Question

If $x_1,x_2,x_3,x_4$ are roots of the equation $x^4-x^3\sin 2\beta +$ $x^2\cos 2\beta -x\cos \beta -\sin \beta =0$, then $\sum _{i=1}^4{\tan }^{-1}{x}_i$ is equal to

• A. $\beta$
• B. $\frac{\pi }{2}-\beta$
• C. $\pi -\beta$
• D. $-\beta$

Answer 1

Answer: (B)

$\Sigma x_1=\sin 2\beta ,\Sigma x_1{x}_2$
$=\cos 2\beta ,\Sigma x_1{x}_2{x}_3=\cos \beta$
and $x_1{x}_2{x}_3{x}_4=-\sin \beta$
$\therefore {\tan }^{-1}{x}_1+{\tan }^{-1}{x}_2+{\tan }^{-1}{x}_3+{\tan }^{-1}{x}_4$
$={\tan }^{-1}\left(\frac{\sum x_1-\sum x_1{x}_2{x}_3}{1-\sum x_1{x}_2+x_1{x}_2{x}_3{x}_4}\right)$
$={\tan }^{-1}\left(\frac{\sin 2\beta -\cos \beta }{1-\cos 2\beta -\sin \beta }\right)$
$={\tan }^{-1}\left\{\frac{\cos \beta (2\sin \beta -1)}{\sin \beta (2\sin \beta -1)}\right\}={\tan }^{-1}\cot \beta$
$={\tan }^{-1}\tan \left(\frac{\pi }{2}-\beta \right)$
$=\frac{\pi }{2}-\beta$