(a)[2]
Triangle $A$ is moved onto triangle $P$ by the translation of $\begin{pmatrix}1 \\ -3\end{pmatrix}$. Draw triangle $P$.
(b)[3]
Describe fully the single transformation taking triangle $A$ onto triangle $B$.
(c)[3]
Transformation $M$ means reflection in the line $y = -1$. Transformation $R$ means a rotation $90^\circ$ clockwise about $(1, 1)$. $RM(B) = Q$. Draw triangle $Q$.