If n is an odd integer but not a multipl...

If n is an odd integer but not a multiple of 3, then prove that `xy(+y)(x^(2)+y^(2)+xy)` is a factor of `(x+y)^(n)-x^(n)-y^(2).`

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If n is an odd integer but not a multiple of 3, then prove that xy(x+y)(x^(2)+y^(2)+xy) is a factor of (x+y)^(n)-x^(n)-y^(n).

x-x^(2)y+xy^(2)-y

If n is anodd integer greter than 3 but not a multiple of 3 prove that [(x+y)^n-x^n-y^n] is divisible by xy(x+y)(x^2+xy+y^2).

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