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-a^{6}+1
Multiply and combine like terms.
\left(1+a^{3}\right)\left(1-a^{3}\right)
Rewrite -a^{6}+1 as 1^{2}-\left(-a^{3}\right)^{2}. The difference of squares can be factored using the rule: p^{2}-q^{2}=\left(p-q\right)\left(p+q\right).
\left(a^{3}+1\right)\left(-a^{3}+1\right)
Reorder the terms.
\left(a+1\right)\left(a^{2}-a+1\right)
Consider a^{3}+1. Rewrite a^{3}+1 as a^{3}+1^{3}. The sum of cubes can be factored using the rule: p^{3}+q^{3}=\left(p+q\right)\left(p^{2}-pq+q^{2}\right).
\left(a-1\right)\left(-a^{2}-a-1\right)
Consider -a^{3}+1. By Rational Root Theorem, all rational roots of a polynomial are in the form \frac{p}{q}, where p divides the constant term 1 and q divides the leading coefficient -1. One such root is 1. Factor the polynomial by dividing it by a-1.
\left(-a^{2}-a-1\right)\left(a-1\right)\left(a^{2}-a+1\right)\left(a+1\right)
Rewrite the complete factored expression. The following polynomials are not factored since they do not have any rational roots: -a^{2}-a-1,a^{2}-a+1.
1-a^{6}
To multiply powers of the same base, add their exponents. Add 2 and 4 to get 6.