < 0, {x, y, z}}, {-y < 0 && -1 + y < 0 && -z < 0 && -1 + z < 0 && x*y - z < 0, {x, y, z}}, {-y < 0 && -1 + y < 0 && -z < 0 && -1 + z < 0 && -1 + x*y^2 + z^2 < 0, {x, y, z}}, {-y < 0 && -y^3 < 0 && -z < 0 && -(Sqrt[y^3]*z) < 0 && -2*Sqrt[y^3] + 3*E*z <= 0, {x, y, z}}, {-y < 0 && x*y != 0 && -u < 0 && z != 0 && -1 - E*z <= 0, {x, y, z, u}}, {y - 2*z < 0 && -y < 0 && y^2 - 2*y*z <= 0 && -x < 0 && -x^2 - y^2 + 2*y*z == 0, {x, y, z}}, {1 + x - z < 0 && -z < 0 && -(u*z) < 0 && -1/4 + E*u*z <= 0 && y + 4*u*z <= 0, {x, y, z, u}}, {-583 + z < 0 && 71 - z < 0 && x < 0 && -4*Log[2] - Log[3] + x*Log[3] - Log[7] + x*Log[7] < 0 && -257103 + 1344*y - 2*y^2 + 441*z < 0, {x, y, z}}, {-z < 0 && x == 0 && y == 0 && -(y*z) < 0 && -1 + E*y*z <= 0, {x, y, z}}, {-z < 0 && x == 0 && y == 0 && -(y*z) < 0 && -1/4 + E*y*z <= 0, {x, y, z}}, {-z < 0 && 1 + y == 0 && 1/2 + y*z <= 0 && -x + 2*y*z < 0 && x < 0, {x, y, z}}, {-z < 0 && -y < 0 && y*z != 0 && x != 0 && -1 - E*x <= 0, {x, y, z}}, {-z < 0 && y - 2*z < 0 && -y < 0 && -x <= 0 && -x^2 - y^2 + 2*y*z == 0, {x, y, z}}, {-z < 0 && -Sqrt[x/z] < 0 && y < 0 && -(y*z) < 0 && x == 0, {x, y, z}}, {-z < 0 && -Sqrt[x/z] < 0 && y < 0 && -(y*z) < 0 && -x < 0, {x, y, z}}, {-z < 0 && -Sqrt[x/z] < 0 && y < 0 && -1/4 + E*y*z <= 0 && -x <= 0, {x, y, z}}, {-z < 0 && -Sqrt[x/z] < 0 && y != 0 && y*z != 0 && x == 0, {x, y, z}}, {-z < 0 && -Sqrt[x/z] < 0 && y != 0 && y*z != 0 && -x <= 0, {x, y, z}}, {-z < 0 && -(Sqrt[x/z]*z) < 0 && y < 0 && -(y*z) < 0 && -x < 0, {x, y, z}}, {-z < 0 && 4096*z - z^2 < 0 && 1 + x - z < 0 && -x < 0 && 1 + x + y <= 0, {x, y, z}}, {-z < 0 && 1 - x <= 0 && -x + y == 0 && -4 + Pi^2 - 8*Pi^2*x + 16*Pi^2*x^2 - 4*z < 0 && 1 - 4*Pi^2*x^2 + z < 0, {x, y, z}}, {-z < 0 && -x <= 0 && -1 - x + y == 0 && -1 + Pi^2 + 4*Pi^2*x + 4*Pi^2*x^2 - z < 0 && 4 - 9*Pi^2 - 24*Pi^2*x - 16*Pi^2*x^2 + 4*z < 0, {x, y, z}}, {-z < 0 && 1 + x <= 0 && -x + y == 0 && -1 + 4*Pi^2*x^2 - z < 0 && 4 - Pi^2 + 8*Pi^2*x - 16*Pi^2*x^2 + 4*z < 0, {x, y, z}}, {-z < 0 && 2 + x <= 0 && -1 - x + y == 0 && -4 + 9*Pi^2 + 24*Pi^2*x + 16*Pi^2*x^2 - 4*z < 0 && 1 - Pi^2 - 4*Pi^2*x - 4*Pi^2*x^2 + z < 0, {x, y, z}}, {-z < 0 && -Sqrt[x/z] <= 0 && y < 0 && -1/4 + E*y*z <= 0 && -x <= 0, {x, y, z}}, {-z < 0 && -1 + z != 0 && -z^2 < 0 && -(u*z) < 0 && u - y == 0, {x, y, z, u}}, {z < 0 && x == 0 && y == 0 && -(y*z) < 0 && -1 + E*y*z <= 0, {x, y, z}}, {z < 0 && x == 0 && y == 0 && -(y*z) < 0 && -1/4 + E*y*z <= 0, {x, y, z}}, {z < 0 && -y - z <= 0 && x + z < 0 && -y < 0 && -x < 0, {x, y, z}}, {z < 0 && z*Log[2] != 0 && -y < 0 && x*z + y*Log[2] != 0 && x*z + 2*y*Log[2] == 0, {x, y, z}}, {x*z < 0 && -z < 0 && -1 - x <= 0 && -1 + x <= 0 && 1 + y - z <= 0, {x, y, z}}, {1 + z < 0 && -(y*z) < 0 && 1/5 + E*y < 0 && -x + y*z < 0 && -y + y*z^2 <= 0, {x, y, z}}, {-1 + x - y + z < 0 && 2 - y <= 0 && -1 - 2*x + 2*z^2 <= 0 && -x + y - z <= 0 && -1 + 2*x - 2*z^2 <= 0, {x, y, z}}, {-1 + x - y + z < 0 && y <= 0 && -1 - 2*x + 2*z^2 <= 0 && -x + y - z <= 0 && -1 + 2*x - 2*z^2 <= 0, {x, y, z}}, {-y + 2*z < 0 && y < 0 && y^2 - 2*y*z <= 0 && -x < 0 && -x^2 - y^2 + 2*y*z == 0, {x, y, z}}, {Sqrt[345] + 5*z < 0 && x == 0 && y == 0 && 1/69 + E*y <= 0 && 69*y - 5*y*z^2 < 0, {x, y, z}}, {1 - z^2 < 0 && -1 - y + z^2 == 0 && -y < 0 && -2*Pi*x + z < 0 && -Pi + 2*Pi*x - z < 0, {x, y, z}}, {-1 + x*y + z^2 < 0 && -1 - z < 0 && -1 + z < 0 && -1 - y < 0 && -1 + y < 0, {x, y, z}}, {z - u*Log[2] < 0 && -Pi - 4*Pi*y + 2*v*Log[2] < 0 && -Pi + 4*Pi*y - 2*v*Log[2] < 0 && -3*Pi - 4*Pi*x + 2*v*Log[2] < 0 && Pi + 4*Pi*x - 2*v*Log[2] < 0, {x, y, z, u, v}}, {z - u*Log[2] < 0 && -Pi - 4*Pi*y + 2*v*Log[2] < 0 && -Pi + 4*Pi*y - 2*v*Log[2] < 0 && -Pi - 4*Pi*x + 2*v*Log[2] < 0 && -Pi + 4*Pi*x - 2*v*Log[2] < 0, {x, y, z, u, v}}, {1 - u <= 0 && -(Pi*y) + v*Log[2] == 0 && 1 - u < 0 && -2*Pi*x - z + v*Log[2] < 0 && 2*Pi*x - z - v*Log[2] < 0, {x, y, z, u, v}}, {u <= 0 && z < 0 && -1 - E*z < 0 && 1 - y + 2*u*z <= 0 && x < 0, {x, y, z, u}}, {-x <= 0 && Sqrt[x] == 0 && y == 0 && z != 0 && -1 - E*z <= 0, {x, y, z}}, {-x <= 0 && Sqrt[x] == 0 && z != 0 && -1 - E*z <= 0 && y == 0, {x, y, z}}, {-x <= 0 && -1 + x + y - z < 0 && -x - y + z <= 0 && -1 - 2*x^2 + 2*y <= 0 && -1 + 2*x^2 - 2*y <= 0, {x, y, z}}, {-x <= 0 && -1 + x - y + z < 0 && -x + y - z <= 0 && -1 - 2*x^2 + 2*z <= 0 && -1 + 2*x^2 - 2*z <= 0, {x, y, z}}, {-x <= 0 && -1 + x + y^2 + z^2 < 0 && 3 + x - 4*y + y^2 - 4*z + 2*y*z + z^2 < 0 && -1 + y - z < 0 && -1 - y + z < 0, {x, y, z}}, {-x <= 0 && x - Sqrt[y^2 + z^2] < 0 && -3 + y^2 - 2*z - z^2 == 0 && y + y*z == 0 && -y^2 - z^2 <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && x + y - z <= 0 && -Sqrt[x + y] + z <= 0 && -x - y <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && x - Sqrt[y + z] < 0 && -y - z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && -1 + x + y <= 0 && -1 + y + z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && -1 + z <= 0 && x + y - z^2 <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && -1 + x + y + z <= 0 && 3*x + 3*y - z <= 0, {x, y, z}}, {-x <= 0 && -y <= 0 && -z <= 0 && -x + 3*y + 3*z <= 0 && -1 + x + y + z <= 0, {x, y, z}}, {-x <= 0 && 2*y - z <= 0 && x*z - 2*y*z^2 <= 0 && z != 0 && z < 0, {x, y, z}}, {-x <= 0 && -(x*y*z) - y^3*z <= 0 && x + y^2 != 0 && -z < 0 && y^2 - 2*y*z <= 0, {x, y, z}}, {x <= 0 && u < 0 && u*x - y*Log[2] <= 0 && u*z < 0 && -1 - E*u*z <= 0, {x, y, z, u}}, {x <= 0 && -1 + x + y - z < 0 && -x - y + z <= 0 && -1 - 2*x^2 + 2*y <= 0 && -1 + 2*x^2 - 2*y <= 0, {x, y, z}}, {x <= 0 && -1 + x - y + z < 0 && -x + y - z <= 0 && -1 - 2*x^2 + 2*z <= 0 && -1 + 2*x^2 - 2*z <= 0, {x, y, z}}, {-x^3 <= 0 && Sqrt[x^3] == 0 && y == 0 && z != 0 && -1 - E*z <= 0, {x, y, z}}, {-x^3 <= 0 && Sqrt[x^3] == 0 && z != 0 && -1 - E*z <= 0 && y == 0, {x, y, z}}, {-x + Sqrt[8 + x^2] <= 0 && 2 + v - z == 0 && -u + 2*v == 0 && y < 0 && -8 - x^2 <= 0, {x, y, z, u, v}}, {-1 + 2*u - 2*y <= 0 && -1 - 2*u + 2*y <= 0 && -1 - 2*x + 2*z <= 0 && -1 + 2*x - 2*z <= 0 && -7 + x^2 + y^2 <= 0, {x, y, z, u}}, {2 - y <= 0 && -1 + x - y + z < 0 && -x + y - z <= 0 && -1 - 2*x + 2*z^2 <= 0 && -1 + 2*x - 2*z^2 <= 0, {x, y, z}}, {x - y <= 0 && y - 2*z <= 0 && -3*u + z <= 0 && u - 4*x <= 0 && x <= 0, {x, y, z, u}}, {x - y <= 0 && y - z <= 0 && -u + z <= 0 && u - v <= 0 && v - x <= 0, {x, y, z, u, v}}, {1 + x - y <= 0 && Pi + 12*Pi*y - 6*z < 0 && -2*Pi*y + z - ArcSin[2/3] < 0 && Pi + 2*Pi*x - z - ArcSin[2/3] < 0 && -5*Pi - 12*Pi*x + 6*z < 0, {x, y, z}}, {-y <= 0 && Sqrt[y] == 0 && x == 0 && z != 0 && -1 - E*z <= 0, {x, y, z}}, {-y <= 0 && Sqrt[y*z] == 0 && x*z^(3/2) == 0 && -z <= 0 && -(y*z) <= 0, {x, y, z, u}}, {-y <= 0 && x - z < 0 && -x <= 0 && -4 + 4*x + z^2 <= 0 && -4 + 4*x + y <= 0, {x, y, z}}, {-y <= 0 && -z <= 0 && x^2 + y - z == 0 && -x < 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -x + z <= 0 && -x <= 0 && -4 + 4*x + z^2 <= 0 && -4 + 4*x + y <= 0, {x, y, z}}, {y <= 0 && -1 + x - y + z < 0 && -x + y - z <= 0 && -1 - 2*x + 2*z^2 <= 0 && -1 + 2*x - 2*z^2 <= 0, {x, y, z}}, {-y^3 <= 0 && Sqrt[y^3] == 0 && x == 0 && z != 0 && -1 - E*z <= 0, {x, y, z}}, {1 - x + y <= 0 && Pi + 12*Pi*y - 6*z < 0 && -2*Pi*y + z - ArcSin[2/3] < 0 && Pi + 2*Pi*x - z - ArcSin[2/3] < 0 && -5*Pi - 12*Pi*x + 6*z < 0, {x, y, z}}, {-z <= 0 && x^2 == 0 && u*x == 0 && u^2 + z == 0 && x*y != 0, {x, y, z, u}}, {-z <= 0 && y == 0 && u != 0 && -1 - E*u <= 0 && u - x + 5*y*z == 0, {x, y, z, u, v}}, {-z <= 0 && x^2*y^2 == 0 && u*x*y^2 == 0 && u^2*y^2 - x^2*z + y^2*z == 0 && x*y != 0, {x, y, z, u}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && 2*x*y - y^2 < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && -x <= 0 && -2*x*y + y^2 <= 0, {x, y, z}}, {-z <= 0 && y^2 + z == 0 && y + x*y + y^3 + y*z == 0 && 1 + 2*x + x^2 + 2*y^2 + 2*x*y^2 + y^4 - 2*z + 2*x*z + 2*y^2*z + z^2 == 0 && -1 + y^2 + z < 0, {x, y, z}}, {-z <= 0 && y^2 + z == 0 && y + x*y + y^3 + y*z == 0 && 1 + 2*x + x^2 + 2*y^2 + 2*x*y^2 + y^4 - 2*z + 2*x*z + 2*y^2*z + z^2 == 0 && -1 + y^2 + z <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + y^2 + z < 0 && 3 - 4*x + x^2 - 4*y + 2*x*y + y^2 + z < 0 && -1 - x + y < 0 && -1 + x - y < 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + y^2 + z < 0 && 3 - 4*x + x^2 - 4*y + 2*x*y + y^2 + z < 0 && 1 - x + y < 0 && -2 + x - y < 0, {x, y, z}}, {-z <= 0 && 9 + 6*x^2 + x^4 - 10*y^2 + 2*x^2*y^2 + y^4 - 10*z + 2*x^2*z + 2*y^2*z + z^2 < 0 && 3 - 4*x + x^2 - 4*y + 2*x*y + y^2 + z < 0 && -1 - x + y < 0 && -1 + x - y < 0, {x, y, z}}, {-z <= 0 && -u <= 0 && x^2 == 0 && u*y^2 + y^2*z == 0 && x*y != 0, {x, y, z, u}}, {-z <= 0 && -u <= 0 && -1 - u + 2*x - z + Sqrt[u + z] + x*Sqrt[u + z] == 0 && 2 + Sqrt[u + z] != 0 && y == 0, {x, y, z, u}}, {-z <= 0 && -v <= 0 && u != 0 && -1 - E*u <= 0 && u + x - v*y + 5*y*z == 0, {x, y, z, u, v}}, {-z <= 0 && u != 0 && -1 - E*u <= 0 && y == 0 && u - x + 5*y*z == 0, {x, y, z, u, v}}, {-z <= 0 && 1 + z != 0 && -2*Sqrt[3] + 3*x + 2*Sqrt[3]*z + 3*x*z == 0 && 1 + z != 0 && -3 + y + 10*z + 2*y*z - 3*z^2 + y*z^2 == 0, {x, y, z}}, {-z <= 0 && 1 + z != 0 && -1 + x + 2*z + 2*x*z - z^2 + x*z^2 == 0 && 1 + z != 0 && -1 + y + 6*z + 2*y*z - z^2 + y*z^2 == 0, {x, y, z}}, {-z <= 0 && 1 + z != 0 && y - 16*z + 2*y*z + y*z^2 == 0 && 1 + z != 0 && -2 + x + 12*z + 2*x*z - 2*z^2 + x*z^2 == 0, {x, y, z}}, {z <= 0 && u < 0 && u*z - x*Log[2] <= 0 && u*y < 0 && -1 - E*u*y <= 0, {x, y, z, u}}, {-(x*z) <= 0 && -z < 0 && -1 - x <= 0 && -1 + x <= 0 && 1 + y - z <= 0, {x, y, z}}, {1 - x*y - z^2 <= 0 && -1 - z < 0 && -1 + z < 0 && -1 - y < 0 && -1 + y < 0, {x, y, z}}, {-x^2 + 2*x*y - y^2 + 2*x*z - z^2 <= 0 && -y < 0 && -x + y < 0 && -z < 0 && -x + z < 0, {x, y, z}}, {u != 0 && u < 0 && -(u*v) < 0 && u*v - y < 0 && 5*u*v^2 - x <= 0, {x, y, z, u, v}}, {u != 0 && u*v != 0 && u*z != 0 && -(u^2*w) + v*w*z + u^2*x*z - u*v*y*z == 0 && u != 0, {x, y, z, u, v, w}}, {u - v != 0 && z == 0 && -x + 2*u*Log[2] == 0 && -y + u*z == 0 && -u - v < 0, {x, y, z, u, v}}, {u - v != 0 && z == 0 && -x + 2*u*Log[2] == 0 && y + u*z == 0 && -u - v < 0, {x, y, z, u, v}}, {y != 0 && y != 0 && x != 0 && y < 0 && y - z < 0, {x, y, z}}, {Sqrt[x] + Sqrt[z] != 0 && -Sqrt[z] <= 0 && -Sqrt[x] <= 0 && -x <= 0 && -z <= 0, {x, y, z}}, {Sqrt[y] + Sqrt[z] != 0 && -Sqrt[z] <= 0 && -Sqrt[y] <= 0 && -y <= 0 && -z <= 0, {x, y, z}}, {z != 0 && y + y*z - x*z^2 == 0 && z != 0 && -1 - z <= 0 && -1 + z <= 0, {x, y, z}}, {z != 0 && z != 0 && -1 - u < 0 && -1 + u < 0 && x - u*z < 0, {x, y, z, u}}, {x*z != 0 && -y + z^2 == 0 && -z < 0 && -z^2 < 0 && -y < 0, {x, y, z}}, {x*z != 0 && 1 + z^2 != 0 && -1 + 3*z^2 == 0 && x + y + x*z^2 + y*z^2 == 0 && x != 0, {x, y, z}}, {x*z != 0 && 1 + z^2 != 0 && -1 + 3*z^2 == 0 && x + 2*y + x*z^2 + 2*y*z^2 == 0 && x != 0, {x, y, z}}, {Sqrt[y^2*z] != 0 && -Sqrt[y^2*z] <= 0 && -Sqrt[z] <= 0 && -z <= 0 && -(y^2*z) <= 0, {x, y, z}}, {-3*x*Sqrt[-z] + 2*Sqrt[y]*Sqrt[-z]*z != 0 && -Sqrt[-z] <= 0 && -Sqrt[y] <= 0 && -y <= 0 && z <= 0, {x, y, z}}, {-y + 2*z*Log[2] != 0 && -y + x*Log[2] == 0 && -y < 0 && -y < 0 && -x < 0, {x, y, z}}, {u == 0 && x == 0 && u < 0 && x < 0 && -y^2 <= 0 && -y < 0, {x, y, z, u}}, {u == 0 && -v + x == 0 && -x <= 0 && -y <= 0 && -z <= 0 && -u <= 0, {x, y, z, u, v}}, {u == 0 && y == 0 && u < 0 && x < 0 && -y^2 <= 0 && -y < 0, {x, y, z, u}}, {v == 0 && y == 0 && w*x != 0 && x != 0 && -v < 0 && -w < 0, {x, y, z, u, v, w}}, {v == 0 && y == 0 && w*x != 0 && x != 0 && -w < 0 && -v < 0, {x, y, z, u, v, w}}, {v == 0 && -z < 0 && -u < 0 && x - u*z == 0 && y != 0 && -1 - E*y <= 0, {x, y, z, u, v}}, {u - x == 0 && 4 + v - 2*x == 0 && z < 0 && -y - z <= 0 && z < 0 && -y < 0, {x, y, z, u, v}}, {x == 0 && y == 0 && -2 - x^2 + y^2 == 0 && x*y == 0 && -8 - u^2 + z^2 + Sqrt[16 + u^2*x^2 + 8*u*y + u^2*y^2 - 8*x*z + x^2*z^2 + y^2*z^2] == 0 && u*z == 0, {x, y, z, u}}, {u - y == 0 && -1 + z != 0 && -Sqrt[z] < 0 && -z < 0 && -(u*z) < 0 && -z <= 0, {x, y, z, u}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && x^4 - 2*x^2*z < 0 && -x <= 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && -x^4 + 2*x^2*z < 0 && -x <= 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && -x <= 0 && x^2 - 2*z <= 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && -x <= 0 && -1 - x^2 + 2*z <= 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && -x <= 0 && -x^2 + 2*z <= 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && -x <= 0 && -x^4 + 2*x^2*z <= 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && x^2 - 2*z < 0 && -1 + 4096*x^2 < 0 && -x <= 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -x^2 + 2*z < 0 && -1 + 4096*x^2 < 0 && -x <= 0, {x, y, z}}, {-1 + y == 0 && 1 + y == 0 && -1 + x == 0 && 1 + x == 0 && 1 + z != 0 && -1 + z != 0, {x, y, z}}, {-1 + y == 0 && -x < 0 && -x^2 <= 0 && z < 0 && -3*Sqrt[x^2/y] - z < 0 && 3*x + z < 0, {x, y, z}}, {-1 + y == 0 && -x < 0 && -x^2 <= 0 && 3*Sqrt[x^2/y] + z < 0 && -3*x - z < 0 && 3*x + 2*z < 0, {x, y, z}}, {-1 + y == 0 && -x < 0 && -x^2 <= 0 && -3*x + 2*z < 0 && 3*Sqrt[x^2/y] - z < 0 && -z < 0, {x, y, z}}, {-1 + y == 0 && -x < 0 && -x^2 <= 0 && -3*x + 2*z < 0 && -3*Sqrt[x^2/y] + z < 0 && -z < 0, {x, y, z}}, {-1 + y == 0 && x < 0 && -x^2 <= 0 && 3*Sqrt[x^2/y] - z < 0 && -z < 0 && 3*x + 2*z < 0, {x, y, z}}, {-1 + y == 0 && x < 0 && -x^2 <= 0 && -3*x + z < 0 && z < 0 && -3*Sqrt[x^2/y] - z < 0, {x, y, z}}, {-1 + y == 0 && x < 0 && -x^2 <= 0 && -3*Sqrt[x^2/y] + z < 0 && -z < 0 && 3*x + 2*z < 0, {x, y, z}}, {-1 + y == 0 && x < 0 && -x^2 <= 0 && -3*x + 2*z < 0 && 3*x - z < 0 && 3*Sqrt[x^2/y] + z < 0, {x, y, z}}, {y == 0 && -39 + x == 0 && -46 + x + y == 0 && z != 0 && -33 + x + y*z^2 == 0 && -z < 0, {x, y, z}}, {y == 0 && -1 + 6*x == 0 && -1 - z <= 0 && -1 + z <= 0 && -1 - y <= 0 && -1 + y <= 0, {x, y, z}}, {y == 0 && 1 + 6*x == 0 && -1 - z <= 0 && -1 + z <= 0 && -1 - y <= 0 && -1 + y <= 0, {x, y, z}}, {y == 0 && u*x - z == 0 && -u < 0 && -v < 0 && -1 - z <= 0 && -1 + z <= 0, {x, y, z, u, v}}, {y == 0 && u*y - z == 0 && u - v != 0 && -x + 2*u*Log[2] == 0 && -u - v < 0 && 1 + z <= 0, {x, y, z, u, v}}, {y == 0 && z == 0 && -y < 0 && -z < 0 && -1 + x <= 0 && -x <= 0, {x, y, z}}, {y == 0 && x*z == 0 && -x < 0 && -y < 0 && -z < 0 && y*z != 0, {x, y, z}}, {x^8*y^8 == 0 && -(u^2*x^8*y^6) - 2*v^2*x^8*y^6 - u^2*x^6*y^8 + v^2*x^6*y^8 + x^8*y^6*z^2 - 2*x^6*y^8*z^2 == 0 && u^4*x^8*y^4 + 6*u^2*v^2*x^8*y^4 + 6*v^4*x^8*y^4 + 4*u^4*x^6*y^6 - 2*u^2*v^2*x^6*y^6 - 6*v^4*x^6*y^6 + u^4*x^4*y^8 + 2*u^2*v^2*x^4*y^8 + v^4*x^4*y^8 + 2*u^2*x^8*y^4*z^2 - 6*v^2*x^8*y^4*z^2 - 2*u^2*x^6*y^6*z^2 + 10*v^2*x^6*y^6*z^2 + 6*u^2*x^4*y^8*z^2 - 6*v^2*x^4*y^8*z^2 + x^8*y^4*z^4 - 6*x^6*y^6*z^4 + 6*x^4*y^8*z^4 == 0 && u^4*v^2*x^8*y^2 + 3*u^2*v^4*x^8*y^2 + 2*v^6*x^8*y^2 + u^6*x^6*y^4 - u^4*v^2*x^6*y^4 - 5*u^2*v^4*x^6*y^4 - 3*v^6*x^6*y^4 + u^6*x^4*y^6 + 3*u^4*v^2*x^4*y^6 + 3*u^2*v^4*x^4*y^6 + v^6*x^4*y^6 + 2*u^2*v^2*x^8*y^2*z^2 - 3*v^4*x^8*y^2*z^2 + 3*u^4*x^6*y^4*z^2 - 3*u^2*v^2*x^6*y^4*z^2 + 4*v^4*x^6*y^4*z^2 - u^4*x^4*y^6*z^2 - 3*u^2*v^2*x^4*y^6*z^2 - 2*v^4*x^4*y^6*z^2 + u^4*x^2*y^8*z^2 + 2*u^2*v^2*x^2*y^8*z^2 + v^4*x^2*y^8*z^2 + v^2*x^8*y^2*z^4 + 3*u^2*x^6*y^4*z^4 - 2*v^2*x^6*y^4*z^4 - 5*u^2*x^4*y^6*z^4 + 4*v^2*x^4*y^6*z^4 + 3*u^2*x^2*y^8*z^4 - 3*v^2*x^2*y^8*z^4 + x^6*y^4*z^6 - 3*x^4*y^6*z^6 + 2*x^2*y^8*z^6 == 0 && u^4*v^4*x^8 + 2*u^2*v^6*x^8 + v^8*x^8 - 2*u^6*v^2*x^6*y^2 - 6*u^4*v^4*x^6*y^2 - 6*u^2*v^6*x^6*y^2 - 2*v^8*x^6*y^2 + u^8*x^4*y^4 + 4*u^6*v^2*x^4*y^4 + 6*u^4*v^4*x^4*y^4 + 4*u^2*v^6*x^4*y^4 + v^8*x^4*y^4 + 2*u^2*v^4*x^8*z^2 - 2*v^6*x^8*z^2 - 6*u^4*v^2*x^6*y^2*z^2 - 4*u^2*v^4*x^6*y^2*z^2 + 2*v^6*x^6*y^2*z^2 + 4*u^6*x^4*y^4*z^2 + 10*u^4*v^2*x^4*y^4*z^2 + 8*u^2*v^4*x^4*y^4*z^2 + 2*v^6*x^4*y^4*z^2 - 2*u^6*x^2*y^6*z^2 - 6*u^4*v^2*x^2*y^6*z^2 - 6*u^2*v^4*x^2*y^6*z^2 - 2*v^6*x^2*y^6*z^2 + v^4*x^8*z^4 - 6*u^2*v^2*x^6*y^2*z^4 + 2*v^4*x^6*y^2*z^4 + 6*u^4*x^4*y^4*z^4 + 8*u^2*v^2*x^4*y^4*z^4 - 6*v^4*x^4*y^4*z^4 - 6*u^4*x^2*y^6*z^4 - 4*u^2*v^2*x^2*y^6*z^4 + 2*v^4*x^2*y^6*z^4 + u^4*y^8*z^4 + 2*u^2*v^2*y^8*z^4 + v^4*y^8*z^4 - 2*v^2*x^6*y^2*z^6 + 4*u^2*x^4*y^4*z^6 + 2*v^2*x^4*y^4*z^6 - 6*u^2*x^2*y^6*z^6 + 2*v^2*x^2*y^6*z^6 + 2*u^2*y^8*z^6 - 2*v^2*y^8*z^6 + x^4*y^4*z^8 - 2*x^2*y^6*z^8 + y^8*z^8 == 0 && x*y != 0, {x, y, z, u, v}}, {-2 + x^2 + y^2 == 0 && -z < 0 && -1 + 4096*z < 0 && 2*x*y*z - z^2 < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {-2 + x^2 + y^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -y <= 0 && -x <= 0 && -2*x*y*z + z^2 <= 0, {x, y, z}}, {-2 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -(x*y*z) < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {-2 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && 1 - 2*x*y*z < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {-2 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 + 2*x*y*z < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {-2 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -z^2 + 2*x*y*z^3 < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {-2 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -y <= 0 && -x <= 0 && -(x*y*z) <= 0, {x, y, z}}, {-2 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -y <= 0 && -x <= 0 && 1 - 2*x*y*z <= 0, {x, y, z}}, {-2 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -y <= 0 && -x <= 0 && -1 + 2*x*y*z <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -(x*z) < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && 1 - 2*x*z < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -1 + 2*x*z < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -z^2 + 2*x*z^3 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && -(x*z) <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && 1 - 2*x*z <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && -1 + 2*x*z <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -1 + z < 0 && -z < 0 && -1 + 4096*z < 0 && 2*x*z - z^2 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -1 + z < 0 && -z < 0 && -1 + 4096*z < 0 && -x <= 0 && -(x*z) <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -1 + z < 0 && -z < 0 && -1 + 4096*z < 0 && -x <= 0 && -2*x*z + z^2 <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && z^2 - 2*x*z^3 <= 0 && z != 0, {x, y, z}}, {x^4 - 4*x^2*y^2 + 4*y^4 == 0 && 7*x^4*z - 7*x^2*y^2*z + 4*y^4*z == 0 && x^4*z^2 + 2*x^2*y^2*z^2 + y^4*z^2 == 0 && x^8*y^8 == 0 && x*y != 0 && -z <= 0, {x, y, z}}, {-x^12 - 8*x^10*y^2 + 8*x^8*y^4 == 0 && x^12*z - 3*x^10*y^2*z + 13*x^8*y^4*z - 21*x^6*y^6*z + 10*x^4*y^8*z == 0 && x^12*z^2 - 14*x^10*y^2*z^2 + 47*x^8*y^4*z^2 - 68*x^6*y^6*z^2 + 47*x^4*y^8*z^2 - 14*x^2*y^10*z^2 + y^12*z^2 == 0 && x^8*y^8 == 0 && x*y != 0 && -z <= 0, {x, y, z}}, {-1 + u^2 - z == 0 && -3*Pi + 2*u - 4*Pi*x < 0 && 1 - u^2 < 0 && u - 2*Pi*y < 0 && -Pi - u + 2*Pi*y < 0 && Pi - u + 2*Pi*x < 0, {x, y, z, u}}, {-1 + u^2 - z == 0 && u - 2*Pi*x < 0 && 1 - u^2 < 0 && u - 2*Pi*y < 0 && -Pi - u + 2*Pi*y < 0 && -Pi - 2*u + 4*Pi*x < 0, {x, y, z, u}}, {x - z == 0 && -y + 2*u*v^2*z == 0 && -u < 0 && -v < 0 && -u < 0 && -v < 0, {x, y, z, u, v}}, {x^2 - z == 0 && -y < 0 && -1 + 4096*y < 0 && -x^2 < 0 && 2*x^2 - y < 0 && -x <= 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 4096*y < 0 && -x^2 < 0 && -x <= 0 && 2*x^2 - y <= 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && -y^2 + z^2 < 0 && -x <= 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && -y - z <= 0 && -x <= 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && y - z <= 0 && -x <= 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && -1 - y + z <= 0 && -x <= 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && -y + z <= 0 && -x <= 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y < 0 && y - z < 0 && -1 + 4096*y < 0 && -x <= 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y - z < 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y + z < 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0, {x, y, z}}, {y^2 - z == 0 && -u + x^2*z == 0 && -y^2 < 0 && -1 + 4096*y^2 < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {z == 0 && x == 0 && z < 0 && x < 0 && -y^2 <= 0 && -y < 0, {x, y, z}}, {z == 0 && y == 0 && z < 0 && x < 0 && -y^2 <= 0 && -y < 0, {x, y, z}}, {z == 0 && y == 0 && x != 0 && -z < 0 && -u < 0 && u*x != 0, {x, y, z, u}}, {z == 0 && y - 5*z + 5*u^2*z == 0 && z != 0 && -1 - u < 0 && -1 + u < 0 && x - u*z < 0, {x, y, z, u, v}}, {z == 0 && -(y*z) - x*Log[2] + z*Log[2] == 0 && v != 0 && -(u*z) < 0 && z < 0 && -u < 0, {x, y, z, u, v}}, {x^2 + y^2 - 2*y*z == 0 && -z < 0 && -y < 0 && y - 2*z < 0 && -x < 0 && -x <= 0, {x, y, z}}, {x^2 + y^2 - 2*y*z == 0 && -z < 0 && -y < 0 && y - 2*z < 0 && -x <= 0 && x <= 0, {x, y, z}}, {x^2 - y*z == 0 && z < 0 && -y + 4*z < 0 && y - z < 0 && z <= 0 && -x <= 0, {x, y, z}}, {z + u*z + x*y*z == 0 && 1 + u + y + u*y == 0 && -y < 0 && -z < 0 && -u < 0 && -1 + x < 0, {x, y, z, u}}, {x^2 - z^2 == 0 && -x <= 0 && -x^2 <= 0 && x^2 - y^2 <= 0 && -x - y < 0 && -x + y < 0, {x, y, z}}, {x^2 - z^2 == 0 && -x <= 0 && -x^2 <= 0 && x^2 - y^2 <= 0 && x - y < 0 && x + y < 0, {x, y, z}}, {x^2 - z^2 == 0 && -x <= 0 && -x^2 <= 0 && -x^2 + y^2 <= 0 && -x - y < 0 && -x + y < 0, {x, y, z}}, {x^2 - z^2 == 0 && -x <= 0 && -x^2 <= 0 && -x^2 + y^2 <= 0 && -y < 0 && -x + y < 0, {x, y, z}}, {u^2 + z^2 == 0 && u^2*y^2 + 2*u*x*y*z + x^2*z^2 == 0 && -x <= 0 && -y <= 0 && -z <= 0 && -u <= 0, {x, y, z, u}}, {-1 + x^2 + z^2 == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -(x*y) < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && 1 - 2*x*y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -1 + 2*x*y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -y^2 + 2*x*y^3 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -(x*y) <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && 1 - 2*x*y <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -1 + 2*x*y <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && x*y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && 2*x*y - y^2 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && -(x*y) <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && -2*x*y + y^2 <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && y^2 - 2*x*y^3 <= 0 && y != 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && 2*x - y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && -2*x + y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && 2*x*y - y^2 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && -x <= 0 && 2*x - y <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && -x <= 0 && -2*x*y + y^2 <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && -2*x + y <= 0 && -x <= 0, {x, y, z}}, {x^2 - 2*u*z + z^2 == 0 && -x - y < 0 && -x + y < 0 && -2*u*z + z^2 <= 0 && y^2 + z^2 <= 0 && -x <= 0, {x, y, z, u}}, {y^2 - 2*u*z + z^2 == 0 && -u < 0 && -z < 0 && -2*u + z < 0 && -x + y < 0 && -y <= 0, {x, y, z, u}}, {y^2 - 2*u*z + z^2 == 0 && -u < 0 && -z < 0 && -2*u + z < 0 && -y <= 0 && x - y <= 0, {x, y, z, u}}, {y^2 - 2*u*z + z^2 == 0 && -u < 0 && -z < 0 && -2*u + z < 0 && -y <= 0 && -x + y <= 0, {x, y, z, u}}, {-u < 0 && x == 0 && y == 0 && -1/4 + E*u*y <= 0 && -(E*u) + z <= 0 && -z < 0, {x, y, z, u}}, {u < 0 && x == 0 && z == 0 && -1/4 + E*u*z <= 0 && E*u - y <= 0 && y < 0, {x, y, z, u}}, {u < 0 && -1 + u^2 < 0 && -1 - u^2 < 0 && 2*u + y + u^2*y == 0 && -2*u + z + u^2*z == 0 && -2*u + x + u^2*x == 0, {x, y, z, u}}, {u < 0 && y < 0 && u*y < 0 && -1/4 + E*u*y <= 0 && -x - 4*u*y <= 0 && u*y^2*z <= 0, {x, y, z, u}}, {u < 0 && Sqrt[-v^(-1)] - Sqrt[5*E]*w <= 0 && -1 + E^(1/(5*E))*u == 0 && v < 0 && 2*w - x == 0 && 2*w - y == 0, {x, y, z, u, v, w}}, {u < 0 && Sqrt[-v^(-1)] + Sqrt[5*E]*w <= 0 && -1 + E^(1/(5*E))*u == 0 && v < 0 && 2*w - x == 0 && 2*w - y == 0, {x, y, z, u, v, w}}, {1 + u < 0 && z != 0 && -(u*z) < 0 && 1/5 + E*z < 0 && -x + u*z < 0 && -z + u^2*z <= 0, {x, y, z, u}}, {v < 0 && -1 + v^4 < 0 && -v^4 < 0 && w < 0 && u != 0 && u*w + y*z == 0, {x, y, z, u, v, w}}, {1 - x < 0 && -x < 0 && -x^5 < 0 && -(v*y) < 0 && 5*v + Sqrt[5]*z < 0 && -(Sqrt[5/E]*u) - 5*v <= 0, {x, y, z, u, v}}, {1 - x < 0 && -x^4 < 0 && -z < 0 && x - Root[{-1 + Log[#1^4]*#1 & , 1.22616125067614367857102506136242336954`20.2855860204585}] <= 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {1 - x < 0 && 1 - x^4 < 0 && -z < 0 && y == 0 && -(y*z) < 0 && -1 + E*y*z <= 0, {x, y, z}}, {-1 + x < 0 && -x < 0 && -x^4 < 0 && -z < 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {-x < 0 && -u < 0 && -(E*u) + x <= 0 && y == 0 && z == 0 && -1 + E*u*z <= 0, {x, y, z, u}}, {-x < 0 && -x^4 < 0 && -z < 0 && x - E*z <= 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {-x < 0 && -21 + y < 0 && -y < 0 && -16*y + z < 0 && -z < 0 && -16*y + x*y + z < 0, {x, y, z}}, {-x < 0 && 1 - z < 0 && -z < 0 && -Sqrt[z^3] <= 0 && -x + z <= 0 && -z^3 <= 0, {x, y, z}}, {-x < 0 && -1/3 - E*x*Log[2] <= 0 && -y + 2*v*Log[2] != 0 && -y < 0 && -2*y*Log[2] - 2*z*Log[2] + 4*v*Log[2]^2 - y*Log[3] + 2*v*Log[2]*Log[3] == 0 && -1/3 - E*u*Log[2] <= 0, {x, y, z, u, v}}, {-x < 0 && -1/3 - E*x*Log[2] <= 0 && -y + 2*v*Log[2] != 0 && -y < 0 && -(z*Log[2]) - y*Log[2*Sqrt[3]] + 2*v*Log[2]*Log[2*Sqrt[3]] == 0 && -1/3 - E*u*Log[2] <= 0, {x, y, z, u, v}}, {-x < 0 && y != 0 && -1 - E*y <= 0 && -u < 0 && -z < 0 && x*z != 0, {x, y, z, u}}, {x < 0 && u < 0 && E*u - x <= 0 && y == 0 && z == 0 && -1 + E*u*z <= 0, {x, y, z, u}}, {x < 0 && -x^4 < 0 && z < 0 && -x + E*z <= 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {x < 0 && -x^4 < 0 && z < 0 && -x + Root[{-1 + Log[#1^4]*#1 & , -0.11610128014515555327872503793826204796`20.602059991306604}] <= 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {-u + 2*Pi*x < 0 && -Pi + u - 2*Pi*x < 0 && -1 + u^2 - z == 0 && 1 - u^2 < 0 && u - 2*Pi*y < 0 && -Pi - u + 2*Pi*y < 0, {x, y, z, u}}, {1 - y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && 3*Sqrt[x^2/y] - z < 0 && -z < 0, {x, y, z}}, {1 - y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -z < 0 && 3*Sqrt[x^2/y] + z < 0, {x, y, z}}, {1 - y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && 3*Sqrt[x^2/y] - z < 0 && -z < 0, {x, y, z}}, {1 - y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -z < 0 && 3*Sqrt[x^2/y] + z < 0, {x, y, z}}, {-2 + y < 0 && -y < 0 && -1 + x - y + z < 0 && -1 - 2*x + 2*z^2 <= 0 && -x + y - z <= 0 && -1 + 2*x - 2*z^2 <= 0, {x, y, z}}, {-y < 0 && -x < 0 && x*y != 0 && -u < 0 && z != 0 && -1 - E*z <= 0, {x, y, z, u}}, {-y < 0 && x < 0 && x*y != 0 && -u < 0 && z != 0 && -1 - E*z <= 0, {x, y, z, u}}, {-y < 0 && -2 + y < 0 && -1 + x - y + z < 0 && -x + y - z <= 0 && -1 - 2*x + 2*z^2 <= 0 && -1 + 2*x - 2*z^2 <= 0, {x, y, z}}, {-y < 0 && -y^3 < 0 && Sqrt[y^3] == 0 && x == 0 && z != 0 && -1 - E*z <= 0, {x, y, z}}, {-y < 0 && -y^2 <= 0 && 5*u + Sqrt[5]*Sqrt[x/z] < 0 && x < 0 && z < 0 && -y + u*z < 0, {x, y, z, u}}, {-y < 0 && -y^2 <= 0 && 5*v + Sqrt[5]*Sqrt[x/u] <= 0 && x < 0 && u < 0 && u*v - y < 0, {x, y, z, u, v}}, {-y < 0 && -y^2 <= 0 && 5*u + Sqrt[5]*Sqrt[x/z] <= 0 && x < 0 && z < 0 && -y + u*z < 0, {x, y, z, u}}, {-y < 0 && x != 0 && -u < 0 && u*x != 0 && z != 0 && -1 - E*z <= 0, {x, y, z, u}}, {-y < 0 && x != 0 && x*y != 0 && -u < 0 && z != 0 && -1 - E*z <= 0, {x, y, z, u}}, {-1 + w + 2*y < 0 && -2*v - Pi*w - 2*Pi*y < 0 && 2*u + 2*Pi*x - Pi*z < 0 && -Pi - 4*u - 4*Pi*x + 2*Pi*z < 0 && -Pi - 8*u - 8*Pi*x <= 0 && -Pi + 8*u + 8*Pi*x <= 0, {x, y, z, u, v, w}}, {5*u + Sqrt[5]*Sqrt[x/z] < 0 && x <= 0 && z < 0 && -(u*z) < 0 && -y + u*z < 0 && -x + 5*u^2*z <= 0, {x, y, z, u}}, {y - z < 0 && -16 + z < 0 && -z < 0 && -583 + x + 64*z - 2*z^2 < 0 && -y < 0 && -x < 0, {x, y, z}}, {-3 + z < 0 && 2 - z <= 0 && y + z^2 <= 0 && -1 - y - z^2 < 0 && -1 - x + z^2 < 0 && x - z^2 <= 0, {x, y, z}}, {-1 + z < 0 && -1 - z < 0 && -y < 0 && 2*x - y < 0 && -x <= 0 && -1 + x^2 + z^2 == 0, {x, y, z}}, {-1 + z < 0 && -1 - z < 0 && -y < 0 && -2*x + y < 0 && -x <= 0 && -1 + x^2 + z^2 == 0, {x, y, z}}, {-1 + z < 0 && -1 - z < 0 && -y < 0 && -x <= 0 && 2*x*y - y^2 < 0 && -1 + x^2 + z^2 == 0, {x, y, z}}, {-1 + z < 0 && -1 - z < 0 && -y < 0 && -x <= 0 && -2*x*y + y^2 <= 0 && -1 + x^2 + z^2 == 0, {x, y, z}}, {-1 + z < 0 && -1 - z < 0 && -y < 0 && 2*x - y <= 0 && -x <= 0 && -1 + x^2 + z^2 == 0, {x, y, z}}, {-1 + z < 0 && -1 - z < 0 && -y < 0 && -2*x + y <= 0 && -x <= 0 && -1 + x^2 + z^2 == 0, {x, y, z}}, {-z < 0 && -u < 0 && -1 - u*y - x*z <= 0 && -1 + u*y + x*z <= 0 && z != 0 && u != 0, {x, y, z, u}}, {-z < 0 && u < 0 && -1 - u*z <= 0 && u*Log[2] != 0 && y < 0 && -(u*x) + y*Log[2] != 0, {x, y, z, u}}, {-z < 0 && y < 0 && -1 - E*y <= 0 && y*z != 0 && x != 0 && -1 - E*x <= 0, {x, y, z}}, {-z < 0 && 1 - z^4 < 0 && -y + z^4 <= 0 && -y < 0 && x < 0 && -1 - E*x <= 0, {x, y, z}}, {z < 0 && -x + 2*u*z != 0 && x < 0 && y != 0 && -1 - E*y <= 0 && 1 + 2*u*z + y*z <= 0, {x, y, z, u}}, {1 + z < 0 && y != 0 && -(y*z) < 0 && 1/5 + E*y < 0 && -x + y*z < 0 && -y + y*z^2 <= 0, {x, y, z}}, {u - v*Log[2] < 0 && -(Pi*z) + w*Log[2] == 0 && -Pi - 4*Pi*y + 2*w*Log[2] < 0 && -Pi + 4*Pi*y - 2*w*Log[2] < 0 && -3*Pi - 4*Pi*x + 2*w*Log[2] < 0 && Pi + 4*Pi*x - 2*w*Log[2] < 0, {x, y, z, u, v, w}}, {u - v*Log[2] < 0 && -(Pi*z) + w*Log[2] == 0 && -Pi - 4*Pi*y + 2*w*Log[2] < 0 && -Pi + 4*Pi*y - 2*w*Log[2] < 0 && -Pi - 4*Pi*x + 2*w*Log[2] < 0 && -Pi + 4*Pi*x - 2*w*Log[2] < 0, {x, y, z, u, v, w}}, {-u + v*Log[2] < 0 && -(Pi*z) + w*Log[2] == 0 && -Pi - 4*Pi*y + 2*w*Log[2] < 0 && -Pi + 4*Pi*y - 2*w*Log[2] < 0 && -Pi - 4*Pi*x + 2*w*Log[2] < 0 && -Pi + 4*Pi*x - 2*w*Log[2] < 0, {x, y, z, u, v, w}}, {-1 + x <= 0 && -x < 0 && -x + z <= 0 && y - z < 0 && -z < 0 && -1 + z <= 0, {x, y, z}}, {-x <= 0 && z == 0 && 9*x*z - 6*Sqrt[x*y]*z^2 + y*z^3 == 0 && u != 0 && -u < 0 && -(x*y) <= 0, {x, y, z, u}}, {-x <= 0 && z == 0 && 9*x*z + 6*Sqrt[x*y]*z^2 + y*z^3 == 0 && u != 0 && -u < 0 && -(x*y) <= 0, {x, y, z, u}}, {-x <= 0 && -y <= 0 && -z <= 0 && z == 0 && -x + y + z == 0 && y == 0, {x, y, z}}, {-y <= 0 && x == 0 && -u < 0 && z != 0 && -1 - E*z <= 0 && -5*x + 5*x*y + z == 0, {x, y, z, u}}, {-y <= 0 && -1 + x^2 + y == 0 && -z < 0 && -1 + 4096*z < 0 && 2*x*z - z^2 < 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -z < 0 && -1 + 4096*z < 0 && -x <= 0 && -2*x*z + z^2 <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -z < 0 && 4096*z - z^2 < 0 && -(x*z) < 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -z < 0 && 4096*z - z^2 < 0 && 1 - 2*x*z < 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 + 2*x*z < 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -z < 0 && 4096*z - z^2 < 0 && -z^2 + 2*x*z^3 < 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && -(x*z) <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && 1 - 2*x*z <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && -1 + 2*x*z <= 0, {x, y, z}}, {-y <= 0 && -u < 0 && x == 0 && z != 0 && -1 - E*z <= 0 && -5*x + 5*x*y + z == 0, {x, y, z, u}}, {-y <= 0 && -u < 0 && z != 0 && -1 - E*z <= 0 && x == 0 && -5*x + 5*x*y + z == 0, {x, y, z, u}}, {-y <= 0 && -2*x + y <= 0 && Sqrt[2*x*y - y^2] - z < 0 && -(Sqrt[2]*Sqrt[x*y]) + z < 0 && -(x*y) <= 0 && -2*x*y + y^2 <= 0, {x, y, z}}, {-y <= 0 && Sqrt[y*z] != 0 && -Sqrt[y*z] <= 0 && -Sqrt[z] <= 0 && -z <= 0 && -(y*z) <= 0, {x, y, z}}, {-x + y <= 0 && -1 + x - y < 0 && -3 + x < 0 && 2 - x <= 0 && x^2 + z <= 0 && -1 - x^2 - z < 0, {x, y, z}}, {-z <= 0 && y == 0 && -v < 0 && u != 0 && -1 - E*u <= 0 && u - x + 5*y*z == 0, {x, y, z, u, v}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && -1 + 4096*y < 0 && 2*x*y - y^2 < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && -2*x*y + y^2 <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && 4096*y - y^2 < 0 && -(x*y) < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && 4096*y - y^2 < 0 && 1 - 2*x*y < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && 4096*y - y^2 < 0 && -1 + 2*x*y < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && 4096*y - y^2 < 0 && -y^2 + 2*x*y^3 < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -(x*y) <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && 1 - 2*x*y <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -1 + 2*x*y <= 0, {x, y, z}}, {-z <= 0 && -v < 0 && y == 0 && u != 0 && -1 - E*u <= 0 && u - x + 5*y*z == 0, {x, y, z, u, v}}, {-z <= 0 && -v < 0 && u != 0 && -1 - E*u <= 0 && y == 0 && u - x + 5*y*z == 0, {x, y, z, u, v}}, {-z <= 0 && -u <= 0 && x^2*y^2 == 0 && v*x^2*y == 0 && v^2*x^2 - u*y^2 - y^2*z == 0 && x*y != 0, {x, y, z, u, v}}, {-z <= 0 && -u <= 0 && -v <= 0 && x^2*y^2 == 0 && v*x^2 - u*y^2 - y^2*z == 0 && x*y != 0, {x, y, z, u, v}}, {-z <= 0 && -u <= 0 && -v <= 0 && x^4*y^2 + x^2*y^4 == 0 && -(v*x^4) + u*x^2*y^2 + v*x^2*y^2 - 3*u*y^4 + x^2*y^2*z - y^4*z == 0 && x*y != 0, {x, y, z, u, v}}, {1 + u^2 != 0 && Pi - 2*x - 2*u^2*x == 0 && 1 + u^2 != 0 && Pi*u - y - u^2*y == 0 && 1 + u^2 != 0 && Pi*u^2 + 2*z + 2*u^2*z == 0, {x, y, z, u}}, {1 + u^2 != 0 && Pi - 2*x - 2*u^2*x == 0 && 1 + u^2 != 0 && 2*Pi*u - y - u^2*y == 0 && 1 + u^2 != 0 && Pi*u^2 + 2*z + 2*u^2*z == 0, {x, y, z, u}}, {1 + u^2 != 0 && Pi*u - x - u^2*x == 0 && 1 + u^2 != 0 && Pi - 2*y - 2*u^2*y == 0 && 1 + u^2 != 0 && Pi*u^2 + 2*z + 2*u^2*z == 0, {x, y, z, u}}, {u - v != 0 && z != 0 && -y + 2*u*z == 0 && -x + 2*u*Log[2] == 0 && -u - v < 0 && -u - v < 0, {x, y, z, u, v}}, {x != 0 && -t < 0 && s != 0 && -1 - E*s <= 0 && s*t != 0 && v*w*x*y - s*t^2*u*z == 0, {x, y, z, u, v, w, s, t}}, {y != 0 && y == 0 && u*y != 0 && x == 0 && y < 0 && y - z < 0, {x, y, z, u}}, {y != 0 && -(y*Sqrt[z]) + 5*x*z == 0 && z != 0 && -y < 0 && -z < 0 && -z <= 0, {x, y, z}}, {y != 0 && -(y*Sqrt[z]) + 5*x*z == 0 && z != 0 && -z < 0 && y < 0 && -z <= 0, {x, y, z}}, {y != 0 && -1 - E*y <= 0 && -z < 0 && y*z != 0 && x != 0 && -1 - E*x <= 0, {x, y, z}}, {y^(1/4) + Sqrt[z] != 0 && -1 + y == 0 && -Sqrt[z] <= 0 && -y^(1/4) <= 0 && -y <= 0 && -z <= 0, {x, y, z}}, {z != 0 && -1 - E*z <= 0 && -x < 0 && x*z != 0 && y != 0 && -1 - E*y <= 0, {x, y, z}}, {z != 0 && z != 0 && 1 + u < 0 && -(u*z) < 0 && -x + u*z < 0 && -z + u^2*z <= 0, {x, y, z, u}}, {z*Log[2] != 0 && -(y*z) - x*Log[2] + z*Log[2] != 0 && z*Log[2] != 0 && -(u*z) < 0 && z < 0 && -u < 0, {x, y, z, u}}, {-y + 2*z*Log[2] != 0 && -y + x*Log[2] == 0 && -y < 0 && -y < 0 && -y < 0 && -x < 0, {x, y, z}}, {-z + Log[-2 + Sqrt[5]] != 0 && -z + Log[-2 + Sqrt[5]] != 0 && x == 0 && x + Log[-2 + Sqrt[5]] == 0 && -(y*z) + y*Log[-2 + Sqrt[5]] + z*Log[-2 + Sqrt[5]] == 0 && -z + Log[-2 + Sqrt[5]] != 0, {x, y, z}}, {u^2 == 0 && u^2*x^2 - 2*u*x*y*z + y^2*z^2 == 0 && -x < 0 && -y < 0 && -z < 0 && -u < 0 && u*z != 0, {x, y, z, u}}, {-112 + x^2 - 9*y == 0 && -3 + 4*x^3 + 2*x*z == 0 && -2 + 3*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-109 + x^2 - 9*y == 0 && 2*x^3 + x*z == 0 && -2 + 3*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-106 + x^2 - 9*y == 0 && 3 + 4*x^3 + 2*x*z == 0 && -2 + 3*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && -x <= 0 && x^2 - 2*z <= 0 && x^2 - 2*z != 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && -x <= 0 && -x^2 + 2*z <= 0 && -x^2 + 2*z != 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && -x <= 0 && x^4 - 2*x^2*z <= 0 && x^2 != 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && -x <= 0 && x^4 - 2*x^2*z <= 0 && x^2 - 2*z != 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && -x <= 0 && -x^4 + 2*x^2*z <= 0 && x^2 - 2*z != 0, {x, y, z}}, {x^2 - y == 0 && -z < 0 && -x^2 < 0 && -1 + 4096*x^2 < 0 && -x <= 0 && x^2*z - 2*z^2 <= 0 && x^2 - 2*z != 0, {x, y, z}}, {-1 + y == 0 && -x < 0 && -x^2 <= 0 && z < 0 && -3*Sqrt[x^2/y] - z < 0 && -3*x - z < 0 && 3*x + 2*z < 0, {x, y, z}}, {-1 + y == 0 && x < 0 && -x^2 <= 0 && -3*x + 2*z < 0 && 3*x - z < 0 && z < 0 && -3*Sqrt[x^2/y] - z < 0, {x, y, z}}, {y == 0 && x == 0 && -z < 0 && -u < 0 && x - y*z == 0 && z != 0 && u != 0, {x, y, z, u}}, {y == 0 && 2 + y == 0 && -7 + u^2 + z^2 <= 0 && x + y <= 0 && -1 - x - y < 0 && -1 + 2*x + 2*z <= 0 && -1 - 2*x - 2*z <= 0, {x, y, z, u}}, {y == 0 && 2 + y == 0 && -7 + u^2 + z^2 <= 0 && -1 - 2*x + 2*z <= 0 && -1 + 2*x - 2*z <= 0 && -x + y <= 0 && -1 + x - y < 0, {x, y, z, u}}, {y == 0 && x - z == 0 && -x < 0 && -y < 0 && -x + z < 0 && -1 + x <= 0 && -1 - z <= 0, {x, y, z}}, {-116 - 9*x + y == 0 && -2 + 3*z == 0 && -3 + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-116 - 9*x + y == 0 && -2 + 3*z == 0 && 3 + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-x + y == 0 && Pi + 12*Pi*y - 6*z < 0 && -2*Pi*y + z - ArcSin[2/3] < 0 && Pi + 2*Pi*x - z - ArcSin[2/3] < 0 && -5*Pi - 12*Pi*x + 6*z < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {1 + x + y == 0 && -x < 0 && -u < 0 && 1 - 8*u + y <= 0 && -z < 0 && 4096*z - z^2 < 0 && 1 + x - z < 0, {x, y, z, u}}, {100 + 9*x + y == 0 && -2 + 3*z == 0 && -3 + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {100 + 9*x + y == 0 && -2 + 3*z == 0 && 3 + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-134 - x^2 + y == 0 && -4*x^3 + y - 2*x*z == 0 && -x + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-80 - x^2 + y == 0 && -4*x^3 + y - 2*x*z == 0 && -x + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {82 - x^2 + y == 0 && -4*x^3 + y - 2*x*z == 0 && -x + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {136 - x^2 + y == 0 && -4*x^3 + y - 2*x*z == 0 && -x + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-8 - 9*x - 4*x^3 + y == 0 && -2 + 3*z + 4*x^2*z == 0 && -3 + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-8 - 9*x - 4*x^3 + y == 0 && -2 + 3*z + 4*x^2*z == 0 && 3 + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-8 + 9*x - 4*x^3 + y == 0 && 2 - 3*z + 4*x^2*z == 0 && -3 + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-8 + 9*x - 4*x^3 + y == 0 && 2 - 3*z + 4*x^2*z == 0 && 3 + 27*y^2 - z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {104 + x^2 + 9*y == 0 && -3 + 4*x^3 + 2*x*z == 0 && -2 + 3*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {107 + x^2 + 9*y == 0 && 2*x^3 + x*z == 0 && -2 + 3*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {110 + x^2 + 9*y == 0 && 3 + 4*x^3 + 2*x*z == 0 && -2 + 3*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-345 + x*y == 0 && 21 + 10*x*y^3 - y*z == 0 && 15*x^2*y^2 - x*z == 0 && -1 - x < 0 && -1 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {341 + x*y == 0 && -21 + 10*x*y^3 - y*z == 0 && 15*x^2*y^2 - x*z == 0 && -1 - x < 0 && -1 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && -1 + 4096*z < 0 && 2*x*y - z < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -2*x*y + z < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && -1 + 4096*z < 0 && 2*x*y*z - z^2 < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -y <= 0 && -x <= 0 && 2*x*y - z <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -y <= 0 && -x <= 0 && -2*x*y + z <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -y <= 0 && -x <= 0 && -2*x*y*z + z^2 <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -(x*y*z) < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && 1 - 2*x*y*z < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 + 2*x*y*z < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -z^2 + 2*x*y*z^3 < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -y <= 0 && -x <= 0 && -(x*y*z) <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -y <= 0 && -x <= 0 && 1 - 2*x*y*z <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -y <= 0 && -x <= 0 && -1 + 2*x*y*z <= 0, {x, y, z, u}}, {-1 + u + y^2 == 0 && -u + x^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -(x*y) + z < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-u^2 + y^2 == 0 && -u^2 + x^2 + z^2 == 0 && -u < 0 && -y <= 0 && -y^2 <= 0 && -x <= 0 && x <= 0, {x, y, z, u}}, {-u^2 + y^2 == 0 && -u^2 + x^2 + z^2 == 0 && u < 0 && -y <= 0 && -y^2 <= 0 && -x <= 0 && x <= 0, {x, y, z, u}}, {-2 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -y <= 0 && -x <= 0 && z^2 - 2*x*y*z^3 <= 0 && z != 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 1 + 2*x*z == 0 && 1 + 2*y*z == 0 && -2 - x < 0 && -2 + x < 0 && -2 - y < 0 && -2 + y < 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && z^2 - 2*x*z^3 <= 0 && z != 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -1 - y < 0 && -1 + y < 0 && 2*x - z < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -1 - y < 0 && -1 + y < 0 && -2*x + z < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -1 - y < 0 && -1 + y < 0 && 2*x*z - z^2 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && 2*x - z <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && -2*x*z + z^2 <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -1 - y < 0 && -1 + y < 0 && -2*x + z <= 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -(x*z) < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && 1 - 2*x*z < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -1 + 2*x*z < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -z^2 + 2*x*z^3 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && -(x*z) <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && 1 - 2*x*z <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && -1 + 2*x*z <= 0, {x, y, z}}, {-2 + x - y^3 == 0 && 15*x^2 - z == 0 && -1 + 4*y^3 - 3*y^2*z == 0 && -3 - x < 0 && -3 + x < 0 && -7 - y < 0 && -7 + y < 0, {x, y, z}}, {-2 + 3*x - y^3 == 0 && 90*x + y - z == 0 && -2 + 3*x - 4*y^3 + 3*y^2*z == 0 && -1 - x < 0 && -1 + x < 0 && -7 - y < 0 && -7 + y < 0, {x, y, z}}, {-9 + x^3 - y^3 == 0 && -x^2 + x^2*z == 0 && 4*y + 3*y^2*z == 0 && -2 - x < 0 && -2 + x < 0 && -2 - y < 0 && -2 + y < 0, {x, y, z}}, {-9 + x^3 - y^3 == 0 && y^2 + 3*x^2*z == 0 && 2*x*y - 3*y^2*z == 0 && -2 - x < 0 && -2 + x < 0 && -2 - y < 0 && -2 + y < 0, {x, y, z}}, {7 + x^3 - y^3 == 0 && -x^2 + x^2*z == 0 && -4*y + 3*y^2*z == 0 && -2 - x < 0 && -2 + x < 0 && -2 - y < 0 && -2 + y < 0, {x, y, z}}, {7 + x^3 - y^3 == 0 && y^2 + 3*x^2*z == 0 && 2*x*y - 3*y^2*z == 0 && -2 - x < 0 && -2 + x < 0 && -2 - y < 0 && -2 + y < 0, {x, y, z}}, {2 + x + y^3 == 0 && 15*x^2 + z == 0 && 5 + 4*y^3 - 3*y^2*z == 0 && -3 - x < 0 && -3 + x < 0 && -7 - y < 0 && -7 + y < 0, {x, y, z}}, {2 + 3*x + y^3 == 0 && 90*x - y - z == 0 && -2 + 3*x - 4*y^3 + 3*y^2*z == 0 && -1 - x < 0 && -1 + x < 0 && -7 - y < 0 && -7 + y < 0, {x, y, z}}, {-9 + x^3 + y^3 == 0 && -x^2 + x^2*z == 0 && 4 + 3*y^2*z == 0 && -2 - x < 0 && -2 + x < 0 && -2 - y < 0 && -2 + y < 0, {x, y, z}}, {7 + x^3 + y^3 == 0 && -x^2 + x^2*z == 0 && 4 + 3*y^2*z == 0 && -2 - x < 0 && -2 + x < 0 && -2 - y < 0 && -2 + y < 0, {x, y, z}}, {-4 + x^2 - 9*y + 4*y^3 == 0 && -3 + 4*x^3 + 2*x*z == 0 && 2 - 3*z + 4*y^2*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-1 + x^2 - 9*y + 4*y^3 == 0 && 2*x^3 + x*z == 0 && 2 - 3*z + 4*y^2*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {2 + x^2 - 9*y + 4*y^3 == 0 && 3 + 4*x^3 + 2*x*z == 0 && 2 - 3*z + 4*y^2*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-4 + x^2 + 9*y + 4*y^3 == 0 && -3 + 4*x^3 + 2*x*z == 0 && -2 + 3*z + 4*y^2*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {-1 + x^2 + 9*y + 4*y^3 == 0 && 2*x^3 + x*z == 0 && -2 + 3*z + 4*y^2*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {2 + x^2 + 9*y + 4*y^3 == 0 && 3 + 4*x^3 + 2*x*z == 0 && -2 + 3*z + 4*y^2*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {5 + 3*x*y + 4*y^3 == 0 && -2*y + 3*y*z == 0 && -2*x + 3*x*z + 12*y^2*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {8 + 3*x*y + 4*y^3 == 0 && -2*y + 3*y*z == 0 && -2*x + 3*x*z + 12*y^2*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {11 + 3*x*y + 4*y^3 == 0 && -2*y + 3*y*z == 0 && -2*x + 3*x*z + 12*y^2*z == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 4096*y < 0 && -x^2 < 0 && -x + x*y < 0 && -x <= 0 && -1 + x^2 <= 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 4096*y < 0 && -x^2 < 0 && -x <= 0 && x - x*y <= 0 && -1 + x^2 <= 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && y - z <= 0 && -x <= 0 && y - z != 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && -y + z <= 0 && -x <= 0 && -y + z != 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && y^2 - z^2 <= 0 && -x <= 0 && x^2 != 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && y^2 - z^2 <= 0 && -x <= 0 && y - z != 0, {x, y, z}}, {x^2 - y - z == 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && -y^2 + z^2 <= 0 && -x <= 0 && y - z != 0, {x, y, z}}, {y^2 - z == 0 && -1 + x^2 + z == 0 && -1 + x^2 + y^2 == 0 && -y^2 < 0 && -y <= 0 && -1 + y^2 <= 0 && -x <= 0, {x, y, z}}, {y^2 - z == 0 && -u + x^2*z == 0 && -u + x^2*y^2 == 0 && -y^2 < 0 && -1 + 4096*y^2 < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {z == 0 && -1 + u == 0 && x != 0 && -y < 0 && -1 + z < 0 && -z < 0 && -v < 0, {x, y, z, u, v}}, {z == 0 && x == 0 && -y < 0 && z < 0 && -1 - z < 0 && 1 + y*z < 0 && x < 0, {x, y, z}}, {z == 0 && y - 5*z + 5*u^2*z == 0 && z != 0 && 1 + u < 0 && -(u*z) < 0 && -x + u*z < 0 && -z + u^2*z <= 0, {x, y, z, u, v}}, {z^2 == 0 && u^2*x^2 - 2*u*x*y*z + y^2*z^2 == 0 && -x < 0 && -y < 0 && -z < 0 && -u < 0 && u*z != 0, {x, y, z, u}}, {-Pi - 2*Pi*x + z == 0 && -z < 0 && -(y*z) < 0 && u - y*z < 0 && -y < 0 && -1 + z <= 0 && -u < 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && -1 + 4096*u < 0 && u - 2*x*y < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && -1 + 4096*u < 0 && -u + 2*x*y < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && -1 + 4096*u < 0 && -u^2 + 2*u*x*y < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && -1 + 4096*u < 0 && -y <= 0 && -x <= 0 && u - 2*x*y <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && -1 + 4096*u < 0 && -y <= 0 && -x <= 0 && -u + 2*x*y <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && -1 + 4096*u < 0 && -y <= 0 && -x <= 0 && u^2 - 2*u*x*y <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && 4096*u - u^2 < 0 && -(u*x*y) < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && 4096*u - u^2 < 0 && 1 - 2*u*x*y < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && 4096*u - u^2 < 0 && -1 + 2*u*x*y < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && 4096*u - u^2 < 0 && -u^2 + 2*u^3*x*y < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && 4096*u - u^2 < 0 && -y <= 0 && -x <= 0 && -(u*x*y) <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && 4096*u - u^2 < 0 && -y <= 0 && -x <= 0 && 1 - 2*u*x*y <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && 4096*u - u^2 < 0 && -y <= 0 && -x <= 0 && -1 + 2*u*x*y <= 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && x^2 - z == 0 && -1 + x^2 + y^2 == 0 && -x^2 < 0 && -y <= 0 && -x <= 0 && -1 + x^2 <= 0, {x, y, z}}, {-1 + x^2*z == 0 && -y < 0 && -x + y < 0 && -z <= 0 && -1 + y^2*z <= 0 && -x <= 0 && z != 0, {x, y, z}}, {x^2 - y*z == 0 && z < 0 && -y + 4*z < 0 && y < 0 && y - z < 0 && x + y - 2*z < 0 && -x <= 0, {x, y, z}}, {x^2 - y*z == 0 && z < 0 && -y + 4*z < 0 && y < 0 && y - z < 0 && -x <= 0 && x + y - 2*z <= 0, {x, y, z}}, {x^2 - y*z == 0 && z < 0 && -y + 4*z < 0 && y < 0 && y - z < 0 && -x - y + 2*z <= 0 && -x <= 0, {x, y, z}}, {-1 - v - x - y - v*y - x*y + u*z + u*v*w*z + u*y*z == 0 && -1 - v - x - 2*y - 2*v*y - 2*x*y - y^2 - v*y^2 - x*y^2 + u*z + u*v*w*z + 2*u*y*z + u*v*w*y*z + u*y^2*z != 0 && -1 + w < 0 && -y < 0 && -u < 0 && -v < 0 && -x < 0, {x, y, z, u, v, w}}, {x^2 - z^2 == 0 && -z < 0 && -x <= 0 && -x^2 <= 0 && -x^2 + y^2 <= 0 && -y < 0 && -x + y < 0, {x, y, z}}, {x^2 - z^2 == 0 && -z < 0 && -x <= 0 && -x^2 <= 0 && -x^2 + y^2 <= 0 && -y < 0 && x + y < 0, {x, y, z}}, {x^2 - z^2 == 0 && -z < 0 && -x <= 0 && -x^2 <= 0 && -x^2 + y^2 <= 0 && y < 0 && -x - y < 0, {x, y, z}}, {x^2 - z^2 == 0 && -z < 0 && -x <= 0 && -x^2 <= 0 && z != 0 && -z < 0 && -y < 0, {x, y, z}}, {x^2 - z^2 == 0 && z < 0 && -x <= 0 && -x^2 <= 0 && -x^2 + y^2 <= 0 && -y < 0 && -x + y < 0, {x, y, z}}, {x^2 - z^2 == 0 && z < 0 && -x <= 0 && -x^2 <= 0 && -x^2 + y^2 <= 0 && -y < 0 && x + y < 0, {x, y, z}}, {x^2 - z^2 == 0 && z < 0 && -x <= 0 && -x^2 <= 0 && -x^2 + y^2 <= 0 && y < 0 && -x - y < 0, {x, y, z}}, {x^2 - z^2 == 0 && z < 0 && -x <= 0 && -x^2 <= 0 && z != 0 && -z < 0 && -y < 0, {x, y, z}}, {x^2 - z^2 == 0 && z < 0 && -x <= 0 && -x^2 <= 0 && z != 0 && -z < 0 && y < 0, {x, y, z}}, {x^2 - z^2 == 0 && z < 0 && -x <= 0 && -x^2 <= 0 && z != 0 && z < 0 && -y < 0, {x, y, z}}, {x^2 - z^2 == 0 && -z <= 0 && -x <= 0 && -x^2 <= 0 && z != 0 && -z < 0 && -y < 0, {x, y, z}}, {x^2 - z^2 == 0 && z <= 0 && -x <= 0 && -x^2 <= 0 && z != 0 && -z < 0 && -y < 0, {x, y, z}}, {x^2 - z^2 == 0 && z <= 0 && -x <= 0 && -x^2 <= 0 && z != 0 && -z < 0 && y < 0, {x, y, z}}, {x^2 - z^2 == 0 && z <= 0 && -x <= 0 && -x^2 <= 0 && z != 0 && z < 0 && -y < 0, {x, y, z}}, {-6 + z^2 == 0 && 36 + 6*y - 6*y^2 + 12*z - 6*z^2 - y*z^2 + y^2*z^2 - 2*z^3 == 0 && 30 - 6*x - 10*y + 30*y^3 + x*z^2 - 5*y^3*z^2 - 40*z^3 + 6*y*z^3 - 24*z^4 - y*z^5 + 4*z^6 == 0 && -1 + y <= 0 && -y <= 0 && -1 + z <= 0 && -z <= 0, {x, y, z}}, {1 + z^2 == 0 && x*y - 2*x*z + x*y*z^2 == 0 && -x < 0 && -z^2 < 0 && -1 - 2*z - z^2 <= 0 && -y + 2*z - y*z^2 < 0 && -(x*y) + 2*x*z - x*y*z^2 < 0, {x, y, z}}, {u^2 + z^2 == 0 && u^2*x^2 - 2*u*x*y*z + y^2*z^2 == 0 && -x < 0 && -y < 0 && -z < 0 && -u < 0 && u*z != 0, {x, y, z, u}}, {-1 + x^2 + z^2 == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && y^2 - 2*x*y^3 <= 0 && y != 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && -1 + 4096*y < 0 && 2*x - y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && -1 + 4096*y < 0 && -2*x + y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && -1 + 4096*y < 0 && 2*x*y - y^2 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && 2*x - y <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && -2*x*y + y^2 <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && -1 + 4096*y < 0 && -2*x + y <= 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && 4096*y - y^2 < 0 && -(x*y) < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && 4096*y - y^2 < 0 && 1 - 2*x*y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && 4096*y - y^2 < 0 && -1 + 2*x*y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && 4096*y - y^2 < 0 && -y^2 + 2*x*y^3 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -(x*y) <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && 1 - 2*x*y <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -1 + 2*x*y <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 + z < 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && -2 + 2*x*y - y^2 + z^2 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 + z < 0 && -z < 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && -2 + 2*x*y - y^2 + z^2 <= 0, {x, y, z}}, {-1 + y^2 + z^2 == 0 && -1 + x^2 - z == 0 && -1 - z < 0 && -1 + z < 0 && -y <= 0 && -x <= 0 && x <= 0, {x, y, z}}, {-1 + y^2 + z^2 == 0 && -1 + x^2 + z == 0 && -1 - z < 0 && -1 + z < 0 && -y <= 0 && -x <= 0 && x <= 0, {x, y, z}}, {x^2 - 2*u*z + z^2 == 0 && -x - y < 0 && -x + y < 0 && -2*u*z + z^2 <= 0 && -(u*y^2) - u*z^2 <= 0 && -x <= 0 && y^2 + z^2 != 0, {x, y, z, u}}, {-u < 0 && -u^4 < 0 && u^4 - y <= 0 && -y < 0 && -x < 0 && -(u*x) < 0 && -1 + E*u*x*z <= 0, {x, y, z, u}}, {u < 0 && -u^4 < 0 && -u^4 + y <= 0 && -y < 0 && -x < 0 && u*x < 0 && -1 + E*u*x*z <= 0, {x, y, z, u}}, {u < 0 && u*Sqrt[x/u] < 0 && y == 0 && z == 0 && -1/4 + E*u*z <= 0 && E*u - x <= 0 && x < 0, {x, y, z, u}}, {v < 0 && -1 - v < 0 && -1 + v^4 < 0 && -v^4 < 0 && w < 0 && u != 0 && u*w + y*z == 0, {x, y, z, u, v, w}}, {1 - x < 0 && -x^4 < 0 && -z < 0 && -x + E*z <= 0 && y == 0 && -(y*z) < 0 && -1 + E*y*z <= 0, {x, y, z}}, {1 - x < 0 && -x^5 < 0 && w*y < 0 && -5*w^2*y + z <= 0 && 1 - 5*E*w^2*y + E*z < 0 && Sqrt[5]*u + 5*w < 0 && -v - Sqrt[5*E]*w <= 0, {x, y, z, u, v, w}}, {1 - x < 0 && 1 - x^4 < 0 && -z < 0 && -x + E*z <= 0 && y == 0 && -(y*z) < 0 && -1 + E*y*z <= 0, {x, y, z}}, {1 - x < 0 && 1 - x^4 < 0 && -z < 0 && -x + Root[{-1 + Log[#1^4]*#1 & , 1.22616125067614367857102506136242336954`20.2855860204585}] <= 0 && y == 0 && -(y*z) < 0 && -1 + E*y*z <= 0, {x, y, z}}, {-x < 0 && -u < 0 && y == 0 && z == 0 && 1 - x*z <= 0 && -(u*z) < 0 && -1 + E*u*z <= 0, {x, y, z, u}}, {-x < 0 && -u < 0 && -z^2 < 0 && -1 - 2*z - z^2 <= 0 && -y + 2*z - y*z^2 < 0 && -(x*y) + 2*x*z - x*y*z^2 < 0 && u - x*y + 2*x*z + u*z^2 - x*y*z^2 < 0, {x, y, z, u}}, {-x < 0 && -u < 0 && E*u - x <= 0 && y == 0 && z == 0 && -(u*z) < 0 && -1 + E*u*z <= 0, {x, y, z, u}}, {-x < 0 && -u < 0 && z != 0 && -1 - E*z <= 0 && u*z != 0 && y != 0 && -1 - E*y <= 0, {x, y, z, u}}, {-x < 0 && -u < 0 && z != 0 && x*z != 0 && -1 - E*z <= 0 && y != 0 && -1 - E*y <= 0, {x, y, z, u}}, {-x < 0 && u < 0 && y == 0 && z == 0 && 1 - x*z <= 0 && -(u*z) < 0 && -1 + E*u*z <= 0, {x, y, z, u}}, {-x < 0 && -y < 0 && x - z <= 0 && -y + z <= 0 && -1 + z < 0 && -z < 0 && -2*z - 3*E^(3/(2*E))*z <= 0, {x, y, z}}, {-x < 0 && y != 0 && -1 - E*y <= 0 && -u < 0 && z < 0 && x*z != 0 && -1 - E*z <= 0, {x, y, z, u}}, {x < 0 && -u < 0 && y == 0 && z == 0 && 1 - x*z <= 0 && -(u*z) < 0 && -1 + E*u*z <= 0, {x, y, z, u}}, {x < 0 && u < 0 && y == 0 && z == 0 && 1 - x*z <= 0 && -(u*z) < 0 && -1 + E*u*z <= 0, {x, y, z, u}}, {x < 0 && u < 0 && -(E*u) + x <= 0 && y == 0 && z == 0 && -(u*z) < 0 && -1 + E*u*z <= 0, {x, y, z, u}}, {x < 0 && -1 - x < 0 && -x^4 < 0 && z < 0 && x - Root[{-1 + Log[#1^4]*#1 & , -0.69949057688577195637880493681113464044`20.28849263474288}] <= 0 && y == 0 && -1 + E*y*z <= 0, {x, y, z}}, {1 - y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && 3*Sqrt[x^2/y] - z < 0 && z < 0 && -z < 0, {x, y, z}}, {1 - y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && z < 0 && z < 0 && -3*Sqrt[x^2/y] - z < 0, {x, y, z}}, {1 - y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -3*Sqrt[x^2/y] + z < 0 && -z < 0 && -z < 0, {x, y, z}}, {1 - y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -3*Sqrt[x^2/y] + z < 0 && z < 0 && -z < 0, {x, y, z}}, {1 - y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && 3*Sqrt[x^2/y] - z < 0 && z < 0 && -z < 0, {x, y, z}}, {1 - y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && z < 0 && z < 0 && -3*Sqrt[x^2/y] - z < 0, {x, y, z}}, {1 - y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -3*Sqrt[x^2/y] + z < 0 && -z < 0 && -z < 0, {x, y, z}}, {1 - y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -3*Sqrt[x^2/y] + z < 0 && z < 0 && -z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -z < 0 && 3*Sqrt[x^2/y] + z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -z < 0 && 3*Sqrt[x^2/y] + z < 0, {x, y, z}}, {-y < 0 && -u < 0 && z < 0 && -1 - z < 0 && 1 + y*z < 0 && -x + 2*u*z < 0 && x < 0, {x, y, z, u}}, {-y < 0 && x != 0 && -t < 0 && s != 0 && -1 - E*s <= 0 && s*t != 0 && v*w*x*y - s*t^2*u*z == 0, {x, y, z, u, v, w, s, t}}, {-y < 0 && x != 0 && x*y != 0 && -t < 0 && s != 0 && -1 - E*s <= 0 && v*w*x*y - s*t^2*u*z == 0, {x, y, z, u, v, w, s, t}}, {x - z < 0 && -x < 0 && -z^5 < 0 && -z < 0 && 1 - z < 0 && -y + z < 0 && -y < 0, {x, y, z}}, {x - z < 0 && -y + z <= 0 && 1 - z < 0 && -z < 0 && -z^5 < 0 && -x < 0 && -y < 0, {x, y, z}}, {-1 + z < 0 && -z < 0 && -Sqrt[-((x*z)/y)] < 0 && -x < 0 && -(x*z) < 0 && -1 - E*x <= 0 && y < 0, {x, y, z}}, {-1 + z < 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -y + z^2 <= 0 && -4 + y + 4*z <= 0 && -x + z^2 <= 0 && -4 + x + 4*z <= 0, {x, y, z}}, {-z < 0 && -z < 0 && -y < 0 && x - z < 0 && u*x + y - u*z < 0 && -1 + z <= 0 && -1 - x <= 0, {x, y, z, u}}, {-z < 0 && -Sqrt[-((x*z)/y)] < 0 && x < 0 && x*z < 0 && -1 - E*x <= 0 && 1 - y < 0 && -1 + y*z <= 0, {x, y, z}}, {z < 0 && -1 + z^4 < 0 && -z^4 < 0 && y - z^4 <= 0 && -y < 0 && x < 0 && -1 - E*x <= 0, {x, y, z}}, {-4 + y + 4*z < 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -y + z^2 <= 0 && -4 + y + 4*z <= 0 && -x + z^2 <= 0 && -4 + x + 4*z <= 0, {x, y, z}}, {-4 + y + 8*z - y*z - 4*z^2 < 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -y + z^2 <= 0 && -4 + y + 4*z <= 0 && -x + z^2 <= 0 && -4 + x + 4*z <= 0, {x, y, z}}, {-1 + z^2 < 0 && -y + z^2 < 0 && x - z^2 <= 0 && -1 - y < 0 && -1 + y < 0 && -1 + x < 0 && -1 - x < 0, {x, y, z}}, {1 - 8*u*x*y*z + 8*u^2*z^2 < 0 && -1 + u^2 + y^2 == 0 && -1 + x^2 + z^2 == 0 && -u < 0 && -z < 0 && -y < 0 && -x < 0, {x, y, z, u}}, {32 - 5*x <= 0 && -32 + 3*x <= 0 && -16 + 15*x - 16*y <= 0 && -16 - 15*x + 16*y <= 0 && -144 + 15*x - 16*z <= 0 && 112 - 15*x + 16*z <= 0 && -1 + x^2 - 2*x*y + y^2 + z^2 <= 0, {x, y, z}}, {1 + x - y <= 0 && Pi + 12*Pi*y - 6*z < 0 && -2*Pi*y + z - ArcSin[2/3] < 0 && Pi + 2*Pi*x - z - ArcSin[2/3] < 0 && -5*Pi - 12*Pi*x + 6*z < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -(x*z) < 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && 1 - 2*x*z < 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -1 + 2*x*z < 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -z^2 + 2*x*z^3 < 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && -(x*z) <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && 1 - 2*x*z <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && -1 + 2*x*z <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -1 + z < 0 && -z < 0 && -1 + 4096*z < 0 && 2*x*z - z^2 < 0 && -x <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -1 + z < 0 && -z < 0 && -1 + 4096*z < 0 && -x <= 0 && -(x*z) <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -1 + z < 0 && -z < 0 && -1 + 4096*z < 0 && -x <= 0 && -2*x*z + z^2 <= 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && z^2 - 2*x*z^3 <= 0 && z != 0, {x, y, z}}, {1 - x + y <= 0 && Pi + 12*Pi*y - 6*z < 0 && -2*Pi*y + z - ArcSin[2/3] < 0 && Pi + 2*Pi*x - z - ArcSin[2/3] < 0 && -5*Pi - 12*Pi*x + 6*z < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {1 + x + y <= 0 && -x < 0 && -u < 0 && 1 - 8*u + y <= 0 && -z < 0 && 4096*z - z^2 < 0 && 1 + x - z < 0, {x, y, z, u}}, {32 - 5*z <= 0 && -32 + 3*z <= 0 && -16 - 16*y + 15*z <= 0 && -16 + 16*y - 15*z <= 0 && -144 - 16*x + 15*z <= 0 && 112 + 16*x - 15*z <= 0 && -1 + x^2 + y^2 - 2*y*z + z^2 <= 0, {x, y, z}}, {4 - y - 4*z <= 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -y + z^2 <= 0 && -4 + y + 4*z <= 0 && -x + z^2 <= 0 && -4 + x + 4*z <= 0, {x, y, z}}, {-z <= 0 && x^2 - z == 0 && -x <= 0 && -x^2 <= 0 && x^2 - y^2 <= 0 && -x - y < 0 && -x + y < 0, {x, y, z}}, {-z <= 0 && x^2 - z == 0 && -x <= 0 && -x^2 <= 0 && x^2 - y^2 <= 0 && x - y < 0 && x + y < 0, {x, y, z}}, {-z <= 0 && x^2 - z == 0 && -x <= 0 && -x^2 <= 0 && -x^2 + y^2 <= 0 && -x - y < 0 && -x + y < 0, {x, y, z}}, {-z <= 0 && x^2 - z == 0 && -x <= 0 && -x^2 <= 0 && -x^2 + y^2 <= 0 && -y < 0 && -x + y < 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -(x*y) < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && 1 - 2*x*y < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -1 + 2*x*y < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -y^2 + 2*x*y^3 < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -(x*y) <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && 1 - 2*x*y <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -1 + 2*x*y <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && x*y < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && 2*x*y - y^2 < 0 && -x <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && -(x*y) <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && -2*x*y + y^2 <= 0, {x, y, z}}, {-z <= 0 && -1 + x^2 + z == 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && y^2 - 2*x*y^3 <= 0 && y != 0, {x, y, z}}, {-z <= 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -y + z^2 <= 0 && -4 + y + 4*z <= 0 && -x + z^2 <= 0 && -4 + x + 4*z <= 0, {x, y, z}}, {-z <= 0 && -u <= 0 && -v <= 0 && x^4 == 0 && -(u*x^2) + v*x^2 - x^2*z == 0 && u^2 + 2*u*v + v^2 + 2*u*z - 2*v*z + z^2 == 0 && x*y != 0, {x, y, z, u, v}}, {-z <= 0 && -u <= 0 && -v <= 0 && y^4 == 0 && u*y^2 + v*y^2 - y^2*z == 0 && u^2 + 2*u*v + v^2 + 2*u*z - 2*v*z + z^2 == 0 && x*y != 0, {x, y, z, u, v}}, {-x - y + z <= 0 && -y <= 0 && x - y - z <= 0 && -z <= 0 && -x + y - z <= 0 && -x <= 0 && -x^3 + 2*x^2*y + 2*x*y^2 - y^3 + 2*x^2*z - 9*x*y*z + 2*y^2*z + 2*x*z^2 + 2*y*z^2 - z^3 < 0, {x, y, z}}, {-x - y + z <= 0 && -y <= 0 && x - y - z <= 0 && -z <= 0 && -x + y - z <= 0 && -x <= 0 && x^3 - 8*x^2*y + 8*x*y^2 + y^3 + 8*x^2*z - 3*x*y*z - 8*y^2*z - 8*x*z^2 + 8*y*z^2 + z^3 < 0, {x, y, z}}, {-x - y + z <= 0 && -y <= 0 && x - y - z <= 0 && -z <= 0 && -x + y - z <= 0 && -x <= 0 && 5*x^3 - 3*x^2*y - 3*x*y^2 + 5*y^3 - 3*x^2*z + 3*x*y*z - 3*y^2*z - 3*x*z^2 - 3*y*z^2 + 5*z^3 < 0, {x, y, z}}, {-x - y + z <= 0 && -y <= 0 && x - y - z <= 0 && -z <= 0 && -x + y - z <= 0 && -x <= 0 && 6*x^3 - 5*x^2*y - 5*x*y^2 + 6*y^3 - 5*x^2*z + 12*x*y*z - 5*y^2*z - 5*x*z^2 - 5*y*z^2 + 6*z^3 < 0, {x, y, z}}, {-x - y + z <= 0 && -y <= 0 && x - y - z <= 0 && -z <= 0 && -x + y - z <= 0 && -x <= 0 && -(x^2*y^2) + y^4 + 2*x^2*y*z - x^2*z^2 - 2*y^2*z^2 + z^4 < 0, {x, y, z}}, {-x - y + z <= 0 && -y <= 0 && x - y - z <= 0 && -z <= 0 && -x + y - z <= 0 && -x <= 0 && x^4 - 2*x^2*y^2 + y^4 + x^2*y*z + x*y^2*z - 2*x^2*z^2 + x*y*z^2 - 2*y^2*z^2 + z^4 < 0, {x, y, z}}, {-x - y + z <= 0 && -y <= 0 && x - y - z <= 0 && -z <= 0 && -x + y - z <= 0 && -x <= 0 && x^4 - x^3*y - x*y^3 + y^4 - x^3*z + x^2*y*z + x*y^2*z - y^3*z + x*y*z^2 - x*z^3 - y*z^3 + z^4 < 0, {x, y, z}}, {-x - y + z <= 0 && -y <= 0 && x - y - z <= 0 && -z <= 0 && -x + y - z <= 0 && -x <= 0 && x^6 - x^5*y - x^4*y^2 + 2*x^3*y^3 - x^2*y^4 - x*y^5 + y^6 - x^5*z + 3*x^4*y*z - 2*x^3*y^2*z - 2*x^2*y^3*z + 3*x*y^4*z - y^5*z - x^4*z^2 - 2*x^3*y*z^2 + 6*x^2*y^2*z^2 - 2*x*y^3*z^2 - y^4*z^2 + 2*x^3*z^3 - 2*x^2*y*z^3 - 2*x*y^2*z^3 + 2*y^3*z^3 - x^2*z^4 + 3*x*y*z^4 - y^2*z^4 - x*z^5 - y*z^5 + z^6 < 0, {x, y, z}}, {-4 + y + 4*z <= 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -y + z^2 <= 0 && -4 + y + 4*z <= 0 && -x + z^2 <= 0 && -4 + x + 4*z <= 0, {x, y, z}}, {x^2 - z^2 <= 0 && y^2 - z^2 == 0 && -z < 0 && -y <= 0 && -y^2 <= 0 && -x <= 0 && x <= 0, {x, y, z}}, {x^2 - z^2 <= 0 && y^2 - z^2 == 0 && z < 0 && -y <= 0 && -y^2 <= 0 && -x <= 0 && x <= 0, {x, y, z}}, {-z + Sqrt[8 + z^2] <= 0 && 2 + s - v == 0 && 2*s - w == 0 && 2 + s - x == 0 && 2*s - y == 0 && u < 0 && -8 - z^2 <= 0, {x, y, z, u, v, w, s}}, {s != 0 && -1 - E*s <= 0 && -t < 0 && s*t != 0 && u != 0 && -1 - E*u <= 0 && u*v*w*x - s*t^2*y*z == 0, {x, y, z, u, v, w, s, t}}, {u != 0 && -1 - E*u <= 0 && s != 0 && -1 - E*s <= 0 && -t < 0 && s*t != 0 && u*v*w*x - s*t^2*y*z == 0, {x, y, z, u, v, w, s, t}}, {v - w != 0 && -v - w < 0 && -x + 2*v*Log[2] == 0 && u < 0 && 2*u*v - y <= 0 && u*z < 0 && -1 - E*u*z <= 0, {x, y, z, u, v, w}}, {y^2 != 0 && -2*y*Sqrt[z] + 5*x*z == 0 && z != 0 && -y < 0 && -z < 0 && y < 0 && -z <= 0, {x, y, z}}, {y^2 != 0 && -2*y*Sqrt[z] + 5*x*z == 0 && z != 0 && -z < 0 && y < 0 && -y <= 0 && -z <= 0, {x, y, z}}, {y^2 != 0 && y != 0 && -2*y*Sqrt[z] + 5*x*z == 0 && z != 0 && -z < 0 && y < 0 && -z <= 0, {x, y, z}}, {y^2 != 0 && y != 0 && -2*y*Sqrt[z] + 5*x*z == 0 && z != 0 && -z < 0 && -y <= 0 && -z <= 0, {x, y, z}}, {z != 0 && -441 + 4*x + 42*z - z^2 == 0 && u != 0 && z != 0 && -u^2 + 32*u*z - 256*z^2 + y*z^2 == 0 && -z < 0 && -u < 0, {x, y, z, u}}, {s == 0 && y != 0 && -v < 0 && -w < 0 && -(v*w) + z == 0 && u != 0 && -1 - E*u <= 0 && u + s*w*x == 0, {x, y, z, u, v, w, s}}, {t == 0 && x != 0 && -w < 0 && -s < 0 && -(s*w) + y == 0 && s*t*x + u*z == 0 && v != 0 && -1 - E*v <= 0, {x, y, z, u, v, w, s, t}}, {v == 0 && u*y + x*z == 0 && -x <= 0 && -y <= 0 && -z <= 0 && -u <= 0 && -v <= 0 && -v^2 + x^2 + y^2 <= 0, {x, y, z, u, v}}, {x^8 == 0 && 25*x^8*z - 109*x^6*y^2*z + 104*x^4*y^4*z == 0 && 99*x^8*z^2 - 198*x^6*y^2*z^2 + 83*x^4*y^4*z^2 + 16*x^2*y^6*z^2 + 32*y^8*z^2 == 0 && 25*x^8*z^3 + 9*x^6*y^2*z^3 - 73*x^4*y^4*z^3 + 19*x^2*y^6*z^3 + 20*y^8*z^3 == 0 && x^8*z^4 - 4*x^6*y^2*z^4 + 6*x^4*y^4*z^4 - 4*x^2*y^6*z^4 + y^8*z^4 == 0 && x^8*y^8 == 0 && x*y != 0 && -z <= 0, {x, y, z}}, {-1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -y <= 0 && -x <= 0 && z^2 - 2*x*y*z^3 <= 0 && z != 0, {x, y, z, u}}, {-1 + u^2 + y^2 == 0 && -1 - u < 0 && -1 + u < 0 && -z < 0 && 4096 + x < 0 && 1 + x - z < 0 && -y <= 0 && 2*y - z <= 0, {x, y, z, u}}, {-1 + u^2 + y^2 == 0 && -1 - u < 0 && -1 + u < 0 && -z < 0 && 4096 + x < 0 && 1 + x - z < 0 && -y <= 0 && -2*y*z + z^2 <= 0, {x, y, z, u}}, {-1 + u^2 + y^2 == 0 && -1 - u < 0 && -1 + u < 0 && -z < 0 && 4096 + x < 0 && 1 + x - z < 0 && -2*y + z <= 0 && -y <= 0, {x, y, z, u}}, {-1 + u^2 + y^2 == 0 && -1 - u < 0 && -1 + u < 0 && -z < 0 && 2*y - z < 0 && 4096 + x < 0 && 1 + x - z < 0 && -y <= 0, {x, y, z, u}}, {-1 + u^2 + y^2 == 0 && -1 - u < 0 && -1 + u < 0 && -z < 0 && -2*y + z < 0 && 4096 + x < 0 && 1 + x - z < 0 && -y <= 0, {x, y, z, u}}, {-1 + u^2 + y^2 == 0 && -1 - u < 0 && -1 + u < 0 && -z < 0 && 2*y*z - z^2 < 0 && 4096 + x < 0 && 1 + x - z < 0 && -y <= 0, {x, y, z, u}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -(x*z) < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && 1 - 2*x*z < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -1 + 2*x*z < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -z^2 + 2*x*z^3 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && -(x*z) <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && 1 - 2*x*z <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && -1 + 2*x*z <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -1 + z < 0 && -z < 0 && -1 + 4096*z < 0 && -1 - y < 0 && -1 + y < 0 && 2*x*z - z^2 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -1 + z < 0 && -z < 0 && -1 + 4096*z < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && -(x*z) <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -1 + z < 0 && -z < 0 && -1 + 4096*z < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && -2*x*z + z^2 <= 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && z^2 - 2*x*z^3 <= 0 && z != 0, {x, y, z}}, {x^2 - z == 0 && -1 - y < 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && -x^2 < 0 && 2*x^2 - y < 0 && -x <= 0, {x, y, z}}, {x^2 - z == 0 && -1 - y < 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && -x^2 < 0 && -x <= 0 && 2*x^2 - y <= 0, {x, y, z}}, {x^2 - z == 0 && -1 - y < 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && -x^2 < 0 && -x <= 0 && -2*x^2 + y <= 0, {x, y, z}}, {x^2 - z == 0 && -1 - y < 0 && -1 + y < 0 && -y < 0 && -1 + 1000000*y < 0 && -x^2 < 0 && 2*x^2 - y < 0 && -x <= 0, {x, y, z}}, {x^2 - z == 0 && -1 - y < 0 && -1 + y < 0 && -y < 0 && -1 + 1000000*y < 0 && -x^2 < 0 && -x <= 0 && 2*x^2 - y <= 0, {x, y, z}}, {x^2 - z == 0 && -1 - y < 0 && -1 + y < 0 && -y < 0 && -1 + 1000000*y < 0 && -x^2 < 0 && -x <= 0 && -2*x^2 + y <= 0, {x, y, z}}, {y^2 - z == 0 && -1 + x^2 + z == 0 && -1 + x^2 + y^2 == 0 && -1 + y < 0 && -y^2 < 0 && -y <= 0 && -1 + y^2 <= 0 && -x <= 0, {x, y, z}}, {y^2 - z == 0 && -1 + x^2 + z == 0 && -1 + x^2 + y^2 == 0 && -y^2 < 0 && -1 + y^2 < 0 && -y <= 0 && -1 + y^2 <= 0 && -x <= 0, {x, y, z}}, {y^2 - z == 0 && -1 + x^2 + z == 0 && -1 + x^2 + y^2 == 0 && -y^2 < 0 && -y^2 + y^3 < 0 && -y <= 0 && -1 + y^2 <= 0 && -x <= 0, {x, y, z}}, {y^2 - z == 0 && -1 + x^2 + z == 0 && -1 + x^2 + y^2 == 0 && -y^2 < 0 && -y^2 + y^3 + y^4 - y^5 < 0 && -y <= 0 && -1 + y^2 <= 0 && -x <= 0, {x, y, z}}, {y^2 - z == 0 && -1 + x^2 + z == 0 && -1 + x^2 + y^2 == 0 && -y^2 < 0 && 1 - y <= 0 && -y <= 0 && -1 + y^2 <= 0 && -x <= 0, {x, y, z}}, {y^2 - z == 0 && -1 + x^2 + z == 0 && -1 + x^2 + y^2 == 0 && -y^2 < 0 && -1 + y <= 0 && -y <= 0 && -1 + y^2 <= 0 && -x <= 0, {x, y, z}}, {y^2 - z == 0 && -1 + x^2 + z == 0 && -1 + x^2 + y^2 == 0 && -y^2 < 0 && -y <= 0 && -y^2 <= 0 && -1 + y^2 <= 0 && -x <= 0, {x, y, z}}, {y^2 - z == 0 && -1 + x^2 + z == 0 && -1 + x^2 + y^2 == 0 && -y^2 < 0 && -y <= 0 && -1 + y^2 <= 0 && -x <= 0 && x^2 <= 0, {x, y, z}}, {y^2 - z == 0 && -1 + x^2 + z == 0 && -1 + x^2 + y^2 == 0 && -y^2 < 0 && -y <= 0 && -1 + y^2 <= 0 && y^2 - y^3 <= 0 && -x <= 0, {x, y, z}}, {y^2 - z == 0 && -u + x^2*z == 0 && -u + x^2*y^2 == 0 && -u < 0 && -y^2 < 0 && -1 + 4096*y^2 < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + x^2 + z == 0 && y < 0 && -x <= 0 && 2 - 2*Sqrt[2] - y < 0 && y < 0 && y + z < 0 && -2*x + z < 0 && -2*x - y < 0, {x, y, z}}, {-1 + y^2 + z == 0 && -1 + x^2 - z == 0 && -u < 0 && 4096*u - u^2 < 0 && -y <= 0 && -x <= 0 && u^2 - 2*u^3*x*y <= 0 && u != 0, {x, y, z, u}}, {-1 + y^2 + z == 0 && x^2 - z == 0 && -1 + x^2 + y^2 == 0 && -x^2 < 0 && -y <= 0 && -x <= 0 && -x^2 <= 0 && -1 + x^2 <= 0, {x, y, z}}, {-1 + y^2 + z == 0 && x^2 - z == 0 && -1 + x^2 + y^2 == 0 && -x^2 < 0 && -y <= 0 && y^2 <= 0 && -x <= 0 && -1 + x^2 <= 0, {x, y, z}}, {-1 + y^2 + z == 0 && x^2 - z == 0 && -1 + x^2 + y^2 == 0 && -(x*y) < 0 && -x^2 < 0 && -1 + x^2 < 0 && -y <= 0 && -x <= 0, {x, y, z}}, {-1 + x^2*z == 0 && 1 - z < 0 && -z <= 0 && -1 + y^2*z <= 0 && -x <= 0 && z != 0 && -y < 0 && -x + y < 0, {x, y, z}}, {x^2 - z^2 == 0 && -z < 0 && -z <= 0 && -x <= 0 && -x^2 <= 0 && z != 0 && -z < 0 && -y < 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -(x*y) < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && 1 - 2*x*y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -1 + 2*x*y < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -y^2 + 2*x*y^3 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -(x*y) <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && 1 - 2*x*y <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && -1 + 2*x*y <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && 2*x*y - y^2 < 0 && -x <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && -(x*y) <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -1 + y < 0 && -y < 0 && -1 + 4096*y < 0 && -x <= 0 && -2*x*y + y^2 <= 0, {x, y, z}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && y^2 - 2*x*y^3 <= 0 && y != 0, {x, y, z}}, {-2*x^2 + x^4 + z^2 == 0 && -2 + x^2 + y^2 == 0 && -x^2 < 0 && -2 + x^2 < 0 && -(x*y) < 0 && -z <= 0 && -y <= 0 && -x <= 0, {x, y, z}}, {-2*x^2 + x^4 + z^2 == 0 && -2 + x^2 + y^2 == 0 && -x^2 < 0 && -2 + x^2 < 0 && -z <= 0 && -y <= 0 && -x <= 0 && -(x*y) <= 0, {x, y, z}}, {-2*x^2 + x^4 + z^2 == 0 && -2 + x^2 + y^2 == 0 && -x^2 < 0 && -2 + x^2 < 0 && -z <= 0 && -y <= 0 && -x <= 0 && x*y <= 0, {x, y, z}}, {x^2 - 2*u*z + z^2 == 0 && -z < 0 && -2*u*z + z^2 <= 0 && -x <= 0 && 2*u - z < 0 && z < 0 && -x - y < 0 && -x + y < 0, {x, y, z, u}}, {x^2 - 2*u*z + z^2 == 0 && -z < 0 && -2*u*z + z^2 <= 0 && -x <= 0 && 2*u - z < 0 && z < 0 && x - y < 0 && x + y < 0, {x, y, z, u}}, {x^2 - 2*u*z + z^2 == 0 && -z < 0 && -2*u*z + z^2 <= 0 && -x <= 0 && -z < 0 && -2*u + z < 0 && -x - y < 0 && -x + y < 0, {x, y, z, u}}, {x^2 - 2*u*z + z^2 == 0 && z < 0 && -2*u*z + z^2 <= 0 && -x <= 0 && 2*u - z < 0 && z < 0 && -x - y < 0 && -x + y < 0, {x, y, z, u}}, {x^2 - 2*u*z + z^2 == 0 && -z <= 0 && -2*u*z + z^2 <= 0 && -x <= 0 && 2*u - z < 0 && z < 0 && -x - y < 0 && -x + y < 0, {x, y, z, u}}, {x^2 - 2*u*z + z^2 == 0 && -z <= 0 && -2*u*z + z^2 <= 0 && -x <= 0 && 2*u - z < 0 && z < 0 && x - y < 0 && x + y < 0, {x, y, z, u}}, {x^2 - 2*u*z + z^2 == 0 && -z <= 0 && -2*u*z + z^2 <= 0 && -x <= 0 && -z < 0 && -2*u + z < 0 && -x - y < 0 && -x + y < 0, {x, y, z, u}}, {x^2 - 2*u*z + z^2 == 0 && z <= 0 && -2*u*z + z^2 <= 0 && -x <= 0 && 2*u - z < 0 && z < 0 && -x - y < 0 && -x + y < 0, {x, y, z, u}}, {1 - u < 0 && 1 - u^4 < 0 && u^4 - y <= 0 && -y < 0 && -x < 0 && -(u*x) < 0 && -(u*x*z) < 0 && -1 + E*u*x*z <= 0, {x, y, z, u}}, {u < 0 && u*Sqrt[x/u] < 0 && y == 0 && z == 0 && -(u*z) < 0 && -1/4 + E*u*z <= 0 && -(E*u) + x <= 0 && x < 0, {x, y, z, u}}, {-1 + x < 0 && -x < 0 && -y < 0 && -z < 0 && y*z != 0 && -z^2 < 0 && x - y*z^2 == 0 && -(Sqrt[x]*z) < 0, {x, y, z}}, {-x < 0 && -t < 0 && s != 0 && -1 - E*s <= 0 && s*t != 0 && u != 0 && -1 - E*u <= 0 && u*v*w*x - s*t^2*y*z == 0, {x, y, z, u, v, w, s, t}}, {-x < 0 && -t < 0 && s != 0 && -1 - E*s <= 0 && u != 0 && u*x != 0 && -1 - E*u <= 0 && u*v*w*x - s*t^2*y*z == 0, {x, y, z, u, v, w, s, t}}, {-x < 0 && -t < 0 && u != 0 && -1 - E*u <= 0 && s != 0 && -1 - E*s <= 0 && s*t != 0 && u*v*w*x - s*t^2*y*z == 0, {x, y, z, u, v, w, s, t}}, {-x < 0 && -t < 0 && u != 0 && u*x != 0 && -1 - E*u <= 0 && s != 0 && -1 - E*s <= 0 && u*v*w*x - s*t^2*y*z == 0, {x, y, z, u, v, w, s, t}}, {-x < 0 && -21 + y < 0 && -y < 0 && -583 + 2*x + 42*y - y^2 < 0 && -441 + 42*y - y^2 < 0 && -16*y + z < 0 && -z < 0 && -583*y^2 - 42*y^3 + y^4 + 128*y*z - 4*z^2 == 0, {x, y, z}}, {-x < 0 && s != 0 && -1 - E*s <= 0 && -t < 0 && s*t != 0 && u != 0 && -1 - E*u <= 0 && u*v*w*x - s*t^2*y*z == 0, {x, y, z, u, v, w, s, t}}, {x < 0 && -1 - x < 0 && -x^4 < 0 && z < 0 && x - E*z <= 0 && y == 0 && -(y*z) < 0 && -1 + E*y*z <= 0, {x, y, z}}, {x < 0 && -1 - x < 0 && -1 + x^4 < 0 && -x^4 < 0 && z < 0 && y == 0 && -(y*z) < 0 && -1 + E*y*z <= 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && 3*Sqrt[x^2/y] - z < 0 && -z < 0 && z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && 3*Sqrt[x^2/y] - z < 0 && z < 0 && -z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -z < 0 && z < 0 && -3*Sqrt[x^2/y] - z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && z < 0 && z < 0 && -3*Sqrt[x^2/y] - z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && -x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -3*Sqrt[x^2/y] + z < 0 && z < 0 && -z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && 3*Sqrt[x^2/y] - z < 0 && -z < 0 && z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && 3*Sqrt[x^2/y] - z < 0 && z < 0 && -z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -z < 0 && z < 0 && -3*Sqrt[x^2/y] - z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && z < 0 && z < 0 && -3*Sqrt[x^2/y] - z < 0, {x, y, z}}, {-1 + y < 0 && -y < 0 && x < 0 && -x^2 <= 0 && 81*x^4 == 0 && -3*Sqrt[x^2/y] + z < 0 && z < 0 && -z < 0, {x, y, z}}, {-y < 0 && -u + y < 0 && -1 + u < 0 && -u < 0 && -Root[u^2*z^8 - 2*u*z^8*#1^2 - 12*u*z^6*#1^3 + (-2*u*z^4 + z^8)*#1^4 - 4*z^6*#1^5 + 6*z^4*#1^6 - 4*z^2*#1^7 + #1^8 & , 1] < 0 && -Root[u^2*z^8 - 2*u*z^8*#1^2 - 12*u*z^6*#1^3 + (-2*u*z^4 + z^8)*#1^4 - 4*z^6*#1^5 + 6*z^4*#1^6 - 4*z^2*#1^7 + #1^8 & , 1]^2 <= 0 && x^8 - 2*u*x^4*z^4 + u^2*z^8 - 4*x^6*z^2* Root[u^2*z^8 - 2*u*z^8*#1^2 - 12*u*z^6*#1^3 + (-2*u*z^4 + z^8)* #1^4 - 4*z^6*#1^5 + 6*z^4*#1^6 - 4*z^2*#1^7 + #1^8 & , 1] - 12*u*x^2*z^6*Root[u^2*z^8 - 2*u*z^8*#1^2 - 12*u*z^6*#1^3 + (-2*u*z^4 + z^8)*#1^4 - 4*z^6*#1^5 + 6*z^4*#1^6 - 4*z^2*#1^7 + #1^8 & , 1] + 6*x^4*z^4*Root[u^2*z^8 - 2*u*z^8*#1^2 - 12*u*z^6*#1^3 + (-2*u*z^4 + z^8)*#1^4 - 4*z^6*#1^5 + 6*z^4*#1^6 - 4*z^2*#1^7 + #1^8 & , 1]^2 - 2*u*z^8*Root[u^2*z^8 - 2*u*z^8*#1^2 - 12*u*z^6*#1^3 + (-2*u*z^4 + z^8)*#1^4 - 4*z^6*#1^5 + 6*z^4*#1^6 - 4*z^2*#1^7 + #1^8 & , 1]^2 - 4*x^2*z^6* Root[u^2*z^8 - 2*u*z^8*#1^2 - 12*u*z^6*#1^3 + (-2*u*z^4 + z^8)*#1^ 4 - 4*z^6*#1^5 + 6*z^4*#1^6 - 4*z^2*#1^7 + #1^8 & , 1]^3 + z^8*Root[u^2*z^8 - 2*u*z^8*#1^2 - 12*u*z^6*#1^3 + (-2*u*z^4 + z^8)* #1^4 - 4*z^6*#1^5 + 6*z^4*#1^6 - 4*z^2*#1^7 + #1^8 & , 1]^4 == 0 && -x^4 == 0, {x, y, z, u}}, {-1 - z < 0 && -u + z < 0 && -1 + u < 0 && 3 - x - y + y*z + x*z^2 - 2*z^3 - z^4 == 0 && -1 - 2*u^3 - u^4 - x + u^2*x + y + u*y == 0 && y + 2*x*z - 6*z^2 - 4*z^3 == 0 && -6*u^2 - 4*u^3 + 2*u*x + y == 0 && -2 + y < 0, {x, y, z, u}}, {1 + y - z < 0 && 1 - y^2 - z^2 <= 0 && -y - z <= 0 && y < 0 && -z <= 0 && -1 + z < 0 && -1 - x + y^2 < 0 && x - y^2 <= 0, {x, y, z}}, {-1 + z < 0 && -z < 0 && -u < 0 && -(u*z) < 0 && -Sqrt[u*z] < 0 && x == 0 && y == 0 && -1 + E*u*y <= 0, {x, y, z, u}}, {-1 + z < 0 && -z < 0 && -Sqrt[-((x*z)/y)] < 0 && x < 0 && x*z < 0 && -1 - E*x <= 0 && -1 + y <= 0 && -y < 0, {x, y, z}}, {-z < 0 && -u < 0 && -4 + 441*x - 42*x*z + x*z^2 == 0 && z != 0 && -u^2 + 32*u*z - 256*z^2 + y*z^2 == 0 && -21 + z != 0 && z != 0 && u != 0, {x, y, z, u}}, {-u <= 0 && y == 0 && 2 + y == 0 && -7 + u + z^2 <= 0 && x + y <= 0 && -1 - x - y < 0 && -1 + 2*x + 2*z <= 0 && -1 - 2*x - 2*z <= 0, {x, y, z, u}}, {-u <= 0 && y == 0 && 2 + y == 0 && -7 + u + z^2 <= 0 && -1 - 2*x + 2*z <= 0 && -1 + 2*x - 2*z <= 0 && -x + y <= 0 && -1 + x - y < 0, {x, y, z, u}}, {-1 + x <= 0 && -x <= 0 && x - z < 0 && -y + z < 0 && -1 + z < 0 && -z < 0 && -1 + y <= 0 && -y <= 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -(x*y*z) < 0 && -x - y + z <= 0 && 2*x^2*y - x*y^2 - x^2*z - 3*x*y*z + 2*y^2*z + 2*x*z^2 - y*z^2 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -(x*y*z) < 0 && -x - y + z <= 0 && x^3 - x^2*y - x*y^2 + y^3 - x^2*z + 3*x*y*z - y^2*z - x*z^2 - y*z^2 + z^3 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && x*y*z < 0 && -x - y + z <= 0 && -2*x^2*y + x*y^2 + x^2*z + 3*x*y*z - 2*y^2*z - 2*x*z^2 + y*z^2 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && x*y*z < 0 && -x - y + z <= 0 && -x^3 + x^2*y + x*y^2 - y^3 + x^2*z - 3*x*y*z + y^2*z + x*z^2 + y*z^2 - z^3 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -(x^2*y^2*z^2) < 0 && -x - y + z <= 0 && x^4*y^2 - 3*x^2*y^2*z^2 + y^4*z^2 + x^2*z^4 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -(x^2*y^2*z^2) < 0 && -x - y + z <= 0 && 2*x^4*y^2 - x^2*y^4 - x^4*z^2 - 3*x^2*y^2*z^2 + 2*y^4*z^2 + 2*x^2*z^4 - y^2*z^4 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && x^2*y^2*z^2 < 0 && -x - y + z <= 0 && -(x^4*y^2) + 3*x^2*y^2*z^2 - y^4*z^2 - x^2*z^4 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && x^2*y^2*z^2 < 0 && -x - y + z <= 0 && -2*x^4*y^2 + x^2*y^4 + x^4*z^2 + 3*x^2*y^2*z^2 - 2*y^4*z^2 - 2*x^2*z^4 + y^2*z^4 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && -(x^2*y) + 3*x*y*z - y^2*z - x*z^2 < 0 && 4*x^2*y + 2*x*y^2 + 2*x^2*z + 9*x*y*z + 4*y^2*z + 4*x*z^2 + 2*y*z^2 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && x^2*y - 3*x*y*z + y^2*z + x*z^2 < 0 && -4*x^2*y - 2*x*y^2 - 2*x^2*z - 9*x*y*z - 4*y^2*z - 4*x*z^2 - 2*y*z^2 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && 2*x^2*y - 2*x*y^2 - 2*x^2*z - 27*x*y*z + 2*y^2*z + 2*x*z^2 - 2*y*z^2 < 0 && 4*x^2*y + 2*x*y^2 + 2*x^2*z + 9*x*y*z + 4*y^2*z + 4*x*z^2 + 2*y*z^2 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && -(x^2*y) - x*y^2 - x^2*z - 2*x*y*z - y^2*z - x*z^2 - y*z^2 < 0 && -x^3 + x^2*y + x*y^2 - y^3 + x^2*z - 2*x*y*z + y^2*z + x*z^2 + y*z^2 - z^3 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && x^2*y + x*y^2 + x^2*z + 2*x*y*z + y^2*z + x*z^2 + y*z^2 < 0 && x^3 - x^2*y - x*y^2 + y^3 - x^2*z + 2*x*y*z - y^2*z - x*z^2 - y*z^2 + z^3 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && -2*x^2*y + 2*x*y^2 + 2*x^2*z + 27*x*y*z - 2*y^2*z - 2*x*z^2 + 2*y*z^2 < 0 && -4*x^2*y - 2*x*y^2 - 2*x^2*z - 9*x*y*z - 4*y^2*z - 4*x*z^2 - 2*y*z^2 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && -x^3 + 2*x^2*y - y^3 - 3*x*y*z + 2*y^2*z + 2*x*z^2 - z^3 < 0 && -x^3 + x^2*y + x*y^2 - y^3 + x^2*z - 2*x*y*z + y^2*z + x*z^2 + y*z^2 - z^3 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && x^3 - 2*x^2*y + y^3 + 3*x*y*z - 2*y^2*z - 2*x*z^2 + z^3 < 0 && x^3 - x^2*y - x*y^2 + y^3 - x^2*z + 2*x*y*z - y^2*z - x*z^2 - y*z^2 + z^3 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && -(x^4*y*z) + x^3*y^2*z + x^2*y^3*z - x*y^4*z + x^3*y*z^2 - 2*x^2*y^2*z^2 + x*y^3*z^2 + x^2*y*z^3 + x*y^2*z^3 - x*y*z^4 < 0 && x^7 - x^6*y - 3*x^5*y^2 + 3*x^4*y^3 + 3*x^3*y^4 - 3*x^2*y^5 - x*y^6 + y^7 - x^6*z + 2*x^5*y*z + x^4*y^2*z - 4*x^3*y^3*z + x^2*y^4*z + 2*x*y^5*z - y^6*z - 3*x^5*z^2 + x^4*y*z^2 + x^3*y^2*z^2 + x^2*y^3*z^2 + x*y^4*z^2 - 3*y^5*z^2 + 3*x^4*z^3 - 4*x^3*y*z^3 + x^2*y^2*z^3 - 4*x*y^3*z^3 + 3*y^4*z^3 + 3*x^3*z^4 + x^2*y*z^4 + x*y^2*z^4 + 3*y^3*z^4 - 3*x^2*z^5 + 2*x*y*z^5 - 3*y^2*z^5 - x*z^6 - y*z^6 + z^7 < 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && x^4*y*z - x^3*y^2*z - x^2*y^3*z + x*y^4*z - x^3*y*z^2 + 2*x^2*y^2*z^2 - x*y^3*z^2 - x^2*y*z^3 - x*y^2*z^3 + x*y*z^4 < 0 && -x^7 + x^6*y + 3*x^5*y^2 - 3*x^4*y^3 - 3*x^3*y^4 + 3*x^2*y^5 + x*y^6 - y^7 + x^6*z - 2*x^5*y*z - x^4*y^2*z + 4*x^3*y^3*z - x^2*y^4*z - 2*x*y^5*z + y^6*z + 3*x^5*z^2 - x^4*y*z^2 - x^3*y^2*z^2 - x^2*y^3*z^2 - x*y^4*z^2 + 3*y^5*z^2 - 3*x^4*z^3 + 4*x^3*y*z^3 - x^2*y^2*z^3 + 4*x*y^3*z^3 - 3*y^4*z^3 - 3*x^3*z^4 - x^2*y*z^4 - x*y^2*z^4 - 3*y^3*z^4 + 3*x^2*z^5 - 2*x*y*z^5 + 3*y^2*z^5 + x*z^6 + y*z^6 - z^7 < 0, {x, y, z}}, {-y <= 0 && -1 + x^2 + y == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -x <= 0 && z^2 - 2*x*z^3 <= 0 && z != 0, {x, y, z}}, {-1 + z <= 0 && -1 + z != 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -y + z^2 <= 0 && -4 + y + 4*z <= 0 && -x + z^2 <= 0 && -4 + x + 4*z <= 0, {x, y, z}}, {-z <= 0 && -u^2 + y^2 == 0 && -u^2 + x^2 + z == 0 && -u < 0 && -y <= 0 && -y^2 <= 0 && -x <= 0 && x <= 0, {x, y, z, u}}, {-z <= 0 && -u^2 + y^2 == 0 && -u^2 + x^2 + z == 0 && u < 0 && -y <= 0 && -y^2 <= 0 && -x <= 0 && x <= 0, {x, y, z, u}}, {-z <= 0 && -1 + x^2 + z == 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && y^2 - 2*x*y^3 <= 0 && y != 0, {x, y, z}}, {-z <= 0 && -1 + z < 0 && -y + z < 0 && x - z <= 0 && -1 - y < 0 && -1 + y < 0 && -1 + x < 0 && -1 - x < 0, {x, y, z}}, {4 - y - 8*z + y*z + 4*z^2 <= 0 && -1 + z != 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -y + z^2 <= 0 && -4 + y + 4*z <= 0 && -x + z^2 <= 0 && -4 + x + 4*z <= 0, {x, y, z}}, {x != 0 && -s < 0 && w != 0 && -1 - E*w <= 0 && s*w != 0 && v != 0 && -1 - E*v <= 0 && v*x*y - s^2*u*w*z == 0, {x, y, z, u, v, w, s}}, {z != 0 && -16*z + y*z != 0 && -x < 0 && -y < 0 && -71 + x - 2*y^2 < 0 && -21 + z < 0 && -z < 0 && -16*z + y*z < 0, {x, y, z}}, {z != 0 && 1 + z^2 != 0 && -1 + z^2 != 0 && 1 + z^2 != 0 && -1 + z^2 != 0 && -y + 2*z + y*z^2 == 0 && z != 0 && -1 + 2*x*z + z^2 == 0, {x, y, z}}, {t == 0 && -w < 0 && -s < 0 && -(s*w) + x == 0 && v != 0 && -1 - E*v <= 0 && u != 0 && -1 - E*u <= 0 && s*t*u + y*z == 0, {x, y, z, u, v, w, s, t}}, {x^2 == 0 && 36*x^2*y - x*z^2 == 0 && 144*x^2*y^2 - 216*x*y*z^2 + z^4 == 0 && -18*x^3 + 576*x^2*y^3 + 62*x*y^2*z^2 - y*z^4 == 0 && -36*x^3*y + 448*x^2*y^4 + x^2*z^2 + 84*x*y^3*z^2 - 3*y^2*z^4 == 0 && -8*x^3*y^2 + 128*x^2*y^5 - x^2*y*z^2 - 24*x*y^4*z^2 + y^3*z^4 == 0 && x^4 - 32*x^3*y^3 + 256*x^2*y^6 - 2*x^2*y^2*z^2 - 32*x*y^5*z^2 + y^4*z^4 == 0 && -y < 0 && -x < 0, {x, y, z}}, {x*y == 0 && x^2 == 0 && -1 + 2*z^3 == 0 && -1 - x < 0 && -1 + x < 0 && -3 - y < 0 && -3 + y < 0 && -7 - z < 0 && -7 + z < 0, {x, y, z}}, {-1 + x^2 + y^2 == 0 && 4096 - z < 0 && -z < 0 && 4096*z - z^2 < 0 && -1 - y < 0 && -1 + y < 0 && -x <= 0 && z^2 - 2*x*z^3 <= 0 && z != 0, {x, y, z}}, {x^2 - z == 0 && -1 - y < 0 && -1 + y < 0 && -y < 0 && -1 + 1000000*y < 0 && -x^2 < 0 && -x <= 0 && 2*x^2*y - y^2 <= 0 && y != 0, {x, y, z}}, {x^2 - z == 0 && -1 - y < 0 && -1 + y < 0 && -y < 0 && -1 + 1000000*y < 0 && -x^2 < 0 && -x <= 0 && -2*x^2*y + y^2 <= 0 && y != 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 4096*y < 0 && -x^2 < 0 && 2*x^2 - y < 0 && -y <= 0 && -1 + 4096*y <= 0 && -x <= 0 && -x^2 <= 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 4096*y < 0 && -x^2 < 0 && -y <= 0 && -1 + 4096*y <= 0 && -x <= 0 && -x^2 <= 0 && 2*x^2 - y <= 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 4096*y < 0 && -x^2 < 0 && -y <= 0 && -1 + 4096*y <= 0 && -x <= 0 && -x^2 <= 0 && -2*x^2 + y <= 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 1000000*y < 0 && -x^2 < 0 && 2*x^2 - y < 0 && -y <= 0 && -1 + 1000000*y <= 0 && -x <= 0 && -x^2 <= 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 1000000*y < 0 && -x^2 < 0 && -y <= 0 && -1 + 1000000*y <= 0 && -x <= 0 && -x^2 <= 0 && 2*x^2 - y <= 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 1000000*y < 0 && -x^2 < 0 && -y <= 0 && -1 + 1000000*y <= 0 && -x <= 0 && -x^2 <= 0 && -2*x^2 + y <= 0, {x, y, z}}, {y^2 - z == 0 && -u + x^2*z == 0 && -u + x^2*y^2 == 0 && -u < 0 && -y^2 < 0 && 2*u - y^2 < 0 && -1 + 4096*y^2 < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {y^2 - z == 0 && -u + x^2*z == 0 && -u + x^2*y^2 == 0 && -u < 0 && -y^2 < 0 && -2*u + y^2 < 0 && -1 + 4096*y^2 < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {y^2 - z == 0 && -u + x^2*z == 0 && -u + x^2*y^2 == 0 && -u < 0 && -y^2 < 0 && -1 + 4096*y^2 < 0 && 2*u*y^2 - y^4 < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-2 + x^2 + y^2 - z == 0 && 2 + x - y + 2*z == 0 && -2 + x*y - z^3 == 0 && -1 - x <= 0 && -1 + x <= 0 && -3 - y <= 0 && -3 + y <= 0 && -7 - z <= 0 && -7 + z <= 0, {x, y, z}}, {-2 + x^2 + y^2 - z == 0 && -11 + x - y + 7*z == 0 && -2 + x*y - z^3 == 0 && -1 - x <= 0 && -1 + x <= 0 && -3 - y <= 0 && -3 + y <= 0 && -7 - z <= 0 && -7 + z <= 0, {x, y, z}}, {-1 + x^2 + z == 0 && y < 0 && -x <= 0 && -z < 0 && -y + z < 0 && -y < 0 && -2*x + z < 0 && -2*x + y < 0 && 2 - 2*Sqrt[2] + y <= 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -2*x - y <= 0 && -x <= 0 && 2*x + y <= 0 && -y - z < 0 && 2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -2*x - y <= 0 && -x <= 0 && 2*x + y <= 0 && y + z < 0 && -2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -2*x + y <= 0 && -x <= 0 && 2*x - y <= 0 && y - z < 0 && 2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -2*x + y <= 0 && -x <= 0 && 2*x - y <= 0 && -y + z < 0 && -2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -y - z <= 0 && -2*x - y <= 0 && -x <= 0 && -y - z < 0 && 2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -y - z <= 0 && -2*x - y <= 0 && -x <= 0 && y + z < 0 && -2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -y - z <= 0 && y + z <= 0 && -x <= 0 && -y - z < 0 && 2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -y - z <= 0 && y + z <= 0 && -x <= 0 && y + z < 0 && -2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && y - z <= 0 && -2*x + y <= 0 && -x <= 0 && y - z < 0 && 2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && y - z <= 0 && -2*x + y <= 0 && -x <= 0 && -y + z < 0 && -2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -y + z <= 0 && -x <= 0 && 2*x - y <= 0 && y - z < 0 && 2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -y + z <= 0 && -x <= 0 && 2*x - y <= 0 && -y + z < 0 && -2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -y + z <= 0 && y - z <= 0 && -x <= 0 && y - z < 0 && 2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -y + z <= 0 && y - z <= 0 && -x <= 0 && -y + z < 0 && -2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && y + z <= 0 && -x <= 0 && 2*x + y <= 0 && -y - z < 0 && 2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && y + z <= 0 && -x <= 0 && 2*x + y <= 0 && y + z < 0 && -2*x - y < 0, {x, y, z}}, {-1 + y^2 + z == 0 && x^2 - z == 0 && -1 + x^2 + y^2 == 0 && -x^2 < 0 && -y <= 0 && -x <= 0 && -1 + x^2 <= 0 && x^2 - x^4 <= 0 && x^2 != 0, {x, y, z}}, {10*x*y^3 + 3*z == 0 && x^2*y^2 == 0 && -2 + 3*x - 4*z^3 == 0 && -1 - x < 0 && -1 + x < 0 && -3 - y < 0 && -3 + y < 0 && -7 - z < 0 && -7 + z < 0, {x, y, z}}, {-1 + u^2 + z^2 == 0 && -1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -1 - u < 0 && -1 + u < 0 && -(x*y) < 0 && -z <= 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {-1 + u^2 + z^2 == 0 && -1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -1 - u < 0 && -1 + u < 0 && -z <= 0 && -y <= 0 && -x <= 0 && -(x*y) <= 0, {x, y, z, u}}, {-1 + u^2 + z^2 == 0 && -1 + u + y^2 == 0 && -1 - u + x^2 == 0 && -1 - u < 0 && -1 + u < 0 && -z <= 0 && -y <= 0 && -x <= 0 && x*y <= 0, {x, y, z, u}}, {-1 + x^2 + z^2 == 0 && -1 - z < 0 && -1 + z < 0 && 4096 - y < 0 && -y < 0 && 4096*y - y^2 < 0 && -x <= 0 && y^2 - 2*x*y^3 <= 0 && y != 0, {x, y, z}}, {x^3 - x^2*y - x*y^2 + y^3 - x^2*z + 3*x*y*z - y^2*z - x*z^2 - y*z^2 + z^3 == 0 && 7*x^3 - 6*x^2*y - 6*x*y^2 + 7*y^3 - 6*x^2*z + 15*x*y*z - 6*y^2*z - 6*x*z^2 - 6*y*z^2 + 7*z^3 == 0 && -x^3 + x^2*y + x*y^2 - y^3 + x^2*z - 2*x*y*z + y^2*z + x*z^2 + y*z^2 - z^3 < 0 && -z <= 0 && -x <= 0 && -x - y + z <= 0 && x - y - z <= 0 && -y <= 0 && -x + y - z <= 0, {x, y, z}}, {x^3 - x^2*y - x*y^2 + y^3 - x^2*z + 3*x*y*z - y^2*z - x*z^2 - y*z^2 + z^3 == 0 && 7*x^3 - 6*x^2*y - 6*x*y^2 + 7*y^3 - 6*x^2*z + 15*x*y*z - 6*y^2*z - 6*x*z^2 - 6*y*z^2 + 7*z^3 == 0 && x^3 - x^2*y - x*y^2 + y^3 - x^2*z + 2*x*y*z - y^2*z - x*z^2 - y*z^2 + z^3 < 0 && -z <= 0 && -x <= 0 && -x - y + z <= 0 && x - y - z <= 0 && -y <= 0 && -x + y - z <= 0, {x, y, z}}, {-4*y + 10*x*y^3 + 3*z + y*z^3 == 0 && -4*x + 15*x^2*y^2 + x*z^3 == 0 && -2 + 3*x + 3*x*y*z^2 - 4*z^3 == 0 && -1 - x < 0 && -1 + x < 0 && -3 - y < 0 && -3 + y < 0 && -7 - z < 0 && -7 + z < 0, {x, y, z}}, {-x < 0 && -t < 0 && s != 0 && -1 - E*s <= 0 && s*t != 0 && s*t^2 != 0 && u != 0 && -1 - E*u <= 0 && u*v*w*x - s*t^2*y*z == 0, {x, y, z, u, v, w, s, t}}, {-x < 0 && -1 - y < 0 && y < 0 && 1 - x + y < 0 && -1 + x^2 - z < 0 && -x <= 0 && x + y <= 0 && -x^2 + z <= 0 && 1 - x^2 - y^2 <= 0, {x, y, z}}, {x < 0 && -1 - x < 0 && -1 + x^4 < 0 && -x^4 < 0 && z < 0 && x - E*z <= 0 && y == 0 && -(y*z) < 0 && -1 + E*y*z <= 0, {x, y, z}}, {x < 0 && -1 - y < 0 && y < 0 && x < 0 && 1 + x + y < 0 && -1 + x^2 - z < 0 && -x + y <= 0 && -x^2 + z <= 0 && 1 - x^2 - y^2 <= 0, {x, y, z}}, {x < 0 && -1 - y < 0 && y < 0 && 1 - x + y < 0 && -1 + x^2 - z < 0 && -x <= 0 && x + y <= 0 && -x^2 + z <= 0 && 1 - x^2 - y^2 <= 0, {x, y, z}}, {-y < 0 && x != 0 && -s < 0 && w != 0 && -1 - E*w <= 0 && s*w != 0 && v != 0 && -1 - E*v <= 0 && v*x*y - s^2*u*w*z == 0, {x, y, z, u, v, w, s}}, {-y < 0 && x != 0 && x*y != 0 && -s < 0 && w != 0 && -1 - E*w <= 0 && v != 0 && -1 - E*v <= 0 && v*x*y - s^2*u*w*z == 0, {x, y, z, u, v, w, s}}, {-1 + z < 0 && -z < 0 && -u < 0 && -(u*z) < 0 && -Sqrt[u*z] < 0 && -(E*u) + z <= 0 && x == 0 && y == 0 && -1 + E*u*y <= 0, {x, y, z, u}}, {-z < 0 && x*z != 0 && y != 0 && -w < 0 && u != 0 && -1 - E*u <= 0 && v != 0 && -1 - E*v <= 0 && -(u*w^2*y) + v*x*z == 0, {x, y, z, u, v, w}}, {-w <= 0 && -v <= 0 && -u <= 0 && -z <= 0 && -y <= 0 && -x <= 0 && v^2 + w^2 - y^2 <= 0 && -(u*w) + x*y - v*z < 0 && u^2 - x^2 + z^2 <= 0, {x, y, z, u, v, w}}, {-x <= 0 && -1 - y < 0 && y < 0 && 1 - x + y < 0 && -1 + x^2 - z < 0 && -x <= 0 && x + y <= 0 && -x^2 + z <= 0 && 1 - x^2 - y^2 <= 0, {x, y, z}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && -x^3 + x^2*y + x*y^2 - y^3 + x^2*z - 2*x*y*z + y^2*z + x*z^2 + y*z^2 - z^3 < 0 && -u < 0 && -7*x^3 - 14*u*x^3 - 9*u^2*x^3 - 2*u^3*x^3 + 6*x^2*y + 12*u*x^2*y + 8*u^2*x^2*y + 2*u^3*x^2*y + 6*x*y^2 + 12*u*x*y^2 + 8*u^2*x*y^2 + 2*u^3*x*y^2 - 7*y^3 - 14*u*y^3 - 9*u^2*y^3 - 2*u^3*y^3 + 6*x^2*z + 12*u*x^2*z + 8*u^2*x^2*z + 2*u^3*x^2*z - 15*x*y*z - 30*u*x*y*z - 21*u^2*x*y*z - 6*u^3*x*y*z + 6*y^2*z + 12*u*y^2*z + 8*u^2*y^2*z + 2*u^3*y^2*z + 6*x*z^2 + 12*u*x*z^2 + 8*u^2*x*z^2 + 2*u^3*x*z^2 + 6*y*z^2 + 12*u*y*z^2 + 8*u^2*y*z^2 + 2*u^3*y*z^2 - 7*z^3 - 14*u*z^3 - 9*u^2*z^3 - 2*u^3*z^3 < 0, {x, y, z, u}}, {-x <= 0 && -z <= 0 && x - y - z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && x^3 - x^2*y - x*y^2 + y^3 - x^2*z + 2*x*y*z - y^2*z - x*z^2 - y*z^2 + z^3 < 0 && -u < 0 && 7*x^3 + 14*u*x^3 + 9*u^2*x^3 + 2*u^3*x^3 - 6*x^2*y - 12*u*x^2*y - 8*u^2*x^2*y - 2*u^3*x^2*y - 6*x*y^2 - 12*u*x*y^2 - 8*u^2*x*y^2 - 2*u^3*x*y^2 + 7*y^3 + 14*u*y^3 + 9*u^2*y^3 + 2*u^3*y^3 - 6*x^2*z - 12*u*x^2*z - 8*u^2*x^2*z - 2*u^3*x^2*z + 15*x*y*z + 30*u*x*y*z + 21*u^2*x*y*z + 6*u^3*x*y*z - 6*y^2*z - 12*u*y^2*z - 8*u^2*y^2*z - 2*u^3*y^2*z - 6*x*z^2 - 12*u*x*z^2 - 8*u^2*x*z^2 - 2*u^3*x*z^2 - 6*y*z^2 - 12*u*y*z^2 - 8*u^2*y*z^2 - 2*u^3*y*z^2 + 7*z^3 + 14*u*z^3 + 9*u^2*z^3 + 2*u^3*z^3 < 0, {x, y, z, u}}, {x <= 0 && -1 - y < 0 && y < 0 && x < 0 && 1 + x + y < 0 && -1 + x^2 - z < 0 && -x + y <= 0 && -x^2 + z <= 0 && 1 - x^2 - y^2 <= 0, {x, y, z}}, {x <= 0 && -1 - y < 0 && y < 0 && 1 - x + y < 0 && -1 + x^2 - z < 0 && -x <= 0 && x + y <= 0 && -x^2 + z <= 0 && 1 - x^2 - y^2 <= 0, {x, y, z}}, {-z <= 0 && -u <= 0 && -v <= 0 && x^8*y^8 == 0 && -(u*x^8*y^6) - 2*v*x^8*y^6 - u*x^6*y^8 + v*x^6*y^8 + x^8*y^6*z - 2*x^6*y^8*z == 0 && u^2*x^8*y^4 + 6*u*v*x^8*y^4 + 6*v^2*x^8*y^4 + 4*u^2*x^6*y^6 - 2*u*v*x^6*y^6 - 6*v^2*x^6*y^6 + u^2*x^4*y^8 + 2*u*v*x^4*y^8 + v^2*x^4*y^8 + 2*u*x^8*y^4*z - 6*v*x^8*y^4*z - 2*u*x^6*y^6*z + 10*v*x^6*y^6*z + 6*u*x^4*y^8*z - 6*v*x^4*y^8*z + x^8*y^4*z^2 - 6*x^6*y^6*z^2 + 6*x^4*y^8*z^2 == 0 && u^2*v*x^8*y^2 + 3*u*v^2*x^8*y^2 + 2*v^3*x^8*y^2 + u^3*x^6*y^4 - u^2*v*x^6*y^4 - 5*u*v^2*x^6*y^4 - 3*v^3*x^6*y^4 + u^3*x^4*y^6 + 3*u^2*v*x^4*y^6 + 3*u*v^2*x^4*y^6 + v^3*x^4*y^6 + 2*u*v*x^8*y^2*z - 3*v^2*x^8*y^2*z + 3*u^2*x^6*y^4*z - 3*u*v*x^6*y^4*z + 4*v^2*x^6*y^4*z - u^2*x^4*y^6*z - 3*u*v*x^4*y^6*z - 2*v^2*x^4*y^6*z + u^2*x^2*y^8*z + 2*u*v*x^2*y^8*z + v^2*x^2*y^8*z + v*x^8*y^2*z^2 + 3*u*x^6*y^4*z^2 - 2*v*x^6*y^4*z^2 - 5*u*x^4*y^6*z^2 + 4*v*x^4*y^6*z^2 + 3*u*x^2*y^8*z^2 - 3*v*x^2*y^8*z^2 + x^6*y^4*z^3 - 3*x^4*y^6*z^3 + 2*x^2*y^8*z^3 == 0 && u^2*v^2*x^8 + 2*u*v^3*x^8 + v^4*x^8 - 2*u^3*v*x^6*y^2 - 6*u^2*v^2*x^6*y^2 - 6*u*v^3*x^6*y^2 - 2*v^4*x^6*y^2 + u^4*x^4*y^4 + 4*u^3*v*x^4*y^4 + 6*u^2*v^2*x^4*y^4 + 4*u*v^3*x^4*y^4 + v^4*x^4*y^4 + 2*u*v^2*x^8*z - 2*v^3*x^8*z - 6*u^2*v*x^6*y^2*z - 4*u*v^2*x^6*y^2*z + 2*v^3*x^6*y^2*z + 4*u^3*x^4*y^4*z + 10*u^2*v*x^4*y^4*z + 8*u*v^2*x^4*y^4*z + 2*v^3*x^4*y^4*z - 2*u^3*x^2*y^6*z - 6*u^2*v*x^2*y^6*z - 6*u*v^2*x^2*y^6*z - 2*v^3*x^2*y^6*z + v^2*x^8*z^2 - 6*u*v*x^6*y^2*z^2 + 2*v^2*x^6*y^2*z^2 + 6*u^2*x^4*y^4*z^2 + 8*u*v*x^4*y^4*z^2 - 6*v^2*x^4*y^4*z^2 - 6*u^2*x^2*y^6*z^2 - 4*u*v*x^2*y^6*z^2 + 2*v^2*x^2*y^6*z^2 + u^2*y^8*z^2 + 2*u*v*y^8*z^2 + v^2*y^8*z^2 - 2*v*x^6*y^2*z^3 + 4*u*x^4*y^4*z^3 + 2*v*x^4*y^4*z^3 - 6*u*x^2*y^6*z^3 + 2*v*x^2*y^6*z^3 + 2*u*y^8*z^3 - 2*v*y^8*z^3 + x^4*y^4*z^4 - 2*x^2*y^6*z^4 + y^8*z^4 == 0 && x*y != 0, {x, y, z, u, v}}, {Root[-1 + t + (6 + 2*t)*#1^2 + (-1 + t)*#1^4 & , 2] - Root[t - 4*#1 + 2*t*#1^2 + 4*#1^3 + t*#1^4 & , 3] <= 0 && Pi*s + 2*v + 2*Pi*y < 0 && -(Pi*s) - 2*w - 2*Pi*y < 0 && 2*u + 2*Pi*x - Pi*z < 0 && -Pi - 4*u - 4*Pi*x + 2*Pi*z < 0 && -Pi - 8*u - 8*Pi*x <= 0 && -Pi + 8*u + 8*Pi*x <= 0 && -1 + t + 6*Root[-1 + t + (6 + 2*t)*#1^2 + (-1 + t)*#1^4 & , 2]^2 + 2*t*Root[-1 + t + (6 + 2*t)*#1^2 + (-1 + t)*#1^4 & , 2]^2 - Root[-1 + t + (6 + 2*t)*#1^2 + (-1 + t)*#1^4 & , 2]^4 + t*Root[-1 + t + (6 + 2*t)*#1^2 + (-1 + t)*#1^4 & , 2]^4 == 0 && t - 4*Root[t - 4*#1 + 2*t*#1^2 + 4*#1^3 + t*#1^4 & , 3] + 2*t*Root[t - 4*#1 + 2*t*#1^2 + 4*#1^3 + t*#1^4 & , 3]^2 + 4*Root[t - 4*#1 + 2*t*#1^2 + 4*#1^3 + t*#1^4 & , 3]^3 + t*Root[t - 4*#1 + 2*t*#1^2 + 4*#1^3 + t*#1^4 & , 3]^4 == 0, {x, y, z, u, v, w, s, t}}, {u != 0 && -1 - E*u <= 0 && w != 0 && -1 - E*w <= 0 && v != 0 && -1 - E*v <= 0 && -s < 0 && s*w != 0 && u*v*x - s^2*w*y*z == 0, {x, y, z, u, v, w, s}}, {v != 0 && -1 - E*v <= 0 && -s < 0 && u != 0 && -1 - E*u <= 0 && w != 0 && -1 - E*w <= 0 && s*w != 0 && u*v*x - s^2*w*y*z == 0, {x, y, z, u, v, w, s}}, {w != 0 && -1 - E*w <= 0 && u != 0 && -1 - E*u <= 0 && v != 0 && -1 - E*v <= 0 && -s < 0 && s*w != 0 && u*v*x - s^2*w*y*z == 0, {x, y, z, u, v, w, s}}, {w != 0 && -1 - E*w <= 0 && v != 0 && -1 - E*v <= 0 && -s < 0 && s*w != 0 && u != 0 && -1 - E*u <= 0 && u*v*x - s^2*w*y*z == 0, {x, y, z, u, v, w, s}}, {z != 0 && -16*z + y*z != 0 && -x < 0 && -16 + y < 0 && -y < 0 && -71 + x - 2*y^2 < 0 && -21 + z < 0 && -z < 0 && -16*z + y*z < 0, {x, y, z}}, {Sqrt[-u]*Sqrt[-(u*z^2)] != 0 && -(u^(3/2)*y*z^2) + Sqrt[-u]*x*Sqrt[-(u*z^2)]*Sqrt[u*z^2] == 0 && z^2 != 0 && -Sqrt[-(u*z^2)] <= 0 && -Sqrt[-u] <= 0 && u <= 0 && -u <= 0 && u*z^2 <= 0 && -(u*z^2) <= 0, {x, y, z, u}}, {s == 0 && x != 0 && -v < 0 && -w < 0 && -(v*w) + y == 0 && u != 0 && -1 - E*u <= 0 && z != 0 && -1 - E*z <= 0 && s*w*x + z == 0, {x, y, z, u, v, w, s}}, {-2*v + Pi*w - 2*v*w^2 == 0 && 1 + w^2 != 0 && -4*u - 8*u*w^2 + Sqrt[2]*Pi*w^4 - 4*u*w^4 == 0 && 1 + w^2 != 0 && Sqrt[2]*Pi*w^2 + 2*z + 4*w^2*z + 2*w^4*z == 0 && 1 + w^2 != 0 && Sqrt[2]*Pi - 4*y - 8*w^2*y - 4*w^4*y == 0 && 1 + w^2 != 0 && Pi*w^2 + x - 2*w^2*x + w^4*x == 0 && -1 + w^2 != 0, {x, y, z, u, v, w}}, {2*v + Pi*w + 2*v*w^2 == 0 && 1 + w^2 != 0 && 4*u + 8*u*w^2 + Sqrt[2]*Pi*w^4 + 4*u*w^4 == 0 && 1 + w^2 != 0 && Sqrt[2]*Pi*w^2 + 2*z + 4*w^2*z + 2*w^4*z == 0 && 1 + w^2 != 0 && Sqrt[2]*Pi + 4*y + 8*w^2*y + 4*w^4*y == 0 && 1 + w^2 != 0 && Pi*w^2 + x - 2*w^2*x + w^4*x == 0 && -1 + w^2 != 0, {x, y, z, u, v, w}}, {2*v + Pi*w + 2*v*w^2 == 0 && 1 + w^2 != 0 && 4*u + 8*u*w^2 + Sqrt[2]*Pi*w^4 + 4*u*w^4 == 0 && 1 + w^2 != 0 && Sqrt[2]*Pi*w^2 + 2*z + 4*w^2*z + 2*w^4*z == 0 && 1 + w^2 != 0 && Sqrt[2]*Pi + 4*y + 8*w^2*y + 4*w^4*y == 0 && 1 + w^2 != 0 && Pi*w^2 + 2*x - 4*w^2*x + 2*w^4*x == 0 && -1 + w^2 != 0, {x, y, z, u, v, w}}, {-1 + u + y^2 == 0 && -u + x^2 == 0 && -1 + x^2 + y^2 == 0 && -z < 0 && -1 + 4096*z < 0 && -x^2 < 0 && -(x*y) + z < 0 && -1 + x^2 < 0 && -y <= 0 && -x <= 0, {x, y, z, u}}, {x^2 - z == 0 && -y < 0 && -1 + 1000000*y < 0 && -x^2 < 0 && -y <= 0 && -1 + 1000000*y <= 0 && -x <= 0 && -x^2 <= 0 && 2*x^2*y - y^2 <= 0 && y != 0, {x, y, z}}, {x^2 - z == 0 && -y < 0 && -1 + 1000000*y < 0 && -x^2 < 0 && -y <= 0 && -1 + 1000000*y <= 0 && -x <= 0 && -x^2 <= 0 && -2*x^2*y + y^2 <= 0 && y != 0, {x, y, z}}, {-1 + x^2 + z == 0 && y < 0 && -x <= 0 && -z < 0 && -2 + 2*Sqrt[2] - y < 0 && -2 + y < 0 && y - z < 0 && -4 + y^2 + 4*z < 0 && 2*x - z < 0 && 2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && y < 0 && -x <= 0 && -z < 0 && -2 + 2*Sqrt[2] - y < 0 && -y + z < 0 && -2 + y < 0 && -4 + y^2 + 4*z < 0 && -2*x + z < 0 && -2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && y < 0 && -x <= 0 && -z < 0 && -y + z < 0 && -y < 0 && y - z < 0 && 2*x - z < 0 && 2*x - y < 0 && 2 - 2*Sqrt[2] + y <= 0, {x, y, z}}, {-107 - x^2 - 9*y + z == 0 && -2*u*x - 4*x^3 + z == 0 && -2 + 3*u == 0 && -u - x + 27*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z, u}}, {109 - x^2 + 9*y + z == 0 && -2*u*x - 4*x^3 + z == 0 && -2 + 3*u == 0 && -u - x + 27*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z, u}}, {1 - x^2 - 9*y - 4*y^3 + z == 0 && -2*u*x - 4*x^3 + z == 0 && -2 + 3*u + 4*u*y^2 == 0 && -u - x + 27*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z, u}}, {1 - x^2 + 9*y - 4*y^3 + z == 0 && -2*u*x - 4*x^3 + z == 0 && 2 - 3*u + 4*u*y^2 == 0 && -u - x + 27*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z, u}}, {-8 - 3*x*y - 4*y^3 + z == 0 && -2*y + 3*u*y == 0 && -2*x + 3*u*x + 12*u*y^2 == 0 && -3 - u + 27*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z, u}}, {-8 - 3*x*y - 4*y^3 + z == 0 && -2*y + 3*u*y == 0 && -2*x + 3*u*x + 12*u*y^2 == 0 && 3 - u + 27*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z, u}}, {x^2 - 2*u*z + z^2 == 0 && -u < 0 && -2*u*z + z^2 <= 0 && -(u*y^2*z) - u*z^3 <= 0 && -x <= 0 && y^2 + z^2 != 0 && 2*u - z < 0 && z < 0 && -x - y < 0 && -x + y < 0, {x, y, z, u}}, {x^2 - 2*u*z + z^2 == 0 && -u < 0 && -2*u*z + z^2 <= 0 && -(u*y^2*z) - u*z^3 <= 0 && -x <= 0 && y^2 + z^2 != 0 && 2*u - z < 0 && z < 0 && x - y < 0 && x + y < 0, {x, y, z, u}}, {x^2 - 2*u*z + z^2 == 0 && -u < 0 && -2*u*z + z^2 <= 0 && -(u*y^2*z) - u*z^3 <= 0 && -x <= 0 && y^2 + z^2 != 0 && -z < 0 && -2*u + z < 0 && -x - y < 0 && -x + y < 0, {x, y, z, u}}, {-2 + x*y - z^3 == 0 && y == 0 && x == 0 && z^2 == 0 && -1 - x < 0 && -1 + x < 0 && -3 - y < 0 && -3 + y < 0 && -7 - z < 0 && -7 + z < 0, {x, y, z}}, {-2 + x*y - z^3 == 0 && -(u*y) + 10*x*y^3 + 3*z == 0 && -(u*x) + 15*x^2*y^2 == 0 && -2 + 3*x + 3*u*z^2 - 4*z^3 == 0 && -1 - x < 0 && -1 + x < 0 && -3 - y < 0 && -3 + y < 0 && -7 - z < 0 && -7 + z < 0, {x, y, z, u}}, {-1 + x^3 + y^3 - z^3 == 0 && x^2 == 0 && y^2 == 0 && z^2 == 0 && -2 - x < 0 && -2 + x < 0 && -2 - y < 0 && -2 + y < 0 && -2 - z < 0 && -2 + z < 0, {x, y, z}}, {-1 + x^3 + y^3 - z^3 == 0 && -x^2 + u*x^2 == 0 && 3*u*y^2 + z^2 == 0 && 2*y*z - 3*u*z^2 == 0 && -2 - x < 0 && -2 + x < 0 && -2 - y < 0 && -2 + y < 0 && -2 - z < 0 && -2 + z < 0, {x, y, z, u}}, {-4 + x^2 + 3*y*z + 4*z^3 == 0 && x == 0 && z == 0 && y + 4*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z}}, {-4 + x^2 + 3*y*z + 4*z^3 == 0 && -3 + 2*u*x + 4*x^3 == 0 && -2*z + 3*u*z == 0 && -2*y + 3*u*y + 12*u*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z, u}}, {-1 + x^2 + 3*y*z + 4*z^3 == 0 && x == 0 && z == 0 && y + 4*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z}}, {-1 + x^2 + 3*y*z + 4*z^3 == 0 && u*x + 2*x^3 == 0 && -2*z + 3*u*z == 0 && -2*y + 3*u*y + 12*u*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z, u}}, {2 + x^2 + 3*y*z + 4*z^3 == 0 && x == 0 && z == 0 && y + 4*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z}}, {2 + x^2 + 3*y*z + 4*z^3 == 0 && 3 + 2*u*x + 4*x^3 == 0 && -2*z + 3*u*z == 0 && -2*y + 3*u*y + 12*u*z^2 == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0, {x, y, z, u}}, {u < 0 && -1 - u < 0 && -1 + u^4 < 0 && -u^4 < 0 && -u^4 + y <= 0 && -y < 0 && -x < 0 && u*x < 0 && -(u*x*z) < 0 && -1 + E*u*x*z <= 0, {x, y, z, u}}, {-w < 0 && w - x + x*z < 0 && -v < 0 && v + u*x - x*y < 0 && -y < 0 && -2*Pi + y < 0 && -1 - z <= 0 && -1 + z <= 0 && -1 - u <= 0 && -1 + u <= 0, {x, y, z, u, v, w}}, {-1 + x < 0 && -x < 0 && -y < 0 && -u < 0 && u*y != 0 && -u^2 < 0 && x - u^2*y == 0 && -(u*Sqrt[x]) < 0 && u^2 - z == 0 && -z < 0, {x, y, z, u}}, {-x < 0 && -s < 0 && u != 0 && -1 - E*u <= 0 && w != 0 && -1 - E*w <= 0 && s*w != 0 && v != 0 && -1 - E*v <= 0 && u*v*x - s^2*w*y*z == 0, {x, y, z, u, v, w, s}}, {-x < 0 && -s < 0 && w != 0 && -1 - E*w <= 0 && u != 0 && u*x != 0 && -1 - E*u <= 0 && v != 0 && -1 - E*v <= 0 && u*v*x - s^2*w*y*z == 0, {x, y, z, u, v, w, s}}, {-x < 0 && -s < 0 && w != 0 && -1 - E*w <= 0 && s*w != 0 && u != 0 && -1 - E*u <= 0 && v != 0 && -1 - E*v <= 0 && u*v*x - s^2*w*y*z == 0, {x, y, z, u, v, w, s}}, {-x < 0 && -s < 0 && w != 0 && -1 - E*w <= 0 && s*w != 0 && v != 0 && -1 - E*v <= 0 && u != 0 && -1 - E*u <= 0 && u*v*x - s^2*w*y*z == 0, {x, y, z, u, v, w, s}}, {-x < 0 && w != 0 && -1 - E*w <= 0 && v != 0 && -1 - E*v <= 0 && -s < 0 && s*w != 0 && u != 0 && -1 - E*u <= 0 && u*v*x - s^2*w*y*z == 0, {x, y, z, u, v, w, s}}, {-x < 0 && -1 + x != 0 && -x^2 < 0 && -x^4 < 0 && -1 + x^4 != 0 && -u < 0 && -(u*x) < 0 && -Sqrt[u*x] < 0 && -(u*y) < 0 && -1 + E*u*z <= 0, {x, y, z, u}}, {-x < 0 && -1 + x != 0 && -x^2 < 0 && -x^4 < 0 && -1 + x^4 != 0 && -u < 0 && -(u*x) < 0 && -Sqrt[u*x] < 0 && u*y < 0 && -1 + E*u*z <= 0, {x, y, z, u}}, {-x < 0 && -1 + x != 0 && -x^2 < 0 && -y < 0 && -(x*y) < 0 && -z < 0 && y*z != 0 && x - y*z^2 == 0 && -(Sqrt[x]*z) < 0 && -Sqrt[x*y] < 0, {x, y, z}}, {x < 0 && -1 - x < 0 && -1 + x^4 < 0 && -x^4 < 0 && z < 0 && x - Root[{-1 + Log[#1^4]*#1 & , -0.11610128014515555327872503793826204796`20.602059991306604}] <= 0 && -x + Root[{-1 + Log[#1^4]*#1 & , -0.69949057688577195637880493681113464044`20.28849263474288}] <= 0 && y == 0 && -(y*z) < 0 && -1 + E*y*z <= 0, {x, y, z}}, {-x <= 0 && x - z <= 0 && -z <= 0 && -(x*z) < 0 && x - y - z <= 0 && -y + z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && x^2 + 2*x*y + y^2 - 7*x*z + 2*y*z + z^2 < 0, {x, y, z}}, {-x <= 0 && x - z <= 0 && -z <= 0 && x*z < 0 && x - y - z <= 0 && -y + z <= 0 && -x + y - z <= 0 && -y <= 0 && -x - y + z <= 0 && -x^2 - 2*x*y - y^2 + 7*x*z - 2*y*z - z^2 < 0, {x, y, z}}, {-x <= 0 && x - z <= 0 && -z <= 0 && x - y - z <= 0 && -y + z <= 0 && -x + y - z <= 0 && -y <= 0 && -(x*y) < 0 && -x - y + z <= 0 && x^2 - 6*x*y + y^2 + 2*x*z + 2*y*z + z^2 < 0, {x, y, z}}, {-x <= 0 && x - z <= 0 && -z <= 0 && x - y - z <= 0 && -y + z <= 0 && -x + y - z <= 0 && -y <= 0 && x*y < 0 && -x - y + z <= 0 && -x^2 + 6*x*y - y^2 - 2*x*z - 2*y*z - z^2 < 0, {x, y, z}}, {-x <= 0 && x - z <= 0 && -z <= 0 && x - y - z <= 0 && -y + z <= 0 && -x + y - z <= 0 && -y <= 0 && -(y*z) < 0 && -x - y + z <= 0 && -x^2 - 2*x*y - y^2 - 2*x*z + 7*y*z - z^2 < 0, {x, y, z}}, {-x <= 0 && x - z <= 0 && -z <= 0 && x - y - z <= 0 && -y + z <= 0 && -x + y - z <= 0 && -y <= 0 && -(y*z) < 0 && -x - y + z <= 0 && x^2 + 2*x*y + y^2 + 2*x*z - 2*y*z + z^2 < 0, {x, y, z}}, {-x <= 0 && x - z <= 0 && -z <= 0 && x - y - z <= 0 && -y + z <= 0 && -x + y - z <= 0 && -y <= 0 && y*z < 0 && -x - y + z <= 0 && -x^2 - 2*x*y - y^2 - 2*x*z + 2*y*z - z^2 < 0, {x, y, z}}, {-x <= 0 && x - z <= 0 && -z <= 0 && x - y - z <= 0 && -y + z <= 0 && -x + y - z <= 0 && -y <= 0 && y*z < 0 && -x - y + z <= 0 && x^2 + 2*x*y + y^2 + 2*x*z - 7*y*z + z^2 < 0, {x, y, z}}, {-z <= 0 && x^2 == 0 && 36*x^2*y - x*z == 0 && 144*x^2*y^2 - 216*x*y*z + z^2 == 0 && -18*x^3 + 576*x^2*y^3 + 62*x*y^2*z - y*z^2 == 0 && -36*x^3*y + 448*x^2*y^4 + x^2*z + 84*x*y^3*z - 3*y^2*z^2 == 0 && -8*x^3*y^2 + 128*x^2*y^5 - x^2*y*z - 24*x*y^4*z + y^3*z^2 == 0 && x^4 - 32*x^3*y^3 + 256*x^2*y^6 - 2*x^2*y^2*z - 32*x*y^5*z + y^4*z^2 == 0 && -y < 0 && -x < 0, {x, y, z}}, {-z <= 0 && Sqrt[-u]*Sqrt[-(u*z)] != 0 && -(u^(3/2)*y*z) + Sqrt[-u]*x*Sqrt[-(u*z)]*Sqrt[u*z] == 0 && z != 0 && -Sqrt[-(u*z)] <= 0 && -Sqrt[-u] <= 0 && u <= 0 && -u <= 0 && u*z <= 0 && -(u*z) <= 0, {x, y, z, u}}, {x != 0 && -w < 0 && v != 0 && -1 - E*v <= 0 && v*w != 0 && u != 0 && -1 - E*u <= 0 && z != 0 && -1 - E*z <= 0 && u*x*y - v*w^2*z == 0, {x, y, z, u, v, w}}, {x != 0 && -w < 0 && v != 0 && -1 - E*v <= 0 && v*w != 0 && z != 0 && -1 - E*z <= 0 && u != 0 && -1 - E*u <= 0 && u*x*y - v*w^2*z == 0, {x, y, z, u, v, w}}, {s == 0 && -v < 0 && -w < 0 && -(v*w) + x == 0 && z != 0 && -1 - E*z <= 0 && u != 0 && -1 - E*u <= 0 && y != 0 && -1 - E*y <= 0 && y + s*w*z == 0, {x, y, z, u, v, w, s}}, {-u^2 + y^2 == 0 && -u^2 + x^2 + z^2 == 0 && x^2 - y^2 + z^2 == 0 && -u < 0 && -u - z < 0 && z < 0 && -y - z < 0 && -y <= 0 && -y^2 <= 0 && -x <= 0 && x <= 0, {x, y, z, u}}, {-u^2 + y^2 == 0 && -u^2 + x^2 + z^2 == 0 && x^2 - y^2 + z^2 == 0 && -u < 0 && -z < 0 && -u + z < 0 && -y + z < 0 && -y <= 0 && -y^2 <= 0 && -x <= 0 && x <= 0, {x, y, z, u}}, {-u^2 + y^2 == 0 && -u^2 + x^2 + z^2 == 0 && x^2 - y^2 + z^2 == 0 && u < 0 && u - z < 0 && z < 0 && -y - z < 0 && -y <= 0 && -y^2 <= 0 && -x <= 0 && x <= 0, {x, y, z, u}}, {-u^2 + y^2 == 0 && -u^2 + x^2 + z^2 == 0 && x^2 - y^2 + z^2 == 0 && u < 0 && -z < 0 && u + z < 0 && -y + z < 0 && -y <= 0 && -y^2 <= 0 && -x <= 0 && x <= 0, {x, y, z, u}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && 4 - y^2 - 4*z < 0 && -1 + z <= 0 && -x <= 0 && 2 - 2*Sqrt[2] - y < 0 && y < 0 && y + z < 0 && -2*x + z < 0 && -2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && 4 - y^2 - 4*z <= 0 && -x <= 0 && 2 - 2*Sqrt[2] - y < 0 && y < 0 && y + z < 0 && -2*x + z < 0 && -2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -4 + y^2 + 4*z <= 0 && -x <= 0 && 2 - 2*Sqrt[2] - y < 0 && y < 0 && y + z < 0 && -2*x + z < 0 && -2*x - y < 0, {x, y, z}}, {-2 + x*y*z == 0 && -1 + x^2 + y^2 - z^2 == 0 && -2*v*x + 3*x^2 - u*y*z == 0 && 2*v*y + z + u*x*z == 0 && y + u*x*y - 2*v*z == 0 && -2 - x < 0 && -2 + x < 0 && -2 - y < 0 && -2 + y < 0 && -2 - z < 0 && -2 + z < 0, {x, y, z, u, v}}, {-2 + x*y*z == 0 && -1 + x^2 + y^2 - z^2 == 0 && x^2*z - y^2*z == 0 && x^2*y + y*z^2 == 0 && x*y^2 + x*z^2 == 0 && -2 - x < 0 && -2 + x < 0 && -2 - y < 0 && -2 + y < 0 && -2 - z < 0 && -2 + z < 0, {x, y, z}}, {-1 - u < 0 && -4 + u < 0 && -3 + u < 0 && -1 + u - z < 0 && -1 - u^2 - y < 0 && -1 + u^2 - x < 0 && 2 - u <= 0 && -u <= 0 && -u + z <= 0 && u^2 + y <= 0 && -u^2 + x <= 0, {x, y, z, u}}, {-w < 0 && -v < 0 && -u < 0 && -z < 0 && -y < 0 && -x < 0 && -v + w < 0 && -u + v < 0 && -y + z < 0 && -x + y < 0 && v*x - w*x - u*y + w*y + u*z - v*z < 0, {x, y, z, u, v, w}}, {-w < 0 && z != 0 && -1 - E*z <= 0 && v != 0 && -1 - E*v <= 0 && v*w != 0 && u != 0 && -1 - E*u <= 0 && y != 0 && -1 - E*y <= 0 && -(v*w^2*y) + u*x*z == 0, {x, y, z, u, v, w}}, {-w < 0 && z != 0 && -1 - E*z <= 0 && v != 0 && -1 - E*v <= 0 && v*w != 0 && y != 0 && -1 - E*y <= 0 && u != 0 && -1 - E*u <= 0 && -(v*w^2*y) + u*x*z == 0, {x, y, z, u, v, w}}, {-v + w < 0 && -u + v < 0 && -y + z < 0 && -x + y < 0 && v*x - w*x - u*y + w*y + u*z - v*z < 0 && -w < 0 && -v < 0 && -u < 0 && -z < 0 && -y < 0 && -x < 0, {x, y, z, u, v, w}}, {-1 + x < 0 && -x < 0 && x - z < 0 && -1 + z < 0 && -z < 0 && -y < 0 && -(y^3*z) < 0 && -2*y^(3/2) + 5*y^(3/2)*Sqrt[z] + 5*Sqrt[y^3*z] == 0 && -z <= 0 && -y <= 0 && -(y^3*z) <= 0, {x, y, z}}, {-1 + x < 0 && -x < 0 && x - z < 0 && -1 + z < 0 && -z < 0 && y < 0 && y^3*z < 0 && -2*y^2 + 5*y^2*Sqrt[z] + 5*Sqrt[-y]*Sqrt[-(y^3*z)] == 0 && -z <= 0 && y <= 0 && y^3*z <= 0, {x, y, z}}, {-x < 0 && -s < 0 && w != 0 && -1 - E*w <= 0 && s*w != 0 && s^2*w != 0 && v != 0 && -1 - E*v <= 0 && u != 0 && -1 - E*u <= 0 && u*v*x - s^2*w*y*z == 0, {x, y, z, u, v, w, s}}, {-y < 0 && x != 0 && -w < 0 && v != 0 && -1 - E*v <= 0 && v*w != 0 && z != 0 && -1 - E*z <= 0 && u != 0 && -1 - E*u <= 0 && u*x*y - v*w^2*z == 0, {x, y, z, u, v, w}}, {-y < 0 && x != 0 && x*y != 0 && -w < 0 && v != 0 && -1 - E*v <= 0 && z != 0 && -1 - E*z <= 0 && u != 0 && -1 - E*u <= 0 && u*x*y - v*w^2*z == 0, {x, y, z, u, v, w}}, {-x <= 0 && -z <= 0 && -y < 0 && -u + y < 0 && -1 + u < 0 && -u < 0 && -Root[u^2*z^4 + (-2*u*z^2 - 12*u*z^3 - 2*u*z^4)*#1^2 + (1 - 4*z + 6*z^2 - 4*z^3 + z^4)*#1^4 & , 1] < 0 && Root[-#1^2 + u*#1^4 & , 1] <= 0 && -Root[u^2*z^4 + (-2*u*z^2 - 12*u*z^3 - 2*u*z^4)*#1^2 + (1 - 4*z + 6*z^2 - 4*z^3 + z^4)*#1^4 & , 1]^2 <= 0 && x^4 - 2*u*x^2*z^2 + u^2*z^4 - 4*x^3*z* Root[u^2*z^4 + (-2*u*z^2 - 12*u*z^3 - 2*u*z^4)*#1^2 + (1 - 4*z + 6*z^2 - 4*z^3 + z^4)*#1^4 & , 1] - 12*u*x*z^3*Root[u^2*z^4 + (-2*u*z^2 - 12*u*z^3 - 2*u*z^4)*#1^2 + (1 - 4*z + 6*z^2 - 4*z^3 + z^4)*#1^4 & , 1] + 6*x^2*z^2*Root[u^2*z^4 + (-2*u*z^2 - 12*u*z^3 - 2*u*z^4)*#1^2 + (1 - 4*z + 6*z^2 - 4*z^3 + z^4)*#1^4 & , 1]^2 - 2*u*z^4*Root[u^2*z^4 + (-2*u*z^2 - 12*u*z^3 - 2*u*z^4)*#1^2 + (1 - 4*z + 6*z^2 - 4*z^3 + z^4)*#1^4 & , 1]^2 - 4*x*z^3*Root[u^2*z^4 + (-2*u*z^2 - 12*u*z^3 - 2*u*z^4)*#1^2 + (1 - 4*z + 6*z^2 - 4*z^3 + z^4)*#1^4 & , 1]^3 + z^4*Root[u^2*z^4 + (-2*u*z^2 - 12*u*z^3 - 2*u*z^4)*#1^2 + (1 - 4*z + 6*z^2 - 4*z^3 + z^4)*#1^4 & , 1]^4 == 0 && -x^2 + u*Root[-#1^2 + u*#1^4 & , 1]^4 == 0, {x, y, z, u}}, {-1 - y <= 0 && -1 + y <= 0 && -1 + y^2 + z^2 == 0 && 1 - 4*x^2 + 22*x^4 - 4*x^6 + x^8 - 8*x^2*y^2 + 16*x^4*y^2 - 8*x^6*y^2 == 0 && -1 - z <= 0 && -1 + z <= 0 && x != 0 && 1 + x^2 != 0 && -x + x^3 != 0 && -1 + x^2 != 0 && 1 + x^2 != 0, {x, y, z}}, {z != 0 && -1 - E*z <= 0 && v != 0 && -1 - E*v <= 0 && u != 0 && -1 - E*u <= 0 && y != 0 && -1 - E*y <= 0 && -w < 0 && v*w != 0 && -(v*w^2*y) + u*x*z == 0, {x, y, z, u, v, w}}, {z != 0 && -1 - E*z <= 0 && v != 0 && -1 - E*v <= 0 && y != 0 && -1 - E*y <= 0 && u != 0 && -1 - E*u <= 0 && -w < 0 && v*w != 0 && -(v*w^2*y) + u*x*z == 0, {x, y, z, u, v, w}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && 4 - y^2 - 4*z < 0 && -1 + z <= 0 && -x <= 0 && -2 - y < 0 && -y - z < 0 && -4 + y^2 + 4*z < 0 && 2*x - z < 0 && 2*x + y < 0 && -2 + 2*Sqrt[2] + y <= 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && 4 - y^2 - 4*z < 0 && -1 + z <= 0 && -x <= 0 && -2 - y < 0 && y + z < 0 && -4 + y^2 + 4*z < 0 && -2*x + z < 0 && -2*x - y < 0 && -2 + 2*Sqrt[2] + y <= 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && 4 - y^2 - 4*z < 0 && -1 + z <= 0 && -x <= 0 && 2 - 2*Sqrt[2] - y < 0 && -y - z < 0 && y < 0 && y + z < 0 && 2*x - z < 0 && 2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && 4 - y^2 - 4*z < 0 && -1 + z <= 0 && -x <= 0 && -z < 0 && -y + z < 0 && -y < 0 && -2*x + z < 0 && -2*x + y < 0 && 2 - 2*Sqrt[2] + y <= 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && 4 - y^2 - 4*z <= 0 && -x <= 0 && -2 - y < 0 && -y - z < 0 && -4 + y^2 + 4*z < 0 && 2*x - z < 0 && 2*x + y < 0 && -2 + 2*Sqrt[2] + y <= 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && 4 - y^2 - 4*z <= 0 && -x <= 0 && -2 - y < 0 && y + z < 0 && -4 + y^2 + 4*z < 0 && -2*x + z < 0 && -2*x - y < 0 && -2 + 2*Sqrt[2] + y <= 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && 4 - y^2 - 4*z <= 0 && -x <= 0 && 2 - 2*Sqrt[2] - y < 0 && -y - z < 0 && y < 0 && y + z < 0 && 2*x - z < 0 && 2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && 4 - y^2 - 4*z <= 0 && -x <= 0 && -z < 0 && -y + z < 0 && -y < 0 && -2*x + z < 0 && -2*x + y < 0 && 2 - 2*Sqrt[2] + y <= 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && -4 + y^2 + 4*z <= 0 && -x <= 0 && -z < 0 && -y + z < 0 && -y < 0 && -2*x + z < 0 && -2*x + y < 0 && 2 - 2*Sqrt[2] + y <= 0, {x, y, z}}, {-x < 0 && -w < 0 && v != 0 && -1 - E*v <= 0 && v*w != 0 && y != 0 && -1 - E*y <= 0 && u != 0 && -1 - E*u <= 0 && z != 0 && -1 - E*z <= 0 && -(v*w^2*y) + u*x*z == 0, {x, y, z, u, v, w}}, {-x < 0 && -w < 0 && z != 0 && -1 - E*z <= 0 && v != 0 && -1 - E*v <= 0 && v*w != 0 && y != 0 && -1 - E*y <= 0 && u != 0 && -1 - E*u <= 0 && -(v*w^2*y) + u*x*z == 0, {x, y, z, u, v, w}}, {-x < 0 && -w < 0 && z != 0 && x*z != 0 && -1 - E*z <= 0 && v != 0 && -1 - E*v <= 0 && y != 0 && -1 - E*y <= 0 && u != 0 && -1 - E*u <= 0 && -(v*w^2*y) + u*x*z == 0, {x, y, z, u, v, w}}, {-x < 0 && v != 0 && -1 - E*v <= 0 && y != 0 && -1 - E*y <= 0 && u != 0 && -1 - E*u <= 0 && -w < 0 && v*w != 0 && z != 0 && -1 - E*z <= 0 && -(v*w^2*y) + u*x*z == 0, {x, y, z, u, v, w}}, {x < 0 && -2 - x < 0 && -4 + x < 0 && -2 + x < 0 && -1 + x - y < 0 && -1 - x^2 - z < 0 && -1 - u + x^2 < 0 && 3 - x <= 0 && -x + y <= 0 && -x <= 0 && u - x^2 <= 0 && x^2 + z <= 0, {x, y, z, u}}, {x < 0 && -1 - x < 0 && -4 + x < 0 && -3 + x < 0 && -1 + x - y < 0 && -1 - x^2 - z < 0 && -1 - u + x^2 < 0 && 2 - x <= 0 && -x + y <= 0 && -x <= 0 && u - x^2 <= 0 && x^2 + z <= 0, {x, y, z, u}}, {x < 0 && 1 - x < 0 && -5 + x < 0 && -4 + x < 0 && -1 + x < 0 && -1 + x - y < 0 && -1 - x^2 - z < 0 && -1 - u + x^2 < 0 && -x + y <= 0 && -x <= 0 && u - x^2 <= 0 && x^2 + z <= 0, {x, y, z, u}}, {x < 0 && -4 + x < 0 && -2 + x < 0 && -x < 0 && -1 + x - y < 0 && -1 - x^2 - z < 0 && -1 - u + x^2 < 0 && 1 - x <= 0 && -x + y <= 0 && -x <= 0 && u - x^2 <= 0 && x^2 + z <= 0, {x, y, z, u}}, {-x <= 0 && -2 - x < 0 && -4 + x < 0 && -2 + x < 0 && -1 + x - y < 0 && -1 - x^2 - z < 0 && -1 - u + x^2 < 0 && 3 - x <= 0 && -x + y <= 0 && -x <= 0 && u - x^2 <= 0 && x^2 + z <= 0, {x, y, z, u}}, {-x <= 0 && -1 - x < 0 && -4 + x < 0 && -3 + x < 0 && -1 + x - y < 0 && -1 - x^2 - z < 0 && -1 - u + x^2 < 0 && 2 - x <= 0 && -x + y <= 0 && -x <= 0 && u - x^2 <= 0 && x^2 + z <= 0, {x, y, z, u}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && 4 - y^2 - 4*z < 0 && -1 + z <= 0 && -x <= 0 && -z < 0 && -2 + 2*Sqrt[2] - y < 0 && -2 + y < 0 && y - z < 0 && -4 + y^2 + 4*z < 0 && 2*x - z < 0 && 2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && 4 - y^2 - 4*z < 0 && -1 + z <= 0 && -x <= 0 && -z < 0 && -2 + 2*Sqrt[2] - y < 0 && -y + z < 0 && -2 + y < 0 && -4 + y^2 + 4*z < 0 && -2*x + z < 0 && -2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && 4 - y^2 - 4*z < 0 && -1 + z <= 0 && -x <= 0 && -z < 0 && -y + z < 0 && -y < 0 && y - z < 0 && 2*x - z < 0 && 2*x - y < 0 && 2 - 2*Sqrt[2] + y <= 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && 4 - y^2 - 4*z <= 0 && -x <= 0 && -z < 0 && -2 + 2*Sqrt[2] - y < 0 && -2 + y < 0 && y - z < 0 && -4 + y^2 + 4*z < 0 && 2*x - z < 0 && 2*x - y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && 4 - y^2 - 4*z <= 0 && -x <= 0 && -z < 0 && -2 + 2*Sqrt[2] - y < 0 && -y + z < 0 && -2 + y < 0 && -4 + y^2 + 4*z < 0 && -2*x + z < 0 && -2*x + y < 0, {x, y, z}}, {-1 + x^2 + z == 0 && -z < 0 && 2 - 2*Sqrt[2] + z < 0 && -1 + z <= 0 && 4 - y^2 - 4*z <= 0 && -x <= 0 && -z < 0 && -y + z < 0 && -y < 0 && y - z < 0 && 2*x - z < 0 && 2*x - y < 0 && 2 - 2*Sqrt[2] + y <= 0, {x, y, z}}, {1 + u - x^2 - 3*y*z - 4*z^3 == 0 && u - 2*v*x - 4*x^3 == 0 && -2*z + 3*v*z == 0 && -2*y + 3*v*y + 12*v*z^2 == 0 && 27*u^2 - v - x == 0 && -3 - x < 0 && -3 + x < 0 && -3 - y < 0 && -3 + y < 0 && -3 - z < 0 && -3 + z < 0 && -3 - u < 0 && -3 + u < 0, {x, y, z, u, v}}, {x^2 == 0 && x*z^2 == 0 && z^4 == 0 && x^3 == 0 && x^2*z^2 == 0 && x*z^4 == 0 && -10587392*x^4 + 1521*z^6 == 0 && x^3*z^2 == 0 && x^2*z^4 == 0 && -2688*x^5 + x*z^6 == 0 && -14160*x^4*z^2 + z^8 == 0 && x^3*z^4 == 0 && -11664*x^6 + x^2*z^6 == 0 && -y < 0 && -x < 0, {x, y, z}}, {-z <= 0 && x^2 == 0 && x*z == 0 && z^2 == 0 && x^3 == 0 && x^2*z == 0 && x*z^2 == 0 && -10587392*x^4 + 1521*z^3 == 0 && x^3*z == 0 && x^2*z^2 == 0 && -2688*x^5 + x*z^3 == 0 && -14160*x^4*z + z^4 == 0 && x^3*z^2 == 0 && -11664*x^6 + x^2*z^3 == 0 && -y < 0 && -x < 0, {x, y, z}}, {Pi + 2*Pi*x - 2*y == 0, {x, y, z}}, {u + y == 0, {x, y, z, u}}, {-1 + Pi + 2*Pi*x + y == 0, {x, y, z}}, {Pi*x - z == 0, {x, y, z}}, {x - 69*y + 5*u^2*z == 0, {x, y, z, u}}, {x - 5*y + 5*u^2*z == 0, {x, y, z, u}}, {x - y + 5*u^2*z == 0, {x, y, z, u}}, {x - 5*y - 64*z + 5*u^2*z == 0, {x, y, z, u}}, {x - y - 64*z + 5*u^2*z == 0, {x, y, z, u}}, {u*y + x*z == 0, {x, y, z, u}}, {-u + 4*x*z - 6*y*z == 0, {x, y, z, u}}, {Pi*x - 4*y*z == 0, {x, y, z}}, {-4*Pi^2*x^2 + y + 4*Pi*x*z - 2*z^2 == 0, {x, y, z}}, {-Pi^2 - 4*Pi^2*x - 4*Pi^2*x^2 + y + 2*Pi*z + 4*Pi*x*z - 2*z^2 == 0, {x, y, z}}, {x - y^2 - z^2 == 0, {x, y, z}}, {x - y - y^2 - z - z^2 == 0, {x, y, z}}, {x - 69*y + 5*y*z^2 == 0, {x, y, z}}, {x - 5*y + 5*y*z^2 == 0, {x, y, z}}, {y + x*z^2 + z^5 == 0, {x, y, z}}, {-u < 0, {x, y, z, u}}, {u < 0, {x, y, z, u}}, {-v < 0, {x, y, z, u, v}}, {v < 0, {x, y, z, u, v}}, {1 - x - y < 0, {x, y, z}}, {-y < 0, {x, y, z}}, {-y < 0, {x, y, z, u}}, {x + 2*y - 2*z < 0, {x, y, z}}, {-z < 0, {x, y, z, u}}, {x^2*y*z < 0, {x, y, z}}, {-(u*y) - x*z < 0, {x, y, z, u}}, {u*y + x*z < 0, {x, y, z, u}}, {-x + y*z < 0, {x, y, z}}, {-x - u*y + y*z < 0, {x, y, z, u}}, {x^2 - 3*y^2 - 3*z^2 < 0, {x, y, z}}, {1 - x^2 - y^2 - z^2 < 0, {x, y, z}}, {100 - x^2 - y^2 - z^2 < 0, {x, y, z}}, {x^2 - y^2 - z^2 < 0, {x, y, z}}, {-x^2 + y^2 + z^2 < 0, {x, y, z}}, {-Sqrt[x^2 + y^2] + z^2 < 0, {x, y, z}}, {u^2 - 8*u*x + 16*x^2 + 6*u*y^2 - 24*x*y^2 + 9*y^4 - 4*u*z + 16*x*z - 12*y^2*z + 4*z^2 < 0, {x, y, z, u}}, {y^2 - x*z^2 < 0, {x, y, z}}, {-1 - y + x*z^2 < 0, {x, y, z}}, {-1 - x + y*z^2 < 0, {x, y, z}}, {x^2*y^2 - x^2*y*z - x*y^2*z + x^2*z^2 - x*y*z^2 + y^2*z^2 < 0, {x, y, z}}, {82 + 322*y + 487*y^2 + 324*y^3 + 81*y^4 - 214*z - 650*y*z - 648*y^2*z - 216*y^3*z + 217*z^2 + 432*y*z^2 + 216*y^2*z^2 - 96*z^3 - 96*y*z^3 + 16*z^4 < 0, {x, y, z}}, {-x + Sqrt[16 - 40*y + 33*y^2 - 10*y^3 + y^4 + 17*z^2 - 10*y*z^2 + 2*y^2*z^2 + z^4] < 0, {x, y, z}}, {-(x^2*y*z) <= 0, {x, y, z}}, {-u^4 - x - u*y - u^2*z <= 0, {x, y, z, u}}, {-(u*y) - x*z <= 0, {x, y, z, u}}, {u*y + x*z <= 0, {x, y, z, u}}, {x - y*z <= 0, {x, y, z}}, {-1 + x*y*z <= 0, {x, y, z}}, {x^2 - y^2 - z^2 <= 0, {x, y, z}}, {x^2 + y^2 - z^2 <= 0, {x, y, z}}, {-100 + x^2 + y^2 + z^2 <= 0, {x, y, z}}, {-1 + x^2 + y^2 + z^2 <= 0, {x, y, z}}, {-x^2 + 3*y^2 + 3*z^2 <= 0, {x, y, z}}, {-36 + x^2 + 4*y^2 + 9*z^2 <= 0, {x, y, z}}, {-1 - E*x + 5*E*y*z^2 <= 0, {x, y, z}}, {-1 - 5*E*x - 64*E*y + 5*E*y*z^2 <= 0, {x, y, z}}, {-1 - E*x - 64*E*y + 5*E*y*z^2 <= 0, {x, y, z}}, {81 + 322*y + 487*y^2 + 324*y^3 + 81*y^4 - 214*z - 650*y*z - 648*y^2*z - 216*y^3*z + 217*z^2 + 432*y*z^2 + 216*y^2*z^2 - 96*z^3 - 96*y*z^3 + 16*z^4 <= 0, {x, y, z}}, {82 + 322*y + 487*y^2 + 324*y^3 + 81*y^4 - 214*z - 650*y*z - 648*y^2*z - 216*y^3*z + 217*z^2 + 432*y*z^2 + 216*y^2*z^2 - 96*z^3 - 96*y*z^3 + 16*z^4 <= 0, {x, y, z}}, {(x == 0 && y == 0) || (y == 0 && 1 + y^2 == 0), {x, y, z}}, {(x == 0 && -z < 0) || (y == 0 && -z < 0), {x, y, z}}, {(y == 0 && -z < 0) || (x + 2*u*Log[2] == 0 && z == 0 && -z < 0), {x, y, z, u}}, {(x - y - z == 0 && x^2 - y*z == 0) || (y - z == 0 && x^2 - y*z == 0), {x, y, z}}, {(-5 + z == 0 && -x + y == 0) || (z == 0 && -x + y == 0), {x, y, z, u}}, {(-5 + z == 0 && x + y == 0) || (z == 0 && x + y == 0), {x, y, z, u}}, {(z == 0 && -x + 5*y*z^2 == 0) || (y == 0 && -x + 5*y*z^2 == 0), {x, y, z}}, {(z == 0 && -5*x - 64*y + 5*y*z^2 == 0) || (y == 0 && -5*x - 64*y + 5*y*z^2 == 0), {x, y, z}}, {(z == 0 && -x - 64*y + 5*y*z^2 == 0) || (y == 0 && -x - 64*y + 5*y*z^2 == 0), {x, y, z}}, {(z == 0 && x - u^2*y + 5*y*z^2 == 0) || (y == 0 && x - u^2*y + 5*y*z^2 == 0), {x, y, z, u}}, {(1 - x < 0 && -(x*y) - z + x*z < 0) || (-1 + x < 0 && x*y + z - x*z < 0), {x, y, z}}, {(71 - x < 0 && y - z*Log[5] < 0) || (-71 + x <= 0 && 71 - x < 0), {x, y, z}}, {(-x < 0 && y^2 - x*z < 0) || (x < 0 && -y^2 + x*z < 0), {x, y, z}}, {(-x < 0 && -y^2 + x*z < 0) || (x < 0 && y^2 - x*z < 0), {x, y, z}}, {(-x < 0 && -1 + y - 2*x*z <= 0) || (x < 0 && 1 - y + 2*x*z <= 0), {x, y, z}}, {(-x < 0 && -1 - x*y - 2*x*z <= 0) || (x < 0 && 1 + x*y + 2*x*z <= 0), {x, y, z}}, {(1 - y < 0 && -y + z <= 0) || (1 - y < 0 && -1 + x^2 + z^2 < 0), {x, y, z}}, {(1 - y < 0 && -y + z <= 0) || (1 - y < 0 && 1 - x^2 - z^2 <= 0), {x, y, z}}, {(-y < 0 && -(x*y) - z < 0) || (y < 0 && x*y + z < 0), {x, y, z}}, {(-y < 0 && -(x*y) - z + y*z < 0) || (y < 0 && x*y + z - y*z < 0), {x, y, z}}, {(-y < 0 && u*y - z^2 < 0) || (y < 0 && -(u*y) + z^2 < 0), {x, y, z, u}}, {(-y < 0 && -(u*y) + z^2 < 0) || (y < 0 && u*y - z^2 < 0), {x, y, z, u}}, {(-y < 0 && 5*x + y - 5*y*z^2 < 0) || (y < 0 && -5*x - y + 5*y*z^2 < 0), {x, y, z}}, {(-y^2 < 0 && u*y^2 - x^2*z < 0) || (y^2 < 0 && -(u*y^2) + x^2*z < 0), {x, y, z, u}}, {(-y^2 < 0 && -(u*y^2) + x^2*z < 0) || (y^2 < 0 && u*y^2 - x^2*z < 0), {x, y, z, u}}, {(-(x^2*y^2) < 0 && u^2*x^2 - x^2*y^2 + y^2*z^2 < 0) || (x^2*y^2 < 0 && -(u^2*x^2) + x^2*y^2 - y^2*z^2 < 0), {x, y, z, u}}, {(y - 2*z < 0 && 71 - x < 0) || (-71 + x <= 0 && 71 - x < 0), {x, y, z}}, {(y - z < 0 && 71 - x < 0) || (-71 + x <= 0 && 71 - x < 0), {x, y, z}}, {(y - z < 0 && -x < 0) || (-x < 0 && x <= 0), {x, y, z}}, {(-z < 0 && 1 + x*y + z < 0) || (z < 0 && -1 - x*y - z < 0), {x, y, z}}, {(-z < 0 && u^2 - v*z < 0) || (z < 0 && -u^2 + v*z < 0), {x, y, z, u, v}}, {(-z < 0 && -u^2 + v*z < 0) || (z < 0 && u^2 - v*z < 0), {x, y, z, u, v}}, {(x*y*z < 0 && -1 - x*y*z <= 0) || (-(x*y*z) <= 0 && -1 + x*y*z <= 0), {x, y, z}}, {(-u + z < 0 && -y < 0) || (-x <= 0 && -y < 0), {x, y, z, u}}, {(-u + z < 0 && y < 0) || (x <= 0 && y < 0), {x, y, z, u}}, {(y + z < 0 && 71 - x < 0) || (-71 + x <= 0 && 71 - x < 0), {x, y, z}}, {(y - u*z + v*z < 0 && -x < 0) || (-x < 0 && x <= 0), {x, y, z, u, v}}, {(5*z - z^2 < 0 && x + y + 20*z*Log[5] - 4*z^2*Log[5] < 0) || (-5*z + z^2 < 0 && -x - y - 20*z*Log[5] + 4*z^2*Log[5] < 0), {x, y, z}}, {(z - z^3 < 0 && -y + 4*x*z - 2*y*z^2 - 4*x*z^3 - y*z^4 < 0) || (-z + z^3 < 0 && y - 4*x*z + 2*y*z^2 + 4*x*z^3 + y*z^4 < 0), {x, y, z}}, {(-(y*Log[2]) < 0 && -(x*y) - Log[2] + z*Log[2] <= 0) || (y*Log[2] < 0 && x*y + Log[2] - z*Log[2] <= 0), {x, y, z}}, {(-x + y <= 0 && -y + z < 0) || (x - y <= 0 && -x + z < 0), {x, y, z}}, {(y - z <= 0 && -x < 0) || (-x < 0 && x <= 0), {x, y, z}}, {(-z <= 0 && y < 0) || (-z <= 0 && y - x*z < 0), {x, y, z}}, {(x^2*y^2 - x^2*y*z - x*y^2*z + x*y*z^2 != 0 && x + y - z == 0) || (x^2*y^2 - x^2*y*z - x*y^2*z + x*y*z^2 != 0 && 2*x*y - x*z - y*z == 0), {x, y, z}}, {(-1 + x == 0 && x == 0 && x < 0) || (x == 0 && y == 0 && x < 0), {x, y, z}}, {(x == 0 && -1 + y == 0 && -x < 0) || (-1 + y == 0 && z == 0 && -x < 0), {x, y, z}}, {(x == 0 && y == 0 && -u < 0) || (z == 0 && -u < 0), {x, y, z, u}}, {(x == 0 && z == 0 && -u^3 + u*y + x*z == 0) || (x == 0 && y - z^2 == 0 && -u^3 + u*y + x*z == 0), {x, y, z, u}}, {(x == 0 && -y < 0 && -u < 0) || (z == 0 && -y < 0 && -u < 0), {x, y, z, u}}, {(x == 0 && z != 0 && z == 0) || (x == 0 && z != 0 && y == 0), {x, y, z}}, {(-3 + 2*x - 2*y == 0 && -2 + 3*x - 3*y == 0 && -z < 0) || (-3 + 2*x - 2*y == 0 && -2 + 3*x - 3*y == 0 && y <= 0), {x, y, z}}, {(2 + x - y == 0 && -1 + x - y == 0 && -z < 0) || (2 + x - y == 0 && -1 + x - y == 0 && y <= 0), {x, y, z}}, {(y == 0 && -5 + 5*y^2 - z == 0 && -z < 0) || (x == 0 && -z < 0), {x, y, z}}, {(y == 0 && z == 0 && -u^3 + u*x + y*z == 0) || (y == 0 && x - z^2 == 0 && -u^3 + u*x + y*z == 0), {x, y, z, u}}, {(u + y == 0 && z == 0 && -z < 0) || (x == 0 && -z < 0), {x, y, z, u}}, {(-1 + x + y == 0 && 2 + x + y == 0 && -z < 0) || (-1 + x + y == 0 && 2 + x + y == 0 && y <= 0), {x, y, z}}, {(-3 + 2*x + 2*y == 0 && -2 + 3*x + 3*y == 0 && -z < 0) || (-3 + 2*x + 2*y == 0 && -2 + 3*x + 3*y == 0 && y <= 0), {x, y, z}}, {(z == 0 && x - y == 0 && -z < 0) || (x == 0 && x - y == 0 && -z < 0), {x, y, z}}, {(z == 0 && x + y == 0 && -z < 0) || (z == 0 && x + y == 0 && z < 0), {x, y, z}}, {(z == 0 && -y < 0 && x - 5*y*z^2 < 0) || (z == 0 && y < 0 && -x + 5*y*z^2 < 0), {x, y, z}}, {(y + z == 0 && u == 0 && -u < 0) || (x == 0 && -u < 0), {x, y, z, u}}, {(-u < 0 && -y < 0 && u*y - z^2 < 0) || (-u < 0 && y < 0 && -(u*y) + z^2 < 0), {x, y, z, u}}, {(-u < 0 && -z < 0 && -x - y - 5*u^2*z < 0) || (-u < 0 && z < 0 && x + y + 5*u^2*z < 0), {x, y, z, u}}, {(u < 0 && -y < 0 && -(u*y) + z^2 < 0) || (u < 0 && y < 0 && u*y - z^2 < 0), {x, y, z, u}}, {(-v < 0 && -z < 0 && -u^2 + v*z < 0) || (-v < 0 && z < 0 && u^2 - v*z < 0), {x, y, z, u, v}}, {(v < 0 && -z < 0 && u^2 - v*z < 0) || (v < 0 && z < 0 && -u^2 + v*z < 0), {x, y, z, u, v}}, {(-x < 0 && -x + 2*y <= 0 && -2*x*y + z^2 <= 0) || (x < 0 && -x + 2*y <= 0 && 2*x*y - z^2 <= 0), {x, y, z}}, {(-y < 0 && x - 2*y*z < 0 && x != 0) || (y < 0 && -x + 2*y*z < 0 && x != 0), {x, y, z}}, {(-y < 0 && 1 + y*z < 0 && -(x*y) + Log[2] == 0) || (y < 0 && -1 - y*z < 0 && -(x*y) + Log[2] == 0), {x, y, z}}, {(-y < 0 && -1 + 2*y*z < 0 && -(x*y) + Log[2] == 0) || (y < 0 && 1 - 2*y*z < 0 && -(x*y) + Log[2] == 0), {x, y, z}}, {(-y < 0 && z - y*Log[21] < 0 && -(x*y) - z + y*z < 0) || (y < 0 && -z + y*Log[21] < 0 && x*y + z - y*z < 0), {x, y, z}}, {(-y < 0 && 1 + z <= 0 && x*y + z <= 0) || (y < 0 && 1 + z <= 0 && -(x*y) - z <= 0), {x, y, z}}, {(-y < 0 && -x + y*z <= 0 && -4 - u + 2*z == 0) || (y < 0 && x - y*z <= 0 && -4 - u + 2*z == 0), {x, y, z, u}}, {(-y < 0 && x != 0 && -x - 2*y*z < 0) || (y < 0 && x != 0 && x + 2*y*z < 0), {x, y, z}}, {(-(x^2*y) < 0 && -z^2 < 0 && -9*x^2 + 6*Sqrt[x^2*y]*z + z^2 - y*z^2 < 0) || (-(x^2*y) < 0 && z^2 < 0 && 9*x^2 - 6*Sqrt[x^2*y]*z - z^2 + y*z^2 < 0), {x, y, z}}, {(-y^2 < 0 && -u < 0 && u*y^2 - x^2*z < 0) || (y^2 < 0 && -u < 0 && -(u*y^2) + x^2*z < 0), {x, y, z, u}}, {(-y^2 < 0 && u < 0 && -(u*y^2) + x^2*z < 0) || (y^2 < 0 && u < 0 && u*y^2 - x^2*z < 0), {x, y, z, u}}, {(-1 - z < 0 && -y < 0 && -x + y*z < 0) || (-1 - z < 0 && y < 0 && x - y*z < 0), {x, y, z}}, {(-z < 0 && -x < 0 && -y^2 + x*z < 0) || (-z < 0 && x < 0 && y^2 - x*z < 0), {x, y, z}}, {(-z < 0 && 1 + x*y < 0 && -1 - x*y - z < 0) || (z < 0 && -1 - x*y < 0 && 1 + x*y + z < 0), {x, y, z}}, {(-z < 0 && y - 2*Pi*x*z < 0 && -y - Pi*z + 2*Pi*x*z < 0) || (z < 0 && y + Pi*z - 2*Pi*x*z < 0 && -y + 2*Pi*x*z < 0), {x, y, z}}, {(-z < 0 && y <= 0 && -(u*y) - Log[2] + x*Log[2] < 0) || (y == 0 && -z < 0), {x, y, z, u}}, {(-z < 0 && -1/4 + E*y*z <= 0 && -x < 0) || (z < 0 && -1/4 + E*y*z <= 0 && x < 0), {x, y, z}}, {(z < 0 && -x < 0 && y^2 - x*z < 0) || (z < 0 && x < 0 && -y^2 + x*z < 0), {x, y, z}}, {(z < 0 && -u + z*Log[21] < 0 && u + x < 0) || (z < 0 && -u + z*Log[21] < 0 && y < 0), {x, y, z, u}}, {(-(y*Log[2]) < 0 && -z < 0 && -x - y*z*Log[2] < 0) || (y*Log[2] < 0 && -z < 0 && x + y*z*Log[2] < 0), {x, y, z}}, {(-(y*Log[2]) < 0 && -z < 0 && x + y*z*Log[2] < 0) || (y*Log[2] < 0 && -z < 0 && -x - y*z*Log[2] < 0), {x, y, z}}, {(-u <= 0 && z == 0 && x - u*y + 5*y*z^2 == 0) || (-u <= 0 && y == 0 && x - u*y + 5*y*z^2 == 0), {x, y, z, u}}, {(-u <= 0 && -z < 0 && u - v*z < 0) || (-u <= 0 && z < 0 && -u + v*z < 0), {x, y, z, u, v}}, {(-u <= 0 && -z < 0 && -u + v*z < 0) || (-u <= 0 && z < 0 && u - v*z < 0), {x, y, z, u, v}}, {(-x <= 0 && 1 - y < 0 && -y + z <= 0) || (-x <= 0 && 1 - y < 0 && -1 + x + z^2 < 0), {x, y, z}}, {(-x <= 0 && 1 - y < 0 && -y + z <= 0) || (-x <= 0 && 1 - y < 0 && 1 - x - z^2 <= 0), {x, y, z}}, {(-x <= 0 && -z < 0 && 5*y + Sqrt[5]*Sqrt[x/z]*z < 0) || (x <= 0 && z < 0 && -5*y - Sqrt[5]*Sqrt[x/z]*z < 0), {x, y, z}}, {(x <= 0 && -y < 0 && -x + 2*y*z < 0) || (x <= 0 && y < 0 && x - 2*y*z < 0), {x, y, z}}, {(-1 - E*x <= 0 && -z < 0 && x + 4*y*z <= 0) || (-1 - E*x <= 0 && z < 0 && -x - 4*y*z <= 0), {x, y, z}}, {(-y <= 0 && -x < 0 && y - x*z < 0) || (-y <= 0 && x < 0 && -y + x*z < 0), {x, y, z}}, {(-y <= 0 && -x < 0 && -y + x*z < 0) || (-y <= 0 && x < 0 && y - x*z < 0), {x, y, z}}, {(y <= 0 && -(z*Log[2]) < 0 && -(y*z) - x*Log[2] < 0) || (y <= 0 && z*Log[2] < 0 && y*z + x*Log[2] < 0), {x, y, z}}, {(y <= 0 && -(z*Log[2]) < 0 && -(y*z) + x*Log[2] < 0) || (y <= 0 && z*Log[2] < 0 && y*z - x*Log[2] < 0), {x, y, z}}, {(E*x*y - z <= 0 && z != 0 && -(E*z) < 0) || (-(E*x*y) + z <= 0 && z != 0 && E*z < 0), {x, y, z}}, {(-z <= 0 && -y < 0 && u*y - z < 0) || (-z <= 0 && y < 0 && -(u*y) + z < 0), {x, y, z, u}}, {(-z <= 0 && -y < 0 && -(u*y) + z < 0) || (-z <= 0 && y < 0 && u*y - z < 0), {x, y, z, u}}, {(-z <= 0 && -y < 0 && 5*x + y - 5*y*z < 0) || (-z <= 0 && y < 0 && -5*x - y + 5*y*z < 0), {x, y, z}}, {(-2*x*y + y^2 + z^2 <= 0 && u^2 - y^2 - z^2 <= 0 && -x < 0) || (u^2 - 2*x*y <= 0 && -u^2 + y^2 + z^2 < 0 && -x < 0), {x, y, z, u}}, {(u != 0 && y == 0 && -z < 0) || (u != 0 && x - Log[2] + u*Log[2] == 0 && z == 0 && -z < 0), {x, y, z, u}}, {(u == 0 && z == 0 && -z < 0 && -u <= 0) || (u == 0 && z == 0 && z < 0 && -u <= 0), {x, y, z, u}}, {(x == 0 && y == 0 && -z < 0 && -y <= 0) || (x == 0 && y == 0 && z < 0 && y <= 0), {x, y, z}}, {(x == 0 && y == 0 && -1 - 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6*Sqrt[x^2*y]*z + z^2 - y*z^2 < 0), {x, y, z}}, {(-u < 0 && 1 + u^2 < 0 && 2*u + z + u^2*z == 0 && -2*u + x + u^2*x == 0 && -2*u + y + u^2*y == 0) || (u < 0 && 1 - u^2 < 0 && 2*u + z + u^2*z == 0 && -2*u + x + u^2*x == 0 && -2*u + y + u^2*y == 0), {x, y, z, u}}, {(-1 + v < 0 && -v < 0 && -(u*v*x) < 0 && -w < 0 && w*y*z < 0) || (-1 + v < 0 && -v < 0 && u*v*x < 0 && -w < 0 && -(w*y*z) < 0), {x, y, z, u, v, w}}, {(-v < 0 && -(v*y) < 0 && z != 0 && -1 - E*z <= 0 && -(u*x*z) < 0) || (-v < 0 && v*y < 0 && z != 0 && -1 - E*z <= 0 && u*x*z < 0), {x, y, z, u, v}}, {(1 - w < 0 && v < 0 && v*y < 0 && -(s*u*v) < 0 && -(w*x*z) < 0) || (1 - w < 0 && v < 0 && v*y < 0 && s*u*v < 0 && w*x*z < 0), {x, y, z, u, v, w, s}}, {(-1 + w < 0 && -w < 0 && -Sqrt[(u*v*w*x)/(s*y*z)] <= 0 && -(s*y*z) < 0 && -(u*v*w*x) <= 0) || (-1 + w < 0 && -w < 0 && -Sqrt[(u*v*w*x)/(s*y*z)] <= 0 && s*y*z < 0 && u*v*w*x <= 0), {x, y, z, u, v, w, s}}, {(-1 + w < 0 && -w < 0 && -Sqrt[(v*w*x*y)/(s*u*z)] <= 0 && -(s*u*z) < 0 && -(v*w*x*y) <= 0) || (-1 + w < 0 && -w < 0 && -Sqrt[(v*w*x*y)/(s*u*z)] <= 0 && s*u*z < 0 && v*w*x*y <= 0), {x, y, z, u, v, w, s}}, {(1 - x < 0 && -x^69 < 0 && -1 + E^(1/(69*E))*x < 0 && 5*u + Sqrt[5]*y < 0 && z == 0) || (-1 + x < 0 && -x < 0 && -x^69 < 0 && -1 + E^(1/(69*E))*x < 0 && 5*u + Sqrt[5]*y < 0 && z == 0), {x, y, z, u}}, {(-Sqrt[x] < 0 && -x < 0 && -(E*x) < 0 && -y < 0 && -x + 4*E*y*z <= 0) || (-Sqrt[x] < 0 && -x < 0 && E*x < 0 && -y < 0 && x - 4*E*y*z <= 0), {x, y, z}}, {(-x < 0 && -y < 0 && -1 - E*y <= 0 && -z < 0 && -1 + x*z <= 0) || (x < 0 && -y < 0 && -1 - E*y <= 0 && -z < 0 && 1 - x*z <= 0), {x, y, z}}, {(-x < 0 && -y < 0 && -1 - E*y <= 0 && z < 0 && 1 - x*z <= 0) || (x < 0 && -y < 0 && -1 - E*y <= 0 && z < 0 && -1 + x*z <= 0), {x, y, z}}, {(-x < 0 && y < 0 && -1 - E*y <= 0 && -z < 0 && -1 + x*z <= 0) || (x < 0 && y < 0 && -1 - E*y <= 0 && -z < 0 && 1 - x*z <= 0), {x, y, z}}, {(-x < 0 && y < 0 && -1 - E*y <= 0 && z < 0 && 1 - x*z <= 0) || (x < 0 && y < 0 && -1 - E*y <= 0 && z < 0 && -1 + x*z <= 0), {x, y, z}}, {(-x < 0 && -y^2 - 2*y*z - z^2 < 0 && -u < 0 && -(u*x) + Log[2] < 0 && -u^2 < 0) || (-x < 0 && y^2 + 2*y*z + z^2 < 0 && -u < 0 && -(u*x) + Log[2] < 0 && u^2 < 0), {x, y, z, u}}, {(-x < 0 && -1 - E*x <= 0 && -z < 0 && y*z < 0 && -(E*x) - y*z <= 0) || (x < 0 && -1 - E*x <= 0 && z < 0 && -(y*z) < 0 && E*x + y*z <= 0), {x, y, z}}, {(-x < 0 && -1 - E*x <= 0 && z < 0 && y*z < 0 && -(E*x) - y*z <= 0) || (x < 0 && -1 - E*x <= 0 && -z < 0 && -(y*z) < 0 && E*x + y*z <= 0), {x, y, z}}, {(x < 0 && -(x*z) < 0 && -1/4 + E*x*z <= 0 && -(E*x^2*y) < 0 && 1/16 - E*x^2*y*z < 0) || (x < 0 && -(x*z) < 0 && -1/4 + E*x*z <= 0 && E*x^2*y < 0 && -1/16 + E*x^2*y*z < 0), {x, y, z}}, {(x < 0 && -1 - E*x <= 0 && -y < 0 && -z < 0 && -x - 4*y*z <= 0) || (x < 0 && -1 - E*x <= 0 && y < 0 && -z < 0 && x + 4*y*z <= 0), {x, y, z}}, {(-1 + y < 0 && -y < 0 && y^3 - z == 0 && -(E*y) < 0 && E*x - y <= 0) || (-1 + y < 0 && -y < 0 && y^3 - z == 0 && E*y < 0 && -(E*x) + y <= 0), {x, y, z}}, {(-1 + y < 0 && -y < 0 && y^3 - z^5 == 0 && -(E*y) < 0 && E*x - y <= 0) || (-1 + y < 0 && -y < 0 && y^3 - z^5 == 0 && E*y < 0 && -(E*x) + y <= 0), {x, y, z}}, {(-Sqrt[y] < 0 && -y < 0 && z < 0 && -(z*Log[2]) < 0 && -3*x*z + Sqrt[y]*Log[2] <= 0) || (-Sqrt[y] < 0 && -y < 0 && z < 0 && z*Log[2] < 0 && 3*x*z - Sqrt[y]*Log[2] <= 0), {x, y, z}}, {(-y < 0 && -u < 0 && u*x - z < 0 && -1 + z <= 0 && -1 - z <= 0) || (y < 0 && -u < 0 && -(u*x) + z < 0 && -1 + z <= 0 && -1 - z <= 0), {x, y, z, u}}, {(-y < 0 && -(E*y) < 0 && -x < 0 && x*z != 0 && E*x + y*z <= 0) || (-y < 0 && E*y < 0 && -x < 0 && x*z != 0 && -(E*x) - y*z <= 0), {x, y, z}}, {(-y < 0 && y*z < 0 && -(E*y) < 0 && -x < 0 && E*x + y*z <= 0) || (-y < 0 && y*z < 0 && E*y < 0 && -x < 0 && -(E*x) - y*z <= 0), {x, y, z}}, {(y < 0 && 1/8 + x == 0 && 1 - x*Sqrt[(1 + 8*x)/x^2] <= 0 && -x^2 < 0 && -4 - u + 2*z == 0) || (y < 0 && 1/8 + x == 0 && 1 - x*Sqrt[(1 + 8*x)/x^2] <= 0 && x^2 < 0 && -4 - u + 2*z == 0), {x, y, z, u}}, {(y < 0 && -(E*y) < 0 && -u < 0 && u*y < 0 && 1 + E*u*y <= 0) || (y < 0 && E*y < 0 && -u < 0 && u*y < 0 && -1 - E*u*y <= 0), {x, y, z, u}}, {(-y^2 < 0 && -x < 0 && z != 0 && -z^2 < 0 && 9*y^2 - x*z^2 == 0) || (y^2 < 0 && -x < 0 && z != 0 && z^2 < 0 && 9*y^2 - x*z^2 == 0), {x, y, z}}, {(u + Sqrt[y/z] < 0 && -z < 0 && y - u^2*z <= 0 && -y <= 0 && -x + 2*u*y < 0) || (u + Sqrt[y/z] < 0 && z < 0 && -y + u^2*z <= 0 && y <= 0 && -x + 2*u*y < 0), {x, y, z, u}}, {(1 - z < 0 && -x < 0 && -y < 0 && x - E*y < 0 && -x + E*y*z <= 0) || (1 - z < 0 && -x < 0 && y < 0 && x - E*y < 0 && x - E*y*z <= 0), {x, y, z}}, {(1 - z < 0 && 1 - z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (1 - z < 0 && 1 - z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(-z < 0 && -Sqrt[u] + 2*Sqrt[x/z]*Sqrt[-(y*z)] == 0 && y*z <= 0 && -x <= 0 && -u < 0) || (z < 0 && -Sqrt[u] + 2*Sqrt[x/z]*Sqrt[-(y*z)] == 0 && y*z <= 0 && x <= 0 && -u < 0), {x, y, z, u}}, {(-z < 0 && -y < 0 && -(y*z) < 0 && -(E*y) < 0 && -1/4 + E*y*z <= 0) || (-z < 0 && -y < 0 && -(y*z) < 0 && E*y < 0 && 1/4 - E*y*z <= 0), {x, y, z}}, {(-z < 0 && -Sqrt[x/z] < 0 && -(y*z) < 0 && -1/4 + E*y*z <= 0 && -x <= 0) || (z < 0 && -Sqrt[x/z] < 0 && -(y*z) < 0 && -1/4 + E*y*z <= 0 && x <= 0), {x, y, z}}, {(-z < 0 && 1 - z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (-z < 0 && 1 - z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(-z < 0 && -5 - x <= 0 && 2*Sqrt[5]*Sqrt[5 + x] + 5*y < 0 && 20*E + 4*E*x - 5*E*y^2 < 0 && -4 - 20*E*z - 4*E*x*z + 5*E*y^2*z <= 0) || (-z < 0 && -5 - x <= 0 && 2*Sqrt[5]*Sqrt[5 + x] + 5*y < 0 && -20*E - 4*E*x + 5*E*y^2 < 0 && 4 + 20*E*z + 4*E*x*z - 5*E*y^2*z <= 0), {x, y, z}}, {(-z < 0 && 3 + y <= 0 && 4 - y^2 <= 0 && 20*E + 4*E*x - 5*E*y^2 < 0 && -4 - 20*E*z - 4*E*x*z + 5*E*y^2*z <= 0) || (-z < 0 && 3 + y <= 0 && 4 - y^2 <= 0 && -20*E - 4*E*x + 5*E*y^2 < 0 && 4 + 20*E*z + 4*E*x*z - 5*E*y^2*z <= 0), {x, y, z}}, {(z < 0 && y < 0 && -(y*z) < 0 && -(E*y) < 0 && 1/4 - E*y*z <= 0) || (z < 0 && y < 0 && -(y*z) < 0 && E*y < 0 && -1/4 + E*y*z <= 0), {x, y, z}}, {(z < 0 && z*Log[2] != 0 && -(E*z) < 0 && -u < 0 && 1 + E*u*z <= 0) || (z < 0 && z*Log[2] != 0 && E*z < 0 && -u < 0 && -1 - E*u*z <= 0), {x, y, z, u}}, {(1 + z < 0 && 1 - z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (1 + z < 0 && 1 - z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(-1 - u <= 0 && -(u*x) < 0 && y != 0 && -1 - E*y <= 0 && -u - 16*E*x*y*z <= 0) || (-1 - u <= 0 && u*x < 0 && y != 0 && -1 - E*y <= 0 && u + 16*E*x*y*z <= 0), {x, y, z, u}}, {(1 + u <= 0 && -(u*x) < 0 && y != 0 && -1 - E*y <= 0 && -u - 16*E*x*y*z <= 0) || (1 + u <= 0 && u*x < 0 && y != 0 && -1 - E*y <= 0 && u + 16*E*x*y*z <= 0), {x, y, z, u}}, {(-x <= 0 && y == 0 && -(x*y) <= 0 && -z^2 < 0 && -9*x + 6*Sqrt[x*y]*z + z^2 - y*z^2 < 0) || (-x <= 0 && y == 0 && -(x*y) <= 0 && z^2 < 0 && 9*x - 6*Sqrt[x*y]*z - z^2 + y*z^2 < 0), {x, y, z}}, {(-x <= 0 && -(x*y) < 0 && -z^2 < 0 && -9*x - 6*Sqrt[x*y]*z - y*z^2 < 0 && 9*x + 6*Sqrt[x*y]*z - z^2 + y*z^2 < 0) || (-x <= 0 && -(x*y) < 0 && z^2 < 0 && 9*x + 6*Sqrt[x*y]*z + y*z^2 < 0 && -9*x - 6*Sqrt[x*y]*z + z^2 - y*z^2 < 0), {x, y, z}}, {(-x <= 0 && -y <= 0 && -y < 0 && -u < 0 && u*y - x*z < 0) || (-x <= 0 && -y <= 0 && y < 0 && -u < 0 && -(u*y) + x*z < 0), {x, y, z, u}}, {(-x <= 0 && -y <= 0 && -y < 0 && u < 0 && -(u*y) + x*z < 0) || (-x <= 0 && -y <= 0 && y < 0 && u < 0 && u*y - x*z < 0), {x, y, z, u}}, {(-Sqrt[x/y^2] <= 0 && -x <= 0 && y < 0 && -y^2 < 0 && 3*z + Sqrt[x/y^2]*Log[2] == 0) || (-Sqrt[x/y^2] <= 0 && x <= 0 && y < 0 && y^2 < 0 && 3*z + Sqrt[x/y^2]*Log[2] == 0), {x, y, z, u}}, {(-Sqrt[(s*t*u*x)/(v*w*y)] <= 0 && t < 0 && -(t*z) < 0 && -(s*t*u*x) <= 0 && -(v*w*y) < 0) || (-Sqrt[(s*t*u*x)/(v*w*y)] <= 0 && t < 0 && -(t*z) < 0 && s*t*u*x <= 0 && v*w*y < 0), {x, y, z, u, v, w, s, t}}, {(-Sqrt[(s*t*u*x)/(v*w*y)] <= 0 && t < 0 && t*z < 0 && -(s*t*u*x) <= 0 && -(v*w*y) < 0) || (-Sqrt[(s*t*u*x)/(v*w*y)] <= 0 && t < 0 && t*z < 0 && s*t*u*x <= 0 && v*w*y < 0), {x, y, z, u, v, w, s, t}}, {(-y <= 0 && -x < 0 && z != 0 && -1 - E*z <= 0 && 5*x - 5*x*y - z < 0) || (-y <= 0 && x < 0 && z != 0 && -1 - E*z <= 0 && -5*x + 5*x*y + z < 0), {x, y, z}}, {(-y <= 0 && -Sqrt[x/y] <= 0 && -x <= 0 && -y < 0 && 3*z + Sqrt[x/y]*Log[2] == 0) || (-y <= 0 && -Sqrt[x/y] <= 0 && x <= 0 && y < 0 && 3*z + Sqrt[x/y]*Log[2] == 0), {x, y, z, u}}, {(-y <= 0 && z != 0 && -1 - E*z <= 0 && -x < 0 && 5*x - 5*x*y - z < 0) || (-y <= 0 && z != 0 && -1 - E*z <= 0 && x < 0 && -5*x + 5*x*y + z < 0), {x, y, z}}, {(-Sqrt[x^2*y] <= 0 && -(x^2*y) <= 0 && -z^2 < 0 && z^3 != 0 && -9*x^2 - 6*Sqrt[x^2*y]*z - y*z^2 < 0) || (-Sqrt[x^2*y] <= 0 && -(x^2*y) <= 0 && z^2 < 0 && z^3 != 0 && 9*x^2 + 6*Sqrt[x^2*y]*z + y*z^2 < 0), {x, y, z}}, {(-Sqrt[x^2*y] <= 0 && -(x^2*y) <= 0 && -z^2 < 0 && z^3 != 0 && -9*x^2 + 6*Sqrt[x^2*y]*z - y*z^2 < 0) || (-Sqrt[x^2*y] <= 0 && -(x^2*y) <= 0 && z^2 < 0 && z^3 != 0 && 9*x^2 - 6*Sqrt[x^2*y]*z + y*z^2 < 0), {x, y, z}}, {(-z <= 0 && -y < 0 && u != 0 && -1 - E*u <= 0 && -u + x - 5*y*z < 0) || (-z <= 0 && y < 0 && u != 0 && -1 - E*u <= 0 && u - x + 5*y*z < 0), {x, y, z, u}}, {(-z <= 0 && -u <= 0 && -2*x*y + y^2 + z <= 0 && u - y^2 - z <= 0 && -x < 0) || (-z <= 0 && -u <= 0 && u - 2*x*y <= 0 && -u + y^2 + z < 0 && -x < 0), {x, y, z, u}}, {(-z <= 0 && u != 0 && -1 - E*u <= 0 && -y < 0 && -u + x - 5*y*z < 0) || (-z <= 0 && u != 0 && -1 - E*u <= 0 && y < 0 && u - x + 5*y*z < 0), {x, y, z, u}}, {(-Sqrt[(s*t*w*z)/(u*v*x)] <= 0 && t < 0 && -(t*y) < 0 && -(u*v*x) < 0 && -(s*t*w*z) <= 0) || (-Sqrt[(s*t*w*z)/(u*v*x)] <= 0 && t < 0 && -(t*y) < 0 && u*v*x < 0 && s*t*w*z <= 0), {x, y, z, u, v, w, s, t}}, {(-Sqrt[(s*t*w*z)/(u*v*x)] <= 0 && t < 0 && -(t*y) < 0 && -(s*t*w*z) <= 0 && -(u*v*x) < 0) || (-Sqrt[(s*t*w*z)/(u*v*x)] <= 0 && t < 0 && -(t*y) < 0 && s*t*w*z <= 0 && u*v*x < 0), {x, y, z, u, v, w, s, t}}, {(-Sqrt[(s*t*w*z)/(u*v*x)] <= 0 && t < 0 && t*y < 0 && -(u*v*x) < 0 && -(s*t*w*z) <= 0) || (-Sqrt[(s*t*w*z)/(u*v*x)] <= 0 && t < 0 && t*y < 0 && u*v*x < 0 && s*t*w*z <= 0), {x, y, z, u, v, w, s, t}}, {(-Sqrt[(s*t*w*z)/(u*v*x)] <= 0 && t < 0 && t*y < 0 && -(s*t*w*z) <= 0 && -(u*v*x) < 0) || (-Sqrt[(s*t*w*z)/(u*v*x)] <= 0 && t < 0 && t*y < 0 && s*t*w*z <= 0 && u*v*x < 0), {x, y, z, u, v, w, s, t}}, {(-Sqrt[(s*w*x*z)/(t*u*v)] <= 0 && v < 0 && v*y < 0 && -(t*u*v) < 0 && -(s*w*x*z) <= 0) || (-Sqrt[(s*w*x*z)/(t*u*v)] <= 0 && v < 0 && v*y < 0 && t*u*v < 0 && s*w*x*z <= 0), {x, y, z, u, v, w, s, t}}, {(-z + Root[{-1 + Log[#1^4]*#1 & , 1.22616125067614367857102506136242336954`20.2855860204585}] <= 0 && 1 - z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (-z + Root[{-1 + Log[#1^4]*#1 & , 1.22616125067614367857102506136242336954`20.2855860204585}] <= 0 && 1 - z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(u - v != 0 && -u - v < 0 && -y < 0 && -x + 2*u*Log[2] == 0 && -1 - 2*u*y + z <= 0) || (u - v != 0 && -u - v < 0 && y < 0 && -x + 2*u*Log[2] == 0 && 1 + 2*u*y - z <= 0), {x, y, z, u, v}}, {(y != 0 && -(E*y) < 0 && y^2 != 0 && -y - E*Log[2] <= 0 && -(x*Log[2]^2) + 9*u^2*y^2*Log[2]^2 + 18*u*y^2*z*Log[2]^2 + 9*y^2*z^2*Log[2]^2 == 0) || (y != 0 && E*y < 0 && y^2 != 0 && y + E*Log[2] <= 0 && -(x*Log[2]^2) + 9*u^2*y^2*Log[2]^2 + 18*u*y^2*z*Log[2]^2 + 9*y^2*z^2*Log[2]^2 == 0), {x, y, z, u}}, {(-1 + z != 0 && Log[11] - z*Log[11] < 0 && x + Log[21] - z*Log[21] < 0 && -y < 0 && -y - x*z + y*z == 0) || (-1 + z != 0 && -Log[11] + z*Log[11] < 0 && -x - Log[21] + z*Log[21] < 0 && -y < 0 && -y - x*z + y*z == 0), {x, y, z}}, {(z != 0 && -(E*z) < 0 && x == 0 && y == 0 && E*y - z <= 0) || (z != 0 && E*z < 0 && x == 0 && y == 0 && -(E*y) + z <= 0), {x, y, z}}, {(-u + z != 0 && -u - z < 0 && -y < 0 && -1 - 2*y*z <= 0 && -x + 2*z*Log[2] == 0) || (-u + z != 0 && -u - z < 0 && y < 0 && 1 + 2*y*z <= 0 && -x + 2*z*Log[2] == 0), {x, y, z, u}}, {(x == 0 && y == 0 && u == 0 && u != 0 && -y < 0 && -u < 0) || (y == 0 && u == 0 && u != 0 && z == 0 && -y < 0 && -u < 0), {x, y, z, u, v}}, {(x == 0 && x*y - y*z == 0 && -(x*y) < 0 && -x <= 0 && -y <= 0 && -z <= 0) || (x == 0 && x*y - y*z == 0 && x*y < 0 && -x <= 0 && -y <= 0 && -z <= 0), {x, y, z}}, {(y == 0 && x != 0 && -v < 0 && u != 0 && -1 - E*u <= 0 && u*v != 0) || (x != 0 && -v < 0 && z == 0 && u != 0 && -1 - E*u <= 0 && u*v != 0), {x, y, z, u, v}}, {(y == 0 && x != 0 && -v < 0 && u != 0 && -1 - E*u <= 0 && u*v != 0) || (x != 0 && -v < 0 && u != 0 && -1 - E*u <= 0 && u*v != 0 && z == 0), {x, y, z, u, v}}, {(z == 0 && x != 0 && w == 0 && -(v*w) + y == 0 && -v < 0 && -w < 0) || (x != 0 && w == 0 && -(v*w) + y == 0 && u == 0 && -v < 0 && -w < 0), {x, y, z, u, v, w, s}}, {(u < 0 && 5*u + Sqrt[5]*Sqrt[x/z] < 0 && -x <= 0 && -z < 0 && -y + u*z < 0 && -x + 5*u^2*z <= 0) || (u < 0 && 5*u + Sqrt[5]*Sqrt[x/z] < 0 && x <= 0 && z < 0 && -y + u*z < 0 && -x + 5*u^2*z <= 0), {x, y, z, u}}, {(-1 + v < 0 && -v < 0 && -(v*x*y) < 0 && w < 0 && -1 - E*w <= 0 && u*w*z < 0) || (-1 + v < 0 && -v < 0 && v*x*y < 0 && w < 0 && -1 - E*w <= 0 && -(u*w*z) < 0), {x, y, z, u, v, w}}, {(-v < 0 && 3 + z <= 0 && 4 - z^2 <= 0 && -x + u*z < 0 && 20*E + 4*E*y - 5*E*z^2 < 0 && -4 - 20*E*v - 4*E*v*y + 5*E*v*z^2 <= 0) || (-v < 0 && 3 + z <= 0 && 4 - z^2 <= 0 && -x + u*z < 0 && -20*E - 4*E*y + 5*E*z^2 < 0 && 4 + 20*E*v + 4*E*v*y - 5*E*v*z^2 <= 0), {x, y, z, u, v}}, {(v < 0 && -1 - E*v <= 0 && -(v*y) < 0 && z != 0 && -1 - E*z <= 0 && -(u*x*z) < 0) || (v < 0 && -1 - E*v <= 0 && v*y < 0 && z != 0 && -1 - E*z <= 0 && u*x*z < 0), {x, y, z, u, v}}, {(-1 + w < 0 && -w < 0 && v < 0 && v*y < 0 && -(s*u*v) < 0 && w*x*z < 0) || (-1 + w < 0 && -w < 0 && v < 0 && v*y < 0 && s*u*v < 0 && -(w*x*z) < 0), {x, y, z, u, v, w, s}}, {(-Sqrt[x] < 0 && -x < 0 && -(E*x) < 0 && -y < 0 && y*z != 0 && -x + 4*E*y*z <= 0) || (-Sqrt[x] < 0 && -x < 0 && E*x < 0 && -y < 0 && y*z != 0 && x - 4*E*y*z <= 0), {x, y, z}}, {(x < 0 && v < 0 && v*x - y*Log[2] <= 0 && -(v*x) - Log[2] < 0 && u*v < 0 && -1 - E*u*v <= 0) || (-x < 0 && v < 0 && v*x - y*Log[2] <= 0 && v*x + Log[2] < 0 && u*v < 0 && -1 - E*u*v <= 0 && -(u*v) + z < 0), {x, y, z, u, v}}, {(-y < 0 && -z < 0 && -1 + x < 0 && -x <= 0 && -(x*y) < 0 && -z + x*z < 0) || (-y < 0 && -z < 0 && -1 + x < 0 && -x <= 0 && x*y < 0 && z - x*z < 0), {x, y, z}}, {(-y < 0 && -z < 0 && 1 - z^2 < 0 && 1 + y - z^2 + y*z^2 == 0 && -x < 0 && x - 2*z + x*z^2 == 0) || (-y < 0 && z < 0 && 1 + z^2 < 0 && 1 + y - z^2 + y*z^2 == 0 && -x < 0 && x - 2*z + x*z^2 == 0), {x, y, z}}, {(-y < 0 && y*z < 0 && -(E*y) < 0 && -x < 0 && x*z != 0 && E*x + y*z <= 0) || (-y < 0 && y*z < 0 && E*y < 0 && -x < 0 && x*z != 0 && -(E*x) - y*z <= 0), {x, y, z}}, {(5*u + Sqrt[5]*Sqrt[x/z] < 0 && -x <= 0 && -z < 0 && -(u*z) < 0 && -y + u*z < 0 && -x + 5*u^2*z <= 0) || (5*u + Sqrt[5]*Sqrt[x/z] < 0 && x <= 0 && z < 0 && -(u*z) < 0 && -y + u*z < 0 && -x + 5*u^2*z <= 0), {x, y, z, u}}, {(-1 + z < 0 && -z < 0 && -x < 0 && -y < 0 && x - E*y < 0 && -x + E*y*z <= 0) || (-1 + z < 0 && -z < 0 && -x < 0 && y < 0 && x - E*y < 0 && x - E*y*z <= 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -(E*z) < 0 && x == 0 && y == 0 && E*y - z <= 0) || (-1 + z < 0 && -z < 0 && E*z < 0 && x == 0 && y == 0 && -(E*y) + z <= 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -(E*z) < 0 && E*y - z <= 0 && -x < 0 && -1 + x*z^3 == 0) || (-1 + z < 0 && -z < 0 && E*z < 0 && -(E*y) + z <= 0 && -x < 0 && -1 + x*z^3 == 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -z^4 < 0 && -x < 0 && -(E*x) < 0 && -x + E*y*z <= 0) || (-1 + z < 0 && -z < 0 && -z^4 < 0 && -x < 0 && E*x < 0 && x - E*y*z <= 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && 1 - z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (-1 + z < 0 && -z < 0 && 1 - z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(-z < 0 && u < 0 && 1 + u*z <= 0 && -(u*x) - Log[2] < 0 && -(u*Log[2]) < 0 && y < 0) || (-z < 0 && u < 0 && 1 + u*z <= 0 && u*x + Log[2] < 0 && u*Log[2] < 0 && y < 0), {x, y, z, u}}, {(z < 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (z < 0 && -1 + z^4 < 0 && -z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(z < 0 && z*Log[2] != 0 && -(E*z) < 0 && -u < 0 && u*z < 0 && 1 + E*u*z <= 0) || (z < 0 && z*Log[2] != 0 && E*z < 0 && -u < 0 && u*z < 0 && -1 - E*u*z <= 0), {x, y, z, u}}, {(z < 0 && z*Log[2] != 0 && -(E*z*Log[2]) < 0 && -(E*x*z) - E*Log[2] + z*Log[2] <= 0 && y < 0 && -(x*z) + y*Log[2] != 0) || (z < 0 && z*Log[2] != 0 && E*z*Log[2] < 0 && E*x*z + E*Log[2] - z*Log[2] <= 0 && y < 0 && -(x*z) + y*Log[2] != 0), {x, y, z}}, {(1 + z < 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (1 + z < 0 && -1 + z^4 < 0 && -z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(-x <= 0 && y == 0 && -(x*y) <= 0 && -z^2 < 0 && -9*x - 6*Sqrt[x*y]*z - y*z^2 < 0 && 9*x + 6*Sqrt[x*y]*z - z^2 + y*z^2 < 0) || (-x <= 0 && y == 0 && -(x*y) <= 0 && z^2 < 0 && 9*x + 6*Sqrt[x*y]*z + y*z^2 < 0 && -9*x - 6*Sqrt[x*y]*z + z^2 - y*z^2 < 0), {x, y, z}}, {(-x <= 0 && -y <= 0 && -z <= 0 && -u <= 0 && -(x*y) < 0 && u*x - x*y + y*z < 0) || (-x <= 0 && -y <= 0 && -z <= 0 && -u <= 0 && x*y < 0 && -(u*x) + x*y - y*z < 0), {x, y, z, u}}, {(-x <= 0 && -Sqrt[x*y] <= 0 && -(x*y) <= 0 && -z^2 < 0 && z^3 != 0 && -9*x - 6*Sqrt[x*y]*z - y*z^2 < 0) || (-x <= 0 && -Sqrt[x*y] <= 0 && -(x*y) <= 0 && z^2 < 0 && z^3 != 0 && 9*x + 6*Sqrt[x*y]*z + y*z^2 < 0), {x, y, z}}, {(-x <= 0 && -Sqrt[x*y] <= 0 && -(x*y) <= 0 && -z^2 < 0 && z^3 != 0 && -9*x + 6*Sqrt[x*y]*z - y*z^2 < 0) || (-x <= 0 && -Sqrt[x*y] <= 0 && -(x*y) <= 0 && z^2 < 0 && z^3 != 0 && 9*x - 6*Sqrt[x*y]*z + y*z^2 < 0), {x, y, z}}, {(-Sqrt[(s*t*u*x)/(v*w*y)] <= 0 && t < 0 && t*z < 0 && s*t*x != 0 && -(s*t*u*x) <= 0 && -(v*w*y) < 0) || (-Sqrt[(s*t*u*x)/(v*w*y)] <= 0 && t < 0 && t*z < 0 && s*t*x != 0 && s*t*u*x <= 0 && v*w*y < 0), {x, y, z, u, v, w, s, t}}, {(-y <= 0 && -y < 0 && -x < 0 && z != 0 && -z^2 < 0 && 9*y - x*z^2 == 0) || (-y <= 0 && y < 0 && -x < 0 && z != 0 && z^2 < 0 && 9*y - x*z^2 == 0), {x, y, z}}, {(-Sqrt[(s*t*w*z)/(u*v*x)] <= 0 && t < 0 && t*y < 0 && s*t*w != 0 && -(s*t*w*z) <= 0 && -(u*v*x) < 0) || (-Sqrt[(s*t*w*z)/(u*v*x)] <= 0 && t < 0 && t*y < 0 && s*t*w != 0 && s*t*w*z <= 0 && u*v*x < 0), {x, y, z, u, v, w, s, t}}, {(z - Root[{-1 + Log[#1^4]*#1 & , 1.22616125067614367857102506136242336954`20.2855860204585}] <= 0 && 1 - z < 0 && 1 - z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (z - Root[{-1 + Log[#1^4]*#1 & , 1.22616125067614367857102506136242336954`20.2855860204585}] <= 0 && 1 - z < 0 && 1 - z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(u != 0 && -1 - E*u <= 0 && -(u*y) < 0 && v != 0 && -1 - E*v <= 0 && -(v*x*z) < 0) || (u != 0 && -1 - E*u <= 0 && u*y < 0 && v != 0 && -1 - E*v <= 0 && v*x*z < 0), {x, y, z, u, v}}, {(v != 0 && -1 - E*v <= 0 && -(v*x*z) < 0 && u != 0 && -1 - E*u <= 0 && -(u*y) < 0) || (v != 0 && -1 - E*v <= 0 && v*x*z < 0 && u != 0 && -1 - E*u <= 0 && u*y < 0), {x, y, z, u, v}}, {(z != 0 && -1 - E*z <= 0 && -(u*x*z) < 0 && v != 0 && -1 - E*v <= 0 && -(v*y) < 0) || (z != 0 && -1 - E*z <= 0 && u*x*z < 0 && v != 0 && -1 - E*v <= 0 && v*y < 0), {x, y, z, u, v}}, {(-u + z != 0 && -u - z < 0 && -x < 0 && y != 0 && -1 - E*y <= 0 && -1 - x*y - 2*x*z <= 0) || (-u + z != 0 && -u - z < 0 && x < 0 && y != 0 && -1 - E*y <= 0 && 1 + x*y + 2*x*z <= 0), {x, y, z, u}}, {(x == 0 && -v < 0 && z != 0 && -1 - E*z <= 0 && u != 0 && -1 - E*u <= 0 && u*v != 0) || (y == 0 && -v < 0 && z != 0 && -1 - E*z <= 0 && u != 0 && -1 - E*u <= 0 && u*v != 0), {x, y, z, u, v}}, {(x == 0 && u != 0 && -1 - E*u <= 0 && -v < 0 && u*v != 0 && z != 0 && -1 - E*z <= 0) || (y == 0 && u != 0 && -1 - E*u <= 0 && -v < 0 && u*v != 0 && z != 0 && -1 - E*z <= 0), {x, y, z, u, v}}, {(x == 0 && z != 0 && -1 - E*z <= 0 && u != 0 && -1 - E*u <= 0 && -v < 0 && u*v != 0) || (z != 0 && -1 - E*z <= 0 && y == 0 && u != 0 && -1 - E*u <= 0 && -v < 0 && u*v != 0), {x, y, z, u, v}}, {(x == 0 && z != 0 && -1 - E*z <= 0 && u != 0 && -1 - E*u <= 0 && -v < 0 && u*v != 0) || (z != 0 && -1 - E*z <= 0 && u != 0 && -1 - E*u <= 0 && y == 0 && -v < 0 && u*v != 0), {x, y, z, u, v}}, {(z^2 == 0 && x == 0 && x^2 == 0 && -y < 0 && z < 0 && -z^2 < 0 && -x^2 <= 0) || (z^2 == 0 && x == 0 && x^2 == 0 && -y < 0 && z < 0 && z^2 < 0 && -x^2 <= 0), {x, y, z}}, {(z^2 == 0 && x == 0 && x^2 == 0 && -y < 0 && -z^2 < 0 && -z <= 0 && -x^2 <= 0) || (z^2 == 0 && x == 0 && x^2 == 0 && -y < 0 && z^2 < 0 && -z <= 0 && -x^2 <= 0), {x, y, z}}, {(u < 0 && 1/8 + z == 0 && 1 - z*Sqrt[(1 + 8*z)/z^2] <= 0 && -z^2 < 0 && -4 + 2*v - w == 0 && v - x == 0 && -4 + 2*v - y == 0) || (u < 0 && 1/8 + z == 0 && 1 - z*Sqrt[(1 + 8*z)/z^2] <= 0 && z^2 < 0 && -4 + 2*v - w == 0 && v - x == 0 && -4 + 2*v - y == 0), {x, y, z, u, v, w}}, {(-v < 0 && u != 0 && -1 - E*u <= 0 && -(u*x*z) < 0 && y != 0 && -1 - E*y <= 0 && -(v*y) < 0) || (-v < 0 && u != 0 && -1 - E*u <= 0 && u*x*z < 0 && y != 0 && -1 - E*y <= 0 && v*y < 0), {x, y, z, u, v}}, {(71 - x < 0 && -21 + y < 0 && -y < 0 && -y^2 < 0 && -16*y + z < 0 && -z < 0 && -583*y^2 + x*y^2 + 64*y*z - 2*z^2 < 0) || (71 - x < 0 && -21 + y < 0 && -y < 0 && y^2 < 0 && -16*y + z < 0 && -z < 0 && 583*y^2 - x*y^2 - 64*y*z + 2*z^2 < 0), {x, y, z}}, {(71 - x < 0 && -21 + y < 0 && -y < 0 && -16*y + z < 0 && -z < 0 && -583*y^2 + x*y^2 + 64*y*z - 2*z^2 < 0 && -256*y^2 + 32*y*z - z^2 < 0) || (71 - x < 0 && -21 + y < 0 && -y < 0 && -16*y + z < 0 && -z < 0 && 583*y^2 - x*y^2 - 64*y*z + 2*z^2 < 0 && 256*y^2 - 32*y*z + z^2 < 0), {x, y, z}}, {(-x < 0 && -21 + y < 0 && -y < 0 && -y^2 < 0 && -16*y + z < 0 && -z < 0 && -583*y^2 + x*y^2 + 64*y*z - 2*z^2 < 0) || (-x < 0 && -21 + y < 0 && -y < 0 && y^2 < 0 && -16*y + z < 0 && -z < 0 && 583*y^2 - x*y^2 - 64*y*z + 2*z^2 < 0), {x, y, z}}, {(-x < 0 && -21 + y < 0 && -y < 0 && -z < 0 && 1/16 - y*z < 0 && -(y^2*z^2) < 0 && -2 + 64*y*z - 583*y^2*z^2 + x*y^2*z^2 < 0) || (-x < 0 && -21 + y < 0 && -y < 0 && -z < 0 && 1/16 - y*z < 0 && y^2*z^2 < 0 && 2 - 64*y*z + 583*y^2*z^2 - x*y^2*z^2 < 0), {x, y, z}}, {(-x < 0 && -y < 0 && 1 + y^2 < 0 && 1 + z^2 != 0 && -1 + z^2 != 0 && y - 2*z + 2*y^2*z - y*z^2 == 0 && y + x*z + x*y^2*z + y*z^2 == 0) || (-x < 0 && y < 0 && -1 - y^2 < 0 && -1 + y^2 != 0 && 1 + z^2 != 0 && -1 + z^2 != 0 && y - 2*z + 2*y^2*z - y*z^2 == 0 && y + x*z + x*y^2*z + y*z^2 == 0), {x, y, z}}, {(-x < 0 && y < 0 && -1 - E*y <= 0 && -z < 0 && -(x*z) < 0 && -(E*z) < 0 && -(E*y) - x*z <= 0) || (-x < 0 && y < 0 && -1 - E*y <= 0 && -z < 0 && -(x*z) < 0 && E*z < 0 && E*y + x*z <= 0), {x, y, z}}, {(-x < 0 && -1 - E*x <= 0 && y < 0 && -(E*y) < 0 && -z < 0 && y*z < 0 && E*x + 4*y*z <= 0) || (-x < 0 && -1 - E*x <= 0 && y < 0 && E*y < 0 && -z < 0 && y*z < 0 && -(E*x) - 4*y*z <= 0), {x, y, z}}, {(x < 0 && w < 0 && w*Log[2] != 0 && w*x - y*Log[2] <= 0 && -(w*x) - Log[2] < 0 && v*w < 0 && -1 - E*v*w <= 0) || (-x < 0 && w < 0 && w*Log[2] != 0 && w*x - y*Log[2] <= 0 && w*x + Log[2] < 0 && v*w < 0 && -1 - E*v*w <= 0 && -(v*w) + z < 0), {x, y, z, u, v, w}}, {(x < 0 && y < 0 && -1 - E*y <= 0 && z < 0 && -(x*z) < 0 && -(E*z) < 0 && E*y + x*z <= 0) || (x < 0 && y < 0 && -1 - E*y <= 0 && z < 0 && -(x*z) < 0 && E*z < 0 && -(E*y) - x*z <= 0), {x, y, z}}, {(-y < 0 && z == 0 && x != 0 && -w < 0 && v != 0 && -1 - E*v <= 0 && v*w != 0) || (-y < 0 && x != 0 && -w < 0 && u == 0 && v != 0 && -1 - E*v <= 0 && v*w != 0), {x, y, z, u, v, w}}, {(-y < 0 && -v < 0 && -x^2 <= 0 && u < 0 && u^2 != 0 && -u - 3*Sqrt[x^2/y] < 0 && -2*u*Sqrt[v] + 5*v*z == 0) || (y < 0 && -v < 0 && x^2 <= 0 && u < 0 && u^2 != 0 && -u - 3*Sqrt[x^2/y] < 0 && -2*u*Sqrt[v] + 5*v*z == 0), {x, y, z, u, v}}, {(-y < 0 && -v < 0 && -x^2 <= 0 && u < 0 && u^2 != 0 && u + 3*Sqrt[x^2/y] < 0 && -2*u*Sqrt[v] + 5*v*z == 0) || (y < 0 && -v < 0 && x^2 <= 0 && u < 0 && u^2 != 0 && u + 3*Sqrt[x^2/y] < 0 && -2*u*Sqrt[v] + 5*v*z == 0), {x, y, z, u, v}}, {(-y < 0 && -v < 0 && -x^2 <= 0 && u - 3*Sqrt[x^2/y] < 0 && -u < 0 && u^2 != 0 && -2*u*Sqrt[v] + 5*v*z == 0) || (y < 0 && -v < 0 && x^2 <= 0 && u - 3*Sqrt[x^2/y] < 0 && -u < 0 && u^2 != 0 && -2*u*Sqrt[v] + 5*v*z == 0), {x, y, z, u, v}}, {(-y < 0 && -v < 0 && -x^2 <= 0 && -u + 3*Sqrt[x^2/y] < 0 && -u <= 0 && u^2 != 0 && -2*u*Sqrt[v] + 5*v*z == 0) || (y < 0 && -v < 0 && x^2 <= 0 && -u + 3*Sqrt[x^2/y] < 0 && -u <= 0 && u^2 != 0 && -2*u*Sqrt[v] + 5*v*z == 0), {x, y, z, u, v}}, {(y < 0 && -y^2 < 0 && -x < 0 && -z < 0 && -(y^2*z) < 0 && -z^2 < 0 && 9*y^2 - x*z^2 == 0) || (y < 0 && y^2 < 0 && -x < 0 && -z < 0 && -(y^2*z) < 0 && z^2 < 0 && 9*y^2 - x*z^2 == 0), {x, y, z}}, {(y < 0 && -1 + y^4 < 0 && -y^4 < 0 && -z < 0 && y*z < 0 && -(E*x*y) < 0 && -1 + E*x*y*z <= 0) || (y < 0 && -1 + y^4 < 0 && -y^4 < 0 && -z < 0 && y*z < 0 && E*x*y < 0 && 1 - E*x*y*z <= 0), {x, y, z}}, {(y < 0 && -1 - E*y <= 0 && z < 0 && -(E*z) < 0 && x < 0 && -(x*z) < 0 && -(E*y) - 4*x*z <= 0) || (y < 0 && -1 - E*y <= 0 && z < 0 && E*z < 0 && x < 0 && -(x*z) < 0 && E*y + 4*x*z <= 0), {x, y, z}}, {(y < 0 && -5/6 - E*y <= 0 && -y^2 < 0 && -x < 0 && z < 0 && -z^2 < 0 && 9*y^2 - x*z^2 == 0) || (y < 0 && -5/6 - E*y <= 0 && y^2 < 0 && -x < 0 && z < 0 && z^2 < 0 && 9*y^2 - x*z^2 == 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -(E*z) < 0 && -y < 0 && y^5 != 0 && E*y - z <= 0 && y^5*z^3 + x*z^5 == 0) || (-1 + z < 0 && -z < 0 && E*z < 0 && -y < 0 && y^5 != 0 && -(E*y) + z <= 0 && y^5*z^3 + x*z^5 == 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -(E*z) < 0 && -y < 0 && y^5 != 0 && E*y - z <= 0 && y^5*z^3 + x^5*z^5 == 0) || (-1 + z < 0 && -z < 0 && E*z < 0 && -y < 0 && y^5 != 0 && -(E*y) + z <= 0 && y^5*z^3 + x^5*z^5 == 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -(E*z) < 0 && E*y - z <= 0 && x != 0 && x^5 != 0 && -1 + x^5*z^3 == 0) || (-1 + z < 0 && -z < 0 && E*z < 0 && -(E*y) + z <= 0 && x != 0 && x^5 != 0 && -1 + x^5*z^3 == 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -Sqrt[-((x*z)/y)] < 0 && x < 0 && x*z < 0 && -1 - E*x <= 0 && -y < 0) || (-1 + z < 0 && -z < 0 && -Sqrt[-((x*z)/y)] < 0 && -x < 0 && -(x*z) < 0 && -1 - E*x <= 0 && y < 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && -(E*x) < 0 && -x + E*y*z <= 0) || (-1 + z < 0 && -z < 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && E*x < 0 && x - E*y*z <= 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (-1 + z < 0 && -z < 0 && -1 + z^4 < 0 && -z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(-z < 0 && u < 0 && 1 + u*z <= 0 && -(u*x) - Log[2] < 0 && -(u*Log[2]) < 0 && y < 0 && -(u*x) + y*Log[2] != 0) || (-z < 0 && u < 0 && 1 + u*z <= 0 && u*x + Log[2] < 0 && u*Log[2] < 0 && y < 0 && -(u*x) + y*Log[2] != 0), {x, y, z, u}}, {(z < 0 && -1 - z < 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (z < 0 && -1 - z < 0 && -1 + z^4 < 0 && -z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(z < 0 && -z + Root[{-1 + Log[#1^4]*#1 & , -0.11610128014515555327872503793826204796`20.602059991306604}] <= 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (z < 0 && -z + Root[{-1 + Log[#1^4]*#1 & , -0.11610128014515555327872503793826204796`20.602059991306604}] <= 0 && -1 + z^4 < 0 && -z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(-Sqrt[(u*x*y)/(v*z)] <= 0 && v < 0 && -1 - E*v <= 0 && -(u*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(v*z) < 0) || (-Sqrt[(u*x*y)/(v*z)] <= 0 && v < 0 && -1 - E*v <= 0 && u*x*y <= 0 && z != 0 && -1 - E*z <= 0 && v*z < 0), {x, y, z, u, v}}, {(z - Root[{-1 + Log[#1^4]*#1 & , -0.69949057688577195637880493681113464044`20.28849263474288}] <= 0 && -1 - z < 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (z - Root[{-1 + Log[#1^4]*#1 & , -0.69949057688577195637880493681113464044`20.28849263474288}] <= 0 && -1 - z < 0 && -1 + z^4 < 0 && -z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(z - Root[{-1 + Log[#1^4]*#1 & , -0.11610128014515555327872503793826204796`20.602059991306604}] <= 0 && -z + Root[{-1 + Log[#1^4]*#1 & , -0.69949057688577195637880493681113464044`20.28849263474288}] <= 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && y != 0 && y*z < 0) || (z - Root[{-1 + Log[#1^4]*#1 & , -0.11610128014515555327872503793826204796`20.602059991306604}] <= 0 && -z + Root[{-1 + Log[#1^4]*#1 & , -0.69949057688577195637880493681113464044`20.28849263474288}] <= 0 && -1 + z^4 < 0 && -z^4 < 0 && x < 0 && y != 0 && -(y*z) < 0), {x, y, z}}, {(u - v != 0 && -u - v < 0 && -x + 2*u*Log[2] == 0 && -y < 0 && z != 0 && -1 - E*z <= 0 && -1 - 2*u*y - y*z <= 0) || (u - v != 0 && -u - v < 0 && -x + 2*u*Log[2] == 0 && y < 0 && z != 0 && -1 - E*z <= 0 && 1 + 2*u*y + y*z <= 0), {x, y, z, u, v}}, {(y != 0 && -y^2 < 0 && -x < 0 && -z < 0 && -(y^2*z) < 0 && -z^2 < 0 && 9*y^2 - x*z^2 == 0) || (y != 0 && y^2 < 0 && -x < 0 && -z < 0 && -(y^2*z) < 0 && z^2 < 0 && 9*y^2 - x*z^2 == 0), {x, y, z}}, {(x == 0 && y == 0 && s == 0 && s != 0 && s*w != 0 && -y < 0 && -s < 0 && -w < 0) || (y == 0 && s == 0 && s != 0 && z == 0 && s*w != 0 && -y < 0 && -s < 0 && -w < 0), {x, y, z, u, v, w, s, t}}, {(x == 0 && y == 0 && s == 0 && s != 0 && v*y != 0 && -y < 0 && -s < 0 && -v < 0) || (y == 0 && s == 0 && s != 0 && w == 0 && v*y != 0 && -y < 0 && -s < 0 && -v < 0), {x, y, z, u, v, w, s, t}}, {(x == 0 && u^(3/2)*y == 0 && Sqrt[-u]*Sqrt[-(u*z^2)] == 0 && Sqrt[u*z^2] == 0 && u <= 0 && -u <= 0 && u*z^2 <= 0 && -(u*z^2) <= 0) || (u == 0 && u^(3/2)*y == 0 && Sqrt[-u]*Sqrt[-(u*z^2)] == 0 && Sqrt[u*z^2] == 0 && u <= 0 && -u <= 0 && u*z^2 <= 0 && -(u*z^2) <= 0), {x, y, z, u, v}}, {(v < 0 && -1 - E*v <= 0 && u != 0 && -1 - E*u <= 0 && -(u*x*y) < 0 && z != 0 && -1 - E*z <= 0 && -(v*z) < 0) || (v < 0 && -1 - E*v <= 0 && u != 0 && -1 - E*u <= 0 && u*x*y < 0 && z != 0 && -1 - E*z <= 0 && v*z < 0), {x, y, z, u, v}}, {(-Pi - 2*x < 0 && y - z < 0 && -Pi - 2*x <= 0 && -Pi + 2*x < 0 && -1 - z <= 0 && -1 + z <= 0 && -1 + z <= 0 && -Pi + 2*x <= 0) || (-Pi - 2*x < 0 && Pi + 2*x < 0 && -Pi + 2*x < 0 && -1 - z <= 0 && -1 - z <= 0 && -1 + z <= 0 && -1 + z <= 0 && -Pi + 2*x <= 0), {x, y, z}}, {(-x < 0 && y == 0 && -w < 0 && u != 0 && -1 - E*u <= 0 && v != 0 && -1 - E*v <= 0 && v*w != 0) || (-x < 0 && -w < 0 && z == 0 && u != 0 && -1 - E*u <= 0 && v != 0 && -1 - E*v <= 0 && v*w != 0), {x, y, z, u, v, w}}, {(-x < 0 && y == 0 && -w < 0 && u != 0 && -1 - E*u <= 0 && v != 0 && -1 - E*v <= 0 && v*w != 0) || (-x < 0 && -w < 0 && u != 0 && -1 - E*u <= 0 && z == 0 && v != 0 && -1 - E*v <= 0 && v*w != 0), {x, y, z, u, v, w}}, {(-x < 0 && y == 0 && -w < 0 && v != 0 && -1 - E*v <= 0 && u != 0 && u*x != 0 && -1 - E*u <= 0) || (-x < 0 && -w < 0 && z == 0 && v != 0 && -1 - E*v <= 0 && u != 0 && u*x != 0 && -1 - E*u <= 0), {x, y, z, u, v, w}}, {(-x < 0 && y == 0 && -w < 0 && v != 0 && -1 - E*v <= 0 && v*w != 0 && u != 0 && -1 - E*u <= 0) || (-x < 0 && -w < 0 && z == 0 && v != 0 && -1 - E*v <= 0 && v*w != 0 && u != 0 && -1 - E*u <= 0), {x, y, z, u, v, w}}, {(-x < 0 && y == 0 && v != 0 && -1 - E*v <= 0 && -w < 0 && v*w != 0 && u != 0 && -1 - E*u <= 0) || (-x < 0 && z == 0 && v != 0 && -1 - E*v <= 0 && -w < 0 && v*w != 0 && u != 0 && -1 - E*u <= 0), {x, y, z, u, v, w}}, {(-x < 0 && y == 0 && v != 0 && -1 - E*v <= 0 && -w < 0 && v*w != 0 && u != 0 && -1 - E*u <= 0) || (-x < 0 && v != 0 && -1 - E*v <= 0 && -w < 0 && v*w != 0 && z == 0 && u != 0 && -1 - E*u <= 0), {x, y, z, u, v, w}}, {(-x < 0 && -y <= 0 && -1 - y^2 < 0 && -1 + y^2 != 0 && 1 + z^2 != 0 && -1 + z^2 != 0 && y - 2*z + 2*y^2*z - y*z^2 == 0 && -y + x*z + x*y^2*z - y*z^2 == 0) || (-x < 0 && y <= 0 && 1 + y^2 < 0 && 1 + z^2 != 0 && -1 + z^2 != 0 && y - 2*z + 2*y^2*z - y*z^2 == 0 && -y + x*z + x*y^2*z - y*z^2 == 0), {x, y, z}}, {(Pi + 2*x < 0 && -Pi + 2*x < 0 && -Pi - 2*x < 0 && -1 - z <= 0 && -Pi + 2*x <= 0 && -1 - z <= 0 && -1 + z <= 0 && -1 + z <= 0) || (-Pi - 2*x <= 0 && -Pi + 2*x < 0 && -Pi - 2*x < 0 && y - z < 0 && -Pi + 2*x <= 0 && -1 - z <= 0 && -1 + z <= 0 && -1 + z <= 0), {x, y, z}}, {(-y < 0 && 1 + z < 0 && z - z^3 < 0 && -1 + 6*z^2 - z^4 < 0 && 1 + 2*z^2 + z^4 < 0 && 1 + y - 6*z^2 + 2*y*z^2 + z^4 + y*z^4 == 0 && -x < 0 && x - 4*z + 2*x*z^2 + 4*z^3 + x*z^4 == 0) || (-y < 0 && 1 + z < 0 && -z + z^3 < 0 && 1 - 6*z^2 + z^4 < 0 && -1 - 2*z^2 - z^4 < 0 && 1 + y - 6*z^2 + 2*y*z^2 + z^4 + y*z^4 == 0 && -x < 0 && x - 4*z + 2*x*z^2 + 4*z^3 + x*z^4 == 0), {x, y, z}}, {(-y < 0 && 1 + z < 0 && 1 + z^2 != 0 && z - z^3 < 0 && -1 + 6*z^2 - z^4 < 0 && 1 + 2*z^2 + z^4 < 0 && 1 + y - 6*z^2 + 2*y*z^2 + z^4 + y*z^4 == 0 && x - 4*z + 2*x*z^2 + 4*z^3 + x*z^4 == 0) || (-y < 0 && 1 + z < 0 && 1 + z^2 != 0 && -z + z^3 < 0 && 1 - 6*z^2 + z^4 < 0 && -1 - 2*z^2 - z^4 < 0 && 1 + y - 6*z^2 + 2*y*z^2 + z^4 + y*z^4 == 0 && x - 4*z + 2*x*z^2 + 4*z^3 + x*z^4 == 0), {x, y, z}}, {(y < 0 && y*Sqrt[-((x*z)/y)] < 0 && -1 - E*y <= 0 && z < 0 && -(E*z) < 0 && x < 0 && -(x*z) < 0 && E*y + 4*x*z <= 0) || (y < 0 && y*Sqrt[-((x*z)/y)] < 0 && -1 - E*y <= 0 && z < 0 && E*z < 0 && x < 0 && -(x*z) < 0 && -(E*y) - 4*x*z <= 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -z^3 < 0 && -(E*z) < 0 && -E^(5/3) + z <= 0 && x == 0 && y == 0 && E*y - z <= 0) || (-1 + z < 0 && -z < 0 && -z^3 < 0 && E*z < 0 && -E^(5/3) + z <= 0 && x == 0 && y == 0 && -(E*y) + z <= 0), {x, y, z}}, {(-1 + w <= 0 && -w < 0 && -s < 0 && -1 - 2*u^2 - u^4 + 2*v^2 - 2*u^2*v^2 - v^4 < 0 && -2*v*y + 2*u^2*v*y + 2*v^3*y - 2*u*z - 2*u^3*z - 2*u*v^2*z + w*z + 2*u^2*w*z + u^4*w*z - 2*v^2*w*z + 2*u^2*v^2*w*z + v^4*w*z == 0 && s + 2*s*u^2 + s*u^4 - 2*s*v^2 + 2*s*u^2*v^2 + s*v^4 + 2*u*y + 2*u^3*y + 2*u*v^2*y - w*y - 2*u^2*w*y - u^4*w*y + 2*v^2*w*y - 2*u^2*v^2*w*y - v^4*w*y - 2*v*z + 2*u^2*v*z + 2*v^3*z < 0 && w - 2*Pi*x < 0 && -Pi - w + 2*Pi*x < 0) || (-1 + w <= 0 && -w < 0 && -s < 0 && 1 + 2*u^2 + u^4 - 2*v^2 + 2*u^2*v^2 + v^4 < 0 && -2*v*y + 2*u^2*v*y + 2*v^3*y - 2*u*z - 2*u^3*z - 2*u*v^2*z + w*z + 2*u^2*w*z + u^4*w*z - 2*v^2*w*z + 2*u^2*v^2*w*z + v^4*w*z == 0 && -s - 2*s*u^2 - s*u^4 + 2*s*v^2 - 2*s*u^2*v^2 - s*v^4 - 2*u*y - 2*u^3*y - 2*u*v^2*y + w*y + 2*u^2*w*y + u^4*w*y - 2*v^2*w*y + 2*u^2*v^2*w*y + v^4*w*y + 2*v*z - 2*u^2*v*z - 2*v^3*z < 0 && w - 2*Pi*x < 0 && -Pi - w + 2*Pi*x < 0), {x, y, z, u, v, w, s}}, {(-x <= 0 && -y < 0 && -v < 0 && -x <= 0 && u < 0 && u^2 != 0 && -u - 3*Sqrt[x/y] < 0 && -2*u*Sqrt[v] + 5*v*z == 0) || (-x <= 0 && y < 0 && -v < 0 && x <= 0 && u < 0 && u^2 != 0 && -u - 3*Sqrt[x/y] < 0 && -2*u*Sqrt[v] + 5*v*z == 0), {x, y, z, u, v}}, {(-x <= 0 && -y < 0 && -v < 0 && -x <= 0 && u < 0 && u^2 != 0 && u + 3*Sqrt[x/y] < 0 && -2*u*Sqrt[v] + 5*v*z == 0) || (-x <= 0 && y < 0 && -v < 0 && x <= 0 && u < 0 && u^2 != 0 && u + 3*Sqrt[x/y] < 0 && -2*u*Sqrt[v] + 5*v*z == 0), {x, y, z, u, v}}, {(-x <= 0 && -y < 0 && -v < 0 && -x <= 0 && u - 3*Sqrt[x/y] < 0 && -u < 0 && u^2 != 0 && -2*u*Sqrt[v] + 5*v*z == 0) || (-x <= 0 && y < 0 && -v < 0 && x <= 0 && u - 3*Sqrt[x/y] < 0 && -u < 0 && u^2 != 0 && -2*u*Sqrt[v] + 5*v*z == 0), {x, y, z, u, v}}, {(-x <= 0 && -y < 0 && -v < 0 && -x <= 0 && -u + 3*Sqrt[x/y] < 0 && -u <= 0 && u^2 != 0 && -2*u*Sqrt[v] + 5*v*z == 0) || (-x <= 0 && y < 0 && -v < 0 && x <= 0 && -u + 3*Sqrt[x/y] < 0 && -u <= 0 && u^2 != 0 && -2*u*Sqrt[v] + 5*v*z == 0), {x, y, z, u, v}}, {(-Sqrt[(u*x*z)/(v*y)] <= 0 && -v < 0 && u != 0 && -1 - E*u <= 0 && -(u*x*z) <= 0 && y != 0 && -1 - E*y <= 0 && -(v*y) < 0) || (-Sqrt[(u*x*z)/(v*y)] <= 0 && -v < 0 && u != 0 && -1 - E*u <= 0 && u*x*z <= 0 && y != 0 && -1 - E*y <= 0 && v*y < 0), {x, y, z, u, v}}, {(u != 0 && -u^3 < 0 && -(E*u^3) < 0 && Sqrt[u^3]*z < 0 && -2*u^3 - E*Sqrt[u^3]*z <= 0 && -x < 0 && 2/3 - u*x <= 0 && 2*u^3*y - Sqrt[u^3]*z == 0) || (u != 0 && -u^3 < 0 && E*u^3 < 0 && Sqrt[u^3]*z < 0 && 2*u^3 + E*Sqrt[u^3]*z <= 0 && -x < 0 && 2/3 - u*x <= 0 && 2*u^3*y - Sqrt[u^3]*z == 0), {x, y, z, u}}, {(u != 0 && -u^3 < 0 && -(E*u^3) < 0 && Sqrt[u^3]*z < 0 && -2*u^3 - E*Sqrt[u^3]*z <= 0 && x < 0 && 2/3 - u*x <= 0 && 2*u^3*y - Sqrt[u^3]*z == 0) || (u != 0 && -u^3 < 0 && E*u^3 < 0 && Sqrt[u^3]*z < 0 && 2*u^3 + E*Sqrt[u^3]*z <= 0 && x < 0 && 2/3 - u*x <= 0 && 2*u^3*y - Sqrt[u^3]*z == 0), {x, y, z, u}}, {(u != 0 && -u^3 < 0 && -(E*u^3) < 0 && Sqrt[u^3]*z < 0 && -u^3 - E*Sqrt[u^3]*z <= 0 && -x < 0 && 2/3 - u*x <= 0 && u^3*y - Sqrt[u^3]*z == 0) || (u != 0 && -u^3 < 0 && E*u^3 < 0 && Sqrt[u^3]*z < 0 && u^3 + E*Sqrt[u^3]*z <= 0 && -x < 0 && 2/3 - u*x <= 0 && u^3*y - Sqrt[u^3]*z == 0), {x, y, z, u}}, {(u != 0 && -u^3 < 0 && -(E*u^3) < 0 && Sqrt[u^3]*z < 0 && -u^3 - E*Sqrt[u^3]*z <= 0 && x < 0 && 2/3 - u*x <= 0 && u^3*y - Sqrt[u^3]*z == 0) || (u != 0 && -u^3 < 0 && E*u^3 < 0 && Sqrt[u^3]*z < 0 && u^3 + E*Sqrt[u^3]*z <= 0 && x < 0 && 2/3 - u*x <= 0 && u^3*y - Sqrt[u^3]*z == 0), {x, y, z, u}}, {(x != 0 && -t < 0 && -(v*w*x) < 0 && s != 0 && -1 - E*s <= 0 && s*t != 0 && -(s*t*u*z) < 0 && v*w*x*y - s*t^2*u*z == 0) || (x != 0 && -t < 0 && v*w*x < 0 && s != 0 && -1 - E*s <= 0 && s*t != 0 && s*t*u*z < 0 && v*w*x*y - s*t^2*u*z == 0), {x, y, z, u, v, w, s, t}}, {(x != 0 && -t < 0 && s != 0 && -1 - E*s <= 0 && s*t != 0 && -(s*t*u*z) < 0 && -(v*w*x) < 0 && v*w*x*y - s*t^2*u*z == 0) || (x != 0 && -t < 0 && s != 0 && -1 - E*s <= 0 && s*t != 0 && s*t*u*z < 0 && v*w*x < 0 && v*w*x*y - s*t^2*u*z == 0), {x, y, z, u, v, w, s, t}}, {(x == 0 && Sqrt[-u]*Sqrt[-(u*z^2)] == 0 && Sqrt[u*z^2] != 0 && -Sqrt[u] <= 0 && -Sqrt[u*z^2] <= 0 && u <= 0 && -u <= 0 && u*z^2 <= 0 && -(u*z^2) <= 0) || (u == 0 && Sqrt[-u]*Sqrt[-(u*z^2)] == 0 && Sqrt[u*z^2] != 0 && -Sqrt[u] <= 0 && -Sqrt[u*z^2] <= 0 && u <= 0 && -u <= 0 && u*z^2 <= 0 && -(u*z^2) <= 0), {x, y, z, u}}, {(u < 0 && -Sqrt[-v^(-1)] + Sqrt[5*E]*w < 0 && -Sqrt[-v^(-1)] - Sqrt[5*E]*w < 0 && -1 + E^(1/(5*E))*u == 0 && v < 0 && -(E*v) < 0 && -1/5 - E*v*w^2 <= 0 && 2*w - x == 0 && 2*w - y == 0) || (u < 0 && -Sqrt[-v^(-1)] + Sqrt[5*E]*w < 0 && -Sqrt[-v^(-1)] - Sqrt[5*E]*w < 0 && -1 + E^(1/(5*E))*u == 0 && v < 0 && E*v < 0 && 1/5 + E*v*w^2 <= 0 && 2*w - x == 0 && 2*w - y == 0), {x, y, z, u, v, w}}, {(-x < 0 && -21 + y < 0 && -y < 0 && -y^2 < 0 && -441 + 42*y - y^2 < 0 && -16*y + z < 0 && -z < 0 && -256*y^2 + x*y^2 + 32*y*z - z^2 == 0 && -256*y^2 + 32*y*z - z^2 < 0) || (-x < 0 && -21 + y < 0 && -y < 0 && y^2 < 0 && -441 + 42*y - y^2 < 0 && -16*y + z < 0 && -z < 0 && -256*y^2 + x*y^2 + 32*y*z - z^2 == 0 && 256*y^2 - 32*y*z + z^2 < 0), {x, y, z}}, {(y < 0 && -y^2 < 0 && -y^30 < 0 && -x < 0 && -z < 0 && -(y^2*z) < 0 && -z^2 < 0 && -z^30 < 0 && 205891132094649*y^30 - x*z^30 == 0) || (y < 0 && -y^2 < 0 && y^30 < 0 && -x < 0 && -z < 0 && -(y^2*z) < 0 && -z^2 < 0 && z^30 < 0 && 205891132094649*y^30 - x*z^30 == 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -Sqrt[-((x*z)/y)] < 0 && x < 0 && x*z < 0 && -1 - E*x <= 0 && -y < 0 && -(y*z) < 0 && E*x + y*z <= 0) || (-1 + z < 0 && -z < 0 && -Sqrt[-((x*z)/y)] < 0 && -x < 0 && -(x*z) < 0 && -1 - E*x <= 0 && y < 0 && y*z < 0 && -(E*x) - y*z <= 0), {x, y, z}}, {(-Sqrt[(u*x*y)/(v*z)] <= 0 && v < 0 && -1 - E*v <= 0 && u != 0 && -1 - E*u <= 0 && -(u*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(v*z) < 0) || (-Sqrt[(u*x*y)/(v*z)] <= 0 && v < 0 && -1 - E*v <= 0 && u != 0 && -1 - E*u <= 0 && u*x*y <= 0 && z != 0 && -1 - E*z <= 0 && v*z < 0), {x, y, z, u, v}}, {(-z <= 0 && x == 0 && u^(3/2)*y == 0 && Sqrt[-u]*Sqrt[-(u*z)] == 0 && Sqrt[u*z] == 0 && u <= 0 && -u <= 0 && u*z <= 0 && -(u*z) <= 0) || (-z <= 0 && u == 0 && u^(3/2)*y == 0 && Sqrt[-u]*Sqrt[-(u*z)] == 0 && Sqrt[u*z] == 0 && u <= 0 && -u <= 0 && u*z <= 0 && -(u*z) <= 0), {x, y, z, u, v}}, {(s != 0 && -1 - E*s <= 0 && u != 0 && -1 - E*u <= 0 && -(u*v*w) < 0 && -t < 0 && s*t != 0 && -(s*t*y) < 0 && u*v*w*x - s*t^2*y*z == 0) || (s != 0 && -1 - E*s <= 0 && u != 0 && -1 - E*u <= 0 && u*v*w < 0 && -t < 0 && s*t != 0 && s*t*y < 0 && u*v*w*x - s*t^2*y*z == 0), {x, y, z, u, v, w, s, t}}, {(s != 0 && -1 - E*s <= 0 && u != 0 && -1 - E*u <= 0 && -(u*v*w) < 0 && -t < 0 && s*t != 0 && -(s*t*y*z) < 0 && u*v*w*x - s*t^2*y*z == 0) || (s != 0 && -1 - E*s <= 0 && u != 0 && -1 - E*u <= 0 && u*v*w < 0 && -t < 0 && s*t != 0 && s*t*y*z < 0 && u*v*w*x - s*t^2*y*z == 0), {x, y, z, u, v, w, s, t}}, {(u != 0 && -1 - E*u <= 0 && -(u*v*w) < 0 && s != 0 && -1 - E*s <= 0 && -t < 0 && s*t != 0 && -(s*t*y) < 0 && u*v*w*x - s*t^2*y*z == 0) || (u != 0 && -1 - E*u <= 0 && u*v*w < 0 && s != 0 && -1 - E*s <= 0 && -t < 0 && s*t != 0 && s*t*y < 0 && u*v*w*x - s*t^2*y*z == 0), {x, y, z, u, v, w, s, t}}, {(u != 0 && -1 - E*u <= 0 && -(u*v*w) < 0 && s != 0 && -1 - E*s <= 0 && -t < 0 && s*t != 0 && -(s*t*y*z) < 0 && u*v*w*x - s*t^2*y*z == 0) || (u != 0 && -1 - E*u <= 0 && u*v*w < 0 && s != 0 && -1 - E*s <= 0 && -t < 0 && s*t != 0 && s*t*y*z < 0 && u*v*w*x - s*t^2*y*z == 0), {x, y, z, u, v, w, s, t}}, {(-y < 0 && -u + y < 0 && -1 + u < 0 && -u < 0 && -Sqrt[x^2/u] <= 0 && x == 0 && -x^2 <= 0 && z < 0 && -z^2 < 0 && -9*x^2 - 6*Sqrt[u]*x*z - u*z^2 < 0) || (-y < 0 && -u + y < 0 && -1 + u < 0 && -u < 0 && -Sqrt[x^2/u] <= 0 && x == 0 && -x^2 <= 0 && z < 0 && z^2 < 0 && 9*x^2 + 6*Sqrt[u]*x*z + u*z^2 < 0), {x, y, z, u}}, {(-y < 0 && -u + y < 0 && -1 + u < 0 && -u < 0 && -Sqrt[x^2/u] <= 0 && x == 0 && -x^2 <= 0 && -z <= 0 && -z^2 < 0 && -9*x^2 + 6*Sqrt[u]*x*z - u*z^2 < 0) || (-y < 0 && -u + y < 0 && -1 + u < 0 && -u < 0 && -Sqrt[x^2/u] <= 0 && x == 0 && -x^2 <= 0 && -z <= 0 && z^2 < 0 && 9*x^2 - 6*Sqrt[u]*x*z + u*z^2 < 0), {x, y, z, u}}, {(-z <= 0 && x == 0 && Sqrt[-u]*Sqrt[-(u*z)] == 0 && Sqrt[u*z] != 0 && -Sqrt[u] <= 0 && -Sqrt[u*z] <= 0 && u <= 0 && -u <= 0 && u*z <= 0 && -(u*z) <= 0) || (-z <= 0 && u == 0 && Sqrt[-u]*Sqrt[-(u*z)] == 0 && Sqrt[u*z] != 0 && -Sqrt[u] <= 0 && -Sqrt[u*z] <= 0 && u <= 0 && -u <= 0 && u*z <= 0 && -(u*z) <= 0), {x, y, z, u}}, {(z != 0 && 1 + z^2 != 0 && -1 + z^2 != 0 && -z + z^3 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 + 2*z^2 + z^4 != 0 && x - 4*z^2 - 2*x*z^2 + x*z^4 == 0 && -y + 6*y*z^2 - y*z^4 < 0 && -y - 4*z + 6*y*z^2 + 4*z^3 - y*z^4 <= 0 && -y + 4*z + 6*y*z^2 - 4*z^3 - y*z^4 <= 0) || (z != 0 && 1 + z^2 != 0 && -1 + z^2 != 0 && -z + z^3 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 + 2*z^2 + z^4 != 0 && x - 4*z^2 - 2*x*z^2 + x*z^4 == 0 && y - 6*y*z^2 + y*z^4 < 0 && y + 4*z - 6*y*z^2 - 4*z^3 + y*z^4 <= 0 && y - 4*z - 6*y*z^2 + 4*z^3 + y*z^4 <= 0), {x, y, z}}, {(-z < 0 && y < 0 && -y^2 <= 0 && -(y^2*z) < 0 && -x < 0 && u < 0 && -u^2 < 0 && -u - 3*Sqrt[y^2/z] < 0 && -3*y + u*Sqrt[z] < 0 && -9*y^2 + 6*u*y*Sqrt[z] - u^2*z < 0 && -(u^2*x) + 9*y^2 - 6*u*y*Sqrt[z] + u^2*z == 0) || (-z < 0 && y < 0 && -y^2 <= 0 && y^2*z < 0 && -x < 0 && u < 0 && u^2 < 0 && -u - 3*Sqrt[y^2/z] < 0 && -3*y + u*Sqrt[z] < 0 && 9*y^2 - 6*u*y*Sqrt[z] + u^2*z < 0 && -(u^2*x) + 9*y^2 - 6*u*y*Sqrt[z] + u^2*z == 0), {x, y, z, u}}, {(-z < 0 && y < 0 && -y^2 <= 0 && -(y^2*z) < 0 && -x < 0 && u < 0 && -u^2 < 0 && -u - 3*Sqrt[y^2/z] < 0 && 3*y - u*Sqrt[z] <= 0 && -9*y^2 + 6*u*y*Sqrt[z] - u^2*z < 0 && -(u^2*x) + 9*y^2 - 6*u*y*Sqrt[z] + u^2*z == 0) || (-z < 0 && y < 0 && -y^2 <= 0 && y^2*z < 0 && -x < 0 && u < 0 && u^2 < 0 && -u - 3*Sqrt[y^2/z] < 0 && 3*y - u*Sqrt[z] <= 0 && 9*y^2 - 6*u*y*Sqrt[z] + u^2*z < 0 && -(u^2*x) + 9*y^2 - 6*u*y*Sqrt[z] + u^2*z == 0), {x, y, z, u}}, {(-z < 0 && y < 0 && -y^2 <= 0 && -(y^2*z) < 0 && -x < 0 && u < 0 && -u^2 < 0 && -u - 3*Sqrt[y^2/z] < 0 && 2*u + 3*Sqrt[y^2/z] != 0 && -3*y + u*Sqrt[z] < 0 && -9*y^2 + 6*u*y*Sqrt[z] - u^2*z < 0 && -(u^2*x) + 9*y^2 - 6*u*y*Sqrt[z] + u^2*z == 0) || (-z < 0 && y < 0 && -y^2 <= 0 && y^2*z < 0 && -x < 0 && u < 0 && u^2 < 0 && -u - 3*Sqrt[y^2/z] < 0 && 2*u + 3*Sqrt[y^2/z] != 0 && -3*y + u*Sqrt[z] < 0 && 9*y^2 - 6*u*y*Sqrt[z] + u^2*z < 0 && -(u^2*x) + 9*y^2 - 6*u*y*Sqrt[z] + u^2*z == 0), {x, y, z, u}}, {(-x < 0 && x^4 <= 0) || (-x < 0 && y*z - Log[5]^2 <= 0 && -(z*Log[5]) < 0) || (-x < 0 && -(y*z) + Log[5]^2 <= 0 && z*Log[5] < 0), {x, y, z}}, {(x < 0 && x^4 <= 0) || (x < 0 && y*z - Log[5]^2 <= 0 && -(z*Log[5]) < 0) || (x < 0 && -(y*z) + Log[5]^2 <= 0 && z*Log[5] < 0), {x, y, z}}, {(-y < 0 && z <= 0) || (-y < 0 && y - z <= 0) || (-y < 0 && -2*Sqrt[1 - x^2]*z - z^2 < 0), {x, y, z}}, {(-y < 0 && z <= 0) || (-y < 0 && y - z <= 0) || (-y < 0 && 2*Sqrt[1 - x^2]*z - z^2 < 0), {x, y, z}}, {(-y < 0 && z <= 0) || (-y < 0 && y - z <= 0) || (-y < 0 && -2*Sqrt[1 - x^2]*z + z^2 <= 0), {x, y, z}}, {(-y < 0 && z <= 0) || (-y < 0 && y - z <= 0) || (-y < 0 && 2*Sqrt[1 - x^2]*z + z^2 <= 0), {x, y, z}}, {(-y < 0 && z <= 0) || (-y < 0 && y - z <= 0) || (-y < 0 && -2*Sqrt[1 - x^2]*z + z^2 <= 0 && -1 + x^2 <= 0), {x, y, z}}, {(-x + y != 0 && y - z == 0) || (-x + y != 0 && x - z == 0) || (-x + y != 0 && x^2 - x*y + y^2 - x*z - y*z + z^2 == 0), {x, y, z}}, {(u - z == 0 && -y + z <= 0 && -x + y < 0) || (-11 + x - 7*y < 0 && -1 - u + x + y + z < 0 && u - z < 0) || (-1 - u + x + y + z < 0 && -x < 0), {x, y, z, u}}, {(z == 0 && -y < 0 && -x < 0) || (y == 0 && -y < 0 && -x < 0) || (x == 0 && -y < 0 && -x < 0), {x, y, z}}, {(-u + Log[2] == 0 && -u < 0 && u*v < 0) || (u - Log[2] <= 0 && -u < 0 && u*v < 0 && -(u*v) + y*Log[2] <= 0) || (u - Log[2] < 0 && -u < 0 && u*v - x*Log[2] <= 0), {x, y, z, u, v}}, {(-u < 0 && x < 0 && u*y + z <= 0) || (u < 0 && x < 0 && -(u*y) - z <= 0) || (x < 0 && -x <= 0), {x, y, z, u}}, {(-u + Log[2] < 0 && u - 2*Log[2] < 0 && -(u*v) + v*Log[2] - x*Log[2] <= 0) || (-u + Log[2] < 0 && -u + 2*Log[2] == 0 && -(u*v) + v*Log[2] < 0) || (-u + Log[2] < 0 && u - 2*Log[2] <= 0 && -(u*v) + v*Log[2] < 0 && u*v - v*Log[2] + y*Log[2] <= 0), {x, y, z, u, v}}, {(-x <= 0 && -y < 0 && z <= 0) || (-x <= 0 && -y < 0 && y - z <= 0) || (-x <= 0 && -y < 0 && -2*Sqrt[1 - x]*z - z^2 < 0), {x, y, z}}, {(-x <= 0 && -y < 0 && z <= 0) || (-x <= 0 && -y < 0 && y - z <= 0) || (-x <= 0 && -y < 0 && 2*Sqrt[1 - x]*z - z^2 < 0), {x, y, z}}, {(-x <= 0 && -y < 0 && z <= 0) || (-x <= 0 && -y < 0 && y - z <= 0) || (-x <= 0 && -y < 0 && -2*Sqrt[1 - x]*z + z^2 <= 0), {x, y, z}}, {(-x <= 0 && -y < 0 && z <= 0) || (-x <= 0 && -y < 0 && y - z <= 0) || (-x <= 0 && -y < 0 && 2*Sqrt[1 - x]*z + z^2 <= 0), {x, y, z}}, {(-x <= 0 && -y < 0 && z <= 0) || (-x <= 0 && -y < 0 && y - z <= 0) || (-x <= 0 && -y < 0 && -2*Sqrt[1 - x]*z + z^2 <= 0 && -1 + x <= 0), {x, y, z}}, {(u == 0 && -x < 0 && -z < 0 && -y < 0) || (x == 0 && -x < 0 && -z < 0 && -y < 0) || (y == 0 && -x < 0 && -z < 0 && -y < 0), {x, y, z, u}}, {(u == 0 && -y < 0 && -x < 0 && -z < 0) || (y == 0 && -y < 0 && -x < 0 && -z < 0) || (x == 0 && -y < 0 && -x < 0 && -z < 0), {x, y, z, u}}, {(u == 0 && -y < 0 && x < 0 && -z < 0) || (y == 0 && -y < 0 && x < 0 && -z < 0) || (x == 0 && -y < 0 && x < 0 && -z < 0), {x, y, z, u}}, {(x == 0 && x == 0 && z == 0 && z == 0) || (x == 0 && z == 0 && z == 0 && y == 0) || (x == 0 && z == 0 && y == 0), {x, y, z, u}}, {(x == 0 && -1 + z == 0 && z == 0 && -z < 0) || (x == 0 && z == 0 && 1 + z == 0 && -z < 0) || (x == 0 && y == 0 && -z < 0), {x, y, z}}, {(x == 0 && z == 0 && -y < 0 && -v < 0) || (x == 0 && v == 0 && -y < 0 && -v < 0) || (u == 0 && -y < 0 && -v < 0), {x, y, z, u, v}}, {(u < 0 && -y < 0 && -1/4 + E*u*y <= 0 && 1/16 - E*u*y^2*z < 0) || (u < 0 && -y < 0 && -1/4 + E*u*y <= 0 && -1/16 + E*u*y^2*z == 0) || (u < 0 && -y < 0 && -1/4 + E*u*y <= 0 && x + 4*u*y <= 0 && -1/16 + E*u*y^2*z < 0), {x, y, z, u}}, {(-x < 0 && x < 0 && -u < 0 && u - y <= 0) || (x < 0 && 4 - E*x <= 0 && -u < 0) || (x < 0 && -u < 0 && -u + z <= 0), {x, y, z, u}}, {(-z < 0 && x < 0 && 1 + u <= 0 && u + y*z <= 0) || (z < 0 && x < 0 && 1 + u <= 0 && -u - y*z <= 0) || (x < 0 && -x <= 0 && 1 + u <= 0), {x, y, z, u}}, {(z == 0 && y == 0 && x == 0 && 1 + x == 0 && z < 0) || (z == 0 && y == 0 && x == 0 && z < 0 && -1 - x < 0 && x < 0) || (z == 0 && y == 0 && x == 0 && z < 0 && 1 + x < 0), {x, y, z}}, {(u < 0 && -z < 0 && -1 + z*Sqrt[(1 + 8*z)/z^2] <= 0 && -z^2 < 0 && -4 + 2*v - w == 0 && v - x == 0 && -4 + 2*v - y == 0) || (u < 0 && z < 0 && -1/8 - z < 0 && 1 - z*Sqrt[(1 + 8*z)/z^2] <= 0 && -z^2 < 0 && -4 + 2*v - w == 0 && v - x == 0 && -4 + 2*v - y == 0) || (u < 0 && 1/8 + z < 0 && 1 - z*Sqrt[(1 + 8*z)/z^2] <= 0 && z^2 < 0 && -4 + 2*v - w == 0 && v - x == 0 && -4 + 2*v - y == 0), {x, y, z, u, v, w}}, {-x + z <= 0 || -x + y <= 0 || y^2 - z^2 - 4*y*z^2 - 2*y^2*z^2 < 0, {x, y, z}}, {(1 + x == 0 && y - z^2*Log[2] < 0) || (1 + x == 0 && -1 - 2*x + 2*Sqrt[1 + x] <= 0 && -1 - x <= 0) || (-1 - x < 0 && y - z^2*Log[2] < 0) || (-1 - x < 0 && -1 - 2*x + 2*Sqrt[1 + x] <= 0 && -1 - x <= 0), {x, y, z}}, {(u - u^3 < 0 && -4*u*x + 4*u^3*x - y - 2*u^2*y - u^4*y < 0 && 1 + Sqrt[2] + z < 0) || (-u + u^3 < 0 && 4*u*x - 4*u^3*x + y + 2*u^2*y + u^4*y < 0 && 1 + Sqrt[2] + z < 0) || (1 + Sqrt[2] + z < 0 && -1 + 6*z^2 - z^4 < 0 && 1 + 2*z^2 + z^4 <= 0) || (1 + Sqrt[2] + z < 0 && 1 - 6*z^2 + z^4 < 0 && -1 - 2*z^2 - z^4 <= 0), {x, y, z, u}}, {(-z <= 0 && 1 + x == 0 && y - z*Log[2] < 0) || (-z <= 0 && 1 + x == 0 && -1 - 2*x + 2*Sqrt[1 + x] <= 0 && -1 - x <= 0) || (-z <= 0 && -1 - x < 0 && y - z*Log[2] < 0) || (-z <= 0 && -1 - x < 0 && -1 - 2*x + 2*Sqrt[1 + x] <= 0 && -1 - x <= 0), {x, y, z}}, {(u == 0 && x == 0 && z == 0 && -y < 0) || (x < 0 && -y < 0 && -(x*y) - Log[2] <= 0 && -x + 2*u*Log[2] == 0 && z == 0) || (-x + 2*u*Log[2] == 0 && z == 0 && -x < 0 && -y < 0) || (-x < 0 && x*y + Log[2] <= 0 && -x + 2*u*Log[2] == 0 && z == 0), {x, y, z, u}}, {(x == 0 && u*y - z^2 == 0 && u*y - z^2 != 0 && -u < 0) || (u == 0 && u*y - z^2 == 0 && u*y - z^2 != 0 && -u < 0) || (z == 0 && u*y - z^2 == 0 && u*y - z^2 != 0 && -u < 0) || (y == 0 && u*y - z^2 == 0 && u*y - z^2 != 0 && -u < 0), {x, y, z, u, v}}, {(x == 0 && u*y - z^2 == 0 && u*y - z^2 != 0 && u < 0) || (u == 0 && u*y - z^2 == 0 && u*y - z^2 != 0 && u < 0) || (z == 0 && u*y - z^2 == 0 && u*y - z^2 != 0 && u < 0) || (y == 0 && u*y - z^2 == 0 && u*y - z^2 != 0 && u < 0), {x, y, z, u, v}}, {(1 + x == 0 && -Sqrt[3] + 2*x < 0 && -Sqrt[3] - 2*x <= 0 && y - z^2*Log[2] < 0) || (1 + x == 0 && -Sqrt[3] + 2*x < 0 && -Sqrt[3] - 2*x <= 0 && -1 - 2*x + 2*Sqrt[1 + x] <= 0 && -1 - x <= 0) || (-1 - x < 0 && -Sqrt[3] + 2*x < 0 && -Sqrt[3] - 2*x <= 0 && y - z^2*Log[2] < 0) || (-1 - x < 0 && -Sqrt[3] + 2*x < 0 && -Sqrt[3] - 2*x <= 0 && -1 - 2*x + 2*Sqrt[1 + x] <= 0 && -1 - x <= 0), {x, y, z}}, {(-Sqrt[y/x] + z == 0 && -x < 0 && y == 0 && -u < 0) || (-Sqrt[y/x] + z == 0 && x < 0 && y == 0 && -u < 0) || (-Sqrt[y/x] + z == 0 && -x < 0 && -y < 0 && -u < 0) || (-Sqrt[y/x] + z == 0 && x < 0 && y < 0 && -u < 0), {x, y, z, u}}, {(Sqrt[y/x] + z == 0 && -x < 0 && y == 0 && -u < 0) || (Sqrt[y/x] + z == 0 && x < 0 && y == 0 && -u < 0) || (Sqrt[y/x] + z == 0 && -x < 0 && -y < 0 && -u < 0) || (Sqrt[y/x] + z == 0 && x < 0 && y < 0 && -u < 0), {x, y, z, u}}, {(-x < 0 && -x^2 < 0 && -y^2 + 4*x*z <= 0 && y + x*Sqrt[(y^2 - 4*x*z)/x^2] < 0) || (-x < 0 && x^2 < 0 && y^2 - 4*x*z <= 0 && y + x*Sqrt[(y^2 - 4*x*z)/x^2] < 0) || (x < 0 && -x^2 < 0 && -y^2 + 4*x*z <= 0 && -y - x*Sqrt[(y^2 - 4*x*z)/x^2] < 0) || (x < 0 && x^2 < 0 && y^2 - 4*x*z <= 0 && -y - x*Sqrt[(y^2 - 4*x*z)/x^2] < 0), {x, y, z}}, {(z < 0 && 1/2 + u*z < 0 && 1 + x == 0 && y == 0) || (z < 0 && 1/2 + u*z <= 0 && x < 0 && -1 - x < 0 && y == 0) || (z < 0 && 1/2 + u*z <= 0 && x - 2*u*z < 0 && 1 + x < 0 && y == 0) || (z < 0 && -x + 2*u*z < 0 && 1 + x < 0 && y == 0), {x, y, z, u}}, {(-z + Log[2] < 0 && z - 2*Log[2] <= 0 && -(u*z) + u*Log[2] < 0 && -(u*z) + u*Log[2] - x*Log[2] <= 0) || (-z + Log[2] < 0 && z - 2*Log[2] <= 0 && -(u*z) + u*Log[2] < 0 && u*z - u*Log[2] + y*Log[2] <= 0) || (-z + Log[2] < 0 && -z + 2*Log[2] == 0 && -(u*z) + u*Log[2] < 0) || (-z + Log[2] < 0 && z - 2*Log[2] < 0 && -(u*z) + u*Log[2] - x*Log[2] <= 0), {x, y, z, u}}, {(z - Log[2] <= 0 && -z < 0 && u*z < 0 && u*z - x*Log[2] <= 0) || (z - Log[2] < 0 && -z < 0 && u*z - x*Log[2] <= 0) || (z - Log[2] <= 0 && -z < 0 && u*z < 0 && -(u*z) + y*Log[2] <= 0) || (-z + Log[2] == 0 && -z < 0 && u*z < 0), {x, y, z, u}}, {(-z < 0 && z*Log[3] + z*Log[7] - Log[336] < 0 && u - u*z + x*z < 0 && -u + u*z - z*Log[16] < 0 && -336 + y <= 0) || (z < 0 && z*Log[3] + z*Log[7] - Log[336] < 0 && -u + u*z - x*z < 0 && u - u*z + z*Log[16] < 0 && -336 + y <= 0) || (-z < 0 && z*Log[3] + z*Log[7] - Log[336] < 0 && -u + u*z - z*Log[16] < 0 && y <= 0) || (z < 0 && z*Log[3] + z*Log[7] - Log[336] < 0 && u - u*z + z*Log[16] < 0 && y <= 0), {x, y, z, u}}, {(-z <= 0 && 1 + x == 0 && -Sqrt[3] + 2*x < 0 && -Sqrt[3] - 2*x <= 0 && y - z*Log[2] < 0) || (-z <= 0 && 1 + x == 0 && -Sqrt[3] + 2*x < 0 && -Sqrt[3] - 2*x <= 0 && -1 - 2*x + 2*Sqrt[1 + x] <= 0 && -1 - x <= 0) || (-z <= 0 && -1 - x < 0 && -Sqrt[3] + 2*x < 0 && -Sqrt[3] - 2*x <= 0 && y - z*Log[2] < 0) || (-z <= 0 && -1 - x < 0 && -Sqrt[3] + 2*x < 0 && -Sqrt[3] - 2*x <= 0 && -1 - 2*x + 2*Sqrt[1 + x] <= 0 && -1 - x <= 0), {x, y, z}}, {(u != 0 && -z + Log[2] < 0 && z - 2*Log[2] <= 0 && -(u*z) + u*Log[2] < 0 && -(u*z) + u*Log[2] - x*Log[2] <= 0) || (u != 0 && -z + Log[2] < 0 && z - 2*Log[2] <= 0 && -(u*z) + u*Log[2] < 0 && u*z - u*Log[2] + y*Log[2] <= 0) || (u != 0 && -z + Log[2] < 0 && -z + 2*Log[2] == 0 && -(u*z) + u*Log[2] < 0) || (u != 0 && -z + Log[2] < 0 && z - 2*Log[2] < 0 && -(u*z) + u*Log[2] - x*Log[2] <= 0), {x, y, z, u}}, {(u != 0 && z - Log[2] <= 0 && -z < 0 && u*z < 0 && u*z - x*Log[2] <= 0) || (u != 0 && z - Log[2] < 0 && -z < 0 && u*z - x*Log[2] <= 0) || (u != 0 && z - Log[2] <= 0 && -z < 0 && u*z < 0 && -(u*z) + y*Log[2] <= 0) || (u != 0 && -z + Log[2] == 0 && -z < 0 && u*z < 0), {x, y, z, u}}, {(x != 0 && -(E*x) < 0 && z < 0 && -(x*z) < 0 && -x + 4*E*y*z == 0) || (x != 0 && -(E*x) < 0 && z < 0 && x*z < 0 && -x + 4*E*y*z <= 0) || (x != 0 && E*x < 0 && z < 0 && -(x*z) < 0 && x - 4*E*y*z <= 0) || (x != 0 && E*x < 0 && z < 0 && x*z < 0 && -x + 4*E*y*z == 0), {x, y, z}}, {(t < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]) < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && -(u*v*x) < 0 && -(s*u*w) < 0) || (t < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)] < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && -(u*v*x) < 0 && s*u*w < 0) || (t < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]) < 0 && -1 - E*t <= 0 && t*y*z < 0 && u*v*x < 0 && -(s*u*w) < 0) || (t < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)] < 0 && -1 - E*t <= 0 && t*y*z < 0 && u*v*x < 0 && s*u*w < 0), {x, y, z, u, v, w, s, t}}, {(t < 0 && -1 - E*t <= 0 && -(t*u*z) < 0 && -(t*u*Sqrt[(v*x*y)/(t*u*z)]*z) < 0 && -(v*x*y) < 0 && -(s*w*x) < 0) || (t < 0 && -1 - E*t <= 0 && -(t*u*z) < 0 && t*u*Sqrt[(v*x*y)/(t*u*z)]*z < 0 && -(v*x*y) < 0 && s*w*x < 0) || (t < 0 && -1 - E*t <= 0 && t*u*z < 0 && -(t*u*Sqrt[(v*x*y)/(t*u*z)]*z) < 0 && v*x*y < 0 && -(s*w*x) < 0) || (t < 0 && -1 - E*t <= 0 && t*u*z < 0 && t*u*Sqrt[(v*x*y)/(t*u*z)]*z < 0 && v*x*y < 0 && s*w*x < 0), {x, y, z, u, v, w, s, t}}, {(t < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]*z) < 0 && -(u*v*x) < 0 && -(s*u*w) < 0) || (t < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)]*z < 0 && -(u*v*x) < 0 && s*u*w < 0) || (t < 0 && -1 - E*t <= 0 && t*y*z < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]*z) < 0 && u*v*x < 0 && -(s*u*w) < 0) || (t < 0 && -1 - E*t <= 0 && t*y*z < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)]*z < 0 && u*v*x < 0 && s*u*w < 0), {x, y, z, u, v, w, s, t}}, {(-x < 0 && -(E*x) < 0 && z < 0 && -(E*x*z) < 0 && y != 0 && -x + 4*E*y*z == 0) || (-x < 0 && -(E*x) < 0 && z < 0 && E*x*z < 0 && y != 0 && -x + 4*E*y*z <= 0) || (-x < 0 && E*x < 0 && z < 0 && -(E*x*z) < 0 && y != 0 && x - 4*E*y*z <= 0) || (-x < 0 && E*x < 0 && z < 0 && E*x*z < 0 && y != 0 && -x + 4*E*y*z == 0), {x, y, z}}, {(x < 0 && -(E*z) < 0 && -(E*z*Log[2]) < 0 && E*x*z + E*Log[2] - z*Log[2] <= 0 && -y < 0 && -(E*x) - y*Log[2] < 0) || (x < 0 && E*z < 0 && E*z*Log[2] < 0 && -(E*x*z) - E*Log[2] + z*Log[2] <= 0 && -y < 0 && -(E*x) - y*Log[2] < 0) || (x < 0 && E*z < 0 && -(E*z*Log[2]) < 0 && E*x*z + E*Log[2] - z*Log[2] == 0 && -y < 0 && -(E*x) - y*Log[2] < 0) || (x < 0 && -(E*z) < 0 && E*z*Log[2] < 0 && E*x*z + E*Log[2] - z*Log[2] == 0 && -y < 0 && -(E*x) - y*Log[2] < 0), {x, y, z}}, {(-y < 0 && E*y < 0 && x < 0 && -(E*x*y) < 0 && -z < 0 && y - 4*E*x*z <= 0) || (-y < 0 && -(E*y) < 0 && x < 0 && E*x*y < 0 && -z < 0 && -y + 4*E*x*z <= 0) || (-y < 0 && -(E*y) < 0 && x < 0 && -(E*x*y) < 0 && -z < 0 && -y + 4*E*x*z == 0) || (-y < 0 && E*y < 0 && x < 0 && E*x*y < 0 && -z < 0 && -y + 4*E*x*z == 0), {x, y, z}}, {(1 - z < 0 && 1 - z^4 < 0 && -x < 0 && -y < 0 && y*z < 0 && -(E*x) - y*z <= 0) || (1 - z < 0 && 1 - z^4 < 0 && -x < 0 && y < 0 && y*z < 0 && E*x + y*z <= 0) || (1 - z < 0 && 1 - z^4 < 0 && x < 0 && -y < 0 && -(y*z) < 0 && -(E*x) - y*z <= 0) || (1 - z < 0 && 1 - z^4 < 0 && x < 0 && y < 0 && -(y*z) < 0 && E*x + y*z <= 0), {x, y, z}}, {(-583 + z < 0 && 71 - z < 0 && -339889 + 1166*z - z^2 < 0 && -y < 0 && u - y*Log[21] < 0 && -u + u*y + x*y < 0) || (-583 + z < 0 && 71 - z < 0 && -339889 + 1166*z - z^2 < 0 && y < 0 && -u + y*Log[21] < 0 && u - u*y - x*y < 0) || (-583 + z < 0 && 71 - z < 0 && -339889 + 1166*z - z^2 < 0 && -y < 0 && 32 + 583*Sqrt[2]*Sqrt[(-71 + z)/(-583 + z)^2] - Sqrt[2]*Sqrt[(-71 + z)/(-583 + z)^2]*z <= 0 && 71 + (339889*(-71 + z))/(-583 + z)^2 - z - (1166*(-71 + z)*z)/ (-583 + z)^2 + ((-71 + z)*z^2)/(-583 + z)^2 == 0 && u - y*Log[21] < 0) || (-583 + z < 0 && 71 - z < 0 && -339889 + 1166*z - z^2 < 0 && y < 0 && 32 + 583*Sqrt[2]*Sqrt[(-71 + z)/(-583 + z)^2] - Sqrt[2]*Sqrt[(-71 + z)/(-583 + z)^2]*z <= 0 && 71 + (339889*(-71 + z))/(-583 + z)^2 - z - (1166*(-71 + z)*z)/ (-583 + z)^2 + ((-71 + z)*z^2)/(-583 + z)^2 == 0 && -u + y*Log[21] < 0), {x, y, z, u}}, {(-z < 0 && 1 - z^4 < 0 && -x < 0 && -y < 0 && y*z < 0 && E*x + y*z <= 0) || (-z < 0 && 1 - z^4 < 0 && -x < 0 && y < 0 && y*z < 0 && -(E*x) - y*z <= 0) || (-z < 0 && 1 - z^4 < 0 && x < 0 && -y < 0 && -(y*z) < 0 && E*x + y*z <= 0) || (-z < 0 && 1 - z^4 < 0 && x < 0 && y < 0 && -(y*z) < 0 && -(E*x) - y*z <= 0), {x, y, z}}, {(x == 0 && s != 0 && s != 0 && s*w != 0 && -y < 0 && -s < 0 && -w < 0) || (x == 0 && -y < 0 && -s < 0 && w < 0 && -1 - E*w <= 0 && s*w != 0) || (s != 0 && s != 0 && z == 0 && s*w != 0 && -y < 0 && -s < 0 && -w < 0) || (-y < 0 && -s < 0 && z == 0 && w < 0 && -1 - E*w <= 0 && s*w != 0), {x, y, z, u, v, w, s}}, {(x == 0 && s != 0 && s != 0 && v*y != 0 && -y < 0 && -s < 0 && -v < 0) || (x == 0 && -y < 0 && -s < 0 && v < 0 && v*y != 0 && -1 - E*v <= 0) || (s != 0 && s != 0 && w == 0 && v*y != 0 && -y < 0 && -s < 0 && -v < 0) || (-y < 0 && -s < 0 && w == 0 && v < 0 && v*y != 0 && -1 - E*v <= 0), {x, y, z, u, v, w, s}}, {(-5 + y == 0 && -1 + x == 0 && 1 + x^2 != 0 && u*y*z + u*x^2*y*z == 0 && -7 - 3*x^2 + y - 2*u^2*y + x^2*y - 2*u^2*x^2*y + 2*y^3 + 2*x^2*y^3 + 2*y*z^2 + 2*x^2*y*z^2 == 0 && -u + 2*u^3 - u*x^2 + 2*u^3*x^2 - 2*u*y^2 - 2*u*x^2*y^2 - 6*u*z^2 - 6*u*x^2*z^2 == 0 && -4*x + z - 6*u^2*z + x^2*z - 6*u^2*x^2*z + 2*y^2*z + 2*x^2*y^2*z + 2*z^3 + 2*x^2*z^3 == 0) || (-5 + y == 0 && 1 + x == 0 && 1 + x^2 != 0 && u*y*z + u*x^2*y*z == 0 && -7 - 3*x^2 + y - 2*u^2*y + x^2*y - 2*u^2*x^2*y + 2*y^3 + 2*x^2*y^3 + 2*y*z^2 + 2*x^2*y*z^2 == 0 && -u + 2*u^3 - u*x^2 + 2*u^3*x^2 - 2*u*y^2 - 2*u*x^2*y^2 - 6*u*z^2 - 6*u*x^2*z^2 == 0 && -4*x + z - 6*u^2*z + x^2*z - 6*u^2*x^2*z + 2*y^2*z + 2*x^2*y^2*z + 2*z^3 + 2*x^2*z^3 == 0) || (-1 + x == 0 && x == 0 && 1 + x^2 != 0 && u*y*z + u*x^2*y*z == 0 && -7 - 3*x^2 + y - 2*u^2*y + x^2*y - 2*u^2*x^2*y + 2*y^3 + 2*x^2*y^3 + 2*y*z^2 + 2*x^2*y*z^2 == 0 && -u + 2*u^3 - u*x^2 + 2*u^3*x^2 - 2*u*y^2 - 2*u*x^2*y^2 - 6*u*z^2 - 6*u*x^2*z^2 == 0 && -4*x + z - 6*u^2*z + x^2*z - 6*u^2*x^2*z + 2*y^2*z + 2*x^2*y^2*z + 2*z^3 + 2*x^2*z^3 == 0) || (x == 0 && 1 + x == 0 && 1 + x^2 != 0 && u*y*z + u*x^2*y*z == 0 && -7 - 3*x^2 + y - 2*u^2*y + x^2*y - 2*u^2*x^2*y + 2*y^3 + 2*x^2*y^3 + 2*y*z^2 + 2*x^2*y*z^2 == 0 && -u + 2*u^3 - u*x^2 + 2*u^3*x^2 - 2*u*y^2 - 2*u*x^2*y^2 - 6*u*z^2 - 6*u*x^2*z^2 == 0 && -4*x + z - 6*u^2*z + x^2*z - 6*u^2*x^2*z + 2*y^2*z + 2*x^2*y^2*z + 2*z^3 + 2*x^2*z^3 == 0), {x, y, z, u}}, {(1 - u < 0 && s < 0 && -(s*u*Sqrt[(v*w*x*y)/(s*u*z)]) < 0 && -1 - E*s <= 0 && -(s*u*z) < 0 && -(v*w*x) < 0 && -(v*w*x*y) <= 0) || (1 - u < 0 && s < 0 && -(s*u*Sqrt[(v*w*x*y)/(s*u*z)]) < 0 && -1 - E*s <= 0 && s*u*z < 0 && -(v*w*x) < 0 && v*w*x*y <= 0) || (1 - u < 0 && s < 0 && s*u*Sqrt[(v*w*x*y)/(s*u*z)] < 0 && -1 - E*s <= 0 && -(s*u*z) < 0 && v*w*x < 0 && -(v*w*x*y) <= 0) || (1 - u < 0 && s < 0 && s*u*Sqrt[(v*w*x*y)/(s*u*z)] < 0 && -1 - E*s <= 0 && s*u*z < 0 && v*w*x < 0 && v*w*x*y <= 0), {x, y, z, u, v, w, s}}, {(-x < 0 && y < 0 && -1 - E*y <= 0 && -z < 0 && -(x*z) < 0 && -(E*z) < 0 && E*y + x*z <= 0) || (-x < 0 && y < 0 && -1 - E*y <= 0 && -z < 0 && -(x*z) < 0 && E*z < 0 && -(E*y) - x*z <= 0) || (-x < 0 && -y < 0 && -1 - E*y <= 0 && z < 0 && x*z < 0 && -(E*z) < 0 && E*y + x*z <= 0) || (-x < 0 && -y < 0 && -1 - E*y <= 0 && z < 0 && x*z < 0 && E*z < 0 && -(E*y) - x*z <= 0), {x, y, z}}, {(-x < 0 && -1 - E*x <= 0 && y < 0 && -(E*y) < 0 && -z < 0 && y*z < 0 && E*x + 4*y*z <= 0) || (-x < 0 && -1 - E*x <= 0 && y < 0 && E*y < 0 && -z < 0 && y*z < 0 && -(E*x) - 4*y*z <= 0) || (x < 0 && -1 - E*x <= 0 && -y < 0 && -(E*y) < 0 && -z < 0 && -(y*z) < 0 && E*x + 4*y*z <= 0) || (x < 0 && -1 - E*x <= 0 && -y < 0 && E*y < 0 && -z < 0 && -(y*z) < 0 && -(E*x) - 4*y*z <= 0), {x, y, z}}, {(-x < 0 && -1 - E*x <= 0 && y < 0 && -(E*y) < 0 && -z < 0 && y*z < 0 && E*x + 4*y*z <= 0) || (x < 0 && -1 - E*x <= 0 && -y < 0 && -(E*y) < 0 && -z < 0 && -(y*z) < 0 && E*x + 4*y*z <= 0) || (-x < 0 && -1 - E*x <= 0 && y < 0 && E*y < 0 && -z < 0 && y*z < 0 && -(E*x) - 4*y*z <= 0) || (x < 0 && -1 - E*x <= 0 && -y < 0 && E*y < 0 && -z < 0 && -(y*z) < 0 && -(E*x) - 4*y*z <= 0), {x, y, z}}, {(-x < 0 && -1 - E*x <= 0 && z != 0 && -(E*z) < 0 && y < 0 && y*z < 0 && -(E*x) - 4*y*z <= 0) || (x < 0 && -1 - E*x <= 0 && z != 0 && -(E*z) < 0 && y < 0 && -(y*z) < 0 && -(E*x) - 4*y*z <= 0) || (-x < 0 && -1 - E*x <= 0 && z != 0 && E*z < 0 && y < 0 && y*z < 0 && E*x + 4*y*z <= 0) || (x < 0 && -1 - E*x <= 0 && z != 0 && E*z < 0 && y < 0 && -(y*z) < 0 && E*x + 4*y*z <= 0), {x, y, z}}, {(x < 0 && -y < 0 && -1 - E*y <= 0 && -z < 0 && x*z < 0 && -(E*z) < 0 && -(E*y) - x*z <= 0) || (x < 0 && -y < 0 && -1 - E*y <= 0 && -z < 0 && x*z < 0 && E*z < 0 && E*y + x*z <= 0) || (x < 0 && y < 0 && -1 - E*y <= 0 && z < 0 && -(x*z) < 0 && -(E*z) < 0 && -(E*y) - x*z <= 0) || (x < 0 && y < 0 && -1 - E*y <= 0 && z < 0 && -(x*z) < 0 && E*z < 0 && E*y + x*z <= 0), {x, y, z}}, {(x < 0 && y < 0 && -1 - E*y <= 0 && -z < 0 && -(x*z) < 0 && -(E*z) < 0 && -(E*y) - x*z <= 0) || (x < 0 && y < 0 && -1 - E*y <= 0 && -z < 0 && -(x*z) < 0 && E*z < 0 && E*y + x*z <= 0) || (x < 0 && -y < 0 && -1 - E*y <= 0 && z < 0 && x*z < 0 && -(E*z) < 0 && -(E*y) - x*z <= 0) || (x < 0 && -y < 0 && -1 - E*y <= 0 && z < 0 && x*z < 0 && E*z < 0 && E*y + x*z <= 0), {x, y, z}}, {(x < 0 && -(E*z) < 0 && -(E*z*Log[2]) < 0 && E*x*z + E*Log[2] - z*Log[2] <= 0 && -y < 0 && E*y < 0 && E*x + y*Log[2] < 0) || (x < 0 && E*z < 0 && E*z*Log[2] < 0 && -(E*x*z) - E*Log[2] + z*Log[2] <= 0 && -y < 0 && E*y < 0 && E*x + y*Log[2] < 0) || (x < 0 && E*z < 0 && -(E*z*Log[2]) < 0 && E*x*z + E*Log[2] - z*Log[2] == 0 && -y < 0 && E*y < 0 && E*x + y*Log[2] < 0) || (x < 0 && -(E*z) < 0 && E*z*Log[2] < 0 && E*x*z + E*Log[2] - z*Log[2] == 0 && -y < 0 && E*y < 0 && E*x + y*Log[2] < 0), {x, y, z}}, {(y < 0 && -y^2 < 0 && -x < 0 && -z < 0 && y^2*z == 0 && -z^2 < 0 && 9*y^2 - x*z^2 == 0) || (y < 0 && y^2 < 0 && -x < 0 && -z < 0 && y^2*z == 0 && z^2 < 0 && 9*y^2 - x*z^2 == 0) || (y < 0 && -y^2 < 0 && -x < 0 && -z < 0 && -(y^2*z) < 0 && -z^2 < 0 && 9*y^2 - x*z^2 == 0) || (y < 0 && y^2 < 0 && -x < 0 && -z < 0 && -(y^2*z) < 0 && z^2 < 0 && 9*y^2 - x*z^2 == 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && -(s*y*z) < 0 && -(u*v*w) < 0 && -(u*v*w*x) <= 0) || (-1 + z < 0 && -z < 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && s*y*z < 0 && -(u*v*w) < 0 && u*v*w*x <= 0) || (-1 + z < 0 && -z < 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && -(s*y*z) < 0 && u*v*w < 0 && -(u*v*w*x) <= 0) || (-1 + z < 0 && -z < 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && s*y*z < 0 && u*v*w < 0 && u*v*w*x <= 0), {x, y, z, u, v, w, s}}, {(-1 + z < 0 && -z < 0 && -(u*v*w) < 0 && -(u*v*w*x) <= 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && -(s*y*z) < 0) || (-1 + z < 0 && -z < 0 && -(u*v*w) < 0 && u*v*w*x <= 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && s*y*z < 0) || (-1 + z < 0 && -z < 0 && u*v*w < 0 && -(u*v*w*x) <= 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && -(s*y*z) < 0) || (-1 + z < 0 && -z < 0 && u*v*w < 0 && u*v*w*x <= 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && s*y*z < 0), {x, y, z, u, v, w, s}}, {(z < 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && -y < 0 && y*z < 0 && -(E*x) - y*z <= 0) || (z < 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && y < 0 && y*z < 0 && E*x + y*z <= 0) || (z < 0 && -1 + z^4 < 0 && -z^4 < 0 && x < 0 && -y < 0 && -(y*z) < 0 && -(E*x) - y*z <= 0) || (z < 0 && -1 + z^4 < 0 && -z^4 < 0 && x < 0 && y < 0 && -(y*z) < 0 && E*x + y*z <= 0), {x, y, z}}, {(y == 0 && z == 0 && y + u*z != 0 && -y < 0 && -z < 0 && -u < 0 && -1 + x <= 0 && -x <= 0) || (y == 0 && y + u*z != 0 && -1 + x == 0 && -y < 0 && -z < 0 && -u < 0 && -1 + x <= 0 && -x <= 0) || (z == 0 && y + u*z != 0 && x == 0 && -y < 0 && -z < 0 && -u < 0 && -1 + x <= 0 && -x <= 0) || (y + u*z != 0 && -1 + x == 0 && x == 0 && -y < 0 && -z < 0 && -u < 0 && -1 + x <= 0 && -x <= 0), {x, y, z, u}}, {(y == 0 && x != 0 && -w < 0 && v < 0 && -1 - E*v <= 0 && z == 0 && u < 0 && -1 - E*u <= 0) || (y == 0 && x != 0 && -w < 0 && v < 0 && -1 - E*v <= 0 && z == 0 && -u < 0) || (y == 0 && x != 0 && -w < 0 && -v < 0 && z == 0 && u < 0 && -1 - E*u <= 0) || (y == 0 && x != 0 && z == 0 && -w < 0 && -v < 0 && -u < 0), {x, y, z, u, v, w}}, {(-u < 0 && y < 0 && -(u*y) < 0 && -1/4 + E*u*y <= 0 && x + 4*u*y <= 0 && -(u*y^2*z) <= 0 && -(E*y^2*z) < 0 && -1/16 + E*u*y^2*z < 0) || (-u < 0 && y < 0 && -(u*y) < 0 && -1/4 + E*u*y <= 0 && -(u*y^2*z) <= 0 && E*y^2*z < 0 && 1/16 - E*u*y^2*z < 0) || (-u < 0 && y < 0 && -(u*y) < 0 && -1/4 + E*u*y <= 0 && -(u*y^2*z) <= 0 && -(E*y^2*z) < 0 && -1/16 + E*u*y^2*z == 0) || (-u < 0 && y < 0 && -(u*y) < 0 && -1/4 + E*u*y <= 0 && -(u*y^2*z) <= 0 && E*y^2*z < 0 && -1/16 + E*u*y^2*z == 0), {x, y, z, u}}, {(u < 0 && -t < 0 && -(t*Sqrt[(u*v*x)/(t*y)]*z) < 0 && -(u*v*x) < 0 && -(s*u*w) < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0) || (u < 0 && -t < 0 && -(t*Sqrt[(u*v*x)/(t*y)]*z) < 0 && u*v*x < 0 && -(s*u*w) < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0) || (u < 0 && -t < 0 && t*Sqrt[(u*v*x)/(t*y)]*z < 0 && -(u*v*x) < 0 && s*u*w < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0) || (u < 0 && -t < 0 && t*Sqrt[(u*v*x)/(t*y)]*z < 0 && u*v*x < 0 && s*u*w < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0), {x, y, z, u, v, w, s, t}}, {(u < 0 && -t < 0 && -(t*Sqrt[(u*v*x)/(t*y)]*z) < 0 && -(u*v*x) < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && -(s*u*w) < 0) || (u < 0 && -t < 0 && t*Sqrt[(u*v*x)/(t*y)]*z < 0 && -(u*v*x) < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && s*u*w < 0) || (u < 0 && -t < 0 && -(t*Sqrt[(u*v*x)/(t*y)]*z) < 0 && u*v*x < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && -(s*u*w) < 0) || (u < 0 && -t < 0 && t*Sqrt[(u*v*x)/(t*y)]*z < 0 && u*v*x < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && s*u*w < 0), {x, y, z, u, v, w, s, t}}, {(-y < 0 && -(y*Sqrt[-((x*z)/y)]) < 0 && -1 - E*y <= 0 && z != 0 && -(E*z) < 0 && x < 0 && x*z < 0 && -(E*y) - 4*x*z <= 0) || (-y < 0 && -(y*Sqrt[-((x*z)/y)]) < 0 && -1 - E*y <= 0 && z != 0 && E*z < 0 && x < 0 && x*z < 0 && E*y + 4*x*z <= 0) || (y < 0 && y*Sqrt[-((x*z)/y)] < 0 && -1 - E*y <= 0 && z != 0 && -(E*z) < 0 && x < 0 && -(x*z) < 0 && -(E*y) - 4*x*z <= 0) || (y < 0 && y*Sqrt[-((x*z)/y)] < 0 && -1 - E*y <= 0 && z != 0 && E*z < 0 && x < 0 && -(x*z) < 0 && E*y + 4*x*z <= 0), {x, y, z}}, {(z < 0 && -1 - z < 0 && -1 + z^4 < 0 && -z^4 < 0 && x < 0 && -y < 0 && -(y*z) < 0 && E*x + y*z <= 0) || (z < 0 && -1 - z < 0 && -1 + z^4 < 0 && -z^4 < 0 && x < 0 && y < 0 && -(y*z) < 0 && -(E*x) - y*z <= 0) || (z < 0 && -1 - z < 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && -y < 0 && y*z < 0 && E*x + y*z <= 0) || (z < 0 && -1 - z < 0 && -1 + z^4 < 0 && -z^4 < 0 && -x < 0 && y < 0 && y*z < 0 && -(E*x) - y*z <= 0), {x, y, z}}, {(-Sqrt[(u*w*x)/(t*y*z)] <= 0 && t < 0 && -(t*y*Sqrt[(u*w*x)/(t*y*z)]) < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && s < 0 && -(s*u*v) < 0 && -(u*w*x) <= 0) || (-Sqrt[(u*w*x)/(t*y*z)] <= 0 && t < 0 && -(t*y*Sqrt[(u*w*x)/(t*y*z)]) < 0 && -1 - E*t <= 0 && t*y*z < 0 && s < 0 && -(s*u*v) < 0 && u*w*x <= 0) || (-Sqrt[(u*w*x)/(t*y*z)] <= 0 && t < 0 && t*y*Sqrt[(u*w*x)/(t*y*z)] < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && s < 0 && s*u*v < 0 && -(u*w*x) <= 0) || (-Sqrt[(u*w*x)/(t*y*z)] <= 0 && t < 0 && t*y*Sqrt[(u*w*x)/(t*y*z)] < 0 && -1 - E*t <= 0 && t*y*z < 0 && s < 0 && s*u*v < 0 && u*w*x <= 0), {x, y, z, u, v, w, s, t}}, {(-Sqrt[(u*w*x)/(t*y*z)] <= 0 && t < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && -(t*y*Sqrt[(u*w*x)/(t*y*z)]*z) < 0 && s < 0 && -(s*u*v) < 0 && -(u*w*x) <= 0) || (-Sqrt[(u*w*x)/(t*y*z)] <= 0 && t < 0 && -1 - E*t <= 0 && t*y*z < 0 && -(t*y*Sqrt[(u*w*x)/(t*y*z)]*z) < 0 && s < 0 && -(s*u*v) < 0 && u*w*x <= 0) || (-Sqrt[(u*w*x)/(t*y*z)] <= 0 && t < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && t*y*Sqrt[(u*w*x)/(t*y*z)]*z < 0 && s < 0 && s*u*v < 0 && -(u*w*x) <= 0) || (-Sqrt[(u*w*x)/(t*y*z)] <= 0 && t < 0 && -1 - E*t <= 0 && t*y*z < 0 && t*y*Sqrt[(u*w*x)/(t*y*z)]*z < 0 && s < 0 && s*u*v < 0 && u*w*x <= 0), {x, y, z, u, v, w, s, t}}, {(-Sqrt[(w*x*y)/(t*u*z)] <= 0 && t < 0 && -1 - E*t <= 0 && -(t*u*z) < 0 && -(t*u*Sqrt[(w*x*y)/(t*u*z)]*z) < 0 && s < 0 && -(s*v*x) < 0 && -(w*x*y) <= 0) || (-Sqrt[(w*x*y)/(t*u*z)] <= 0 && t < 0 && -1 - E*t <= 0 && t*u*z < 0 && -(t*u*Sqrt[(w*x*y)/(t*u*z)]*z) < 0 && s < 0 && -(s*v*x) < 0 && w*x*y <= 0) || (-Sqrt[(w*x*y)/(t*u*z)] <= 0 && t < 0 && -1 - E*t <= 0 && -(t*u*z) < 0 && t*u*Sqrt[(w*x*y)/(t*u*z)]*z < 0 && s < 0 && s*v*x < 0 && -(w*x*y) <= 0) || (-Sqrt[(w*x*y)/(t*u*z)] <= 0 && t < 0 && -1 - E*t <= 0 && t*u*z < 0 && t*u*Sqrt[(w*x*y)/(t*u*z)]*z < 0 && s < 0 && s*v*x < 0 && w*x*y <= 0), {x, y, z, u, v, w, s, t}}, {(x == 0 && u < 0 && -t < 0 && -(t*Sqrt[(u*v*x)/(t*y)]*z) < 0 && -(u*v*x) <= 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && -(s*u*w) < 0) || (x == 0 && u < 0 && -t < 0 && -(t*Sqrt[(u*v*x)/(t*y)]*z) < 0 && u*v*x <= 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && -(s*u*w) < 0) || (x == 0 && u < 0 && -t < 0 && t*Sqrt[(u*v*x)/(t*y)]*z < 0 && -(u*v*x) <= 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && s*u*w < 0) || (x == 0 && u < 0 && -t < 0 && t*Sqrt[(u*v*x)/(t*y)]*z < 0 && u*v*x <= 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && s*u*w < 0), {x, y, z, u, v, w, s, t}}, {(x == 0 && -1 + z < 0 && -z < 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && y != 0 && -(s*y*z) < 0 && -(u*v*w) < 0 && -(u*v*w*x) <= 0) || (x == 0 && -1 + z < 0 && -z < 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && y != 0 && s*y*z < 0 && -(u*v*w) < 0 && u*v*w*x <= 0) || (x == 0 && -1 + z < 0 && -z < 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && y != 0 && -(s*y*z) < 0 && u*v*w < 0 && -(u*v*w*x) <= 0) || (x == 0 && -1 + z < 0 && -z < 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && y != 0 && s*y*z < 0 && u*v*w < 0 && u*v*w*x <= 0), {x, y, z, u, v, w, s}}, {(x == 0 && -1 + z < 0 && -z < 0 && y != 0 && -(u*v*w) < 0 && -(u*v*w*x) <= 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && -(s*y*z) < 0) || (x == 0 && -1 + z < 0 && -z < 0 && y != 0 && -(u*v*w) < 0 && u*v*w*x <= 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && s*y*z < 0) || (x == 0 && -1 + z < 0 && -z < 0 && y != 0 && u*v*w < 0 && -(u*v*w*x) <= 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && -(s*y*z) < 0) || (x == 0 && -1 + z < 0 && -z < 0 && y != 0 && u*v*w < 0 && u*v*w*x <= 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && s*y*z < 0), {x, y, z, u, v, w, s}}, {(x == 0 && y != 0 && z != 0 && t < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]) < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && -(u*v*x) <= 0 && -(s*u*w) < 0) || (x == 0 && y != 0 && z != 0 && t < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]) < 0 && -1 - E*t <= 0 && t*y*z < 0 && u*v*x <= 0 && -(s*u*w) < 0) || (x == 0 && y != 0 && z != 0 && t < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)] < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && -(u*v*x) <= 0 && s*u*w < 0) || (x == 0 && y != 0 && z != 0 && t < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)] < 0 && -1 - E*t <= 0 && t*y*z < 0 && u*v*x <= 0 && s*u*w < 0), {x, y, z, u, v, w, s, t}}, {(x == 0 && y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]*z) < 0 && -(u*v*x) <= 0 && -(s*u*w) < 0) || (x == 0 && y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && t*y*z < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]*z) < 0 && u*v*x <= 0 && -(s*u*w) < 0) || (x == 0 && y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)]*z < 0 && -(u*v*x) <= 0 && s*u*w < 0) || (x == 0 && y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && t*y*z < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)]*z < 0 && u*v*x <= 0 && s*u*w < 0), {x, y, z, u, v, w, s, t}}, {(y == 0 && 1 - u < 0 && s < 0 && -(s*u*Sqrt[(v*w*x*y)/(s*u*z)]) < 0 && -1 - E*s <= 0 && z != 0 && -(s*u*z) < 0 && -(v*w*x) < 0 && -(v*w*x*y) <= 0) || (y == 0 && 1 - u < 0 && s < 0 && -(s*u*Sqrt[(v*w*x*y)/(s*u*z)]) < 0 && -1 - E*s <= 0 && z != 0 && s*u*z < 0 && -(v*w*x) < 0 && v*w*x*y <= 0) || (y == 0 && 1 - u < 0 && s < 0 && s*u*Sqrt[(v*w*x*y)/(s*u*z)] < 0 && -1 - E*s <= 0 && z != 0 && -(s*u*z) < 0 && v*w*x < 0 && -(v*w*x*y) <= 0) || (y == 0 && 1 - u < 0 && s < 0 && s*u*Sqrt[(v*w*x*y)/(s*u*z)] < 0 && -1 - E*s <= 0 && z != 0 && s*u*z < 0 && v*w*x < 0 && v*w*x*y <= 0), {x, y, z, u, v, w, s}}, {(y == 0 && z != 0 && u != 0 && t < 0 && -1 - E*t <= 0 && -(t*u*z) < 0 && -(t*u*Sqrt[(v*x*y)/(t*u*z)]*z) < 0 && -(v*x*y) <= 0 && -(s*w*x) < 0) || (y == 0 && z != 0 && u != 0 && t < 0 && -1 - E*t <= 0 && t*u*z < 0 && -(t*u*Sqrt[(v*x*y)/(t*u*z)]*z) < 0 && v*x*y <= 0 && -(s*w*x) < 0) || (y == 0 && z != 0 && u != 0 && t < 0 && -1 - E*t <= 0 && -(t*u*z) < 0 && t*u*Sqrt[(v*x*y)/(t*u*z)]*z < 0 && -(v*x*y) <= 0 && s*w*x < 0) || (y == 0 && z != 0 && u != 0 && t < 0 && -1 - E*t <= 0 && t*u*z < 0 && t*u*Sqrt[(v*x*y)/(t*u*z)]*z < 0 && v*x*y <= 0 && s*w*x < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && x == 0 && s < 0 && -(s*u*Sqrt[(v*w*x*y)/(s*u*z)]) < 0 && -1 - E*s <= 0 && z != 0 && -(s*u*z) < 0 && -(v*w*x) < 0 && -(v*w*x*y) <= 0) || (1 - u < 0 && x == 0 && s < 0 && -(s*u*Sqrt[(v*w*x*y)/(s*u*z)]) < 0 && -1 - E*s <= 0 && z != 0 && s*u*z < 0 && -(v*w*x) < 0 && v*w*x*y <= 0) || (1 - u < 0 && x == 0 && s < 0 && s*u*Sqrt[(v*w*x*y)/(s*u*z)] < 0 && -1 - E*s <= 0 && z != 0 && -(s*u*z) < 0 && v*w*x < 0 && -(v*w*x*y) <= 0) || (1 - u < 0 && x == 0 && s < 0 && s*u*Sqrt[(v*w*x*y)/(s*u*z)] < 0 && -1 - E*s <= 0 && z != 0 && s*u*z < 0 && v*w*x < 0 && v*w*x*y <= 0), {x, y, z, u, v, w, s}}, {(1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) < 0 && -(v*w*x) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) < 0 && v*w*x < 0) || (1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y < 0 && -(v*w*x) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y < 0 && v*w*x < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && -(s*w*x) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && s*w*x < 0) || (1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && -(s*w*x) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && s*w*x < 0), {x, y, z, u, v, w, s, t}}, {(u < 0 && -t < 0 && -(t*Sqrt[(u*v*x)/(t*y)]*z) < 0 && v == 0 && -(u*v*x) <= 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && -(s*u*w) < 0) || (u < 0 && -t < 0 && -(t*Sqrt[(u*v*x)/(t*y)]*z) < 0 && v == 0 && u*v*x <= 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && -(s*u*w) < 0) || (u < 0 && -t < 0 && t*Sqrt[(u*v*x)/(t*y)]*z < 0 && v == 0 && -(u*v*x) <= 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && s*u*w < 0) || (u < 0 && -t < 0 && t*Sqrt[(u*v*x)/(t*y)]*z < 0 && v == 0 && u*v*x <= 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && s*u*w < 0), {x, y, z, u, v, w, s, t}}, {(u < 0 && -t < 0 && -(t*Sqrt[(u*v*x)/(t*y)]*z) < 0 && -(u*v*x) < 0 && s < 0 && -(s*u*w) < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0) || (u < 0 && -t < 0 && -(t*Sqrt[(u*v*x)/(t*y)]*z) < 0 && u*v*x < 0 && s < 0 && -(s*u*w) < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0) || (u < 0 && -t < 0 && t*Sqrt[(u*v*x)/(t*y)]*z < 0 && -(u*v*x) < 0 && s < 0 && s*u*w < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0) || (u < 0 && -t < 0 && t*Sqrt[(u*v*x)/(t*y)]*z < 0 && u*v*x < 0 && s < 0 && s*u*w < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0), {x, y, z, u, v, w, s, t}}, {(-x < 0 && 1 + z^2 != 0 && -z + z^3 < 0 && 1 - 6*z^2 + z^4 < 0 && -1 - 2*z^2 - z^4 < 0 && 1 + x - 6*z^2 + 2*x*z^2 + z^4 + x*z^4 == 0 && y - y^3 - z + 6*y^2*z - y^4*z - 6*y*z^2 + 6*y^3*z^2 + z^3 - 6*y^2*z^3 + y^4*z^3 + y*z^4 - y^3*z^4 < 0 && 1 - 6*y^2 + y^4 + 16*y*z - 16*y^3*z - 6*z^2 + 36*y^2*z^2 - 6*y^4*z^2 - 16*y*z^3 + 16*y^3*z^3 + z^4 - 6*y^2*z^4 + y^4*z^4 < 0 && -1 - 2*y^2 - y^4 - 2*z^2 - 4*y^2*z^2 - 2*y^4*z^2 - z^4 - 2*y^2*z^4 - y^4*z^4 < 0) || (-x < 0 && 1 + z^2 != 0 && -z + z^3 < 0 && 1 - 6*z^2 + z^4 < 0 && -1 - 2*z^2 - z^4 < 0 && 1 + x - 6*z^2 + 2*x*z^2 + z^4 + x*z^4 == 0 && -y + y^3 + z - 6*y^2*z + y^4*z + 6*y*z^2 - 6*y^3*z^2 - z^3 + 6*y^2*z^3 - y^4*z^3 - y*z^4 + y^3*z^4 < 0 && -1 + 6*y^2 - y^4 - 16*y*z + 16*y^3*z + 6*z^2 - 36*y^2*z^2 + 6*y^4*z^2 + 16*y*z^3 - 16*y^3*z^3 - z^4 + 6*y^2*z^4 - y^4*z^4 < 0 && 1 + 2*y^2 + y^4 + 2*z^2 + 4*y^2*z^2 + 2*y^4*z^2 + z^4 + 2*y^2*z^4 + y^4*z^4 < 0) || (-x < 0 && 1 + z^2 != 0 && z - z^3 < 0 && -1 + 6*z^2 - z^4 < 0 && 1 + 2*z^2 + z^4 < 0 && 1 + x - 6*z^2 + 2*x*z^2 + z^4 + x*z^4 == 0 && y - y^3 - z + 6*y^2*z - y^4*z - 6*y*z^2 + 6*y^3*z^2 + z^3 - 6*y^2*z^3 + y^4*z^3 + y*z^4 - y^3*z^4 < 0 && 1 - 6*y^2 + y^4 + 16*y*z - 16*y^3*z - 6*z^2 + 36*y^2*z^2 - 6*y^4*z^2 - 16*y*z^3 + 16*y^3*z^3 + z^4 - 6*y^2*z^4 + y^4*z^4 < 0 && -1 - 2*y^2 - y^4 - 2*z^2 - 4*y^2*z^2 - 2*y^4*z^2 - z^4 - 2*y^2*z^4 - y^4*z^4 < 0) || (-x < 0 && 1 + z^2 != 0 && z - z^3 < 0 && -1 + 6*z^2 - z^4 < 0 && 1 + 2*z^2 + z^4 < 0 && 1 + x - 6*z^2 + 2*x*z^2 + z^4 + x*z^4 == 0 && -y + y^3 + z - 6*y^2*z + y^4*z + 6*y*z^2 - 6*y^3*z^2 - z^3 + 6*y^2*z^3 - y^4*z^3 - y*z^4 + y^3*z^4 < 0 && -1 + 6*y^2 - y^4 - 16*y*z + 16*y^3*z + 6*z^2 - 36*y^2*z^2 + 6*y^4*z^2 + 16*y*z^3 - 16*y^3*z^3 - z^4 + 6*y^2*z^4 - y^4*z^4 < 0 && 1 + 2*y^2 + y^4 + 2*z^2 + 4*y^2*z^2 + 2*y^4*z^2 + z^4 + 2*y^2*z^4 + y^4*z^4 < 0), {x, y, z}}, {(-1 + z < 0 && -z < 0 && u == 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && y != 0 && -(s*y*z) < 0 && -(u*v*w) < 0 && -(u*v*w*x) <= 0) || (-1 + z < 0 && -z < 0 && u == 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && y != 0 && s*y*z < 0 && -(u*v*w) < 0 && u*v*w*x <= 0) || (-1 + z < 0 && -z < 0 && u == 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && y != 0 && -(s*y*z) < 0 && u*v*w < 0 && -(u*v*w*x) <= 0) || (-1 + z < 0 && -z < 0 && u == 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && y != 0 && s*y*z < 0 && u*v*w < 0 && u*v*w*x <= 0), {x, y, z, u, v, w, s}}, {(-1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) < 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) < 0 && u*v*w < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x < 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x < 0 && u*v*w < 0), {x, y, z, u, v, w, s, t}}, {(-1 + z < 0 && -z < 0 && y != 0 && u == 0 && -(u*v*w) < 0 && -(u*v*w*x) <= 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && -(s*y*z) < 0) || (-1 + z < 0 && -z < 0 && y != 0 && u == 0 && -(u*v*w) < 0 && u*v*w*x <= 0 && -s < 0 && -(s*Sqrt[(u*v*w*x)/(s*y*z)]*z) < 0 && s*y*z < 0) || (-1 + z < 0 && -z < 0 && y != 0 && u == 0 && u*v*w < 0 && -(u*v*w*x) <= 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && -(s*y*z) < 0) || (-1 + z < 0 && -z < 0 && y != 0 && u == 0 && u*v*w < 0 && u*v*w*x <= 0 && -s < 0 && s*Sqrt[(u*v*w*x)/(s*y*z)]*z < 0 && s*y*z < 0), {x, y, z, u, v, w, s}}, {(y != 0 && z != 0 && t < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]) < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && u == 0 && -(u*v*x) <= 0 && -(s*u*w) < 0) || (y != 0 && z != 0 && t < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]) < 0 && -1 - E*t <= 0 && t*y*z < 0 && u == 0 && u*v*x <= 0 && -(s*u*w) < 0) || (y != 0 && z != 0 && t < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)] < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && u == 0 && -(u*v*x) <= 0 && s*u*w < 0) || (y != 0 && z != 0 && t < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)] < 0 && -1 - E*t <= 0 && t*y*z < 0 && u == 0 && u*v*x <= 0 && s*u*w < 0), {x, y, z, u, v, w, s, t}}, {(y != 0 && z != 0 && t < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]) < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && v == 0 && -(u*v*x) <= 0 && -(s*u*w) < 0) || (y != 0 && z != 0 && t < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]) < 0 && -1 - E*t <= 0 && t*y*z < 0 && v == 0 && u*v*x <= 0 && -(s*u*w) < 0) || (y != 0 && z != 0 && t < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)] < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && v == 0 && -(u*v*x) <= 0 && s*u*w < 0) || (y != 0 && z != 0 && t < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)] < 0 && -1 - E*t <= 0 && t*y*z < 0 && v == 0 && u*v*x <= 0 && s*u*w < 0), {x, y, z, u, v, w, s, t}}, {(y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]*z) < 0 && u == 0 && -(u*v*x) <= 0 && -(s*u*w) < 0) || (y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && t*y*z < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]*z) < 0 && u == 0 && u*v*x <= 0 && -(s*u*w) < 0) || (y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)]*z < 0 && u == 0 && -(u*v*x) <= 0 && s*u*w < 0) || (y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && t*y*z < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)]*z < 0 && u == 0 && u*v*x <= 0 && s*u*w < 0), {x, y, z, u, v, w, s, t}}, {(y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]*z) < 0 && v == 0 && -(u*v*x) <= 0 && -(s*u*w) < 0) || (y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && t*y*z < 0 && -(t*y*Sqrt[(u*v*x)/(t*y*z)]*z) < 0 && v == 0 && u*v*x <= 0 && -(s*u*w) < 0) || (y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && -(t*y*z) < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)]*z < 0 && v == 0 && -(u*v*x) <= 0 && s*u*w < 0) || (y != 0 && z != 0 && t < 0 && -1 - E*t <= 0 && t*y*z < 0 && t*y*Sqrt[(u*v*x)/(t*y*z)]*z < 0 && v == 0 && u*v*x <= 0 && s*u*w < 0), {x, y, z, u, v, w, s, t}}, {(z != 0 && x == 0 && u != 0 && t < 0 && -1 - E*t <= 0 && -(t*u*z) < 0 && -(t*u*Sqrt[(v*x*y)/(t*u*z)]*z) < 0 && -(v*x*y) <= 0 && -(s*w*x) < 0) || (z != 0 && x == 0 && u != 0 && t < 0 && -1 - E*t <= 0 && t*u*z < 0 && -(t*u*Sqrt[(v*x*y)/(t*u*z)]*z) < 0 && v*x*y <= 0 && -(s*w*x) < 0) || (z != 0 && x == 0 && u != 0 && t < 0 && -1 - E*t <= 0 && -(t*u*z) < 0 && t*u*Sqrt[(v*x*y)/(t*u*z)]*z < 0 && -(v*x*y) <= 0 && s*w*x < 0) || (z != 0 && x == 0 && u != 0 && t < 0 && -1 - E*t <= 0 && t*u*z < 0 && t*u*Sqrt[(v*x*y)/(t*u*z)]*z < 0 && v*x*y <= 0 && s*w*x < 0), {x, y, z, u, v, w, s, t}}, {(z != 0 && u != 0 && t < 0 && -1 - E*t <= 0 && -(t*u*z) < 0 && -(t*u*Sqrt[(v*x*y)/(t*u*z)]*z) < 0 && v == 0 && -(v*x*y) <= 0 && -(s*w*x) < 0) || (z != 0 && u != 0 && t < 0 && -1 - E*t <= 0 && t*u*z < 0 && -(t*u*Sqrt[(v*x*y)/(t*u*z)]*z) < 0 && v == 0 && v*x*y <= 0 && -(s*w*x) < 0) || (z != 0 && u != 0 && t < 0 && -1 - E*t <= 0 && -(t*u*z) < 0 && t*u*Sqrt[(v*x*y)/(t*u*z)]*z < 0 && v == 0 && -(v*x*y) <= 0 && s*w*x < 0) || (z != 0 && u != 0 && t < 0 && -1 - E*t <= 0 && t*u*z < 0 && t*u*Sqrt[(v*x*y)/(t*u*z)]*z < 0 && v == 0 && v*x*y <= 0 && s*w*x < 0), {x, y, z, u, v, w, s, t}}, {(y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y <= 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y <= 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0), {x, y, z, u, v, w, s, t}}, {(y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && -(s*w*x) < 0) || (y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && -(s*w*x) < 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && s*w*x < 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && s*w*x < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y <= 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y <= 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && -(s*w*x) < 0) || (1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && -(s*w*x) < 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && s*w*x < 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && s*w*x < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v == 0 && -(v*x*y) <= 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v == 0 && v*x*y <= 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v == 0 && -(v*x*y) <= 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v == 0 && v*x*y <= 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v == 0 && -(v*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && -(s*w*x) < 0) || (1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v == 0 && v*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && -(s*w*x) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v == 0 && -(v*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && s*w*x < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v == 0 && v*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && s*w*x < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) < 0 && s < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y < 0 && s < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) < 0 && s < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y < 0 && s < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y <= 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0) || (1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y <= 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && -(s*w*x) < 0) || (1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && -(s*w*x) < 0) || (1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && s*w*x < 0) || (1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && s*w*x < 0), {x, y, z, u, v, w, s, t}}, {(-y < 0 && 1 + z < 0 && 1 + z^2 != 0 && -z + z^3 < 0 && 1 - 6*z^2 + z^4 < 0 && -1 - 2*z^2 - z^4 < 0 && 1 + y - 6*z^2 + 2*y*z^2 + z^4 + y*z^4 == 0 && x - x^3 - z + 6*x^2*z - x^4*z - 6*x*z^2 + 6*x^3*z^2 + z^3 - 6*x^2*z^3 + x^4*z^3 + x*z^4 - x^3*z^4 < 0 && 1 - 6*x^2 + x^4 + 16*x*z - 16*x^3*z - 6*z^2 + 36*x^2*z^2 - 6*x^4*z^2 - 16*x*z^3 + 16*x^3*z^3 + z^4 - 6*x^2*z^4 + x^4*z^4 < 0 && -1 - 2*x^2 - x^4 - 2*z^2 - 4*x^2*z^2 - 2*x^4*z^2 - z^4 - 2*x^2*z^4 - x^4*z^4 < 0) || (-y < 0 && 1 + z < 0 && 1 + z^2 != 0 && -z + z^3 < 0 && 1 - 6*z^2 + z^4 < 0 && -1 - 2*z^2 - z^4 < 0 && 1 + y - 6*z^2 + 2*y*z^2 + z^4 + y*z^4 == 0 && -x + x^3 + z - 6*x^2*z + x^4*z + 6*x*z^2 - 6*x^3*z^2 - z^3 + 6*x^2*z^3 - x^4*z^3 - x*z^4 + x^3*z^4 < 0 && -1 + 6*x^2 - x^4 - 16*x*z + 16*x^3*z + 6*z^2 - 36*x^2*z^2 + 6*x^4*z^2 + 16*x*z^3 - 16*x^3*z^3 - z^4 + 6*x^2*z^4 - x^4*z^4 < 0 && 1 + 2*x^2 + x^4 + 2*z^2 + 4*x^2*z^2 + 2*x^4*z^2 + z^4 + 2*x^2*z^4 + x^4*z^4 < 0) || (-y < 0 && 1 + z < 0 && 1 + z^2 != 0 && z - z^3 < 0 && -1 + 6*z^2 - z^4 < 0 && 1 + 2*z^2 + z^4 < 0 && 1 + y - 6*z^2 + 2*y*z^2 + z^4 + y*z^4 == 0 && x - x^3 - z + 6*x^2*z - x^4*z - 6*x*z^2 + 6*x^3*z^2 + z^3 - 6*x^2*z^3 + x^4*z^3 + x*z^4 - x^3*z^4 < 0 && 1 - 6*x^2 + x^4 + 16*x*z - 16*x^3*z - 6*z^2 + 36*x^2*z^2 - 6*x^4*z^2 - 16*x*z^3 + 16*x^3*z^3 + z^4 - 6*x^2*z^4 + x^4*z^4 < 0 && -1 - 2*x^2 - x^4 - 2*z^2 - 4*x^2*z^2 - 2*x^4*z^2 - z^4 - 2*x^2*z^4 - x^4*z^4 < 0) || (-y < 0 && 1 + z < 0 && 1 + z^2 != 0 && z - z^3 < 0 && -1 + 6*z^2 - z^4 < 0 && 1 + 2*z^2 + z^4 < 0 && 1 + y - 6*z^2 + 2*y*z^2 + z^4 + y*z^4 == 0 && -x + x^3 + z - 6*x^2*z + x^4*z + 6*x*z^2 - 6*x^3*z^2 - z^3 + 6*x^2*z^3 - x^4*z^3 - x*z^4 + x^3*z^4 < 0 && -1 + 6*x^2 - x^4 - 16*x*z + 16*x^3*z + 6*z^2 - 36*x^2*z^2 + 6*x^4*z^2 + 16*x*z^3 - 16*x^3*z^3 - z^4 + 6*x^2*z^4 - x^4*z^4 < 0 && 1 + 2*x^2 + x^4 + 2*z^2 + 4*x^2*z^2 + 2*x^4*z^2 + z^4 + 2*x^2*z^4 + x^4*z^4 < 0), {x, y, z}}, {(x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && y != 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0 && -(u*v*w) < 0) || (x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && y != 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0 && -(u*v*w) < 0) || (x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && y != 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0 && u*v*w < 0) || (x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && y != 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0 && u*v*w < 0), {x, y, z, u, v, w, s, t}}, {(y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && z != 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0 && -(v*w*x) < 0) || (y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && z != 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0 && -(v*w*x) < 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && z != 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0 && v*w*x < 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && z != 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0 && v*w*x < 0), {x, y, z, u, v, w, s, t}}, {(y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && s < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y <= 0 && s < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && s < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y <= 0 && s < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && z != 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0 && -(v*w*x) < 0) || (1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && z != 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0 && -(v*w*x) < 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && z != 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0 && v*w*x < 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && z != 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0 && v*w*x < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && s < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y <= 0 && s < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && s < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y <= 0 && s < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) < 0) || (1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) < 0 && -(v*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && s*x*y < 0 && -(v*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) < 0 && v*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && s*x*y < 0 && v*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && -(v*w*x) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && v*w*x < 0) || (1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && s*x*y < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && -(v*w*x) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && s*x*y < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && v*w*x < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v == 0 && -(v*x*y) <= 0 && s < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v == 0 && v*x*y <= 0 && s < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v == 0 && -(v*x*y) <= 0 && s < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v == 0 && v*x*y <= 0 && s < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && s < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && -(t*u*Sqrt[(v*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && v*x*y <= 0 && s < 0 && -(s*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0) || (1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && -(v*x*y) <= 0 && s < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0) || (1 - u < 0 && -Sqrt[(v*x*y)/(t*z)] <= 0 && t < 0 && t*u*Sqrt[(v*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*x*y <= 0 && s < 0 && s*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0), {x, y, z, u, v, w, s, t}}, {(1 + 2*v - v^2 < 0 && -4*v + Sqrt[2]*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] + 2*Sqrt[2]*v*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] - Sqrt[2]*v^2*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] <= 0 && -1 - 2*v^2 - v^4 <= 0 && -1 - 4*v - 2*v^2 + 4*v^3 - v^4 < 0 && -1 - 2*v^2 - v^4 + (1 + 2*v^2 + v^4)/(-1 - 2*v + v^2)^2 + (4*v*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 + (2*v^2*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 - (4*v^3*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 + (v^4*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 == 0 && s + 2*Pi*w - 2*Pi*z < 0 && -Pi - s - 2*Pi*w + 2*Pi*z < 0 && -s + 4*u + 4*Pi*x < 0 && Pi + s - 4*Pi*x < 0 && -1 + w + 2*y < 0 && -(Pi*w) - 2*Pi*y + 2*ArcTan[1 + Sqrt[2]] < 0) || (1 + 2*v - v^2 < 0 && -4*v + Sqrt[2]*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] + 2*Sqrt[2]*v*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] - Sqrt[2]*v^2*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] <= 0 && 1 + 2*v^2 + v^4 <= 0 && 1 + 4*v + 2*v^2 - 4*v^3 + v^4 < 0 && -1 - 2*v^2 - v^4 + (1 + 2*v^2 + v^4)/(-1 - 2*v + v^2)^2 + (4*v*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 + (2*v^2*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 - (4*v^3*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 + (v^4*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 == 0 && s + 2*Pi*w - 2*Pi*z < 0 && -Pi - s - 2*Pi*w + 2*Pi*z < 0 && -s + 4*u + 4*Pi*x < 0 && Pi + s - 4*Pi*x < 0 && -1 + w + 2*y < 0 && -(Pi*w) - 2*Pi*y + 2*ArcTan[1 + Sqrt[2]] < 0) || (-1 - 2*v + v^2 < 0 && 4*v - Sqrt[2]*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] - 2*Sqrt[2]*v*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] + Sqrt[2]*v^2*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] <= 0 && -1 - 2*v^2 - v^4 <= 0 && -1 - 4*v - 2*v^2 + 4*v^3 - v^4 < 0 && -1 - 2*v^2 - v^4 + (1 + 2*v^2 + v^4)/(-1 - 2*v + v^2)^2 + (4*v*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 + (2*v^2*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 - (4*v^3*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 + (v^4*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 == 0 && s + 2*Pi*w - 2*Pi*z < 0 && -Pi - s - 2*Pi*w + 2*Pi*z < 0 && -s + 4*u + 4*Pi*x < 0 && Pi + s - 4*Pi*x < 0 && -1 + w + 2*y < 0 && -(Pi*w) - 2*Pi*y + 2*ArcTan[1 + Sqrt[2]] < 0) || (-1 - 2*v + v^2 < 0 && 4*v - Sqrt[2]*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] - 2*Sqrt[2]*v*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] + Sqrt[2]*v^2*Sqrt[(1 + 2*v^2 + v^4)/ (-1 - 2*v + v^2)^2] <= 0 && 1 + 2*v^2 + v^4 <= 0 && 1 + 4*v + 2*v^2 - 4*v^3 + v^4 < 0 && -1 - 2*v^2 - v^4 + (1 + 2*v^2 + v^4)/(-1 - 2*v + v^2)^2 + (4*v*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 + (2*v^2*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 - (4*v^3*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 + (v^4*(1 + 2*v^2 + v^4))/(-1 - 2*v + v^2)^2 == 0 && s + 2*Pi*w - 2*Pi*z < 0 && -Pi - s - 2*Pi*w + 2*Pi*z < 0 && -s + 4*u + 4*Pi*x < 0 && Pi + s - 4*Pi*x < 0 && -1 + w + 2*y < 0 && -(Pi*w) - 2*Pi*y + 2*ArcTan[1 + Sqrt[2]] < 0), {x, y, z, u, v, w, s}}, {(-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && y != 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && y != 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && y != 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0 && u*v*w < 0) || (-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && y != 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0 && u*v*w < 0), {x, y, z, u, v, w, s, t}}, {(-1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && -(u*v*w) < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && u*v*w < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && -(u*v*w) < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && u*v*w < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x < 0), {x, y, z, u, v, w, s, t}}, {(-1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) < 0 && -(u*v*w) < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && s != 0 && -1 - E*s <= 0 && s*u*x < 0 && -(u*v*w) < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) < 0 && u*v*w < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && s != 0 && -1 - E*s <= 0 && s*u*x < 0 && u*v*w < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0), {x, y, z, u, v, w, s, t}}, {(-1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && u*v*w < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && s != 0 && -1 - E*s <= 0 && s*u*x < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && s != 0 && -1 - E*s <= 0 && s*u*x < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && u*v*w < 0), {x, y, z, u, v, w, s, t}}, {(-1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && -(t*y) < 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && -(t*y) < 0 && u*v*w < 0) || (-1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && s*u*x < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && t*y < 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && s*u*x < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && t*y < 0 && u*v*w < 0), {x, y, z, u, v, w, s, t}}, {(x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && -(u*v*w) < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0) || (x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && -(u*v*w) < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0) || (x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && u*v*w < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0) || (x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && u*v*w < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0), {x, y, z, u, v, w, s, t}}, {(x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && -(u*v*w) < 0) || (x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && -(u*v*w) < 0) || (x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && u*v*w < 0) || (x == 0 && -1 + z < 0 && -z < 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && u*v*w < 0), {x, y, z, u, v, w, s, t}}, {(x == 0 && -1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && -(t*y) < 0 && -(u*v*w) < 0) || (x == 0 && -1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && t*y < 0 && -(u*v*w) < 0) || (x == 0 && -1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && -(t*y) < 0 && u*v*w < 0) || (x == 0 && -1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && t*y < 0 && u*v*w < 0), {x, y, z, u, v, w, s, t}}, {(y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0) || (y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0), {x, y, z, u, v, w, s, t}}, {(y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && -(v*w*x) < 0) || (y == 0 && 1 - u < 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && -(v*w*x) < 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && v*w*x < 0) || (y == 0 && 1 - u < 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && v*w*x < 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*w*x) < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0) || (1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && -(v*w*x) < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*w*x < 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && v*w*x < 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0), {x, y, z, u, v, w, s, t}}, {(1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && -(v*w*x) < 0) || (1 - u < 0 && x == 0 && t < 0 && -(t*u*Sqrt[(s*x*y)/(t*z)]) < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && -(v*w*x) < 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && -(s*x*y) <= 0 && z != 0 && -1 - E*z <= 0 && -(t*z) < 0 && v*w*x < 0) || (1 - u < 0 && x == 0 && t < 0 && t*u*Sqrt[(s*x*y)/(t*z)] < 0 && -1 - E*t <= 0 && s != 0 && -1 - E*s <= 0 && s*x*y <= 0 && z != 0 && -1 - E*z <= 0 && t*z < 0 && v*w*x < 0), {x, y, z, u, v, w, s, t}}, {(-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && -(u*v*w) < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0) || (-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && -(u*v*w) < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0) || (-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && u*v*w < 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0) || (-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && u*v*w < 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0), {x, y, z, u, v, w, s, t}}, {(-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && s != 0 && -1 - E*s <= 0 && -(s*u*x) <= 0 && y != 0 && -1 - E*y <= 0 && -(t*y) < 0 && u*v*w < 0) || (-1 + z < 0 && -z < 0 && u == 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && s != 0 && -1 - E*s <= 0 && s*u*x <= 0 && y != 0 && -1 - E*y <= 0 && t*y < 0 && u*v*w < 0), {x, y, z, u, v, w, s, t}}, {(-1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && u == 0 && -(s*u*x) <= 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && -(t*y) < 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && u == 0 && s*u*x <= 0 && -t < 0 && -(t*Sqrt[(s*u*x)/(t*y)]*z) < 0 && t*y < 0 && -(u*v*w) < 0) || (-1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && u == 0 && -(s*u*x) <= 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && -(t*y) < 0 && u*v*w < 0) || (-1 + z < 0 && -z < 0 && y != 0 && -1 - E*y <= 0 && s != 0 && -1 - E*s <= 0 && u == 0 && s*u*x <= 0 && -t < 0 && t*Sqrt[(s*u*x)/(t*y)]*z < 0 && t*y < 0 && u*v*w < 0), {x, y, z, u, v, w, s, t}}, {x <= 0 || (-y < 0 && -y + z <= 0) || (-y < 0 && -2/3 - z^2 < 0 && 5/3 - 2*x - 3*x*z^2 < 0) || (-y < 0 && 2/3 + z^2 < 0 && 5/3 + 2*x + 3*x*z^2 < 0), {x, y, z}}, {y <= 0 || (-z < 0 && u - z <= 0) || (-z < 0 && -2/3 - u^2 < 0 && -3 - 2*u^2 + 2*x + 3*u^2*x - 2*y - 3*u^2*y < 0 && 3 + 2*u^2 - 2*x - 3*u^2*x - 2*y - 3*u^2*y < 0) || (-z < 0 && 2/3 + u^2 < 0 && 3 + 2*u^2 - 2*x - 3*u^2*x + 2*y + 3*u^2*y < 0 && -3 - 2*u^2 + 2*x + 3*u^2*x + 2*y + 3*u^2*y < 0), {x, y, z, u}}, {(y < 0 && -(x*y) - Log[2] < 0 && -(y*Log[2]) < 0 && v - z <= 0) || (y < 0 && x*y + Log[2] < 0 && y*Log[2] < 0 && v - z <= 0) || (y < 0 && u - v <= 0) || (y < 0 && -(E*y*Log[2]) < 0 && -(E*x*y) - E*Log[2] + y*Log[2] <= 0) || (y < 0 && E*y*Log[2] < 0 && E*x*y + E*Log[2] - y*Log[2] <= 0), {x, y, z, u, v}}, {(y < 0 && -(x*y) - Log[2] < 0 && -(y*Log[2]) < 0 && v - z <= 0) || (y < 0 && x*y + Log[2] < 0 && y*Log[2] < 0 && v - z <= 0) || (y < 0 && -(E*y*Log[2]) < 0 && -(E*x*y) - E*Log[2] + y*Log[2] <= 0) || (y < 0 && E*y*Log[2] < 0 && E*x*y + E*Log[2] - y*Log[2] <= 0) || (y < 0 && u - v <= 0), {x, y, z, u, v}}, {(1 - v < 0 && u - v <= 0 && -v + z <= 0 && -v + y <= 0 && -v + x <= 0) || (-u + v <= 0 && 1 - u < 0 && -u + z <= 0 && -u + y <= 0 && -u + x <= 0) || (v - z <= 0 && u - z <= 0 && 1 - z < 0 && y - z <= 0 && x - z <= 0) || (v - y <= 0 && u - y <= 0 && -y + z <= 0 && 1 - y < 0 && x - y <= 0) || (v - x <= 0 && u - x <= 0 && -x + z <= 0 && -x + y <= 0 && 1 - x < 0), {x, y, z, u, v}}, {(1 - x < 0 && -x + y <= 0 && -x + z <= 0 && u - x <= 0 && v - x <= 0) || (x - y <= 0 && 1 - y < 0 && -y + z <= 0 && u - y <= 0 && v - y <= 0) || (x - z <= 0 && y - z <= 0 && 1 - z < 0 && u - z <= 0 && v - z <= 0) || (-u + x <= 0 && -u + y <= 0 && -u + z <= 0 && 1 - u < 0 && -u + v <= 0) || (-v + x <= 0 && -v + y <= 0 && -v + z <= 0 && u - v <= 0 && 1 - v < 0), {x, y, z, u, v}}, {(u - z < 0 && -u - z < 0 && x < 0 && 1/2 + x*z <= 0 && y == 0) || (y == 0 && -u - z < 0 && u - z < 0 && -z < 0 && -x < 0) || (-u + z < 0 && x < 0 && 1/2 + x*z <= 0 && y == 0) || (z <= 0 && -u - z < 0 && -x < 0 && -1/2 - x*z <= 0 && y == 0) || (y == 0 && -z < 0 && -u + z < 0 && -x < 0), {x, y, z, u}}, {(v - z <= 0 && y < 0 && -(y*Log[2]) < 0 && -x + 2*w*Log[2] == 0 && -x - 2*s*Log[2] < 0 && -(x*y) - Log[2] < 0) || (v - z <= 0 && y < 0 && y*Log[2] < 0 && -x + 2*w*Log[2] == 0 && -x - 2*s*Log[2] < 0 && x*y + Log[2] < 0) || (u - v <= 0 && y < 0 && -x + 2*w*Log[2] == 0 && -x - 2*s*Log[2] < 0) || (y < 0 && -(E*y*Log[2]) < 0 && -x + 2*w*Log[2] == 0 && -x - 2*s*Log[2] < 0 && -(E*x*y) - E*Log[2] + y*Log[2] <= 0) || (y < 0 && E*y*Log[2] < 0 && -x + 2*w*Log[2] == 0 && -x - 2*s*Log[2] < 0 && E*x*y + E*Log[2] - y*Log[2] <= 0), {x, y, z, u, v, w, s}}, {z == 0 || -(u*x^2) + y^2 + u*y^2 + u*z^2 + u^2*z^2 == 0 || -x + y + z <= 0 || (-y + z < 0 && -x + y - z <= 0) || (y - z <= 0 && -x - y + z <= 0), {x, y, z, u}}, {y <= 0 || (-z < 0 && -1 + u + z <= 0) || (-z < 0 && 1 - u + z <= 0) || (-z < 0 && -1 - u < 0 && 2 - u + x + u*x - y - u*y < 0 && -2 + u - x - u*x - y - u*y < 0) || (-z < 0 && 1 + u < 0 && -2 + u - x - u*x + y + u*y < 0 && 2 - u + x + u*x + y + u*y < 0), {x, y, z, u}}, {(x == 0 && -1 + y == 0) || (x == 0 && y == 0) || (x == 0 && 1 + y == 0) || (-1 + y == 0 && 1 + y^2 == 0) || (y == 0 && 1 + y^2 == 0) || (1 + y == 0 && 1 + y^2 == 0), {x, y, z}}, {(-y < 0 && -v < 0 && x == 0 && u == 0 && z == 0) || (z == 0 && -y < 0 && -x + 2*u*Log[2] == 0 && x - 2*v*Log[2] < 0 && -x < 0) || (z == 0 && -x + 2*u*Log[2] == 0 && x - 2*v*Log[2] < 0 && -x < 0 && x*y + Log[2] <= 0) || (z == 0 && -y < 0 && -x + 2*u*Log[2] == 0 && x < 0 && -x - 2*v*Log[2] < 0 && -(x*y) - Log[2] <= 0) || (z == 0 && -y < 0 && -x + 2*u*Log[2] == 0 && -x + 2*v*Log[2] < 0 && -x < 0 && -x - 2*v*Log[2] < 0) || (z == 0 && -x + 2*u*Log[2] == 0 && -x + 2*v*Log[2] < 0 && -x < 0 && -x - 2*v*Log[2] < 0 && x*y + Log[2] <= 0), {x, y, z, u, v}}, {(w <= 0 && -x < 0 && -v + z < 0 && -1 - u*x - 2*w*x <= 0) || (w <= 0 && x < 0 && -v + z < 0 && 1 + u*x + 2*w*x <= 0) || (w <= 0 && -x < 0 && v - y < 0 && -1 - u*x - 2*w*x <= 0) || (w <= 0 && E - x < 0 && -x < 0 && E*x < 0 && -1 - u*x - 2*w*x <= 0) || (w <= 0 && E - x < 0 && x < 0 && E*x < 0 && 1 + u*x + 2*w*x <= 0) || (w <= 0 && -E + x < 0 && -x < 0 && -(E*x) < 0 && -1 - u*x - 2*w*x <= 0) || (w <= 0 && -E + x < 0 && x < 0 && -(E*x) < 0 && 1 + u*x + 2*w*x <= 0), {x, y, z, u, v, w}}, {(x < 0 && y < 0 && z < 0 && -1 - x - y - z <= 0) || (x < 0 && y < 0 && -z <= 0 && -1 - x - y + z <= 0) || (x < 0 && z < 0 && -y <= 0 && -1 - x + y - z <= 0) || (x < 0 && -y <= 0 && -z <= 0 && -1 - x + y + z <= 0) || (y < 0 && z < 0 && -x <= 0 && -1 + x - y - z <= 0) || (y < 0 && -x <= 0 && -z <= 0 && -1 + x - y + z <= 0) || (z < 0 && -x <= 0 && -y <= 0 && -1 + x + y - z <= 0) || (-x <= 0 && -y <= 0 && -z <= 0 && -1 + x + y + z <= 0), {x, y, z}}, {(x < 0 && y < 0 && -1 + x^2 + y^2 < 0 && z < 0 && -2 - x - y - z <= 0) || (x < 0 && y < 0 && -1 + x^2 + y^2 < 0 && -z <= 0 && -2 - x - y + z <= 0) || (x < 0 && -1 + x^2 + y^2 < 0 && z < 0 && -y <= 0 && -2 - x + y - z <= 0) || (x < 0 && -1 + x^2 + y^2 < 0 && -y <= 0 && -z <= 0 && -2 - x + y + z <= 0) || (y < 0 && -1 + x^2 + y^2 < 0 && z < 0 && -x <= 0 && -2 + x - y - z <= 0) || (y < 0 && -1 + x^2 + y^2 < 0 && -x <= 0 && -z <= 0 && -2 + x - y + z <= 0) || (-1 + x^2 + y^2 < 0 && z < 0 && -x <= 0 && -y <= 0 && -2 + x + y - z <= 0) || (-1 + x^2 + y^2 < 0 && -x <= 0 && -y <= 0 && -z <= 0 && -2 + x + y + z <= 0), {x, y, z}}, {(-(z*Log[2]) < 0 && -(E*z) < 0 && -(E*z*Log[2]) < 0 && y*z + Log[2] + x*z*Log[2] < 0 && E*y*z + E*Log[2] - z*Log[2] <= 0) || (-(z*Log[2]) < 0 && -(E*z) < 0 && E*z*Log[2] < 0 && y*z + Log[2] + x*z*Log[2] < 0 && E*y*z + E*Log[2] - z*Log[2] == 0) || (-(z*Log[2]) < 0 && E*z < 0 && -(E*z*Log[2]) < 0 && y*z + Log[2] + x*z*Log[2] < 0 && E*y*z + E*Log[2] - z*Log[2] == 0) || (-(z*Log[2]) < 0 && E*z < 0 && E*z*Log[2] < 0 && y*z + Log[2] + x*z*Log[2] < 0 && -(E*y*z) - E*Log[2] + z*Log[2] <= 0) || (z*Log[2] < 0 && -(E*z) < 0 && -(E*z*Log[2]) < 0 && -(y*z) - Log[2] - x*z*Log[2] < 0 && E*y*z + E*Log[2] - z*Log[2] <= 0) || (z*Log[2] < 0 && -(E*z) < 0 && E*z*Log[2] < 0 && -(y*z) - Log[2] - x*z*Log[2] < 0 && E*y*z + E*Log[2] - z*Log[2] == 0) || (z*Log[2] < 0 && E*z < 0 && -(E*z*Log[2]) < 0 && -(y*z) - Log[2] - x*z*Log[2] < 0 && E*y*z + E*Log[2] - z*Log[2] == 0) || (z*Log[2] < 0 && E*z < 0 && E*z*Log[2] < 0 && -(y*z) - Log[2] - x*z*Log[2] < 0 && -(E*y*z) - E*Log[2] + z*Log[2] <= 0), {x, y, z}}, {(-Sqrt[z^(-1)] < 0 && Sqrt[z] < 0 && 9*E^2 - z < 0 && -z < 0 && -u < 0 && -3*u*x + Sqrt[z]*Log[2] <= 0) || (-Sqrt[z^(-1)] < 0 && -Sqrt[z] < 0 && 9*E^2 - z < 0 && -z < 0 && u < 0 && 3*u*x - Sqrt[z]*Log[2] <= 0) || (-Sqrt[z^(-1)] < 0 && Sqrt[z] < 0 && -1/3 + E*Sqrt[z^(-1)] < 0 && 9*E^2 - z < 0 && -z < 0 && -u < 0 && -3*u*x + Sqrt[z]*Log[2] <= 0) || (-Sqrt[z^(-1)] < 0 && -Sqrt[z] < 0 && -1/3 + E*Sqrt[z^(-1)] < 0 && 9*E^2 - z < 0 && -z < 0 && u < 0 && 3*u*x - Sqrt[z]*Log[2] <= 0) || (-Sqrt[z^(-1)] <= 0 && -Sqrt[z] < 0 && 9*E^2 - z < 0 && -z < 0 && u < 0 && -3*u*y + Sqrt[z]*Log[2] <= 0) || (-Sqrt[z^(-1)] <= 0 && Sqrt[z] < 0 && 9*E^2 - z < 0 && -z < 0 && -u < 0 && 3*u*y - Sqrt[z]*Log[2] <= 0) || (-Sqrt[z^(-1)] <= 0 && Sqrt[z] < 0 && 1/3 - E*Sqrt[z^(-1)] <= 0 && 9*E^2 - z < 0 && -z < 0 && -u < 0) || (-Sqrt[z^(-1)] <= 0 && -Sqrt[z] < 0 && 1/3 - E*Sqrt[z^(-1)] <= 0 && 9*E^2 - z < 0 && -z < 0 && u < 0), {x, y, z, u}}, {(-z < 0 && -u < 0 && -w < 0 && -v < 0 && x == 0 && y == 0) || (x == 0 && -w < 0 && -z < 0 && v < 0 && -1 - E*v <= 0 && y == 0 && -u < 0) || (x == 0 && -w < 0 && -z < 0 && -v < 0 && y == 0 && u < 0 && -1 - E*u <= 0) || (x == 0 && -w < 0 && z < 0 && -1 - E*z <= 0 && -v < 0 && y == 0 && -u < 0) || (x == 0 && -w < 0 && -z < 0 && v < 0 && -1 - E*v <= 0 && y == 0 && u < 0 && -1 - E*u <= 0) || (x == 0 && -w < 0 && z < 0 && -1 - E*z <= 0 && v < 0 && -1 - E*v <= 0 && y == 0 && -u < 0) || (x == 0 && -w < 0 && z < 0 && -1 - E*z <= 0 && -v < 0 && y == 0 && u < 0 && -1 - E*u <= 0) || (x == 0 && -w < 0 && z < 0 && -1 - E*z <= 0 && v < 0 && -1 - E*v <= 0 && y == 0 && u < 0 && -1 - E*u <= 0), {x, y, z, u, v, w}}, {(-z < 0 && -u < 0 && -w < 0 && -v < 0 && x == 0 && y == 0) || (x == 0 && -z < 0 && v < 0 && -1 - E*v <= 0 && y == 0 && -u < 0 && -w < 0) || (x == 0 && -z < 0 && -v < 0 && y == 0 && u < 0 && -1 - E*u <= 0 && -w < 0) || (x == 0 && z < 0 && -1 - E*z <= 0 && -v < 0 && y == 0 && -u < 0 && -w < 0) || (x == 0 && -z < 0 && v < 0 && -1 - E*v <= 0 && y == 0 && u < 0 && -1 - E*u <= 0 && -w < 0) || (x == 0 && z < 0 && -1 - E*z <= 0 && v < 0 && -1 - E*v <= 0 && y == 0 && -u < 0 && -w < 0) || (x == 0 && z < 0 && -1 - E*z <= 0 && -v < 0 && y == 0 && u < 0 && -1 - E*u <= 0 && -w < 0) || (x == 0 && z < 0 && -1 - E*z <= 0 && v < 0 && -1 - E*v <= 0 && y == 0 && u < 0 && -1 - E*u <= 0 && -w < 0), {x, y, z, u, v, w}}, {(-x < 0 && E*x < 0 && z < 0 && -(x*z) < 0 && -(E*x*z) < 0 && y < 0 && x - 4*E*y*z <= 0) || (-x < 0 && -(E*x) < 0 && z < 0 && x*z < 0 && E*x*z < 0 && y < 0 && -x + 4*E*y*z <= 0) || (-x < 0 && -(E*x) < 0 && z < 0 && -(x*z) < 0 && -(E*x*z) < 0 && y < 0 && -x + 4*E*y*z == 0) || (-x < 0 && -(E*x) < 0 && z < 0 && x*z < 0 && -(E*x*z) < 0 && y < 0 && -x + 4*E*y*z == 0) || (-x < 0 && E*x < 0 && z < 0 && x*z < 0 && -(E*x*z) < 0 && y < 0 && -x + 4*E*y*z == 0) || (-x < 0 && -(E*x) < 0 && z < 0 && -(x*z) < 0 && E*x*z < 0 && y < 0 && -x + 4*E*y*z == 0) || (-x < 0 && E*x < 0 && z < 0 && -(x*z) < 0 && E*x*z < 0 && y < 0 && -x + 4*E*y*z == 0) || (-x < 0 && E*x < 0 && z < 0 && x*z < 0 && E*x*z < 0 && y < 0 && -x + 4*E*y*z == 0), {x, y, z}}, {(-2*s + Sqrt[2]*v != 0 && -s^2 + t^2 + x == 0 && 2*s*t - y == 0 && -v^2 + w^2 + 2*x - z == 0 && u + 2*v*w - 2*y == 0 && -2*s + Sqrt[2]*v < 0 && -v < 0 && -s < 0) || (-2*t + Sqrt[2]*w != 0 && -s^2 + t^2 + x == 0 && 2*s*t - y == 0 && -v^2 + w^2 + 2*x - z == 0 && u + 2*v*w - 2*y == 0 && -2*s + Sqrt[2]*v < 0 && -v < 0 && -s < 0) || (-2*s + Sqrt[2]*v != 0 && -s^2 + t^2 + x == 0 && 2*s*t - y == 0 && -v^2 + w^2 + 2*x - z == 0 && u + 2*v*w - 2*y == 0 && s == 0 && -t <= 0 && -2*s + Sqrt[2]*v < 0 && -v < 0) || (-2*s + Sqrt[2]*v != 0 && -s^2 + t^2 + x == 0 && 2*s*t - y == 0 && -v^2 + w^2 + 2*x - z == 0 && u + 2*v*w - 2*y == 0 && v == 0 && -w <= 0 && -2*s + Sqrt[2]*v < 0 && -s < 0) || (-2*t + Sqrt[2]*w != 0 && -s^2 + t^2 + x == 0 && 2*s*t - y == 0 && -v^2 + w^2 + 2*x - z == 0 && u + 2*v*w - 2*y == 0 && s == 0 && -t <= 0 && -2*s + Sqrt[2]*v < 0 && -v < 0) || (-2*t + Sqrt[2]*w != 0 && -s^2 + t^2 + x == 0 && 2*s*t - y == 0 && -v^2 + w^2 + 2*x - z == 0 && u + 2*v*w - 2*y == 0 && v == 0 && -w <= 0 && -2*s + Sqrt[2]*v < 0 && -s < 0) || (-2*s + Sqrt[2]*v != 0 && -s^2 + t^2 + x == 0 && 2*s*t - y == 0 && -v^2 + w^2 + 2*x - z == 0 && u + 2*v*w - 2*y == 0 && s == 0 && v == 0 && -t <= 0 && -w <= 0 && -2*s + Sqrt[2]*v < 0) || (-2*t + Sqrt[2]*w != 0 && -s^2 + t^2 + x == 0 && 2*s*t - y == 0 && -v^2 + w^2 + 2*x - z == 0 && u + 2*v*w - 2*y == 0 && s == 0 && v == 0 && -t <= 0 && -w <= 0 && -2*s + Sqrt[2]*v < 0), {x, y, z, u, v, w, s, t}}, {(z != 0 && 1 + z^2 != 0 && -z + z^3 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 + 2*z^2 + z^4 != 0 && -1 + z^2 != 0 && 1 + z^2 != 0 && y == 0 && -1 + z == 0 && -1 - u <= 0 && -1 + u <= 0 && x - 4*z^2 - 2*x*z^2 + x*z^4 == 0) || (z != 0 && 1 + z^2 != 0 && -z + z^3 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 + 2*z^2 + z^4 != 0 && -1 + z^2 != 0 && 1 + z^2 != 0 && y == 0 && z == 0 && -1 - u <= 0 && -1 + u <= 0 && x - 4*z^2 - 2*x*z^2 + x*z^4 == 0) || (z != 0 && 1 + z^2 != 0 && -z + z^3 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 + 2*z^2 + z^4 != 0 && -1 + z^2 != 0 && 1 + z^2 != 0 && y == 0 && 1 + z == 0 && -1 - u <= 0 && -1 + u <= 0 && x - 4*z^2 - 2*x*z^2 + x*z^4 == 0) || (z != 0 && 1 + z^2 != 0 && -z + z^3 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 + 2*z^2 + z^4 != 0 && -1 + z^2 != 0 && 1 + z^2 != 0 && -1 - 2*z + z^2 == 0 && -1 + z == 0 && -1 - u <= 0 && -1 + u <= 0 && x - 4*z^2 - 2*x*z^2 + x*z^4 == 0) || (z != 0 && 1 + z^2 != 0 && -z + z^3 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 + 2*z^2 + z^4 != 0 && -1 + z^2 != 0 && 1 + z^2 != 0 && -1 - 2*z + z^2 == 0 && z == 0 && -1 - u <= 0 && -1 + u <= 0 && x - 4*z^2 - 2*x*z^2 + x*z^4 == 0) || (z != 0 && 1 + z^2 != 0 && -z + z^3 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 + 2*z^2 + z^4 != 0 && -1 + z^2 != 0 && 1 + z^2 != 0 && -1 - 2*z + z^2 == 0 && 1 + z == 0 && -1 - u <= 0 && -1 + u <= 0 && x - 4*z^2 - 2*x*z^2 + x*z^4 == 0) || (z != 0 && 1 + z^2 != 0 && -z + z^3 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 + 2*z^2 + z^4 != 0 && -1 + z^2 != 0 && 1 + z^2 != 0 && -1 + 2*z + z^2 == 0 && -1 + z == 0 && -1 - u <= 0 && -1 + u <= 0 && x - 4*z^2 - 2*x*z^2 + x*z^4 == 0) || (z != 0 && 1 + z^2 != 0 && -z + z^3 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 + 2*z^2 + z^4 != 0 && -1 + z^2 != 0 && 1 + z^2 != 0 && -1 + 2*z + z^2 == 0 && z == 0 && -1 - u <= 0 && -1 + u <= 0 && x - 4*z^2 - 2*x*z^2 + x*z^4 == 0) || (z != 0 && 1 + z^2 != 0 && -z + z^3 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 - 6*z^2 + z^4 != 0 && 1 + 2*z^2 + z^4 != 0 && -1 + z^2 != 0 && 1 + z^2 != 0 && -1 + 2*z + z^2 == 0 && 1 + z == 0 && -1 - u <= 0 && -1 + u <= 0 && x - 4*z^2 - 2*x*z^2 + x*z^4 == 0), {x, y, z, u}}, {(y < 0 && -(u*Log[2]) < 0 && -(E*u) < 0 && -(E*u*Log[2]) < 0 && u*y + Log[2] + u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] <= 0 && -z < 0 && -(E*z) < 0 && E*y + z*Log[2] <= 0) || (y < 0 && u*Log[2] < 0 && -(E*u) < 0 && -(E*u*Log[2]) < 0 && -(u*y) - Log[2] - u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] <= 0 && -z < 0 && -(E*z) < 0 && E*y + z*Log[2] <= 0) || (y < 0 && -(u*Log[2]) < 0 && E*u < 0 && E*u*Log[2] < 0 && u*y + Log[2] + u*x*Log[2] < 0 && -(E*u*y) - E*Log[2] + u*Log[2] <= 0 && -z < 0 && -(E*z) < 0 && E*y + z*Log[2] <= 0) || (y < 0 && u*Log[2] < 0 && E*u < 0 && E*u*Log[2] < 0 && -(u*y) - Log[2] - u*x*Log[2] < 0 && -(E*u*y) - E*Log[2] + u*Log[2] <= 0 && -z < 0 && -(E*z) < 0 && E*y + z*Log[2] <= 0) || (y < 0 && -(u*Log[2]) < 0 && E*u < 0 && -(E*u*Log[2]) < 0 && u*y + Log[2] + u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] == 0 && -z < 0 && -(E*z) < 0 && E*y + z*Log[2] <= 0) || (y < 0 && u*Log[2] < 0 && E*u < 0 && -(E*u*Log[2]) < 0 && -(u*y) - Log[2] - u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] == 0 && -z < 0 && -(E*z) < 0 && E*y + z*Log[2] <= 0) || (y < 0 && -(u*Log[2]) < 0 && -(E*u) < 0 && -(E*u*Log[2]) < 0 && u*y + Log[2] + u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] <= 0 && -z < 0 && E*z < 0 && E*y + z*Log[2] == 0) || (y < 0 && u*Log[2] < 0 && -(E*u) < 0 && -(E*u*Log[2]) < 0 && -(u*y) - Log[2] - u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] <= 0 && -z < 0 && E*z < 0 && E*y + z*Log[2] == 0) || (y < 0 && -(u*Log[2]) < 0 && -(E*u) < 0 && E*u*Log[2] < 0 && u*y + Log[2] + u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] == 0 && -z < 0 && -(E*z) < 0 && E*y + z*Log[2] <= 0) || (y < 0 && u*Log[2] < 0 && -(E*u) < 0 && E*u*Log[2] < 0 && -(u*y) - Log[2] - u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] == 0 && -z < 0 && -(E*z) < 0 && E*y + z*Log[2] <= 0) || (y < 0 && -(u*Log[2]) < 0 && E*u < 0 && E*u*Log[2] < 0 && u*y + Log[2] + u*x*Log[2] < 0 && -(E*u*y) - E*Log[2] + u*Log[2] <= 0 && -z < 0 && E*z < 0 && E*y + z*Log[2] == 0) || (y < 0 && u*Log[2] < 0 && E*u < 0 && E*u*Log[2] < 0 && -(u*y) - Log[2] - u*x*Log[2] < 0 && -(E*u*y) - E*Log[2] + u*Log[2] <= 0 && -z < 0 && E*z < 0 && E*y + z*Log[2] == 0) || (y < 0 && -(u*Log[2]) < 0 && E*u < 0 && -(E*u*Log[2]) < 0 && u*y + Log[2] + u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] == 0 && -z < 0 && E*z < 0 && E*y + z*Log[2] == 0) || (y < 0 && u*Log[2] < 0 && E*u < 0 && -(E*u*Log[2]) < 0 && -(u*y) - Log[2] - u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] == 0 && -z < 0 && E*z < 0 && E*y + z*Log[2] == 0) || (y < 0 && -(u*Log[2]) < 0 && -(E*u) < 0 && E*u*Log[2] < 0 && u*y + Log[2] + u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] == 0 && -z < 0 && E*z < 0 && E*y + z*Log[2] == 0) || (y < 0 && u*Log[2] < 0 && -(E*u) < 0 && E*u*Log[2] < 0 && -(u*y) - Log[2] - u*x*Log[2] < 0 && E*u*y + E*Log[2] - u*Log[2] == 0 && -z < 0 && E*z < 0 && E*y + z*Log[2] == 0), {x, y, z, u}}, {(x < 0 && y < 0 && z < 0 && -1 - x <= 0 && x - y <= 0 && x - z <= 0) || (x < 0 && y < 0 && -1 - x <= 0 && x - y <= 0 && -z <= 0 && x + z <= 0) || (x < 0 && z < 0 && -1 - x <= 0 && -y <= 0 && x + y <= 0 && x - z <= 0) || (x < 0 && -1 - x <= 0 && -y <= 0 && x + y <= 0 && -z <= 0 && x + z <= 0) || (y < 0 && z < 0 && -x <= 0 && -1 + x <= 0 && -x - y <= 0 && -x - z <= 0) || (y < 0 && -x <= 0 && -1 + x <= 0 && -x - y <= 0 && -z <= 0 && -x + z <= 0) || (z < 0 && -x <= 0 && -1 + x <= 0 && -y <= 0 && -x + y <= 0 && -x - z <= 0) || (-x <= 0 && -1 + x <= 0 && -y <= 0 && -x + y <= 0 && -z <= 0 && -x + z <= 0) || (x < 0 && y < 0 && z < 0 && -x + y <= 0 && -1 - y <= 0 && y - z <= 0) || (x < 0 && y < 0 && -x + y <= 0 && -1 - y <= 0 && -z <= 0 && y + z <= 0) || (x < 0 && z < 0 && -x - y <= 0 && -y <= 0 && -1 + y <= 0 && -y - z <= 0) || (x < 0 && -x - y <= 0 && -y <= 0 && -1 + y <= 0 && -z <= 0 && -y + z <= 0) || (y < 0 && z < 0 && -x <= 0 && x + y <= 0 && -1 - y <= 0 && y - z <= 0) || (y < 0 && -x <= 0 && x + y <= 0 && -1 - y <= 0 && -z <= 0 && y + z <= 0) || (z < 0 && -x <= 0 && x - y <= 0 && -y <= 0 && -1 + y <= 0 && -y - z <= 0) || (-x <= 0 && x - y <= 0 && -y <= 0 && -1 + y <= 0 && -z <= 0 && -y + z <= 0) || (x < 0 && y < 0 && z < 0 && -x + z <= 0 && -y + z <= 0 && -1 - z <= 0) || (x < 0 && z < 0 && -x + z <= 0 && -y <= 0 && y + z <= 0 && -1 - z <= 0) || (x < 0 && y < 0 && -x - z <= 0 && -y - z <= 0 && -z <= 0 && -1 + z <= 0) || (x < 0 && -x - z <= 0 && -y <= 0 && y - z <= 0 && -z <= 0 && -1 + z <= 0) || (y < 0 && z < 0 && -x <= 0 && x + z <= 0 && -y + z <= 0 && -1 - z <= 0) || (z < 0 && -x <= 0 && x + z <= 0 && -y <= 0 && y + z <= 0 && -1 - z <= 0) || (y < 0 && -x <= 0 && x - z <= 0 && -y - z <= 0 && -z <= 0 && -1 + z <= 0) || (-x <= 0 && x - z <= 0 && -y <= 0 && y - z <= 0 && -z <= 0 && -1 + z <= 0), {x, y, z}}, {y != 0, {x, y, z}}, {y != 0, {x, y, z, u}}, {z != 0, {x, y, z}}, {z != 0, {x, y, z, u}}, {x*z != 0, {x, y, z}}, {x*y*z != 0, {x, y, z}}, {-(u*y) - x*z != 0, {x, y, z, u}}, {-5*z + z^2 != 0, {x, y, z}}, {z*Log[2] != 0, {x, y, z}}, {-y + 2*z*Log[2] != 0, {x, y, z}}}; ind={52, 58, 78, 136, 137, 144, 169, 182, 183, 184, 190, 223, 224, 225, 308, 314, 324, 328, 335, 342, 345, 353, 354, 384, 420, 421, 422, 482, 521, 621, 622, 646, 647, 648, 658, 712, 714, 717, 761, 766, 784, 811, 816, 817, 821, 838, 919, 932, 1031, 1032, 1037, 1038, 1045, 1062, 1071, 1085, 1086, 1096, 1143, 1166, 1167, 1238, 1243, 1246, 1256, 1269, 1270, 1271, 1306, 1307, 1308, 1310, 1481, 1507, 1508, 1512, 1516, 1517, 1520, 1535, 1536, 1553, 1563, 1564, 1568, 1569, 1646, 1647, 1648, 1649, 1651, 1665, 1666, 1686, 1692, 1697, 1698, 1701, 1743, 1744, 1749, 1750, 1755, 1756, 1759, 1760, 1761, 1762, 1763, 1764, 1768, 1769, 1770, 1779, 1780, 1787, 1799, 1800, 1801, 1802, 1803, 1818, 1819, 1828, 1830, 1832, 1833, 1837, 1841, 1842, 1843, 1853, 1854, 1855, 1856, 1917, 1919, 2076, 2079, 2117, 2137, 2138, 2174, 2178, 2179, 2188, 2189, 2190, 2191, 2192, 2195, 2206, 2210, 2229, 2231, 2252, 2275, 2300, 2302, 2304, 2305, 2311, 2313, 2314, 2315, 2316, 2320, 2332, 2353, 2355, 2367, 2372, 2373, 2374, 2379, 2399, 2400, 2403, 2404, 2405, 2414, 2415, 2416, 2419, 2421, 2435, 2436, 2437, 2438, 2444, 2445, 2446, 2448, 2449, 2451, 2452, 2453, 2454, 2466, 2469, 2470, 2472, 2473, 2474, 2477, 2478, 2479, 2481, 2488};