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INTERVAL - Intervals |
You are given n closed integer intervals [ai, bi] and n integers c1, ..., cn.
Task
Write a program that:
- reads the number of intervals, their endpoints and integers c1, ..., cn from the standard input,
- computes the minimal size of a set Z of integers which has at least ci common elements with interval [ai, bi], for each i = 1, 2, ..., n,
- writes the answer to the standard output.
Input
The input begins with the integer t, the number of test cases. Then t test cases follow.
For each test case the first line of the input contains an integer n (1 <= n <= 50000) - the number of intervals. The following n lines describe the intervals. Line (i+1) of the input contains three integers ai, bi and ci separated by single spaces and such that 0 < = ai < = bi <= 50000 and 1 < = ci < = bi -ai +1.
Output
For each test case the output contains exactly one integer equal to the minimal size of set Z sharing at least ci elements with interval [ai, bi], for each i= 1, 2, ..., n.
Example
Sample input: 1 5 3 7 3 8 10 3 6 8 1 1 3 1 10 11 1 Sample output: 6Warning: enormous Input/Output data, be careful with certain languages
Added by: | adrian |
Date: | 2004-07-07 |
Time limit: | 1.604s |
Source limit: | 50000B |
Memory limit: | 1536MB |
Cluster: | Cube (Intel G860) |
Languages: | All |
Resource: | ACM Central European Programming Contest, Warsaw 2002 |
hide comments
2014-04-15 08:47:33 Hussain Kara Fallah
see QUEST5 before solving this :D |
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2010-12-29 16:23:47 J
Maybe it needs lot of optimization. Mine gives TLE. |
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2009-06-15 09:11:42 Moshiur Rahman
Explanation of the sample input: A possible minimal set you can construct is: 3 6 7 8 9 10 Last edit: 2009-06-15 10:23:22 |
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2009-04-11 06:43:48 Gautam Verma
Better if the test case has been explained. |