Answer:
Test statistic [tex]Z = 6.5217[/tex]
The Calculated value Z =6.5217 > 1.96 at 5% level of significance
Null hypothesis is rejected
There is real difference among all teens
Step-by-step explanation:
Step(i):-
Given large sample size 'n' = 886
first sample proportion p⁻₁ = 44% =0.44
Second sample proportion p⁻₂ = 29% =0.29
Null hypothesis:H₀:There is no significant difference between two proportions
Alternative Hypothesis:H₁: There is significant difference between two proportions
Level of significance ∝ = 0.95 or 95%
[tex]Z_{\frac{\alpha }{2} = Z_{\frac{0.05}{2} } = Z_{0.025} } =1.96[/tex]
Step(ii):-
Test statistic
[tex]Z = \frac{p^{-} _{1}-p^{-} _{2} }{\sqrt{pq(\frac{1}{n_{1} } +}\frac{1}{n_{2} } )}[/tex]
Where 'p'
[tex]p = \frac{n_{1} p^{-} _{1}+n_{2}p^{-} _{2} }{n_{1} +n_{2} }[/tex]
[tex]p = \frac{886 (0.44)+886(0.29) }{886+886 }[/tex]
p = 0.365
q = 1-p =1-0.365 =0.635
[tex]Z = \frac{0.44-0.29 }{\sqrt{0.365(0.635)(\frac{1}{886} +}\frac{1}{886} )}[/tex]
[tex]Z = \frac{0.15}{ 0.023} = 6.5217[/tex]
The Calculated value Z =6.5217 > 1.96 at 5% level of significance
Conclusion:-
Null hypothesis is rejected
There is real difference among all teens
