A sample size must be determined for estimating a population mean given that the confidence level is % and the desired margin of error is . The largest value in the population is thought to be and the - QAmmunity.org

A sample size must be determined for estimating a population mean given that the confidence level is % and the desired margin of error is . The largest value in the population is thought to be and the

asked Feb 22, 2021 31.9k views

1 Answer

Complete Question

The complete question is shown on the first uploaded image

Answer:

a

n =290

b

n =129

c

The correct option is D

Explanation:

From the question we are told that

The margin of error is
E = 0.23

The largest value is k = 15

The smallest value is u = 7

From the question we are told the confidence level is 95% , hence the level of significance is

$\alpha = (100 - 95 ) \%$

=>
$\alpha = 0.05$

Generally from the normal distribution table the critical value of
$(\alpha )/(2)$ is

$Z_{(\alpha )/(2) } =  1.96$

Generally population standard deviation estimate is mathematically represented as

$\sigma = (Range )/(4)$

Here the Range is mathematically represented as

Range = k - u

=>
Range = 15 - 7

=>
Range = 8

=>
$\sigma = (8 )/(4)$

=>
$\sigma = 2$

Generally the sample size is mathematically represented as

$n = [\frac{Z_{(\alpha )/(2) } *  \sigma }{E} ] ^2$

=>
$n = [1.96  *  2 }{0.23} ] ^2$

=>
n =290

Generally to obtain a conservatively small sample size the population standard deviation estimate becomes

=>
$\sigma = (Range )/(6)$

=>
$\sigma = (8 )/(6)$

=>
$\sigma =1.333$

Generally the conservatively small sample size is mathematically evaluated as

$n = [\frac{Z_{(\alpha )/(2) } *  \sigma }{E} ] ^2$

=>
$n = [1.96  *  1.333 }{0.23} ] ^2$

=>
n =129

A sample size must be determined for estimating a population mean given that the confidence-example-1

Kuan Tein answered Feb 28, 2021

5.3k points

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