Finding Factoring of a^6-b^6 Using Sum or Difference of Cubes

Given polynomial is a^6-b^6

It can be expanded using a^3-b^3 formula i.e a³-b³=(a-b)(a²+ab+b²)

(a-b)(a^2+ab+b^2)

=a (a^2 + a b + b^2) - b (a^2 + a b + b^2)

= a^3 + a^2b + ab^2 - a^2b - ab^2 - b^3

= a^3 - b^3

=(a^2-b^2)(a^4+a^2b^2+b^4)

So, the factors of a^6-b^6 are (a - b) (a + b) (a^2 - a b + b^2) (a^2 + a b + b^2)

1. What are the factors for a a^6-b^6 using the sum or difference of cubes?

The factor for a^6-b^6 is (a - b) (a + b) (a^2 - a b + b^2) (a^2 + a b + b^2)

2. How can I use the sum or difference of cubes method to factorize the given equation?

You can first find the factors of the given equation a^6-b^6, then by performing simple mathematical calculations you can get the desired factors.