Some standard examples on various quals seems to be computing units/class numbers etc. of the ring $\mathbb{Q}(\alpha)$, where $\alpha$ is a root of either $X^3+aX+b$ or $X^5+aX+b$.
My questions is the following: What are some standard tricks that can be used to deduce that a particular unit is actually a fundamental unit?
I'm familiar with class field theory and L-series, so I don't mind higher-level methods. I'm sort of trying to figure out what's usable during an exam. Books on number theoretic algorithms only cover pretty general cases and these algorithms are too computationally intensive to be done manually.