The compiler should be warning you if you leave out the second clause, i.e. if your last match has a set of guards where the last one is not trivially true.
Generally testing guards for completeness is obviously not possible, as it would be as hard as solving the halting problem.
Answer to Matt's comment:
Look at the example:
foo a b
| a <= b = True
| a > b = False
A human can see that one of both guards must be true. But the compiler does not know that either a<=b or a>b.
Now look for another example:
fermat a b c n
| a^n + b^n /= c^n = ....
| n < 0 = undefined
| n < 3 = ....
To prove that the set of guards is complete, the compiler had to prove Fermats Last Theorem. It's impossible do do that in a compiler. Remember that the number and complexity of the guards is not limited. The compiler would have to be a general solver for mathematical problems, problems that are stated in Haskell itself.
More formally, in the easiest case:
f x | p x = y
the compiler must prove that if p x is not bottom, then p x is True for all possible x. In other words, it must prove that either p x is bottom (does not halt) no matter what x is or evaluates to True.