$\overline{x}=35, n=25, \sigma =4$, confidence level $=90\%$

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

Compute the $90\%$ confidence interval for$\mu$

The needed value of $z_{\frac{\alpha }{2}}$ with a $90\%$ confidence level is $1.645$ as shown in "Table II Areas under the standard normal curve."

Thus, the confidence interval is,

Therefore, the $90\%$ confidence interval for $\mu$ is $(33.684,36.316)$

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

Thus, the margin of error by using the half-length of the confidence interval is $1.316$

Using a formula, calculate the margin of error.

Thus, the margin of error by using the formula is $1.316$