#P1644F. Basis

    ID: 6312 Type: RemoteJudge 6000ms 512MiB Tried: 0 Accepted: 0 Difficulty: (None) Uploaded By: Tags>combinatoricsfftmathnumber theory*2900

Basis

No submission language available for this problem.

Description

For an array of integers $a$, let's define $|a|$ as the number of elements in it.

Let's denote two functions:

  • $F(a, k)$ is a function that takes an array of integers $a$ and a positive integer $k$. The result of this function is the array containing $|a|$ first elements of the array that you get by replacing each element of $a$ with exactly $k$ copies of that element.

    For example, $F([2, 2, 1, 3, 5, 6, 8], 2)$ is calculated as follows: first, you replace each element of the array with $2$ copies of it, so you obtain $[2, 2, 2, 2, 1, 1, 3, 3, 5, 5, 6, 6, 8, 8]$. Then, you take the first $7$ elements of the array you obtained, so the result of the function is $[2, 2, 2, 2, 1, 1, 3]$.

  • $G(a, x, y)$ is a function that takes an array of integers $a$ and two different integers $x$ and $y$. The result of this function is the array $a$ with every element equal to $x$ replaced by $y$, and every element equal to $y$ replaced by $x$.

    For example, $G([1, 1, 2, 3, 5], 3, 1) = [3, 3, 2, 1, 5]$.

An array $a$ is a parent of the array $b$ if:

  • either there exists a positive integer $k$ such that $F(a, k) = b$;
  • or there exist two different integers $x$ and $y$ such that $G(a, x, y) = b$.

An array $a$ is an ancestor of the array $b$ if there exists a finite sequence of arrays $c_0, c_1, \dots, c_m$ ($m \ge 0$) such that $c_0$ is $a$, $c_m$ is $b$, and for every $i \in [1, m]$, $c_{i-1}$ is a parent of $c_i$.

And now, the problem itself.

You are given two integers $n$ and $k$. Your goal is to construct a sequence of arrays $s_1, s_2, \dots, s_m$ in such a way that:

  • every array $s_i$ contains exactly $n$ elements, and all elements are integers from $1$ to $k$;
  • for every array $a$ consisting of exactly $n$ integers from $1$ to $k$, the sequence contains at least one array $s_i$ such that $s_i$ is an ancestor of $a$.

Print the minimum number of arrays in such sequence.

The only line contains two integers $n$ and $k$ ($1 \le n, k \le 2 \cdot 10^5$).

Print one integer — the minimum number of elements in a sequence of arrays meeting the constraints. Since the answer can be large, output it modulo $998244353$.

Input

The only line contains two integers $n$ and $k$ ($1 \le n, k \le 2 \cdot 10^5$).

Output

Print one integer — the minimum number of elements in a sequence of arrays meeting the constraints. Since the answer can be large, output it modulo $998244353$.

Samples

3 2
2
4 10
12
13 37
27643508
1337 42
211887828
198756 123456
159489391
123456 198756
460526614

Note

Let's analyze the first example.

One of the possible answers for the first example is the sequence $[[2, 1, 2], [1, 2, 2]]$. Every array of size $3$ consisting of elements from $1$ to $2$ has an ancestor in this sequence:

  • for the array $[1, 1, 1]$, the ancestor is $[1, 2, 2]$: $F([1, 2, 2], 13) = [1, 1, 1]$;
  • for the array $[1, 1, 2]$, the ancestor is $[1, 2, 2]$: $F([1, 2, 2], 2) = [1, 1, 2]$;
  • for the array $[1, 2, 1]$, the ancestor is $[2, 1, 2]$: $G([2, 1, 2], 1, 2) = [1, 2, 1]$;
  • for the array $[1, 2, 2]$, the ancestor is $[1, 2, 2]$;
  • for the array $[2, 1, 1]$, the ancestor is $[1, 2, 2]$: $G([1, 2, 2], 1, 2) = [2, 1, 1]$;
  • for the array $[2, 1, 2]$, the ancestor is $[2, 1, 2]$;
  • for the array $[2, 2, 1]$, the ancestor is $[2, 1, 2]$: $F([2, 1, 2], 2) = [2, 2, 1]$;
  • for the array $[2, 2, 2]$, the ancestor is $[1, 2, 2]$: $G(F([1, 2, 2], 4), 1, 2) = G([1, 1, 1], 1, 2) = [2, 2, 2]$.