I just asked a question which is related to this one, but the problem seems to be different. In this case, one has to show that $$z(t)=\frac{a+bt}{c+dt}$$
Describes a straight line or a circumference, given that $t$ takes every value in the extended real number line. That is, $\mathbb{R} \cup\{\pm\infty\}$. Also, $a,b,c,d\in\mathbb{C}$ and $ad-bc \neq 0$.
How can I prove this? I don't know how one can prove at the same time that $z(t)$ describes a circumference and/or a line. Do I need to prove each thing separately? Or is it that it only describes one of those things? Can someone point me in the right direction?