Respuesta :
Answer:
Roughly a 95% chance.
Step-by-step explanation:
The standard deviation of sample of size 'n' and with a proportion 'p' is given by:
[tex]SD = \sqrt{\frac{p*(1-p)}{n} }[/tex]
In this case, in a sample of 400 residents with proportion 20%, the standard deviation is:
[tex]SD=\sqrt{\frac{0.2*(1-0.2)}{400} }\\ SD=0.02[/tex]
The upper and lower limits proposed (0.16 and 0.24) are exactly two standard deviations above and below the mean of 0.20. According to the 95% rule, this interval comprehends 95% of all data. Therefore, there is roughly a 95% chance that the resulting sample proportion will be within 0.04 of the true proportion.
Answer:
P(0.16 < [tex]\hat p[/tex] < 0.24) = 0.9546 or 95.5%
Step-by-step explanation:
We are given that 20% of the residents in a certain state support an increase in the property tax. An opinion poll will randomly sample 400 state residents and will then compute the proportion in the sample that support a property tax increase.
Let p = % of the residents in a certain state that support an increase in the property tax = 20%
[tex]\hat p[/tex] = % of the residents in a certain state that support an increase in the
property tax in a sample of 400 residents
The one-sample z sore probability distribution for sample proportion is given by;
Z = [tex]\frac{\hat p -p}{\sqrt{\frac{\hat p(1- \hat p)}{n} } }[/tex] ~ N(0,1) where, n = sample residents = 400
So, probability that sample proportion will lie between 0.16 and 0.24 is given by = P(0.16 < [tex]\hat p[/tex] < 0.24)
P(0.16 < [tex]\hat p[/tex] < 0.24) = P( [tex]\hat p[/tex] < 0.24) - P( [tex]\hat p \leq[/tex] 0.16)
P( [tex]\hat p[/tex] < 0.24) = P( [tex]\frac{\hat p -p}{\sqrt{\frac{\hat p(1- \hat p)}{n} } }[/tex] < [tex]\frac{0.24 -0.20}{\sqrt{\frac{0.24(1- 0.24)}{400} } }[/tex] ) = P(Z < 1.87) = 0.96926
P( [tex]\hat p[/tex] [tex]\leq[/tex] 0.16) = P( [tex]\frac{\hat p -p}{\sqrt{\frac{\hat p(1- \hat p)}{n} } }[/tex] [tex]\leq[/tex] [tex]\frac{0.16 -0.20}{\sqrt{\frac{0.16(1- 0.16)}{400} } }[/tex] ) = P(Z < -2.18) = 1 - P(Z [tex]\leq[/tex] 2.18)
= 1 - 0.98537 = 0.01463
Therefore, P(0.16 < [tex]\hat p[/tex] < 0.24) = 0.96926 - 0.01463 = 0.9546
Hence, it is 95.5% likely that the sample proportion will lie between 0.16 and 0.24.
