1 Answer

David Barrows · Answer 1 · 2021-01-19T07:01:55+0000

Answer:

95% two-sided confidence interval for the true mean heights of men is [168.8 cm , 181.2 cm].

Explanation:

We are given that the heights of 40 randomly chosen men are measured and found to follow a normal distribution.

An average height of 175 cm is obtained. The standard deviation of men's heights is 20 cm.

Firstly, the pivotal quantity for 95% confidence interval for the true mean is given by;

P.Q. =
$(\bar X-\mu)/((\sigma)/(√(n) ) )$ ~ N(0,1)

where,
$\bar X$ = sample average height = 175 cm

$\sigma$ = population standard deviation = 20 cm

n = sample of men = 40

Here for constructing 95% confidence interval we have used One-sample z test statistics as we know about population standard deviation.

So, 95% confidence interval for the true mean,
$\mu$ is ;

P(-1.96 < N(0,1) < 1.96) = 0.95 {As the critical value of z at 2.5%

level of significance are -1.96 & 1.96}

P(-1.96 <
$(\bar X-\mu)/((s)/(√(n) ) )$ < 1.96) = 0.95

P(
$-1.96 * }{(\sigma)/(√(n) ) }$ <
${\bar X-\mu}$ <
$1.96 * }{(\sigma)/(√(n) ) }$ ) = 0.95

P(
$\bar X-1.96 * }{(\sigma)/(√(n) ) }$ <
$\mu$ <
$\bar X+1.96 * }{(\sigma)/(√(n) ) }$ ) = 0.95

95% confidence interval for
$\mu$ = [
$\bar X-1.96 * }{(\sigma)/(√(n) ) }$ ,
$\bar X+1.96 * }{(\sigma)/(√(n) ) }$ ]

= [
175-1.96 * }{(20)/(√(40) ) } ,
175+1.96 * }{(20)/(√(40) ) } ]

= [168.8 cm , 181.2 cm]

Therefore, 95% confidence interval for the true mean height of men is [168.8 cm , 181.2 cm].

The interpretation of the above interval is that we are 95% confident that the true mean height of men will be between 168.8 cm and 181.2 cm.

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