cot ^{ - 1}left[ frac{sqrt {1 - sin x} + sqrt | vedclass

Name: Exam Paper Generator | JEE NEET Paper Generator | Vedclass
Brand: Vedclass
Rating: 5 (35 reviews)

Question

(D) Let $y = \cot ^{ - 1}\left[ \frac{\sqrt {1 - \sin x} + \sqrt {1 + \sin x}}{\sqrt {1 - \sin x} - \sqrt {1 + \sin x}} \right]$.Rationalizing the den

Vedclass · Accepted Answer

$\pi - \frac{x}{2}$

Vedclass · Answer

(D) Let $y = \cot ^{ - 1}\left[ \frac{\sqrt {1 - \sin x} + \sqrt {1 + \sin x}}{\sqrt {1 - \sin x} - \sqrt {1 + \sin x}} \right]$.Rationalizing the denominator:$y = \cot ^{ - 1}\left[ \frac{(\sqrt {1 - \sin x} + \sqrt {1 + \sin x})^2}{(\sqrt {1 - \sin x})^2 - (\sqrt {1 + \sin x})^2} \right]$Expanding the numerator and denominator:$y = \cot ^{ - 1}\left[ \frac{(1 - \sin x) + (1 + \sin x) + 2\sqrt {(1 - \sin x)(1 + \sin x)}}{(1 - \sin x) - (1 + \sin x)} \right]$$y = \cot ^{ - 1}\left[ \frac{2 + 2\sqrt {1 - \sin ^2 x}}{-2\sin x} \right] = \cot ^{ - 1}\left[ \frac{2(1 + \cos x)}{-2\sin x} \right]$Using half-angle formulas $1 + \cos x = 2\cos ^2(x/2)$ and $\sin x = 2\sin(x/2)\cos(x/2)$:$y = \cot ^{ - 1}\left[ \frac{2(2\cos ^2(x/2))}{-2(2\sin(x/2)\cos(x/2))} \right] = \cot ^{ - 1}\left[ -\frac{\cos(x/2)}{\sin(x/2)} \right]$$y = \cot ^{ - 1}\left( -\cot(x/2) \right) = \cot ^{ - 1}\left( \cot(\pi - x/2) \right) = \pi - \frac{x}{2}$.

$\cot ^{ - 1}\left[ \frac{\sqrt {1 - \sin x} + \sqrt {1 + \sin x}}{\sqrt {1 - \sin x} - \sqrt {1 + \sin x}} \right] = $

Similar Questions

Simplify $\tan ^{-1}\left[\frac{a \cos x-b \sin x}{b \cos x+a \sin x}\right],$ if $\frac{a}{b} \tan x > -1$.

Consider the following statements.
$I$. $\sin ^{-1}(y^2-4y+6)+\cos ^{-1}(y^2-4y+6) = \frac{\pi}{2}, \forall y \in R$
$II$. $\sec ^{-1}(y^2-4y+6)+\operatorname{cosec}^{-1}(y^2-4y+6) = \frac{\pi}{2}, \forall y \in R$
Which of the above statement$(s)$ is/are true?

Evaluate: $\tan^{-1} \left( \frac{1}{\sqrt{x^2 - 1}} \right)$

If $\tan ^{-1} \sqrt{x^2+x}+\sin ^{-1} \sqrt{x^2+x+1}=\frac{\pi}{2}$,then the value of $x$ is

$\tan ^{-1} \sqrt{3} - \cot ^{-1}(-\sqrt{3}) = $ . . . . . . .

Vedclass Test Series

Exam Paper Generator

Online Exam Module