Given parameters $a, b, c$; $max(a,b,c) \le 9000$. Your task is to compute $\sumSigma\limits_{x = 1}^{a} \sumSigma\limits_{y = 1}^{b} \sumSigma\limits_{z = 1}^{c} d(x*y*z) $ where $ d(n)$ is the divisor count function : the number of positive divisors of $n$.↵
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This is the final problem in my recent OI Mocktest, I can only solve it to the first subtask: $max(a,b,c) \le 200$, by iterating over all triplets $(x,y,z)$ and adding $d(x*y*z)$ to the result variable, to compute $d(x*y*z)$, I used applied prime sieve.↵
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Can you suggest the algorithm for the final subtask?↵
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Any help would be highly appreciated!
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This is the final problem in my recent OI Mocktest, I can only solve it to the first subtask: $max(a,b,c) \le 200$, by iterating over all triplets $(x,y,z)$ and adding $d(x*y*z)$ to the result variable, to compute $d(x*y*z)$, I used applied prime sieve.↵
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Can you suggest the algorithm for the final subtask?↵
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Any help would be highly appreciated!