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rod curring
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rod curring
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// A Naive recursive solution for Rod cutting problem
#include<stdio.h>
#include<limits.h>
// A utility function to get the maximum of two integers
int max(int a, int b) { return (a > b)? a : b;}
/* Returns the best obtainable price for a rod of length n and
price[] as prices of different pieces */
int cutRod(int price[], int n)
{
if (n <= 0)
return 0;
int max_val = INT_MIN;
// Recursively cut the rod in different pieces and compare different
// configurations
for (int i = 0; i<n; i++)
max_val = max(max_val, price[i] + cutRod(price, n-i-1));
return max_val;
}
/* Driver program to test above functions */
int main()
{
int arr[] = {1, 5, 8, 9, 10, 17, 17, 20};
int size = sizeof(arr)/sizeof(arr[0]);
printf("Maximum Obtainable Value is %dn", cutRod(arr, size));
getchar();
return 0;
}
Run on IDE
Output:
Maximum Obtainable Value is 22
Considering the above implementation, following is recursion tree for a Rod of length 4.
cR() ---> cutRod()
cR(4)
/ /
/ /
cR(3) cR(2) cR(1) cR(0)
/ | / |
/ | / |
cR(2) cR(1) cR(0) cR(1) cR(0) cR(0)
/ | |
/ | |
cR(1) cR(0) cR(0) cR(0)
/
/
CR(0)
In the above partial recursion tree, cR(2) is being solved twice. We can see that there are many subproblems which are solved again and again. Since same suproblems are called again, this problem has Overlapping Subprolems property. So the Rod Cutting problem has both properties (see this and this) of a dynamic programming problem. Like other typical Dynamic Programming(DP) problems, recomputations of same subproblems can be avoided by constructing a temporary array val[] in bottom up manner.
// A Dynamic Programming solution for Rod cutting problem
#include<stdio.h>
#include<limits.h>
// A utility function to get the maximum of two integers
int max(int a, int b) { return (a > b)? a : b;}
/* Returns the best obtainable price for a rod of length n and
price[] as prices of different pieces */
int cutRod(int price[], int n)
{
int val[n+1];
val[0] = 0;
int i, j;
// Build the table val[] in bottom up manner and return the last entry
// from the table
for (i = 1; i<=n; i++)
{
int max_val = INT_MIN;
for (j = 0; j < i; j++)
max_val = max(max_val, price[j] + val[i-j-1]);
val[i] = max_val;
}
return val[n];
}
/* Driver program to test above functions */
int main()
{
int arr[] = {1, 5, 8, 9, 10, 17, 17, 20};
int size = sizeof(arr)/sizeof(arr[0]);
printf("Maximum Obtainable Value is %dn", cutRod(arr, size));
getchar();
return 0;
}