题目链接:Counterexample
Counterexample
time limit per test
1 second
memory limit per test
256 megabytes
input
standard input
output
standard output
Your friend has recently learned about coprime numbers. A pair of numbers {a,?b} is called coprime if the maximum number that divides both a and b is equal to one.
Your friend often comes up with different statements. He has recently supposed that if the pair (a,?b) is coprime and the pair (b,?c) is coprime, then the pair (a,?c) is coprime.
You want to find a counterexample for your friend's statement. Therefore, your task is to find three distinct numbers (a,?b,?c), for which the statement is false, and the numbers meet the condition l?≤?a?
More specifically, you need to find three numbers (a,?b,?c), such that l?≤?a?
Input
The single line contains two positive space-separated integers l, r (1?≤?l?≤?r?≤?1018; r?-?l?≤?50).
Output
Print three positive space-separated integers a, b, c ? three distinct numbers (a,?b,?c) that form the counterexample. If there are several solutions, you are allowed to print any of them. The numbers must be printed in ascending order.
If the counterexample does not exist, print the single number -1.
Sample test(s)
input
2 4
output
2 3 4
input
10 11
output
-1
input
900000000000000009 900000000000000029
output
900000000000000009 900000000000000010 900000000000000021
Note
In the first sample pair (2,?4) is not coprime and pairs (2,?3) and (3,?4) are.
In the second sample you cannot form a group of three distinct integers, so the answer is -1.
In the third sample it is easy to see that numbers 900000000000000009 and 900000000000000021 are divisible by three.
大致题意:给定l和r,找出满足条件 l?≤?a?
解题思路:暴力枚举。枚举所有的情况,对每个情况进行判断。这种做法的前提是数据不大,数据要是大了,就不能这么直接暴力了。
AC代码:
#include#include #include #include #include #include #include #include