Find all the values of \(\theta\), in the range \(0^\circ < \theta < 180^\circ\), for which \(\cos\theta=\sin 4\theta\). Hence show that
\[
\sin 18^\circ = \frac14\left( \sqrt 5 -1\right).
\]
Given that
\[
4\sin^2 x + 1 = 4\sin^2 2x
\,,
\]
find all possible values of \(\sin x\,\), giving your answers in the form \(p+q\sqrt5\) where \(p\) and \(q\) are rational numbers.
Hence find two values of \(\alpha\) with \(0^\circ < \alpha < 90^\circ\) for which
\[
\sin^23\alpha + \sin^25\alpha = \sin^2 6\alpha\,.
\]
\(\,\) \begin{align*}
&& 4 \sin^2 x + 1 &= 4 \sin^2 2 x \\
&&&= 16 \sin^2 x \cos^2 x \\
&&&= 16 \sin^2 x (1- \sin^2 x) \\
\Rightarrow && 0 &= 16y^2 -12y+1 \\
\Rightarrow && \sin^2 x &= \frac{3\pm \sqrt5}{8} \\
&&&= \left ( \frac{1 \pm \sqrt5}{4} \right)^2 \\
\Rightarrow && \sin x &= \pm \frac{1 \pm \sqrt{5}}{4}
\end{align*}
\(\,\) \begin{align*}
&& \sin^2 x + \frac1{2^2} &= \sin^2 2x
\end{align*}
So if we can have \(\sin 5x = \pm \frac12\) and \(\sin 3x = \pm \frac{1 \pm \sqrt5}{4}\) then we are good, ie
\begin{align*}
&& 5x &= 30^{\circ}, 150^{\circ}, 210^{\circ}, 330^{\circ}, 390^{\circ}, \cdots \\
\Rightarrow && x &= 6^{\circ}, 30^{\circ}, 42^{\circ}, 66^{\circ}, 78^{\circ} \\
\Rightarrow && 3x &= \boxed{18^{\circ}}, \cancel{90^{\circ}}, \boxed{126^{\circ}}, \boxed{198^{\circ}}, \boxed{78^{\circ}}
\end{align*}
So our solutions are \(x = 6^{\circ}, 42^{\circ}, 66^{\circ}, 78^{\circ}\) although it's interesting to note that \(x = 45^{\circ}\) is another solution