The maximum value of -1 x2-cosec-1 x2 is equal toA- -2-4B- 3 w-4C- -2D- None of these

The correct option is B 5π^2/4 I=(sec^ 1x)^2+(cosec^ 1x)^2 =(sec^ 1x+cosec^ 1x)^2 2sec^ 1x cosec^ 1x =π^2/4 2sec^ 1x(π/2 sec^ 1x ) =π^2/4+2((sec^ 1x)^2 π/2(se ...

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Standard XII

Mathematics

Properties Derived from Trigonometric Identities

The maximum v...

Question

The maximum value of $(s e c^{- 1} x)^{2} + (c o s e c^{- 1} x)^{2}$ is equal to

$\frac{π^{2}}{4}$

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$\frac{5 π^{2}}{4}$

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$π^{2}$

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None of these

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Solution

The correct option is B
$\frac{5 π^{2}}{4}$

$I = (s e c^{- 1} x)^{2} + (c o s e c^{- 1} x)^{2}$
$= (s e c^{- 1} x + c o s e c^{- 1} x)^{2} - 2 s e c^{- 1} x c o s e c^{- 1} x$
$= \frac{π^{2}}{4} - 2 s e c^{- 1} x (\frac{π}{2} - s e c^{- 1} x)$
$= \frac{π^{2}}{4} + 2 ((s e c^{- 1} x)^{2} - \frac{π}{2} (s e c^{- 1} x) + \frac{π^{2}}{16} - \frac{π^{2}}{16})$
$= \frac{π^{2}}{4} + 2 {(s e c^{- 1} x - \frac{π}{4})}^{2} - \frac{π^{2}}{8} \Rightarrow I_{m a x} = \frac{π^{2}}{4} + 2 \times \frac{9 π^{2}}{16} - \frac{π^{2}}{8}$
$= {\frac{5 π}{4}}^{2}$

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The maximum value of (sec−1x)2+(cosec−1x)2 is equal to

The correct option is B 5π24 I=(sec−1x)2+(cosec−1x)2 =(sec−1x+cosec−1x)2−2sec−1x cosec−1x =π24−2sec−1x(π2−sec−1x) =π24+2((sec−1x)2−π2(sec−1x)+π216−π216) =π24+2(sec−1x−π4)2−π28⇒Imax=π24+2×9π216−π28 =5π42

The maximum value of $(s e c^{- 1} x)^{2} + (c o s e c^{- 1} x)^{2}$ is equal to