given an array consists of $$$n$$$ integers and an integer $$$p$$$, find number of pair($$$i,j$$$):
so that $$$i<j$$$ and $$$(a[i]*a[j])$$$ $$$mod$$$ $$$p$$$ $$$=$$$ $$$(a[i]+a[j])$$$ $$$mod$$$ $$$p$$$
$$$n<=10^5$$$
$$$1<p<=10^9$$$
need help with this problem
given an array consists of $$$n$$$ integers and an integer $$$p$$$, find number of pair($$$i,j$$$):
so that $$$i<j$$$ and $$$(a[i]*a[j])$$$ $$$mod$$$ $$$p$$$ $$$=$$$ $$$(a[i]+a[j])$$$ $$$mod$$$ $$$p$$$
$$$n<=10^5$$$
$$$1<p<=10^9$$$