Copy and complete the following Cayley table for the transformations of T₁, T₂, T₃, T₄, under the operation of composition of transformations.

Show that T₁, T₂, T₃, T₄ under the operation of composition of transformations form a group. Associativity may be assumed.

Show that this group is cyclic.

Write down the 2 × 2 matrices representing T₃, T₄ and T₅.

Find the 2 × 2 matrix representing T.

Give a geometric description of the transformation T.

      A2

[2 marks]

Note: Award A1 for 6, 7 or 8 correct.

the table is closed – no new elements      A1

T₁ is the identity      A1

T₃ (and T₁) are self-inverse; T₂ and T₄ are an inverse pair. Hence every element has an inverse      A1

hence it is a group      AG

[3 marks]

all elements in the group can be generated by T₂ (or T₄)       R1

hence the group is cyclic      AG

[1 mark]

T₃ is represented by \(\left( {\begin{array}{*{20}{c}}
{ - 1}&0 \\
0&{ - 1}
\end{array}} \right)\)      A1

T₄ is represented by \(\left( {\begin{array}{*{20}{c}}
0&{ - 1} \\
1&0
\end{array}} \right)\)      A1

T₅ is represented by \(\left( {\begin{array}{*{20}{c}}
1&0 \\
0&{ - 1}
\end{array}} \right)\)      A1

[3 marks]

\(\left( {\begin{array}{*{20}{c}}
0&{ - 1} \\
1&0
\end{array}} \right)\left( {\begin{array}{*{20}{c}}
1&0 \\
0&{ - 1}
\end{array}} \right)\left( {\begin{array}{*{20}{c}}
{ - 1}&0 \\
0&{ - 1}
\end{array}} \right) = \left( {\begin{array}{*{20}{c}}
0&{ - 1} \\
{ - 1}&0
\end{array}} \right)\)       (M1)A1

Note: Award M1A0 for multiplying the matrices in the wrong order.

[2 marks]

a reflection in the line \(y =  - x\)      A1

[1 mark]