(a(i))[1]
Give the coordinates of point $A$.
(a(ii))[1]
Plot point $B$ at $(-1, 3)$ on the grid.
(a(iii))[1]
Mark a point $C$ on the grid so that triangle $ABC$ is isosceles.
(b(i))[1]
State the order of rotational symmetry.
(b(ii))[2]
Draw every line of symmetry on the diagram.
(c(i))[3]
Describe the single transformation that takes triangle $A$ to triangle $B$.
(c(ii))[3]
Describe the single transformation that maps triangle $A$ onto triangle $C$.
(c(iii)(a))[2]
Draw the image of triangle $A$ after translating by the vector $\begin{pmatrix}-5\\3\end{pmatrix}$.
(c(iii)(b))[2]
Draw the image of triangle $A$ after reflecting in the line $y = -2$.