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A triplet \$(p1,p2,p3)\$ where \$p1,p2,p3\$ are primes (not necessarily distinct) is called special if \$p1+p2+p3\$ divides \$p1*p2*p3\$. Find the number of triplets such that each prime of the triplet is not greater than \$N\$. Two triplets are considered to be different if the element at any one of the positions (first, second, third) is different in the second one.

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Input format

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The first line of the input consists of an integer \$N\$.

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Output format

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Print the answer in a single line.

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Constraints

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\$1<=N<=10^6\$

","sample_explanation":"

The possible triplets are {3,3,3},{2,3,5},{2,5,3},{3,2,5},{3,5,2},{5,2,3},{5,3,2}.

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