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

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.

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. [Hint write a^n = (a - b + b)^n and expand]

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.

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.

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.

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.

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.

If a and b are distinct integers,prove that a-b is a factor of a^(n)-b^(n), wherever n is a positive integer.

If aa n db are distinct integers, prove that a-b is a factor of a^n-b^n , wherever n is a positive integer.

If aa n db are distinct integers, prove that a-b is a factor of a^n-b^n , wherever n is a positive integer.