Answer:
a)
Group 18-34 years old
[tex]\bar x = 1041.625 \\ s^2=485301 \\ s=696.635[/tex]
Group 35-44 years old
[tex]\bar x = 1359.5 \\ s^2=178548 \\ s=422.549[/tex]
Group 45 and older
[tex]\bar x = 1414.375 \\ s^2=18292.27 \\ s=135.248[/tex]
b)
According to the sample there is 9.04% probability that a person between 18 and 34 consume less than the average, 47.74% probability that a person between 35 and 44 consume more than the average and 50% probability that a person older than 45 consume more than the average.
Step-by-step explanation:
a)
The mean for each sample is
[tex]\bar x=\frac{\sum_{k=1}^{10}x_k}{10}[/tex]
where the [tex]x_k[/tex] are the data corresponding to each group
The variance is
[tex]s^2=\frac{\sum_{k=1}^{10}(\bar x-x_k)^2}{9}[/tex]
and the standard deviation is s, the square root of the variance.
Group 18-34 years old
[tex]\bar x = 1041.625 \\ s^2=485301 \\ s=696.635[/tex]
Group 35-44 years old
[tex]\bar x = 1359.5 \\ s^2=178548 \\ s=422.549[/tex]
Group 45 and older
[tex]\bar x = 1414.375 \\ s^2=18292.27 \\ s=135.248[/tex]
b)
Let's compare these averages against the general media established of $1,092 by using the corresponding z-scores
[tex]z=\frac{\bar x-\mu}{s/\sqrt{n}}[/tex]
where
[tex]\bar x[/tex] = mean of the sample
[tex]\mu [/tex] = established average
s = standard deviation of the sample
n = size of the sample
z-score of Group 18-34 years old
[tex]z=\frac{1041.625-1092}{696.635/\sqrt{10}}=-0.2286[/tex]
The area under the normal curve N(0;1) between -0.2286 and 0 is 0.0904. So according to the sample there is 9.04% probability that a person between 18 and 34 consume less than the average.
z-score of Group 35-44 years old
[tex]z=\frac{1359-1092}{422.5491/\sqrt{10}}=2.0019[/tex]
The area under the normal curve N(0;1) between 0 and 2.0019 is 0.4774. So according to the sample there is 47.74% probability that a person between 35 and 44 consume more than the average.
z-score of Group 45 and older
[tex]z=\frac{1414.375-1092}{135.2489/\sqrt{10}}=7.5375[/tex]
The area under the normal curve N(0;1) between 0 and 7.5375 is 0.5. So according to the sample there is 50% probability that a person older than 45 consume more than the average.
