{"raw_statement":[{"iden":"problem statement","content":"For two sets of integers, $A$ and $B$, such that $A \\cap B = \\emptyset$, we define $f(A,B)$ as follows.\n\n* Let $C=(C_1,C_2,\\dots,C_{|A|+|B|})$ be a sequence consisting of the elements of $A \\cup B$, sorted in ascending order.\n* Take $k_1,k_2,\\dots,k_{|A|}$ such that $A=\\lbrace C_{k_1},C_{k_2},\\dots,C_{k_{|A|}}\\rbrace$. Then, let $\\displaystyle f(A,B)=\\sum_{i=1}^{|A|} k_i$.\n\nFor example, if $A=\\lbrace 1,3\\rbrace$ and $B=\\lbrace 2,8\\rbrace$, then $C=(1,2,3,8)$, so $A=\\lbrace C_1,C_3\\rbrace$; thus, $f(A,B)=1+3=4$.\nWe have $N$ sets of integers, $S_1,S_2\\dots,S_N$, each of which has $M$ elements. For each $i\\ (1 \\leq i \\leq N)$, $S_i = \\lbrace A_{i,1},A_{i,2},\\dots,A_{i,M}\\rbrace$. Here, it is guaranteed that $S_i \\cap S_j = \\emptyset\\ (i \\neq j)$.\nFind $\\displaystyle \\sum_{1\\leq i