Refer to the accompanying data display that results from a sample of airport data speeds in Mbps. Complete parts (a) through (c) below.
Click the icon to view a t distribution table.
TInterval
\[
\begin{array}{l}
(13.046,22.15) \\
x=17.598 \\
S x=16.01712719 \\
n=50
\end{array}
\]
a. What is the number of degrees of freedom that should be used for finding the critical value $t_{\alpha / 2}$ ?
\[
\mathrm{df}=
\]
(Type a whole number.)
\(\boxed{\text{Final Answer: The number of degrees of freedom that should be used for finding the critical value } t_{\alpha / 2} \text{ is } 49}\)
Step 1 :The number of degrees of freedom for a t-distribution is typically calculated as the sample size minus 1. In this case, the sample size (n) is given as 50.
Step 2 :Therefore, the degrees of freedom should be 50 - 1 = 49.
Step 3 :\(n = 50\)
Step 4 :\(df = 49\)
Step 5 :\(\boxed{\text{Final Answer: The number of degrees of freedom that should be used for finding the critical value } t_{\alpha / 2} \text{ is } 49}\)