시간 제한 | 메모리 제한 | 제출 | 정답 | 맞힌 사람 | 정답 비율 |
---|---|---|---|---|---|
2 초 | 512 MB | 538 | 182 | 130 | 33.333% |
Farmer John wants to divide his $N$ cows $(N \leq 7500)$, conveniently numbered $1 \ldots N$, into $K$ non-empty groups ($2 \leq K \leq N$) such that no two cows from two different groups can interact with each other without walking some number of miles. Cow $x$ and Cow $y$ (where $1 \leq x < y \leq N$) are willing to walk $(2019201913x + 2019201949y)\text{ mod } 2019201997$ miles to see each other.
Given a division of the $N$ cows into $K$ non-empty groups, let $M$ be the minimum of the number of miles any two cows in two different groups are willing to walk to see each other. To test the cows' devotion to each other, Farmer John wants to optimally divide the $N$ cows into $K$ groups such that $M$ is as large as possible.
The input is just one line, containing $N$ and $K$, separated by a space.
Print out $M$ in an optimal solution.
3 2
2019201769
In this example, Cow 1 and Cow 2 are willing to walk 2019201817 miles to see each other. Cow 2 and Cow 3 are willing to walk 2019201685 miles. And Cow 1 and Cow 3 are willing to walk 2019201769 miles. Thus, by grouping the cows such that 1 is by herself and 2 and 3 are grouped together, $M = \min(2019201817,2019201769) = 2019201769$ (which is the best we can do here).