SOLUTION: For what integer values of n is x-y a factor of {{{x^n+y^n}}}? I know that x-y is a factor of {{{x^n-y^n}}} for all natural values of n but what if it were a '+' instead of a'-'

Algebra ->  Functions -> SOLUTION: For what integer values of n is x-y a factor of {{{x^n+y^n}}}? I know that x-y is a factor of {{{x^n-y^n}}} for all natural values of n but what if it were a '+' instead of a'-'      Log On


   



Question 772334: For what integer values of n is x-y a factor of x%5En%2By%5En?
I know that x-y is a factor of x%5En-y%5En for all natural values of n but what if it were a '+' instead of a'-'? What values of n will the problem be satisfied?

Answer by Alan3354(69443) About Me  (Show Source):
You can put this solution on YOUR website!
For what integer values of n is x-y a factor of x%5En%2By%5En?
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No integer values.