The difference is in the heuristic function.

Uniform-cost search is *uninformed* search: it doesn't use any domain knowledge. It expands the least cost node, and it does so in every direction because no information about the goal is provided. It can be viewed as a function `f(n) = g(n)`

where `g(n)`

is a path cost ("path cost" itself is a function that assigns a numeric cost to a path with respect to performance measure, e.g. distance in kilometers, or number of moves etc.). It simply is a cost to reach node *n*.

Best-first search is *informed* search: it uses a heuristic function to estimate how close the current state is to the goal (are we getting close to the goal?). Hence our cost function `f(n) = g(n)`

is combined with the cost to get from n to the goal, the `h(n)`

(heuristic function that estimates that cost) giving us `f(n) = g(n) + h(n)`

. An example of a best-first search algorithm is **A*** algorithm.

Yes, both methods have a list of expanded nodes, but **best-first search will try to minimize that number of expanded nodes** (path cost + heuristic function).