Today in an exam I was given a algorithmic problem where I was given the size N*M of a chessboard, and I should determine what is the smallest possible number of moves that a knight can do from the bottom left edge of the chessboard to go to the up right edge. How can that be done?

Here is the efficient solution. First, special cases. If Now the general case. A knight has 8 possible jumps, it goes 2 in one direction, and then 1 in another. The possible directions are
And the number of jumps is:
We expect the number of jumps to be as low as possible. Intuitively if we have a set of numbers that satisfies the top two equations, and we've made the number of jumps low, we shouldn't have much trouble in finding an order to put the jumps which stays inside of the box. I won't prove it, but this turns out to be true if Thus solve this integer programming problem (solve those two equations keeping the number of jumps as low as possible) and we have our answer. There are solvers for this, but this particular problem is very simple. We just do the "obvious thing" to get close to our target, figure out a couple of extra jumps, and it is not hard to prove that this is an optimal solution to the integer equations, and therefore must be the answer to the chess problem. So what is the obvious thing? First, if If you land directly on the target, you have your best possible answer. If you went along the wall and missed by 1, it turns out that by converting one of your jumps into a pair you wind up where you need to be. If you went along the wall and missed by 2 (ie you're one diagonal) then you need to insert 2 jumps. (Distance shows you that you need at least one more, and a simple parity argument shows that you need at least 2, and a pair of jumps will do it.) If you went along the diagonal and missed by 1, insert one pair of jumps and you're good. If you went along the diagonal and missed by 2, then convert a upright/rightup pair into rightup/rightup/upleft/leftup and you can do it with just 2 more jumps. If you did not travel along the diagonal but had a upleft, convert that into a rightup/upleft/rightup triplet and again you can do it with just 2 more jumps. The remaining special case is a 3x3 board, which takes 4 jumps. (I leave it to you to figure out all of the appropriate inequalities and modulos that picture works out to.) 


You could simulate the knight's move using BFS or DFS. Personally I prefer the DFS approach, as it can be implemended recursively. If you have a function
When you reach your destination, you return the current value of count. EDIT: it can also be solved using dynamic programming. You define



A solution using BFS and memoization:
The minimum number of jumps for each square will be accesible in UPDATE Notice that if the matrix is square 


I believe you can reduce this down to three cases:
If you have a board larger than these, you can reduce it to one of them by setting the endpoint of one move as the starting point of a larger board. Example: a board of size 4w * 5h:
where s is start and e is end. From there, reduce it to a square board:
Where it takes 4 moves to reach the end. So you have 1 + 4 moves = 5 for this size. I hope that is enough to get you started. EDIT: This doesn't seem to be perfect as is. However, it demonstrates a heuristic way to solve this problem. Here is another case for your viewing pleasure:
that has 4 moves until the end in a 4x8 board. Via a programming lanugage, this might be better solved by starting out by mapping all possible moves from your current location and seeing if they match the end point. If they don't, check to see if your problem is now a simpler one that you have solved before. This is accomplished via memoization, as a commenter pointed out. If you are doing this by hand, however, I bet you can solve it by isolating it into a small number of cases as I have begun to do. 

