Answer:
95% of confidence intervals for the proportion of all dies that pass the probe.
(0.4867 , 0.6453)
Step-by-step explanation:
Step(i):-
Given sample size 'n' = 150
The sample proportion
[tex]p = \frac{x}{n} = \frac{85}{150} = 0.566[/tex]
Level of significance = 0.05
The critical value Z₀.₀₅ = 1.96
Step(ii):-
95% of confidence intervals for the proportion of all dies that pass the probe.
[tex](p^{-} - Z_{0.05} \frac{\sqrt{p(1-p)} }{\sqrt{n} } , p^{-} + Z_{0.05} \frac{\sqrt{p(1-p)} }{\sqrt{n} })[/tex]
[tex](0.566 - 1.96\frac{\sqrt{0.566(1-0.566)} }{\sqrt{150} } , 0.566 + 1.96\frac{\sqrt{0.566(1-0.566)} }{\sqrt{150} })[/tex]
( 0.566 - 0.0793 , 0.566 + 0.0793)
(0.4867 , 0.6453)
Conclusion:-
95% of confidence intervals for the proportion of all dies that pass the probe.
(0.4867 , 0.6453)
