4.II .7 B. 7 \mathrm{~B} \quad.7 BNumbers and Sets | Part IA, 2002(a) Suppose that ppp is an odd prime. Find 1p+2p+…+(p−1)p1^{p}+2^{p}+\ldots+(p-1)^{p}1p+2p+…+(p−1)p modulo ppp.(b) Find (p−1)(p-1)(p−1) ! modulo (1+2+…+(p−1))(1+2+\ldots+(p-1))(1+2+…+(p−1)), when ppp is an odd prime.Typos? Please submit corrections to this page on GitHub.