Hint 1+\cos(a) = 2 \, \cos²\left(\frac{a}{2}\right) \Rightarrow \\ 2+2\cos(a) = 4 \, \cos²\left(\frac{a}{2}\right) \Rightarrow \\ \sqrt{2+ 2\cos(a)} =2 \cos(\frac{a}{2}) This means that if you ...

\displaystyle{3}\sqrt{{{1}-{{\sin}^{{2}}{\left(\theta\right)}}}} Explanation: We know that \displaystyle{{\cos}^{{2}}{\left(\theta\right)}}+{{\sin}^{{2}}{\left(\theta\right)}}={1} . So \displaystyle{{\cos}^{{2}}{\left(\theta\right)}}={1}-{{\sin}^{{2}}{\left(\theta\right)}} ...

\displaystyle=\frac{{7}}{{\cos{\theta}}} Explanation: \displaystyle{7}{\cos{\theta}}={7}\cdot\frac{{1}}{{\sec{\theta}}}=\frac{{7}}{{\sec{\theta}}}

Double angle formula : \cos(2\theta)=\cos^2\theta-\sin^2\theta=0.

Use the binomial theorem for (x+i y)^4: \begin{align}(x+i y)^4 &= x^4 + 4 i x^3 y +6 i^2 x^2 y^2+4 i^3 x y^3 + i^4 y^4\\&= x^4-6 x^2 y^2 + y^4 + i (4 x^3 y - 4 x y^3) \end{align} using i^2=-1 ...

\cos(-1710^{\circ})=\cos(1710^{\circ}) \because \cos (-x)=\cos(x) \cos(1710^{\circ})=\cos(1800^{\circ}-90^{\circ}) \cos(1710^{\circ})=\cos(360^{\circ}\cdot5-90^{\circ}) \cos(1710^{\circ})=\cos(-90^{\circ})\because \cos(360^{\circ}\cdot n\pm x)=\cos(\pm x) ...