# minimal cost sum

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i want to to calculate minimum sum in given two dimensional array

``````#include<iostream>
#include<limits.h>
using namespace std;
#define R 3
#define C 3
int Min(int x,int y,int z){
if(x<y){
return (x<z)?x:z;
}
else
return (y<z)?y:z;
}
int mincost(int cost[R][C],int m,int n){

int i,j;
int t[R][C];
t[0][0]=cost[0][0];
for(i=1;i<=m;i++)
t[i][0]=t[i-1][0]+cost[i][0];
for(j=1;j<=n;j++)
t[0][j]=t[0][j-1]+cost[0][j];
for(i=1;i<=m;i++){
for(j=1;j<=n;j++){
t[i][j]=Min(t[i-1][j-1],t[i-1][j],t[i][j-1]+cost[i][j]);
}
}
return t[m][n];

}

int main(){

int cost[R][C]={{1,2,3},
{4,8,2},
{1,5,3}};
cout<<mincost(cost,2,2)<<endl;

return 0;
}
``````

from starting point (0,0) to some point (m,n) for this array it equals 8,but output shows me 1,why?what is wrong with this code? algorithm in words

Given a cost matrix cost[][] and a position (m, n) in cost[][], write a function that returns cost of minimum cost path to reach (m, n) from (0, 0). Each cell of the matrix represents a cost to traverse through that cell. Total cost of a path to reach (m, n) is sum of all the costs on that path (including both source and destination). You can only traverse down, right and diagonally lower cells from a given cell, i.e., from a given cell (i, j), cells (i+1, j), (i, j+1) and (i+1, j+1) can be traversed. You may assume that all costs are positive integers.

-
Can you describe your algorithm in words? That would be appropriate for a comment block in your code. – Greg Hewgill Nov 2 '11 at 18:36
I can't think of any way to interpret that where the result is 8, except for finding the maximum element :( – Mooing Duck Nov 2 '11 at 18:48
The description you added was not a description of your algorithm, but rather a description of the problem statement. – Greg Hewgill Nov 2 '11 at 19:00
yes but ,here is hint for algorithm,so what is problem about my problem definitions? it is dynamic implementation of code – dato Nov 2 '11 at 19:04

I see that this is a dynamic programming solution.

you have a typo here:

``````t[i][j]=Min(t[i-1][j-1],t[i-1][j],t[i][j-1]+cost[i][j]);
``````

it should be:

``````t[i][j]=Min(t[i-1][j-1],t[i-1][j],t[i][j-1]) + cost[i][j];
``````

basically it worked like `t[i][j] = t[i-1][j-1]`.

Note: A good way to debug these problems is to print the intermediate matrix (here: `t`).

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 it is great helping,thanks a lot – dato Nov 2 '11 at 18:58
``````Min(t[i-1][j-1],t[i-1][j],t[i][j-1]+cost[i][j])
``````

should probably be

``````Min(t[i-1][j-1],t[i-1][j],t[i][j-1]) +cost[i][j]
``````

Just guessing, it's hard to read your intent, but looks like a pathfinding algorithm. Your code wasn't adding the cost properly to diagonal or horizontal movement, and since the cost of the beginning was one, that was also your result. This should return a cost of eleven for your sample.

-

Given that t[0][0] = cost[0][0] = 1 then

``````for(i=1;i<=m;i++){
for(j=1;j<=n;j++){
t[i][j]=Min(t[i-1][j-1],t[i-1][j],t[i][j-1]+cost[i][j]);
}
``````

for i=1, j=1

``````t[1][1] = Min(t[0][0], t[0][1], t[1][0]+cost[1][1]) = Min(1, ...) = 1
``````

for i=2 j=2

``````t[2][2] = Min(t[1][1], t[1][2], t[2][1]+cost[2][2]) = Min(1, ...) = 1
``````
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