The given curve is $f\left(x\right)=x^2$ and the interval is $\left[0,4\right].$

We have to use 4 frustums to approximate the area of the surface of the revolution obtained by revolving the given curve on the given interval. To approximate the area, we will use the formula of the area of a surface of revolution which is $S=\sum _{k=1}^{n}2\pi r_k{s}_k.$

Here,

 $$\begin{gathered} s_k=\sqrt{{\left(\mathrm{\Delta x}\right)}^2+{\left({\mathrm{\Delta y}}_{\mathrm{k}}\right)}^2} , r_k=\frac{f\left(x_{k-1}\right)+f\left(x_k\right)}{2}, \Delta x=\frac{b-a}{n}, and \\ \mathrm{\Delta }{y}_k=f\left(x_k\right)-f\left(x_{k-1}\right) \text{for }k=0,1,2,\dots ,n. \end{gathered}$$

So,

 $$\begin{gathered} \mathrm{\Delta }x=\frac{b-a}{n} \\ \mathrm{\Delta }x=\frac{4-0}{4} \\ \mathrm{\Delta }x=1 \end{gathered}$$

Now, we have to find $x_k \mathrm{and} f\left(x_k\right) \mathrm{for} k=0,1,2,3,4:$

$\begin{array}{rl}{x}_0& =0, x_1=1, x_2=2, x_3=3, x_4=4\\ f\left(0\right)& =0, f\left(1\right)=1, f\left(2\right)=4, f\left(3\right)=9, f\left(4\right)=16\end{array}$

Let's find $r_k and s_k:$

$$\begin{gathered} r_1=\frac{f\left(0\right)+f\left(1\right)}{2} \mathrm{and} s_1=\sqrt{{\left(1\right)}^2+(1-0{)}^2} \\ {r}_1=\frac{1}{2} s_1=\sqrt{2} \end{gathered}$$

And

$$\begin{gathered} r_2=\frac{f\left(1\right)+f\left(2\right)}{2} \mathrm{and} s_2=\sqrt{(1{)}^2+(4-1{)}^2} \\ {r}_2=\frac{5}{2} s_2=\sqrt{10} \end{gathered}$$

And

$$\begin{gathered} r_3=\frac{f\left(2\right)+f\left(3\right)}{2} \mathrm{and} s_3=\sqrt{(1{)}^2+(9-4{)}^2} \\ {r}_3=\frac{13}{2} s_3=\sqrt{26} \\ \mathrm{And} \\ {r}_4=\frac{f\left(3\right)+f\left(4\right)}{2} \mathrm{and} s_4=\sqrt{(1{)}^2+(16-9{)}^2} \\ {r}_4=\frac{25}{2} s_4=5\sqrt{2} \end{gathered}$$

Now, let's find the area of the surface:

$\begin{array}{rl}S& =2\pi r_1{s}_1+2\pi r_2{s}_2+2\pi r_3{s}_3+2\pi r_4{s}_4\\ S& =2\pi \left[\frac{1}{2}\sqrt{2}+\frac{5}{2}\sqrt{10}+\frac{13}{2}\sqrt{26}+\frac{125}{2}\sqrt{2}\right]\\ S& =\left[126\sqrt{2}+5\sqrt{10}+13\sqrt{26}\right]\pi \end{array}$