简单数学题 - 問題

#8479. 简单数学题

統計

この問題は以下のコンテストで使用されています：

Petrozavodsk Winter 2024. Day 4. PKU Contest 2

AI Translation — This statement was translated using AI and may contain inaccuracies. Please refer to the original statement if in doubt.

给定两个正整数 $m$ 和 $n$，求以下公式对 $998\,244\,353$ 取模后的值：

$$\sum_{i=0}^{\lfloor \frac{m}{2} \rfloor} \sum_{j=0}^{\lfloor \frac{n}{2} \rfloor} \binom{i+j}{j}^2 \binom{m+n-2i-2j}{n-2j}$$

其中，$\binom{a}{b}$ 是二项式系数（从 $a$ 个元素的固定集合中选择 $b$ 个元素构成的无序子集的方案数）。

输入格式

第一行包含一个整数 $T$ ($1 \le T \le 10^5$)，表示测试用例的数量。

对于每个测试用例，输入为一行，包含两个整数 $m$ 和 $n$ ($1 \le m, n \le 10^5$)。

输出格式

对于每个测试用例，输出一行，包含一个整数：该公式对 $998\,244\,353$ 取模后的值。

样例

样例输入 1

2
1 9
2 6

样例输出 1

30
80

Editorials

ID	Type	Status	Title	Posted By	Last Updated	Actions
#852	Editorial	Open	题解	Qingyu	2026-01-28 02:24:22	View

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