摘要:
250pt....500pt 题意:给n和m,a,b满足(1 <= a <= n, 1 <= b <= m),SSR(a, b) = (sqrt(a) + sqrt(b))^2为整数,其实就是sqrt(a*b)为整数。总体思路是:从1...n枚举a,看m中有多少个和a组合可以构成平方数的。先把a因式分解,a = k1p1*k2p2*...*kxpx找到所有pi (1 <= i <= x)中是奇数的质因子,因为幂为偶数的质因子开放的结果一定是整数,所以不用考虑偶数的情况。剩下这些设幂为奇数的质因子的积为W,比如a = 2^3*5^3*7^2, W = 2^3* 阅读全文
