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BRIDGE - Building Bridges |
The tribe soon discovers that just communication is not enough and wants to meet each other to form a joint force against the terminator. But there is a deep canyon that needs to crossed. Points have been identified on both sides on which bridge ends can be made. But before the construction could be started, a witch Chudael predicted that a bridge can only be built between corresponding end points, i.e. a bridge starting from the ith end point on one side can only end on the ith end point on the other side, where the position of end points is seen in the order in which the points were identified. If not, it would lead to the end of the tribe. The tribe just wants to make as many non-cutting bridges as possible, with the constraint in mind. Bridges "cut" if and only if they have exactly one common point that is not an end point.
Input
The first line of the input contains test cases t (1 ≤ t ≤ 50). It is followed by 3×t lines, 3 for each test case. The first line of input for each test case contains the number of end points identified on each side, n (1 ≤ n ≤ 103). The second line contains x-coordinates of end points identified on the first side and similarly the third line contains the x-coordinates of corresponding end points identified on the other side. The end points are inputted in the order in which they were identified. The x-coordinates can range between -103 to 103.
Output
You are required to output a single line for each test case. The line contains a single integer – the maximum number of bridges possible with the constraints explained above.
Example
Input: 3 4 2 5 8 10 6 4 1 2 3 5 3 10 6 4 1 6 1 2 3 4 5 6 3 4 5 6 1 2 Output: 2 2 4
Explanation
For the first test case, two non-overlapping bridges can be formed between the 3rd and 4th end points on each side.
Added by: | Troika::Bytes |
Date: | 2010-02-18 |
Time limit: | 1s |
Source limit: | 50000B |
Memory limit: | 1536MB |
Cluster: | Cube (Intel G860) |
Languages: | ADA95 DOC ASM32 ASM64 BASH BF C CSHARP C++ 4.3.2 CPP C99 CLPS LISP sbcl LISP clisp D ERL FORTRAN HASK ICON ICK JAVA JS-RHINO LUA NEM NICE OCAML PAS-GPC PAS-FPC PDF PERL PHP PIKE PS PRLG-swi PYTHON RUBY SCALA SCM guile SCM qobi ST TCL TEXT WHITESPACE |
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2022-12-06 10:42:56
vector<pair<ll,ll>> aa(n) giving runtime error. But if i not tack size n and push_back all element then it works. There is some compiler problem? |
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2021-05-25 14:06:34
1 3 1 1 2 1 1 1 for this test case and will be 3..... |
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2020-10-26 10:23:36
<snip> can anyone tell me the mistakle [NG]: Read the footer. Last edit: 2020-10-26 12:47:03 |
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2020-05-04 19:45:36
Can anyone explain why LIS is the solution of this problem... |
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2020-04-29 02:00:09
"cut" definition cost me 1 WA :/ |
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2019-12-29 20:05:54
java gives TLE for O(nlogn), and other are accepted with O(n^2)??wtf? |
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2019-08-19 15:48:29
14 First consider the pairs: (2,6), (5, 4), (8, 1), (10, 2), sort it according to the first element of the pairs (in this case are already sorted) and compute the list on the second element of the pairs, thus compute the LIS on 6 4 1 2, that is 1 2. Therefore the non overlapping lines you are looking for are (8, 1) and (10, 2). |
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2019-06-01 06:51:39
Use the concept of LIS with order of pairs in mind easy cake problem |
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2019-05-29 13:46:04
A simple problem made very difficult because of not having proper explanation Read Shashank Tiwari's comment Last edit: 2019-05-29 13:46:44 |
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2019-03-11 10:25:20
Finally got AC. Make sure to check if your answer works for multiple points on the same x coordinate. e.g. 1 1 2 1 1 1 Last edit: 2019-03-11 10:25:35 |