ICL 2016 (GP of Tatarstan)
Problem A
Upsolved by ultmaster. (-2)
题意:给定三点 $A,B,C$,求一点 $Q$ 使得 $AQB = \alpha_1$, $BQC = \alpha_2$。
题解:搞出四个圆,然后两两配对。注意交点不能和给定点重合,注意圆重合的情况。
Problem B
Unsolved. (-10)
Problem C
Solved by ultmaster. 01:34 (+1)
题意:有 $n$ 个东西,每个东西已知一些事件发生,求在此条件下 另一系列事件发生的概率。
题解:条件概率公式。注意权重。
Problem D
Unsolved.
Problem E
Unsolved.
Problem F
Solved by ultmaster. 00:42 (+1)
题意:问有多少个有序数列满足 gcd 是 d,lcm 是 m。
题解:m /= d。然后简单容斥一下。
Problem G
Solved by zerol. 00:13 (+)
Problem H
Solved by zerol. 01:36 (+2)
Problem I
Solved by zerol. 00:49 (+)
Problem J
Solved by zerol. 03:21 (+2)
Problem K
Solved by kblack. 02:06 (+1)
Problem L
Solved by kblack. 02:56 (+3)
Problem M
Solved by kblack. 00:07 (+)
温暖的签到。