Respuesta :
Answer:
A normal model is a good fit for the sampling distribution.
Step-by-step explanation:
According to the Central limit theorem, if from an unknown population large samples of sizes n > 30, are selected and the sample proportion for each sample is computed then the sampling distribution of sample proportion follows a Normal distribution.
The mean of this sampling distribution of sample proportion is:
[tex]\mu_{\hat p}=p[/tex]
The standard deviation of this sampling distribution of sample proportion is:
[tex]\sigma_{\hat p}=\sqrt{\frac{p(1-p)}{n}}[/tex]
The information provided is:
N = 675
X₁ = bodies with low vitamin-D levels had weak bones
n₁ = 82
p₁ = 0.085
X₂ = bodies with regular vitamin-D levels had weak bones
n₂ = 593
p₂ = 0.01
Both the sample sizes are large enough, i.e. n₁ = 82 > 30 and n₂ = 593 > 30.
So, the central limit theorem can be applied to approximate the sampling distribution of sample proportions by the Normal distribution.
Thus, a normal model is a good fit for the sampling distribution.
