Let p be the population proportion of parents who had children in grades K-12 were satisfied with the quality of education the students receive.
Set of hypothesis :
[tex]H_0: p=0.43\\\\ H_a:p\neq0.43[/tex]
Confidence interval for population proportion is given by :-
[tex]\hat{p}\pm z_c\sqrt{\dfrac{\hat{p}(1-\hat{p})}{n}}[/tex] , where
n= sample size
[tex]\hat{p}[/tex]= sample proportion
and [tex]z_c[/tex] is the two-tailed z-value for confidence level (c).
As per given ,
Sample size of parents : n= 1085
Number of parents indicated that they were satisfied= 466
Sample proportion : [tex]\hat{p}=\dfrac{466}{1085}\approx0.429[/tex]
Critical value for 90% confidence interval : [tex]z_c=1.645[/tex] ( by z-value table)
Now, the 90% confidence interval :
[tex]0.429\pm (1.645)\sqrt{\dfrac{0.429(1-0.429)}{1085}}\\\\=0.429\pm 0.0247\\\\=(0.429-0.0247,\ 0.429+0.0247)\\\\=(0.4043,\ 0.4537)[/tex]
Thus , the 90% confidence interval: (0.4043, 0.4537).
Since 0.43 lies in 90% confidence interval , it means we do not have enough evidence to reject the null hypothesis .
i.e. We are have no evidence that parents' attitudes toward the quality of education have changed.
