If n is n odd integer that is greater th...

If `n` is n odd integer that is greater than or equal to 3 but not la ultiple of 3, then prove that `(x+1)^n=x^n-1` is divisible by `x^3+x^2+xdot`

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Thus , ` x^(3) + x^(2) + x "divides" (x +1)^(n) , x^(n) - 1`

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