According to a survey in a country 32 of adults do not have
According to a survey in a country, 32% of adults do not have any credit cards. Suppose a simple random sample of 800 adults is obtained.
Determine the mean of the sampling distribution of (phat) p ____
Determine the standard deviation of the sampling distribution of (phat) p_____
In a random sample of 800 adults, what is the probability that less than 30% have no credit cards? The probability is ______
Solution
Determine the mean of the sampling distribution of (phat) p ____
As stated already, p^ = 0.32 [ANSWER]
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Determine the standard deviation of the sampling distribution of (phat) p_____
As
s(p) = sqrt[p(1-p)/n)]
Then
s(p) = sqrt(0.32*(1-0.32)/800) = 0.016492423 [ANSWER]
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In a random sample of 800 adults, what is the probability that less than 30% have no credit cards?
We first get the z score for the critical value. As z = (x - u) sqrt(n) / s, then as
po = critical value = 0.3
p = mean = 0.32
s(p) = standard deviation = 0.016492423
Thus,
z = (po - p) / s(p) = -1.212678089
Thus, using a table/technology, the left tailed area of this is
P(z > -1.212678089 ) = 0.11262646 [ANSWER]
