Imagine you are a football team-coach. There are 11 players and 11 different positions in the field in which players play. Each player is capable of playing at all 11 different positions with a certain rating at the specified position.

You being the coach of the team have to decide the strongest possible LINEUP for the team (consisting of all 11 players) such that overall rating (i.e, sum of ratings) is maximized. No two players can play at the same position.

As an example, consider a smaller LINEUP problem in which only 3 players play a certain game.

```
3 2 1
4 1 5
6 7 3
```

Player 1 can play at position 1 with rating 3, at position 2 with rating 2 and at position 3 with rating 1. Similarly for all the players the ith column represents their rating at ith position. The best LINEUP will be when player 1 plays at position 1, player 2 at position 3 and player 3 at position 2, resulting in maximum rating = 15 (3 + 5 + 7).

So, how can this problem be solved by Dynamic Programming? I have read on forums someone solving this problem by DP but I am unable to figure out how the problem possesses Optimal Substructure. So please help me figure out that....

Plz also mention that is it possible or not to solve the problem by DP

And please edit the title appropriately...