Difference between revisions of "XVII Open Cup named after E.V. Pankratiev. XXI Ural Championship"
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Solved by Xiejiadong. 2:46 (+1) | Solved by Xiejiadong. 2:46 (+1) | ||
| − | + | 题意:给出两个对于坐标轴散点的柱形统计图,判断能够通过同一个散点分布得到。 | |
| + | |||
| + | 题解:因为没有散点在坐标轴的定义域外面,所以前缀和处理以后,开始端点 $b$ 处一定是 $0$ ,通过这个可以推断出所有前缀和位置的和。 | ||
| + | |||
| + | 判断是否有冲突,是否有靠后的位置小于前面(要保证非负)的即可。 | ||
== Problem C == | == Problem C == | ||
Upsolved by Xiejiadong. (-6) | Upsolved by Xiejiadong. (-6) | ||
| + | |||
| + | 题意:配置一个 mass 在 $[min,max]$ 范围内的东西,使得能够得到这类东西的数量最大。 | ||
| + | |||
| + | 题解:dp 显然 $f[i]=max(min(f[i-mx],c/x))$ 。 | ||
| + | |||
| + | 考虑把所有质量相同的东西压在一起处理,时间复杂度 $O(n^2logn)$ 。 | ||
| + | |||
| + | 被题意杀了。 | ||
== Problem D == | == Problem D == | ||
Latest revision as of 08:32, 27 October 2019
Problem A
Solved by Xiejiaodng. 0:23 (+)
题意:判断给出的图是不是一个环 + 一条链。
题解:找到环和链的转折点,一定是一个度数为 $3$ 的点。
找到度数为 $1$ 的点一定是链的一段,从这个点出发到度数为 $3$ 的点然后在把环标记一遍。
去掉不联通的情况,去掉各种细节即可。
Problem B
Solved by Xiejiadong. 2:46 (+1)
题意:给出两个对于坐标轴散点的柱形统计图,判断能够通过同一个散点分布得到。
题解:因为没有散点在坐标轴的定义域外面,所以前缀和处理以后,开始端点 $b$ 处一定是 $0$ ,通过这个可以推断出所有前缀和位置的和。
判断是否有冲突,是否有靠后的位置小于前面(要保证非负)的即可。
Problem C
Upsolved by Xiejiadong. (-6)
题意:配置一个 mass 在 $[min,max]$ 范围内的东西,使得能够得到这类东西的数量最大。
题解:dp 显然 $f[i]=max(min(f[i-mx],c/x))$ 。
考虑把所有质量相同的东西压在一起处理,时间复杂度 $O(n^2logn)$ 。
被题意杀了。
Problem D
Unsolved. (-5)
Problem E
Unsolved.
Problem F
Unsolved.
Problem G
Solved by Weaver_zhu. 0:51 (+1)
Problem H
Solved by Kilo_5723. 4:13 (+)
Problem I
Unsolved.
Problem J
Unsolved.
Problem K
Solved by Kilo_5723. 0:51 (+)
Problem L
Unsolved.
Problem M
Unsolved.