1650B. DIV + MOD
1650B. DIV + MOD
- time limit per test2 seconds
- memory limit per test256 megabytes
- inputstandard input
- outputstandard output Not so long ago, Vlad came up with an interesting function:
f(x)=⌊⌋+x mod a, where ⌊⌋ is , rounded down, x mod a — the remainder of the integer division of x by a. For example, with a=3 and x=11, the value f(11)=⌊⌋+11 mod 3=3+2=5.
The number a is fixed and known to Vlad. Help Vlad find the maximum value of fa(x) if x can take any integer value from l to r inclusive (l≤x≤r).
Input
The first line of input data contains an integer t (1≤t≤10) — the number of input test cases.
输入数据的第一行包含一个整数t(1≤T≤10)-输入测试用例的数量。
This is followed by t lines, each of which contains three integers l, r and a (1≤l≤r≤10,1≤ai≤10) — the left and right boundaries of the segment and the fixed value of a.
然后是t行,每行包含三个整数l、r和a(1≤l≤r≤10,1≤ai≤10)-段的左右边界和a的固定值。
Output
For each test case, output one number on a separate line — the maximum value of the function on a given segment for a given a.
对于每个测试用例,在单独的一行上输出一个数字——给定a的给定段上函数的最大值。
Example
input
5
1 4 3
5 8 4
6 10 6
1 1000000000 1000000000
10 12 8
output
2
4
5
999999999
5
Note
In the first sample:
f(1)=⌊⌋+1mod3=0+1=1,
f(2)=⌊⌋+2mod3=0+2=2,
f(3)=⌊⌋+3mod3=1+0=1,
f(4)=⌊⌋+4mod3=1+1=2
As an answer, obviously, f(2) and f(4) are suitable.
Solution
考虑到x/a每增大a才增大1,xmoda每增大1增大1,周期为a,值域为[0,a-1],因此考虑最接近r端点模a余数最大值(可以为r),能保证总体最大值
Code
#include <iostream>
using namespace std;
//B. DIV + MOD
int main() {
int t = 0;
cin >> t;
for (int i = 0;i < t;i++){
int l,r,a = 0;
cin >> l >> r >> a;
if(r % a == a - 1)//r%a是a-1
cout << r / a + r % a << endl;
else if(r - r % a - 1 >= l)//r最近%a是a-1的值>=l
cout << (r - r % a - 1 ) / a + (r - r % a -1) % a << endl;
else//r最近%a是a-1的值<l
cout << r / a + r % a << endl;
}
return 0;
}
https://codeforces.ml/