**Category : **JEE Main & Advanced

For finding \[{{n}^{th}}\] derivative of fractional expressions whose numerator and denominator are rational algebraic expression, firstly we resolve them into partial fractions and then we find \[{{n}^{th}}\] derivative by using the formula giving the \[{{n}^{th}}\] derivative of \[\frac{1}{ax+b}\].

*play_arrow*Introduction*play_arrow*Some Standard Differentiation*play_arrow*Theorems for Differentiation*play_arrow*Methods of Differentiation*play_arrow*Differentiation of a Function with Respect to Another Function*play_arrow*Successive Differentiation or Higher Order Derivatives*play_arrow*\[{{n}^{th}}\] Derivative Using Partial Fractions*play_arrow*Differentiation of Integral Function*play_arrow*Leibnitz?s Theorem*play_arrow*Definition*play_arrow*Higher Partial Derivatives*play_arrow*Euler's Theorem on Homogeneous Functions*play_arrow*Deduction of Euler?s Theorem*play_arrow*Derivative as the Rate of Change

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