Question

For $0<\theta <\frac{\pi }{2},$ the solution (s) of
${\sum }_{m=1}^{6}cosec(\theta +\frac{(m-1)\pi }{4})cosec(\theta +\frac{m\pi }{4})=4\sqrt{2}$ is/are

• A. $\frac{\pi }{4}$
• B. $\frac{\pi }{6}$
• C. $\frac{\pi }{12}$
• D. $\frac{5\pi }{12}$

Answer 1

Answer: (C), (D)

$\frac{5\pi }{12}$

For $0<\theta <\frac{\pi }{2}$
${\sum }_{m=1}^{6}cosec(\theta +\frac{(m-1)\pi }{4})cosec(\theta +\frac{m\pi }{4})=4\sqrt{2}$
$\Rightarrow {\sum }_{m=1}^6\frac{1}{\sin (\theta +\frac{(m-1)\pi }{4})\sin (\theta +\frac{m\pi }{4})}=4\sqrt{2}$
$\Rightarrow {\sum }_{m=1}^6\frac{\sin [\theta +\frac{m\pi }{4}-(\theta +\frac{(m-1)\pi }{4})]}{\sin (\theta +\frac{(m-1)\pi }{4})\sin (\theta +\frac{m\pi }{4})}=4$
$\Rightarrow {\sum }_{m=1}^6[\cot (\theta +\frac{(m-1)\pi }{4})-\cot (\theta +\frac{m\pi }{4})]=4$
$\Rightarrow \cot \left(\theta \right)-\cot (\theta +\frac{\pi }{4})+\cot (\theta +\frac{\pi }{4})$
$-\cot (\theta +\frac{2\pi }{4})+...+\cot (\theta +\frac{5\pi }{4})-\cot (\theta +\frac{6\pi }{4})=4$
$\Rightarrow \cot \theta -\cot (\frac{3\pi }{2}+\theta )=4$
$\Rightarrow \cot \theta +\tan \theta =4$
$\Rightarrow {\tan }^2\theta -4\tan \theta +1=0$
$\Rightarrow (\tan \theta -2{)}^2-3=0$
$\Rightarrow (\tan \theta -2+\sqrt{3})(\tan \theta -2-\sqrt{3})=0$
$\Rightarrow \tan \theta =2-\sqrt{3}or\tan \theta =2+\sqrt{3}$
$\Rightarrow \theta =\frac{\pi }{12};\theta =\frac{5\pi }{12}$
$\because \theta \in (0,\frac{\theta }{2})$