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a grid of NxN is given. each point is assigned a value say num starting from 1,1 we have to traverse to N,N. if i,j is current position we can go right or down. How to find the min sum of digits by traversing from 1,1 to n,n along any path any two points can have same number ex 1 2 3 4 5 6 7 8 9 1+2+3+6+9 = 21 n <=10000000000 Output 21 Can someone explain how to approach the problem? |
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This is a dynamic programming problem. The subproblem here is the minimum cost/path to get to any given square. Because you can only move down and to the right, there are only two squares that can let you enter a given square, the one above and the one to the left. Therefore the cost of getting to a square (i,i) is |
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You can convert the grid into a graph. The edges get the weights of the values from your grid elements. Then you can find the solution with the shortest path problem. |
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Here is my solution with dynamic - programming in you start with (1,1) so you can find say a = (1,2) and b = (2,1) by a = value(1,1) + value(1,2). Then, to find (2,2) select the minimum Given Matrix Shortest path : so to find (2,2) take the original value(2,2)=5 from Given Matrix and select m Shortest path : so to find (3,2) select Shortest path : so the last one Shortest path : from (1,1) to any point (i, j) |
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Read about dynamic programming and go from there. |
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Attempt: Start with the first row and calculate the cumulative values and store them. I claim this algorithm is O(n) since if you use a 2 dimensional array you only need to access all fields at most twice (read from top, left) for read and once for write. |
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If you want to go really fancy or have to operate on massive matrices, A* could also be an option. |
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Can someone write a programpart of your question. – Abe Miessler Jan 13 '11 at 21:00