# scaling factor for the cost distance between nodes in A* algorithm

I have a set data which is a collection of node - node - associated cost. This cost is represented as a distance in feet.

I also have a x-y-coordinate for each node. Now in the A* algorithm I will need to add the cost from node to node + the heuristic cost from the middle node to the destination. However, these two values needs to be having the same metric/unit. I can't have one in feet and the other one in coordinate distance.

I know that in order to do this I first need to find a scaling factor, to scale the cost from feet to x-y-coordinate distance. Right? All I can say is that all this cost is scalable. So this beta value will be the same for all pair of node-node.. Question is how do I find this value?

What I've done right now is to find the coordinate distance between node - node and then from that compare with the cost in feet. And I can therefore find a beta, which is a constant and should work for every node-node-cost (feet)... I am not sure if this is true though. I am not looking for a magic trick here, just a simple way/math to solve this

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That is, if the distance between node1 and node2 is, say, 3 feet, and the nodes' coordinates are `[0,0]` and `[0,9]` respectively, then the "scaling factor" is 3/9 ... or 9/3, depending on which way you want to do the conversion.