If ∫cot⁡xsin⁡xcos⁡xdx=Pcot⁡x+Q then the value of P4 is

Let I=∫cot⁡xsin⁡xcos⁡xdx=∫cot⁡xtan⁡xsec2⁡xdx=∫sec2⁡x(tan⁡x)3/2dx=−2tan⁡x+Q=−2cot⁡x+Q∴ P=−2⇒P4=16

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If $\int \frac{\sqrt{\cot x}}{\sin xcos x} dx = P \sqrt{\cot x} + Q$ then the value of P⁴ is

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answer is 16.

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Detailed Solution

$\begin{array}{l} Let I = \int \frac{\sqrt{\cot x}}{\sin xcos x} dx = \int \frac{\sqrt{\cot x}}{\tan x} \sec^{2} xdx \\ = \int \frac{\sec^{2} x}{(\tan x)^{3 / 2}} dx = \frac{- 2}{\sqrt{\tan x}} + Q = - 2 \sqrt{\cot x} + Q \\ ∴ P = - 2 \Rightarrow P^{4} = 16 \end{array}$