310695: CF1872D. Plus Minus Permutation
Description
You are given $3$ integers — $n$, $x$, $y$. Let's call the score of a permutation$^\dagger$ $p_1, \ldots, p_n$ the following value:
$$(p_{1 \cdot x} + p_{2 \cdot x} + \ldots + p_{\lfloor \frac{n}{x} \rfloor \cdot x}) - (p_{1 \cdot y} + p_{2 \cdot y} + \ldots + p_{\lfloor \frac{n}{y} \rfloor \cdot y})$$
In other words, the score of a permutation is the sum of $p_i$ for all indices $i$ divisible by $x$, minus the sum of $p_i$ for all indices $i$ divisible by $y$.
You need to find the maximum possible score among all permutations of length $n$.
For example, if $n = 7$, $x = 2$, $y = 3$, the maximum score is achieved by the permutation $[2,\color{red}{\underline{\color{black}{6}}},\color{blue}{\underline{\color{black}{1}}},\color{red}{\underline{\color{black}{7}}},5,\color{blue}{\underline{\color{red}{\underline{\color{black}{4}}}}},3]$ and is equal to $(6 + 7 + 4) - (1 + 4) = 17 - 5 = 12$.
$^\dagger$ A permutation of length $n$ is an array consisting of $n$ distinct integers from $1$ to $n$ in any order. For example, $[2,3,1,5,4]$ is a permutation, but $[1,2,2]$ is not a permutation (the number $2$ appears twice in the array) and $[1,3,4]$ is also not a permutation ($n=3$, but the array contains $4$).
InputThe first line of input contains an integer $t$ ($1 \le t \le 10^4$) — the number of test cases.
Then follows the description of each test case.
The only line of each test case description contains $3$ integers $n$, $x$, $y$ ($1 \le n \le 10^9$, $1 \le x, y \le n$).
OutputFor each test case, output a single integer — the maximum score among all permutations of length $n$.
ExampleInput8 7 2 3 12 6 3 9 1 9 2 2 2 100 20 50 24 4 6 1000000000 5575 25450 4 4 1Output
12 -3 44 0 393 87 179179179436104 -6Note
The first test case is explained in the problem statement above.
In the second test case, one of the optimal permutations will be $[12,11,\color{blue}{\underline{\color{black}{2}}},4,8,\color{blue}{\underline{\color{red}{\underline{\color{black}{9}}}}},10,6,\color{blue}{\underline{\color{black}{1}}},5,3,\color{blue}{\underline{\color{red}{\underline{\color{black}{7}}}}}]$. The score of this permutation is $(9 + 7) - (2 + 9 + 1 + 7) = -3$. It can be shown that a score greater than $-3$ can not be achieved. Note that the answer to the problem can be negative.
In the third test case, the score of the permutation will be $(p_1 + p_2 + \ldots + p_9) - p_9$. One of the optimal permutations for this case is $[9, 8, 7, 6, 5, 4, 3, 2, 1]$, and its score is $44$. It can be shown that a score greater than $44$ can not be achieved.
In the fourth test case, $x = y$, so the score of any permutation will be $0$.
Output
$$
\left( p_{1 \cdot x} + p_{2 \cdot x} + \ldots + p_{\lfloor \frac{n}{x} \rfloor \cdot x} \right) - \left( p_{1 \cdot y} + p_{2 \cdot y} + \ldots + p_{\lfloor \frac{n}{y} \rfloor \cdot y} \right)
$$
即排列的分数是所有索引 i 能被 x 整除的 p_i 之和,减去所有索引 i 能被 y 整除的 p_i 之和。
你需要找到长度为 n 的所有排列中可能的最大分数。
输入输出数据格式:
输入:
- 第一行包含一个整数 t (1 ≤ t ≤ 10^4) —— 测试用例的数量。
- 然后是每个测试用例的描述。
- 每个测试用例的描述仅包含一行,包含 3 个整数 n, x, y (1 ≤ n ≤ 10^9, 1 ≤ x, y ≤ n)。
输出:
- 对于每个测试用例,输出一个整数 —— 长度为 n 的所有排列中的最大分数。题目大意:给定三个整数 n, x, y。排列 p_1, …, p_n 的分数定义为: $$ \left( p_{1 \cdot x} + p_{2 \cdot x} + \ldots + p_{\lfloor \frac{n}{x} \rfloor \cdot x} \right) - \left( p_{1 \cdot y} + p_{2 \cdot y} + \ldots + p_{\lfloor \frac{n}{y} \rfloor \cdot y} \right) $$ 即排列的分数是所有索引 i 能被 x 整除的 p_i 之和,减去所有索引 i 能被 y 整除的 p_i 之和。 你需要找到长度为 n 的所有排列中可能的最大分数。 输入输出数据格式: 输入: - 第一行包含一个整数 t (1 ≤ t ≤ 10^4) —— 测试用例的数量。 - 然后是每个测试用例的描述。 - 每个测试用例的描述仅包含一行,包含 3 个整数 n, x, y (1 ≤ n ≤ 10^9, 1 ≤ x, y ≤ n)。 输出: - 对于每个测试用例,输出一个整数 —— 长度为 n 的所有排列中的最大分数。