F - Numbered Checker
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F - Numbered Checker
Score : $500$ points
Problem Statement
We have a grid with $N$ rows and $M$ columns. The square $(i,j)$ at the $i$-th row from the top and $j$-th column from the left has an integer $(i-1) \times M + j$ written on it.
Let us perform the following operation on this grid.
- For every square $(i,j)$ such that $i+j$ is odd, replace the integer on that square with $0$.
Answer $Q$ questions on the grid after the operation.
The $i$-th question is as follows:
- Find the sum of the integers written on all squares $(p,q)$ that satisfy all of the following conditions, modulo $998244353$.
- $A_i \le p \le B_i$.
- $C_i \le q \le D_i$.
Constraints
- All values in the input are integers.
- $1 \le N,M \le 10^9$
- $1 \le Q \le 2 \times 10^5$
- $1 \le A_i \le B_i \le N$
- $1 \le C_i \le D_i \le M$
Input
The input is given from Standard Input in the following format:
Output
Print $Q$ lines.
The $i$-th line should contain the answer to the $i$-th question as an integer.
5 4
6
1 3 2 4
1 5 1 1
5 5 1 4
4 4 2 2
5 5 4 4
1 5 1 4
28
27
36
14
0
104
The grid in this input is shown below.
This input contains six questions.
- The answer to the first question is $0+3+0+6+0+8+0+11+0=28$.
- The answer to the second question is $1+0+9+0+17=27$.
- The answer to the third question is $17+0+19+0=36$.
- The answer to the fourth question is $14$.
- The answer to the fifth question is $0$.
- The answer to the sixth question is $104$.
1000000000 1000000000
3
1000000000 1000000000 1000000000 1000000000
165997482 306594988 719483261 992306147
1 1000000000 1 1000000000
716070898
240994972
536839100
For the first question, note that although the integer written on the square $(10^9,10^9)$ is $10^{18}$, you are to find it modulo $998244353$.
999999999 999999999
3
999999999 999999999 999999999 999999999
216499784 840031647 84657913 415448790
1 999999999 1 999999999
712559605
648737448
540261130