Question
Suppose f'(x) >0 in (a, b). Prove that f is strictly increasing in (a, b), and let g be its inverse function. Prove that g is differentiable, and that g^{\prime}(f(x))=\frac{1}{f^{\prime}(x)} \quad(a<x<b)
Fig: 1
Fig: 2
Suppose f'(x) >0 in (a, b). Prove that f is strictly increasing in (a, b), and let g be its inverse function. Prove that g is differentiable, and that g^{\prime}(f(x))=\frac{1}{f^{\prime}(x)} \quad(a<x<b)
Fig: 1
Fig: 2
