\displaystyle{38}^{\circ}{17}+{k}{360}^{\circ} \displaystyle{141}^{\circ}{83}+{k}{360}^{\circ} Explanation: \displaystyle{{\sin}^{{2}}{t}}+{\sin{{t}}}-{1}={0} Solve this quadratic ...

The solutions are \displaystyle{S}={\left\lbrace{30}º,{150}º,{270}º\right\rbrace} Explanation: The equation is \displaystyle{2}{{\sin}^{{2}}\theta}+{\sin{\theta}}-{1}={0} We can factorise ...

\displaystyle\theta\in{\left\lbrace{0},{2.730},{3.146},{5.872}\right\rbrace} (to 3 decimal places) Explanation: Given \displaystyle{\left(\text{XXX}\right)}{5}{{\sin}^{{2}}{\left(\theta\right)}}+{2}{\sin{{\left(\theta\right)}}}={0} ...

The solutions are \displaystyle{S}={\left\lbrace{14.1}^{\circ},{165.9}^{\circ},{245.6}^{\circ},{294.4}^{\circ}\right\rbrace} Explanation: The equation is \displaystyle{9}{{\sin}^{{2}}\theta}+{6}{\sin{\theta}}={2} ...

\displaystyle{0},\frac{\pi}{{2}},\pi,{2}\pi Explanation: \displaystyle{{\sin}^{{2}}{t}}-{\sin{{t}}}={0} \displaystyle{\sin{{t}}}{\left({\sin{{t}}}-{1}\right)}={0} Use unit circle ...

\displaystyle\theta={n}\cdot\pi or \displaystyle\theta=\frac{\pi}{{6}}+{n}\cdot{2}\pi or \displaystyle\theta=\frac{{{5}\pi}}{{6}}+{n}\cdot{2}\pi \displaystyle{\left(\text{XXXXXXXXXXXXXXXX}\right)}{n}\in\mathbb{Z} ...