I am trying to come up with the solution for a problem analogous to the following:
- Let M be a matrix of n rows and T columns.
- Let each row have positive non-decreasing values. (e.g. row = [1, 2, 30, 30, 35])
- Let M[i][j] correspond to the score obtained by spending j units of time on exam i.
Using dynamic programming, solve the problem as to find the optimal way of spending T units of time to study which will yield the highest total score.
Thanks in advance for any help :)
S = 0 for i = 1:n for j = 0:T max = 0 for k = 0:j Grade = G[i][j]+ S[i-1][T-k] if Grade > max max = Grade end for S[i][j] = max end for end for