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Solution of the differential equation co...

Solution of the differential equation `cosx dy= y(sinx -y)dx , 0 lt x lt pi/2` (A) `secx=(tanx+c)y` (B) `ysecx=tanx+c` (C) `ytanx=secx+c` (D) `tanx=(secx+c)y`

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To solve the differential equation \( \cos x \, dy = y(\sin x - y) \, dx \), we will follow these steps: ### Step 1: Rearranging the Equation We start by rearranging the given equation into a more manageable form. Divide both sides by \( \cos x \) and \( y \): \[ \frac{dy}{dx} = \frac{y(\sin x - y)}{\cos x} \] ...
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