$\int e^x \left[ \frac{2 + \sin 2x}{1 + \cos 2x} \right] dx =$
- A$e^x \tan x + C$
- B$e^x + \tan x + C$
- C$2e^x \tan x + C$
- D$e^x \tan 2x + C$
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यदि $\int {{e^{\sec x}}\left( {\sec x + \tan x f(x) + (\sec x \tan x + \sec^2 x)} \right)dx = {e^{\sec x}}f(x) + C}$ है,तो $f(x)$ का एक संभावित विकल्प क्या है?
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