If a and b are distinct integers- prove that a - b is a factor of a-n-b-n- whenever n is a positive integer-

Question

Toppr Admin · Accepted Answer

When n is an even number then an-x2212-bn can be written as -an-2-x2212-bn-2-an-2-bn-2- here if n2 is even then it can be further expanded and finally we will get -a-b-some thing-now- here if n or n2 is odd then the expansion is of the form-a-x2212-b-an-x2212-1b0-an-x2212-2b1-an-x2212-3b2-a0bn-x2212-1-

If a and b are distinct integers, prove that a−b is a factor of an−bn, whenever n is a positive integer.

When n is an even number then an−bn can be written as (an/2−bn/2)(an/2+bn/2). here if n2 is even then it can be further expanded and finally we will get (a-b)*(some thing).now, here if n or n2 is odd then the expansion is of the form(a−b)(an−1b0+an−2b1+an−3b2+.....+a0bn−1)

If $a$ and $b$ are distinct integers, prove that $a - b$ is a factor of $a^{n} - b^{n}$ , whenever $n$ is a positive integer.