Suppose, there's n persons A1,A2,....,An. Person Ai have a set of p_i_ numbers, Xi.1,Xi.2,....,Xi.pi. You have Q quaries. Each quary is two types. 1. 1 in t S1,S2,...,St. Set p_in_ with t and Xi with S. 2. 2 l,r,m,S1,S2,...,Sm. Calculate the number of people Al...Ar, who has at least one number Si in his set p_i_
1<=n,Q<=100000 1<=p_i_,t,m<=20 1<=Si,each element of Xi<=1000000
How can be it solved?
N.B.: Its a problem of an onsite contest.