Answer :
Answer:
Follows are the solution to this question:
Step-by-step explanation:
The missing data is defined in the attached file please find it.
Given:
Admission Status
[tex]\left\begin{array}{ccccc}Ethnography &Acceptable \ Approval &Waitlisted & Turned \ Away & Total\\\\ Hispanic/ Black & 51 &206&143 & 400 \\Asia &57&289&100&446\\White& 62&222&145&429\\ Total & 170& 717& 388& 1275\end{array}\right \\\\\\[/tex]
In point A:
The overall percent of applicants, which is Asia:
[tex]= \frac{446}{1275} \\\\ = 0.3498039 \approx 34.98 \%[/tex]
In point B:
The overall percent of the students, who admitted to Asia:
[tex]P(accepted\ Asian) = P( \frac{Placcepted \ Asian}{Asian})[/tex]
[tex]= \frac{\frac{57}{1275}}{\frac{446}{1275}} \\\\= \frac{57}{1275} \times \frac{1275}{446} \\\\= \frac{57}{446} \\\\= 0.1278027\approx 12.78 \%[/tex]
In point C:
The Asian percentage approved:
[tex]P(Asian/accepted) =\frac{P(accepted, Asian)}{P(accepted)}\\[/tex]
[tex]=\frac{\frac{57}{1275}}{\frac{170}{1275}} \\\\= \frac{57}{1275} \times \frac{1275}{170} \\\\= \frac{57}{170} \\\\= 0.3352941\approx 33.52%[/tex]
In point D:
The number of all students admitted:
[tex]=\frac{170}{1275}\\\\= 0.13333 \\\\= 13.33%[/tex]
