Differentiable function/D in R/Inverse function/Fact/Proof

We consider the difference quotient

${\displaystyle {}{\frac {f^{-1}(y)-f^{-1}(b)}{y-b}}={\frac {f^{-1}(y)-a}{y-b}}\,,}$

and have to show that the limit for ${\displaystyle {}y\rightarrow b}$ exists, and obtains the value claimed. For this, let ${\displaystyle {}{\left(y_{n}\right)}_{n\in \mathbb {N} }}$ denote a sequence in ${\displaystyle {}E\setminus \{b\}}$, converging to ${\displaystyle {}b}$. Because of fact, the function ${\displaystyle {}f^{-1}}$ is continuous. Therefore, also the sequence with the members ${\displaystyle {}x_{n}:=f^{-1}(y_{n})}$ converges to ${\displaystyle {}a}$. Because of bijectivity, ${\displaystyle {}x_{n}\neq a}$ for all ${\displaystyle {}n}$. Thus

${\displaystyle {}\lim _{n\rightarrow \infty }{\frac {f^{-1}(y_{n})-a}{y_{n}-b}}=\lim _{n\rightarrow \infty }{\frac {x_{n}-a}{f(x_{n})-f(a)}}={\left(\lim _{n\rightarrow \infty }{\frac {f(x_{n})-f(a)}{x_{n}-a}}\right)}^{-1}\,,}$

where the right-hand side exists, due to the condition, and the second equation follows from fact  (5).