(n+1)(n)(n+1)=210

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Solution for (n+1)(n)(n+1)=210 equation:


Simplifying
(n + 1)(n)(n + 1) = 210

Reorder the terms:
(1 + n)(n)(n + 1) = 210

Reorder the terms:
(1 + n) * n(1 + n) = 210

Reorder the terms for easier multiplication:
n(1 + n)(1 + n) = 210

Multiply (1 + n) * (1 + n)
n(1(1 + n) + n(1 + n)) = 210
n((1 * 1 + n * 1) + n(1 + n)) = 210
n((1 + 1n) + n(1 + n)) = 210
n(1 + 1n + (1 * n + n * n)) = 210
n(1 + 1n + (1n + n2)) = 210

Combine like terms: 1n + 1n = 2n
n(1 + 2n + n2) = 210
(1 * n + 2n * n + n2 * n) = 210
(1n + 2n2 + n3) = 210

Solving
1n + 2n2 + n3 = 210

Solving for variable 'n'.

Reorder the terms:
-210 + 1n + 2n2 + n3 = 210 + -210

Combine like terms: 210 + -210 = 0
-210 + 1n + 2n2 + n3 = 0

The solution to this equation could not be determined.

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