Triangles $A$, $B$ and $C$ are displayed on the grid.
Triangle $A$ is positioned on the left, triangle $B$ is on the right and triangle $C$ lies near the centre-left. The axes are marked $x$ and $y$.
(a(i))[3]
Describe fully the single transformation that carries triangle $A$ to triangle $B$.
(a(ii))[3]
Describe fully the single transformation that carries triangle $A$ to triangle $C$.
(b(i))[2]
translate triangle $A$ by the vector $\begin{pmatrix}6\\-2\end{pmatrix}$.
(b(ii))[2]
reflect triangle $A$ in the line $y = 1$.
Worked solution & mark scheme
This 10-mark question has a full step-by-step worked solution and mark scheme. One marking point: “A rotation” …