Derivative/R/Affine-linear function/Directly/Example

Let ${\displaystyle {}s,c\in \mathbb {R} }$, and let

${\displaystyle \alpha \colon \mathbb {R} \longrightarrow \mathbb {R} ,x\longmapsto sx+c,}$

be an affine-linear function. To determine the derivative in a point ${\displaystyle {}a\in \mathbb {R} }$, we consider the difference quotient

${\displaystyle {}{\frac {(sx+c)-(sa+c)}{x-a}}={\frac {sx-sa}{x-a}}=s\,.}$

This is constant and equals ${\displaystyle {}s}$, so that the limit of the difference quotient as ${\displaystyle {}x}$ tends to ${\displaystyle {}a}$ exists and equals ${\displaystyle {}s}$ as well. Hence, the derivative exists in every point and is just ${\displaystyle {}s}$. The slope of the affine-linear function is also its derivative.