Banned Quotient
Chef wants to select a subset $S$ of the set $\{1, 2, \ldots, N\}$ such that there are no two integers $x, y \in S$ which satisfy $\frac{x}{y} = M$. Help Chef find the maximum size of a subset $S$ he can choose and the number of ways in which he can choose a subset $S$ with this maximum size. Since the number of ways to choose $S$ can be very large, calculate it modulo $998,244,353$. ### Inp
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solution.cppC++17
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