The function to be plotted is:

$y=5\cos \left(\mathrm{\pi x}\right)-3$

By comparing the given function $y=5\cos \left(\mathrm{\pi x}\right)$

with $y=A\cos \left(\omega x\right)$

we get amplitude: $A=5$

Time period : $$\begin{gathered} T=\frac{2\mathrm{\pi }}{\omega } \\ T=\frac{2\mathrm{\pi }}{\mathrm{\pi }} \\ T=2 \end{gathered}$$

The graph of $5\cos \left(\mathrm{\pi x}\right)$ will lie between -5 and 5 on the y-axis. One cycle begins at  $x=0$and ends at $x=2$

Divide the interval $\left[0,2\right]$ into four subintervals,

each of length:$\frac{2}{4}=0.5$

The x-coordinates of the five key points are :

First x-coordinate is 0

second x-coordinate is $0+0.5=0.5$

Third x-coordinate is $0.5+0.5=1$

Fourth x-coordinate is $1+0.5=1.5$

Fifth x-coordinate is $1.5+0.5=2$

These values represent the x-coordinates of the five key points on the graph. 

Since $y=5\cos \left(\omega x\right)$

Hence,  multiply the y-coordinates of the five key points for $y=\cos x$  by 5.

The five key points on the graph are:

$\left(0,5\right),\left(0.5,0\right),\left(1,-5\right),\left(1.5,0\right),\left(2,5\right)$

Add -3 to these y-coordinate of key points to get keypoints for the function $y=5\cos \left(\mathrm{\pi x}\right)-3$

So five key-points of the given function are:

$\left(0,2\right),\left(0.5,-3\right),\left(1,-8\right),\left(1.5,-3\right),\left(2,2\right)$

Plot the five key points obtained in Step 4 and fill in the graph. Extend the graph in each direction to obtain the complete graph. Notice that additional key points appear every 0.5 units. 

As we can see that the value of $x$ is set of all real number.

So domain is $\left(-\infty ,\infty \right)$

The y- value of the function in the graph lies from -8 to 2.

So the range of the function is $\left[-8,2\right]$.