Answer:
a) There are 10 different samples of size 2.
b) See the explanation section
c) See the explanation section
Step-by-step explanation:
a) We need to select a sample of size 2 from the given population of size 5. We use combination to get the number of difference sample.
[tex]\{ {{5} \atop {2}} \} = \frac{5!}{2!(5-2)!} \\= \frac{5!}{2!3!} \\= \frac{120}{2*6} \\= \frac{120}{12} \\=10[/tex]
b) Possible sample of size 2:
Peter Hankish 8 Connie Stallter 6 Juan Lopez 4 Ted Barnes 10 Peggy Chu 6
c) The mean of the population is:
[tex]mean = \frac{(8+6+4+10+6)}{5} \\= \frac{34}{5} \\= 6.8[/tex]
Comparing the mean of the population and the sample; we can say that most of the 2-size sample have their mean higher than that of the population sample. And the variation with the mean is not much. Some sample have their mean greater than population mean, while some sample have their mean greater than the population mean.
This question is based on the statistics. Therefore, the answers of all the questions are explained below.
Given:
There are five sales associates at Mid-Motors Ford. Sales Associate Cars Sold Peter Hankish 8 Connie Stallter 6 Juan Lopez 4 Ted Barnes 10 Peggy Chu 6.
(a) We have to find different samples of size 2 are possible.
Thus, we have to select sample of size 2 from given population of size 5.
So, by using combination,
[tex]5_{c_2} = \dfrac{5!}{2! (5-2)!} =\dfrac{120}{12} = 10[/tex]
Thus, 10 different samples of size 2 are possible.
(b) We have to find list all possible samples of size 2, and compute the mean of each sample.
Peter Hankish 8 ,Connie Stallter 6, Juan Lopez 4, Ted Barnes 10, Peggy Chu 6.
(c) The mean of the population is:
[tex]Mean = \dfrac{8+6+4+10+6}{5}\\\\Mean = \dfrac{34}{5}\\\\Mean = 6.8[/tex]
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https://brainly.com/question/19146184
