\displaystyle\frac{\sqrt{{3}}}{{2}} Explanation: Use the unit circle and trig table --> The co-terminal angle (reference angle) of \displaystyle{\left(-{240}^{\circ}\right)} is \displaystyle{\left({360}^{\circ}-{240}^{\circ}={120}^{\circ}\right)} ...

Your approach number 1 is correct. The reference angle should always be between your ray of interest and the x-axis. The reference angle for 210^\circ is 210^\circ-180^\circ=30^\circ. This is ...

We know that 60^\circ can be constructed and that 72^\circ can be constructed. By bisecting the 72^\circ, we get 36^\circ and by subtracting the 60^\circ by the 36^\circ, we get 24^\circ ...

First, the way many scientific calculators work is to calculate more digits than they show, and then they round the value before displaying it. This happens even if you calculate something like 1/7 \times 7 ...

\frac{\cos25^{\circ}-\sin5^{\circ}}{\sin25^{\circ}+\cos5^{\circ}}=\frac{\sin65^{\circ}-\sin5^{\circ}}{\sin25^{\circ}+\sin85^{\circ}}=\frac{2\sin30^{\circ}\cos35^{\circ}}{2\sin55^{\circ}\cos30^{\circ}}=\tan30^{\circ}=\frac{1}{\sqrt3}

Taking L.H.S. sin40°sin50° or sin50°sin40° We know the identity, sinAsinB=\dfrac{1}{2}\Big(cos(A-B)-cos(A+B)\Big) Here we consider A=50° and B=40° Then, sin50°sin40°=\dfrac{1}{2}\Big(cos(50°-40°)-cos(50°+40°)\Big) ...