1 Answer

Renise · Answer 1 · 2023-12-02T08:24:24+0000

If a function f(x) has an inverse f ⁻¹(x), then by definition

$f\left(f^(-1)(x)\right) = x$

Differentiating both sides with respect to x yields

$f'\left(f^(-1)(x)\right) * \left(f^(-1)\right)'(x) = 1 \implies \left(f^(-1)\right)'(x) = \frac1{f'\left(f^(-1)(x)\right)}$

Now, if f(a) = b and b = f ⁻¹(a), then

$\left(f^(-1)\right)'(a) = \frac1{f'\left(f^(-1)(a)\right)} = \frac1{f'(b)}$

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