write a go solution for Description:
There is a chip on the coordinate line. Initially, the chip is located at the point 0. You can perform any number of moves; each move increases the coordinate of the chip by some positive integer (which is called the length of the move). The length of the first move you make should be divisible by k, the length of the second move — by k+1, the third — by k+2, and so on.

For example, if k=2, then the sequence of moves may look like this: 0arrow4arrow7arrow19arrow44, because 4-0=4 is divisible by 2=k, 7-4=3 is divisible by 3=k+1, 19-7=12 is divisible by 4=k+2, 44-19=25 is divisible by 5=k+3.

You are given two positive integers n and k. Your task is to count the number of ways to reach the point x, starting from 0, for every xin[1,n]. The number of ways can be very large, so print it modulo 998244353. Two ways are considered different if they differ as sets of visited positions.

Input Format:
The first (and only) line of the input contains two integers n and k (1<=k<=n<=2*10^5).

Output Format:
Print n integers — the number of ways to reach the point x, starting from 0, for every xin[1,n], taken modulo 998244353.

Note:
Let's look at the first example:

Ways to reach the point 1: [0,1];

Ways to reach the point 2: [0,2];

Ways to reach the point 3: [0,1,3], [0,3];

Ways to reach the point 4: [0,2,4], [0,4];

Ways to reach the point 5: [0,1,5], [0,3,5], [0,5];

Ways to reach the point 6: [0,1,3,6], [0,2,6], [0,4,6], [0,6];

Ways to reach the point 7: [0,2,4,7], [0,1,7], [0,3,7], [0,5,7], [0,7];

Ways to reach the point 8: [0,3,5,8], [0,1,5,8], [0,2,8], [0,4,8], [0,6,8], [0,8].. Output only the code with no comments, explanation, or additional text.