
residually finite proof
Let $\displaystyle A$ be a polycyclicbyfinite group.
$\displaystyle \langle a \rangle, \langle b \rangle \in center(A)$.
Also, $\displaystyle \langle a \rangle / (N \cap \langle a \rangle)$ is finite.
how to show that $\displaystyle A/(N\cap \langle a \rangle)$ is residually finite???
Is polycyclicbyfinite group finitely generated? If yes, then the proof just walks out.
Can I claim that $\displaystyle \langle a \rangle$ is polycyclic and imply 3rd isomorpism theorem?
any other way to prove this problem?