# Why A* is faster if i use 4xManhattan Distances as Heuristic for 15-Puzzle

I have implemented an A* algorithm for solving the 15-puzzle. I made a research for finding some viable or admissible heuristics, looking for a fast solution, and i find that using 4*Manhattan Distance as heuristic always solve any 15-puzzle in less than a second. I tried this and effectively works. I tried to find a answer for that but i cant find it.

Any one can explain this?

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Did you change the cost function as well? –  larsmans Oct 25 '12 at 18:55
I suggest you name the other heuristics you tried –  Qnan Oct 25 '12 at 19:04

4* manhattan distance is not admissible heuristic, this makes the algorithm behave "closer" to greedy best first (where the algorithm chooses which node to develop solely based on the heuristic function). This makes the algorithm sometimes prefer depth of solutions and exploration over breadth and optimality.

The idea is similar to what happens in A*-Epsilon, where you allow A* to develop none optimal nodes up to a certain bound in order to speed up your algorithm, Actually - I suspect you will get the same (or similar results) if you run A*-Epsilon with Manhattan distance and `epsilon = 3`. (If I am correct, this makes the solution you find in the modified heuristic bounded by `4*OPTIMAL`, where OPTIMAL is the length of the optimal path)

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Yes this is not an admissible heuristic. I have also another question, i tried this heuristic (4*MD) in other puzzles (6x6 puzzles or 5x5 puzzles) and do not works similar, this means i need to find an epsilon for each particular puzzles? There is also a faster heuristic that also be admissible? –  Raul Otaño Oct 25 '12 at 20:06
@RaulOtaño: The fastest admissible heuristic is `h*(v)` - which predicts exactly what is the cost to the target, however -if you had it - you wouldn't need A*, greedy best first on the heuristic would give you the shortest path easily! –  amit Oct 25 '12 at 22:12