If x = 2 cosec - 1 t and y = 2 sec - 1 t , t ≥ 1 , then d y d x is equal to

Given, x = 2 cosec - 1 t = 2 cosec - 1 t 2 and y = 2 sec - 1 t = 2 sec - 1 t 2 , then we have x · y = 2 sec − 1 t + cosec − 1 t 2 And, we know that sec - 1 x + cosec - 1 x = π 2 , ⇒ x y = 2 π 4 On differentiating, both sides with respect to x , and applying product rule, we get x d y d x + y = 0 ⇒ d y d x = - y x .

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Mathematics - Differentiation Question with Solution | TestHub

MathematicsDifferentiationDifferentiation of Inverse Trigonometric FunctionsMedium2 minPYQ_2018

MathematicsMediumsingle choice

If $x = \sqrt{2^{{cosec}^{- 1} t}}$ and $y = \sqrt{2^{\sec^{- 1} t}}, (|t| \geq 1),$ then $\frac{d y}{d x}$ is equal to

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Solution:

Given, $x = \sqrt{2^{{cosec}^{- 1} t}} = 2^{\frac{{cosec}^{- 1} t}{2}}$ and $y = \sqrt{2^{\sec^{- 1} t}} = 2^{\frac{\sec^{- 1} t}{2}},$ then we have

$x \cdot y = 2^{\frac{\sec^{- 1} t + {cosec}^{- 1} t}{2}}$

And, we know that $\sec^{- 1} x + {cosec}^{- 1} x = \frac{π}{2},$

$\Rightarrow x y = 2^{\frac{π}{4}}$

On differentiating, both sides with respect to $x,$ and applying product rule, we get

$x \frac{d y}{d x} + y = 0$

$\Rightarrow \frac{d y}{d x} = - \frac{y}{x} .$

Stream:JEESubject:MathematicsTopic:DifferentiationSubtopic:Differentiation of Inverse Trigonometric Functions

⏱ 2mℹ️ Source: PYQ_2018

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