Consider the function.

$f\left(x\right)=-3x+2$

The slope of secant line of the given function is as follows:

$\begin{array}{rcl}{m}_{sec}& =& \frac{f(x+h)-f\left(x\right)}{h}\\ & =& \frac{-3(x+h)+2-(-3x+2)}{h}\\ & =& \frac{-3x-3h+2+3x-2}{h}\\ & =& \frac{-3h}{h}\\ & =& -3\end{array}$

From part (a), the value is $m_{sec}=-3$ for all values of $h$ since $m_{sec}$ is constant in $h$.

Therefore, the value of $m_{sec}$ for $h=0.5,0.1,$ and $0.01$ at $x=1$ are $-3,-3,$ and $-3$.

Thus, conclude that as $h$ approaches to $0$, $m_{sec}$ approaches $-3$.

From part (b), $m_{sec}=-3$ at $x=1$ and $h=0.01$.

The equation of a straight line with point $(x_1,y_1)$ and the slope $m$ is given by $y-y_1=m(x-x_1)$.

 $\begin{array}{rcl}(1,f(1\left)\right)& =& (1,-3(1)+2)\\ & =& (1,-3+2)\\ & =& (1,-1)\end{array}$

Thus, the equation of a line with point $(1,f(1\left)\right)$ and the slope $m=-3$ is as follows:

$\begin{array}{rcl}y-(-1)& =& -3(x-1)\\ y+1& =& -3x+3\\ y& =& -3x+3-1\\ y& =& -3x+2\end{array}$

The function is $f\left(x\right)=-3x+2$ and the secant line is $y=-3x+2$.

The graph of $f$ and the secant line is as follows: