\displaystyle{\sin{{\left({{\cos}^{{-{1}}}{\left(\frac{{5}}{{13}}\right)}}+{{\tan}^{{-{1}}}{\left(\frac{{3}}{{4}}\right)}}\right)}}}=\frac{{63}}{{65}} Explanation: Let \displaystyle{{\cos}^{{-{1}}}{\left(\frac{{5}}{{13}}\right)}}={x} ...

You can do this: Apply the formula \sin(A-B)=\sin A \cos B-\cos A \sin B: \sin\left[\cos^{-1}\left(\frac{3}{4}\right) - \tan^{-1}\left(\frac{1}{3}\right)\right]=\sin\left[\cos^{-1}\left(\frac{3}{4}\right)\right]\cos\left[\tan^{-1}\left(\frac{3}{4}\right)\right]-\frac{3}{4}\sin\left[\tan^{-1}\left(\frac{3}{4}\right)\right] ...

\displaystyle{\sin{{\left({{\cos}^{{-{1}}}{\left(\frac{{3}}{{4}}\right)}}-{{\tan}^{{-{1}}}{\left(\frac{{1}}{{4}}\right)}}\right)}}}=\frac{{{4}\sqrt{{7}}-{3}}}{{{4}\sqrt{{17}}}} Explanation: Let ...

\displaystyle{\tan{{\left({{\sin}^{{-{{1}}}}{\left(\frac{{4}}{{5}}\right)}}-{{\cos}^{{-{{1}}}}{\left(\frac{{5}}{{13}}\right)}}\right)}}}=-\frac{{16}}{{63}} Explanation: Note : \displaystyle{\left({\left({A}\right)}{{\tan}^{{-{{1}}}}{x}}-{{\tan}^{{-{{1}}}}{y}}={{\tan}^{{-{{1}}}}{\left(\frac{{{x}-{y}}}{{{1}+{x}{y}}}\right)}}\right.} ...

Firstly, it will be useful to write \displaystyle \tan B = \frac{n\sin A\cos A}{1-n\cos^2 A} as \displaystyle \tan B = \frac{n\sin A\cos A}{1-n\cos^2 A}\times\frac{\sec^2 A}{\sec^2 A} \displaystyle \tan B = \frac{n\tan A}{\sec^2 A - n} = \frac{n\tan A}{1-n+\tan ^2 A}. ...

0.999 Explanation: The easiest way is to use calculator: \displaystyle{\arctan{{\left(\frac{{3}}{{4}}\right)}}}={36}^{\circ}{87} \displaystyle{2}{\arctan{{\left(\frac{{3}}{{4}}\right)}}}={73}^{\circ}{75} ...