BYTESM2 - Philosophers Stone

One of the secret chambers in Hogwarts is full of philosopher’s stones. The floor of the chamber is covered by h × w square tiles, where there are h rows of tiles from front (first row) to back (last row) and w columns of tiles from left to right. Each tile has 1 to 100 stones on it. Harry has to grab as many philosopher’s stones as possible, subject to the following restrictions:

  • He starts by choosing any tile in the first row, and collects the philosopher’s stones on that tile. Then, he moves to a tile in the next row, collects the philosopher’s stones on the tile, and so on until he reaches the last row.
  • When he moves from one tile to a tile in the next row, he can only move to the tile just below it or diagonally to the left or right.
Given the values of h and w, and the number of philosopher’s stones on each tile, write a program to compute the maximum possible number of philosopher’s stones Harry can grab in one single trip from the first row to the last row.

Input

The first line consists of a single integer T, the number of test cases. In each of the test cases, the first line has two integers. The first integer h (1 <= h <= 100) is the number of rows of tiles on the floor. The second integer w (1 <= w <= 100) is the number of columns of tiles on the floor. Next, there are h lines of inputs. The i-th line of these, specifies the number of philosopher’s stones in each tile of the i-th row from the front. Each line has w integers, where each integer m (0 <= m <= 100) is the number of philosopher’s stones on that tile. The integers are separated by a space character.

Output

The output should consist of T lines, (1 <= T <= 100), one for each test case. Each line consists of a single integer, which is the maximum possible number of philosopher’s stones Harry can grab, in one single trip from the first row to the last row for the corresponding test case.

Example

Input:
1
6 5
3 1 7 4 2
2 1 3 1 1
1 2 2 1 8
2 2 1 5 3
2 1 4 4 4
5 2 7 5 1

Output:
32 	

//7+1+8+5+4+7=32

Added by:Paritosh Aggarwal
Date:2009-02-21
Time limit:1s
Source limit:50000B
Memory limit:1536MB
Cluster: Cube (Intel G860)
Languages:ADA95 ASM32 BASH BF C CSHARP CPP C99 CLPS LISP sbcl LISP clisp D FORTRAN HASK ICON ICK JAVA LUA NEM NICE OCAML PAS-GPC PAS-FPC PERL PHP PIKE PRLG-swi PYTHON RUBY SCM guile SCM qobi ST TEXT WHITESPACE

hide comments
2014-09-20 14:13:18 Deepanker Aggarwal
Someone, please enable c++4.3.2 . I don't think it changes the complexity of the question
2014-09-19 11:29:21 Sumit Gulati
nice question of dp for practise :)
2014-09-17 23:06:50 Rajat (1307086)
need to practice more DP.
2014-09-17 20:58:15 shade_1
easy problm...should be moved to tutorial section
2014-09-16 23:16:13 Ruffneck
this question cleared my concepts on DP. easy, but awesome.
2014-09-05 13:31:10 Gaurav Ahirwar
AC! in one go! :D .. Finally improving my programming!
2014-08-06 22:19:15 Pratik Nagelia
AC in one go... :)B)..!
Can be done easily using bottom up approach ..!

Last edit: 2014-08-15 18:53:07
2014-07-20 11:21:04 Darren Sun
The actual test cases do not ensure w integers in each line. This creates unnecessary troubles for problem solvers using languages like Java.
2014-07-15 10:53:40 Ravichandra Enaganti
Until solving this problem, I was afraid of DP. This gave me a confidence that I can solve a DP problem.
2014-07-15 08:06:52 The Exorcist
recursion + memoization == TLE ...??
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