Answer
See solution
Work Step by Step
a) $f(c x+d y)=m(c x+d y)=m c x+m d y$
a) When $b=0, f(x)=m x .$ In this case, for all $x$
$y$ in $R$ and all scalars $c$ and $d$
\[
\begin{array}{l}
=c(m x)+d(m y) \\
=c \cdot f(x)+d \cdot f(y)
\end{array}
\]
This shows that $f$ is linear
b) When $f(x)=m x+b$ with b nonzero, $f(0)=$
\[
m(0)+b=b \neq 0
\]
c) In calculus, $f$ is called a "linear function" because the graph of $f$ is a line.
