Обсуждение @ 1705. Зайцы-бандиты @ Timus Online Judge

[n/m]==[n/(m+1)]

Послано Wang Jia 11 апр 2009 21:59

maybe the problem can be abstracted as the following one:

n,m are integers, n given, find the smallest m such that [n/m]==[n/(m+1)] holds, where [] denotes the floor() function.

well, anyone has any ideas?

Re: [n/m]==[n/(m+1)]

Послано NickSergeev[MSU MindCraft] 2 авг 2009 18:21

Yes, it's redefinition of problem.

Re: [n/m]==[n/(m+1)]

Послано Wang Jia 22 авг 2009 13:38

but how can i find such an m? a binary search does seems not to work...

Re: [n/m]==[n/(m+1)]

Послано Fly [Yaroslavl_SU] 25 ноя 2009 02:21

The binary search works. But it isn't a binary search by the answer. ;)

Re: [n/m]==[n/(m+1)]

Послано Tolstobrov Anatoliy[Ivanovo SPU] 29 дек 2014 20:39

I use binary search of answer in range Sqrt(n) and Sqrt(n) + Sqrt(Sqrt(n))

Обсуждение задачи 1705. Зайцы-бандиты