Chapter 3 - Derivatives - 3.10 Derivatives of Inverse Trigonometric Functions - 3.10 Execises - Page 222: 63

\[\left( {{f}^{-1}} \right)'\left( x \right)=2x\]

\[\begin{align} & f\left( x \right)=\sqrt{x+2},x\ge -2 \\ & \text{Write }f\left( x \right)\text{ as }y \\ & y=\sqrt{x+2} \\ & \text{Interchange }x\text{ and }y \\ & x=\sqrt{y+2} \\ & \text{Solve for }y \\ & {{x}^{2}}=y+2 \\ & y={{x}^{2}}-2 \\ & \text{Write }y\text{ as }{{f}^{-1}}\left( x \right) \\ & {{f}^{-1}}\left( x \right)={{x}^{2}}-2 \\ & \text{Compute the derivative} \\ & \left( {{f}^{-1}} \right)'\left( x \right)=\frac{d}{dx}\left[ {{x}^{2}}-2 \right] \\ & \left( {{f}^{-1}} \right)'\left( x \right)=2x \\ \end{align}\]