Answer:
a
The 90% confidence interval that estimate the true proportion of students who receive financial aid is
[tex]0.533 < p < 0.64 [/tex]
b
[tex]n = 1789[/tex]
Step-by-step explanation:
Considering question a
From the question we are told that
The sample size is n = 200
The number of student that receives financial aid is [tex]k = 118[/tex]
Generally the sample proportion is
[tex]\^ p = \frac{k}{n}[/tex]
=> [tex]\^ p = \frac{118}{200}[/tex]
=> [tex]\^ p = 0.59[/tex]
From the question we are told the confidence level is 90% , hence the level of significance is
[tex]\alpha = (100 - 90 ) \%[/tex]
=> [tex]\alpha = 0.10[/tex]
Generally from the normal distribution table the critical value of [tex]\frac{\alpha }{2}[/tex] is
[tex]Z_{\frac{\alpha }{2} } = 1.645[/tex]
Generally the margin of error is mathematically represented as
[tex]E = Z_{\frac{\alpha }{2} } * \sqrt{\frac{\^ p (1- \^ p)}{n} } [/tex]
=>[tex]E = 1.645 * \sqrt{\frac{0.59 (1- 0.59)}{200} } [/tex]
=> [tex]E = 0.057 [/tex]
Generally 90% confidence interval is mathematically represented as
[tex]\^ p -E < p < \^ p +E[/tex]
=> [tex]0.533 < p < 0.64 [/tex]
Considering question b
From the question we are told that
The margin of error is E = 0.03
From the question we are told the confidence level is 99% , hence the level of significance is
[tex]\alpha = (100 - 99 ) \%[/tex]
=> [tex]\alpha = 0.01[/tex]
Generally from the normal distribution table the critical value of is
[tex]Z_{\frac{\alpha }{2} } = 2.58[/tex]
Generally the sample size is mathematically represented as
[tex][\frac{Z_{\frac{\alpha }{2} }}{E} ]^2 * \^ p (1 - \^ p )[/tex]
=> [tex]n = [\frac{2.58}{0.03} ]^2 * 0.59 (1 - 0.59 ) [/tex]
=> [tex]n = 1789[/tex]
