The main idea of the proof is that when A* finds a path, it has a found a path that has an estimate lower then the estimate of any other possible paths. Since the the estimates are optimistic, the other paths can be safely ignored. Also, A* is only optimal if two conditions are met:
1. The heuristic is admissible, as in, it will never over-estimate the cost.
2. The heuristic is monotonic, meaning, if H(1) < H(2) then RealCost(1) < RealCost(2).
You can prove the optimality to be correct by assuming the opposite, and expanding the implications.
Assume that the path give by A* is not optimal with an admissible and monotonic heuristic, and think about what that means in terms of implications (you'll soon find yourself reaching a contradiction), and thus, your original assumption is reduced to absurd.
From that you can conclude that your original assumption was false, that is, A* is optimal with the above conditions. Q.E.D. ;)
Hope this gets you on the right track.