A problem is NP-complete if

- it's in NP, and
- every problem in NP is polynomial-time reducible to it.

This means that if you take any two NP-complete problems, you're guaranteed that they're polynomial-time reducible to one another, even if you don't know precisely what that reduction is going to look like.

You asked why you get to pick which NP-complete problem to use as the source of a reduction when proving NP-completeness. The reason is that once you've shown that some NP-complete problem A reduces to an NP problem B, you can conclude that *every* NP-complete problem C reduces to B, since C reduces to A and A reduces to B. In other words, if you prove that a problem is NP-complete by reducing any known NP-complete problem to it, you could have in principle reduced *every* NP-complete problem to it. You're just keeping things easy by reducing from a problem that makes the reduction easiest to do.

It can be pretty tough in practice to do a reduction if you pick the wrong NP-complete language as your source. To get a sense of why this is, think about how the proof of Cook-Levin theorem (that SAT is NP-complete) works. To show that you can reduce any NP problem to SAT, you start with a polynomial-time, nondeterministic Turing machine for that problem, then use that to construct a massive propositional formula that basically says "there is some computation of this TM that accepts its input string." This is great in theory, but in practice this is a horrid reduction that would be almost utterly incomprehensible to anyone who looked at it. Any time you're proving NP-completeness of a problem by doing a reduction from a known NP-complete problem, think of it as finding a shortcut to skip a really tough proof - if you can find something nice and simple, you're skipping a behemoth of a reduction.