In your specific case you get either \sin\alpha = \frac{1}{2}\text{ and } \cos\alpha=-\frac{\sqrt{3}}{2}\text{ for } r=2 or \sin\alpha = -\frac{1}{2}\text{ and } \cos\alpha=\frac{\sqrt{3}}{2}\text{ for } r=-2 ...

Finally solved the problem! for shortness, let's set 2\cos18=x. From the inequalities a\le2b and 2\cos(18)b\le a, we see the trivial inequalities: a^5\ge(xb)^5,a^4\ge(xb)^4, -a^3\ge-8b^3,-a^2\ge-4b^2,a\ge xb ...

36\sin(1.5t) - 15\cos(1.5t) = k\cos\alpha\sin 1.5 t - k\sin\alpha\cos 1.5t k\cos \alpha = 36 k\sin \alpha = -15 This is incorrect. We have -k\sin\alpha=-15\quad\Rightarrow\quad k\sin\alpha=\color{red}{+}15 ...

The addition theorem is \sin ( x \pm y ) = \sin x \; \cos y \pm \cos x \; \sin y \quad (*) which is a shorthand notation for the two variants \sin ( x + y ) = \sin x \; \cos y + \cos x \; \sin y \quad (**) \\ \sin ( x - y ) = \sin x \; \cos y - \cos x \; \sin y \quad (***) ...

k\sin\alpha = 6, or is it k\sin\alpha = -6? It is the latter. So, having \tan\alpha=-6/8=-3/4 gives \alpha=\arctan(-3/4)\approx -36.9^\circ. Hence, for n\in\mathbb Z, \begin{align}10\cos(x-(-36.9^\circ))=5&\Rightarrow \cos(x+36.9^\circ)=1/2\\&\Rightarrow x+36.9^\circ=\pm 60^\circ+360^\circ n\\&\Rightarrow x=-36.9^\circ\pm 60^\circ+360^\circ n\\&\Rightarrow x=23.1^\circ,\quad 263.1^\circ\end{align} ...

No, you need to argue that |f'(x)|<1 for all x in [2,3]. But that is a straightforward result from trigonometry in this case.