n^2[n+1][2n^3+4n^2+n-1]=0

Solution for n^2[n+1][2n^3+4n^2+n-1]=0 equation:

Simplifying
n2[n + 1][2n3 + 4n2 + n + -1] = 0

Reorder the terms:
n2[1 + n][2n3 + 4n2 + n + -1] = 0

Reorder the terms:
n2[1 + n][-1 + n + 4n2 + 2n3] = 0

Multiply [1 + n] * [-1 + n + 4n2 + 2n3]
n2[1[-1 + n + 4n2 + 2n3] + n[-1 + n + 4n2 + 2n3]] = 0
n2[[-1 * 1 + n * 1 + 4n2 * 1 + 2n3 * 1] + n[-1 + n + 4n2 + 2n3]] = 0
n2[[-1 + 1n + 4n2 + 2n3] + n[-1 + n + 4n2 + 2n3]] = 0
n2[-1 + 1n + 4n2 + 2n3 + [-1 * n + n * n + 4n2 * n + 2n3 * n]] = 0
n2[-1 + 1n + 4n2 + 2n3 + [-1n + n2 + 4n3 + 2n4]] = 0

Reorder the terms:
n2[-1 + 1n + -1n + 4n2 + n2 + 2n3 + 4n3 + 2n4] = 0

Combine like terms: 1n + -1n = 0
n2[-1 + 0 + 4n2 + n2 + 2n3 + 4n3 + 2n4] = 0
n2[-1 + 4n2 + n2 + 2n3 + 4n3 + 2n4] = 0

Combine like terms: 4n2 + n2 = 5n2
n2[-1 + 5n2 + 2n3 + 4n3 + 2n4] = 0

Combine like terms: 2n3 + 4n3 = 6n3
n2[-1 + 5n2 + 6n3 + 2n4] = 0
[-1 * n2 + 5n2 * n2 + 6n3 * n2 + 2n4 * n2] = 0
[-1n2 + 5n4 + 6n5 + 2n6] = 0

Solving
-1n2 + 5n4 + 6n5 + 2n6 = 0

Solving for variable 'n'.

Factor out the Greatest Common Factor (GCF), 'n2'.
n2(-1 + 5n2 + 6n3 + 2n4) = 0

Subproblem 1
Set the factor 'n2' equal to zero and attempt to solve:

Simplifying
n2 = 0

Solving
n2 = 0

Move all terms containing n to the left, all other terms to the right.

Simplifying
n2 = 0

Take the square root of each side:
n = {0}
Subproblem 2
Set the factor '(-1 + 5n2 + 6n3 + 2n4)' equal to zero and attempt to solve:

Simplifying
-1 + 5n2 + 6n3 + 2n4 = 0

Solving
-1 + 5n2 + 6n3 + 2n4 = 0

The solution to this equation could not be determined.

This subproblem is being ignored because a solution could not be determined.
Solution
n = {0}