Write down the value of \(r\).

Find \(p\).

Find \(q\).

Solve \(f(x) = 7\).

\(r =  - 4\)     A2     N2

Note: Award A1 for \(r = 4\).

[2 marks]

evidence of valid approach     (M1)

eg     \(\frac{{\max y{\text{ value -- }}y{\text{ value}}}}{2}\), distance from \(y = 10\)

\(p = 8\)     A1     N2

[2 marks]

valid approach     (M1)

eg     period is \(24\), \(\frac{{360}}{{24}}\), substitute a point into their \(f(x)\)

\(q = \frac{{2\pi }}{{24}}\left( {\frac{\pi }{{12}},{\text{ exact}}} \right)\), \(0.262\) (do not accept degrees)     A1     N2

[2 marks]

valid approach     (M1)

eg     line on graph at \(y = 7,{\text{ }}8\cos \left( {\frac{{2\pi }}{{24}}(x - 4)} \right) + 10 = 7\)

\(x = 11.46828\)

\(x = 11.5\)   (accept \((11.5, 7)\))     A1     N2

[2 marks]

Note: Do not award the final A1 if additional values are given. If an incorrect value of \(q\) leads to multiple solutions, award the final A1 only if all solutions within the domain are given.