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Contest: Task: Related: TaskE TaskG

Score : $1000$ points

Problem Statement

Yosupo loves query problems. He made the following problem:


A Query Problem

We have an integer sequence of length $N$: $a_1,\ldots,a_N$. Initially, $a_i = 0 (1 \leq i \leq N)$. We also have a variable $ans$, which is initially $0$. Here, you will be given $Q$ queries of the following forms:

  • Type 1:

    • $t_i (=1)$ $l_i$ $r_i$ $v_i$

    • For each $j = l_i,\ldots,r_i$, $a_j := \min(a_j,v_i)$.

  • Type 2:

    • $t_i (=2)$ $l_i$ $r_i$ $v_i$

    • For each $j = l_i,\ldots,r_i$, $a_j := \max(a_j,v_i)$.

  • Type 3:

    • $t_i (=3)$ $l_i$ $r_i$

    • Compute $a_{l_i} + \ldots + a_{r_i}$ and add the result to $ans$.

Print the final value of $ans$.

Here, for each query, $1$ $\leq$ $l_i$ $\leq$ $r_i$ $\leq$ $N$ holds. Additionally, for Type 1 and 2, $0$ $\leq$ $v_i$ $\leq$ $M-1$ holds.


Maroon saw this problem, thought it was too easy, and came up with the following problem:


Query Problems

Given are positive integers $N,M,Q$. There are $( \frac{(N+1)N}{2} \cdot (M+M+1) )^Q$ valid inputs for "A Query Problem". Find the sum of outputs over all those inputs, modulo $998{,}244{,}353$.


Find it.

Constraints

  • $1 \leq N,M,Q \leq 200000$
  • All numbers in input are integers.

Input

Input is given from Standard Input in the following format:

$N$ $M$ $Q$

Output

Print the answer.


Sample Input 1

1 2 2

Sample Output 1

1

There are $25$ valid inputs, and just one of them - shown below - results in a positive value of $ans$.

$t_1 = 2, l_1 = 1, r_1 = 1, v_1 = 1, t_2 = 3, l_2 = 1, r_2 = 1$

$ans$ will be $1$ in this case, so the answer is $1$.


Sample Input 2

3 1 4

Sample Output 2

0

Sample Input 3

111 112 113

Sample Output 3

451848306