Score : $600$ points
You are given positive integers $N$ and $M$. For each $k=1,\ldots,N$, solve the following problem.
Here, two ways to divide people into groups are considered different when there is a pair $(x, y)$ such that Person $x$ and Person $y$ belong to the same group in one way but not in the other.
Input is given from Standard Input in the following format:
$N$ $M$
Print $N$ lines.
The $i$-th line should contain the answer for the problem with $k=i$.
4 2
0 2 4 1
People whose ID numbers are equal modulo $2$ cannot belong to the same group. That is, Person $1$ and Person $3$ cannot belong to the same group, and neither can Person $2$ and Person $4$.
6 6
1 31 90 65 15 1
You can divide them as you like.
20 5
0 0 0 331776 207028224 204931064 814022582 544352515 755619435 401403040 323173195 538468102 309259764 722947327 162115584 10228144 423360 10960 160 1
Be sure to find the answer modulo $998244353$.