Practice is really the only way, but it can helped along by *reading* proofs as well. I won't touch on practice because the other answerers have covered everything that I can think of, so I'll just talk about what I mean by reading.

Textbooks are very fond of writing out the "important" proofs. Its very nice, because they often prove very powerful statements, and are really fancy. But just as you shouldn't learn to be a world-class gymnast from day 1 by emulating an Olympian (as in, you'll probably break your spine), you shouldn't read any really big proofs (at first). What I found was helpful was reading smaller proofs, usually from returned homework (I assume you're a student) or occasionally a textbook that wisens up.

The *reason why* I think reading proofs is helpful is because there are a small set of "tricks" or "ideas" that constitute huge chunks of schoolwork proofs, and even more advanced ones. Data structure qualities and recurrence relations usually involve thinking related to **proof by induction**, proofs involving computability with finite state machines sometimes use the **pigeonhole principle**, and more rarely the idea of **diagonalization** (very infrequent, don't worry about it). And of course, just about every other proof uses **proof by contradiction**. I'm sure there are other handy tools that have slipped my mind, but I hope you get the idea.

Figuring out when, how, and why you'd approach a problem with one particular method or another is what takes practice and experience. I suggest reading proofs in addition to practice because it can often show you creative ways of using a proving method you've already encountered.

As a final note, try to remember when you first learned to program. How did you get better? Proving things and programming things are not too dissimilar, in my opinion. :)