$\overline{x}=50, n=16, s=5$, confidence level $=99\%$

The formula used: The confidence interval $\overline{x}\pm t_{\frac{\alpha }{2}}\left(\frac{s}{\sqrt{n}}\right)$ and $Margin\text{ of }error\left(E\right)=t_{\frac{a}{2}}\left(\frac{s}{\sqrt{n}}\right)$

Compute the $99\%$ confidence interval for $\mu$

Consider $\overline{x}=50,n=16,s=5$, a $99\%$ confidence level.

The needed value  $t_{\frac{\alpha }{2}}$ for $99\%$ confidence with $15(=16-1)$ degrees of freedom is $2.947$, according to "Table IV Values of $t_{\alpha }$

Thus, the confidence interval is,

$$\begin{gathered} \overline{x}\pm t_{\frac{\alpha }{2}}\left(\frac{s}{\sqrt{n}}\right)=50\pm 2.947\left(\frac{5}{\sqrt{16}}\right) \\ =50\pm 2.947(1.25) \\ =50\pm 3.6838 \\ =(46.3162,53.6838) \end{gathered}$$

Therefore, the $99\%$ confidence interval $\mu$ is $(46.3162,53.6838)$

Using the half-length of the confidence interval, calculate the margin of error. 

$$\begin{gathered} \text{ Margin of error }=\frac{53.6838-46.3162}{2} \\ =\frac{7.3676}{2} \\ =3.6838 \end{gathered}$$

Thus, the margin of error by using the half-length of the confidence interval is $3.6838$

Using the formula, calculate the margin of error. 

$$\begin{gathered} Margin\text{ of }error\left(E\right)=t_{\frac{a}{2}}\left(\frac{s}{\sqrt{n}}\right) \\ =2.947\left(\frac{5}{\sqrt{16}}\right) \\ =2.947(1.25) \\ =3.6838 \end{gathered}$$

Thus, the margin of error by using formula is $3.6838$