Definite Integral from 0 to a of x^m by (a^n - x^n)^p

Theorem

 * $\ds \int_0^a x^m \paren {a^n - x^n}^p \rd x = \frac {a^{m + 1 + n p} \, \map \Gamma {\frac {m + 1} n} \map \Gamma {p + 1} } {n \map \Gamma {\frac {m + 1} n + p + 1} }$