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Gebuh · Answer 1 · 2021-01-25T21:00:55+0000

Answer:

99%, confidence interval for the true mean lifespan of this product is [12.08 years , 13.92 years].

Explanation:

We are given that a toy maker claims his best product has an average lifespan of exactly 18 years.

The product evaluator was provided data collected from a random sample of 35 people who used the product. Using the data, an average product lifespan of 13 years and a standard deviation of 2 years was calculated.

Firstly, the pivotal quantity for 99% confidence interval for the true mean is given by;

P.Q. =
$(\bar X-\mu)/((s)/(√(n) ) )$ ~
t_n_-_1

where,
$\bar X$ = sample average product lifespan = 13 years

n = sample of people = 35

s = sample standard deviation = 2 years

$\mu$ = true mean lifespan

Here for constructing 99% confidence interval we have used One-sample t statistics because we don't know about the population standard deviation.

So, 99% confidence interval for the true mean,
$\mu$ is ;

P(-2.728 <
t_3_4 < 2.728) = 0.99 {As the critical value of t at 34 degree

of freedom are -2.728 & 2.728 with P = 0.5%}

P(-2.728 <
$(\bar X-\mu)/((s)/(√(n) ) )$ < 2.728) = 0.99

P(
-2.728 * {(s)/(√(n) ) } <
${\bar X-\mu}$ <
) = 0.99

P(
$\bar X-2.728 * {(s)/(√(n) ) }$ <
$\mu$ <
$\bar X+2.728 * {(s)/(√(n) ) }$ ) = 0.99

99% confidence interval for
$\mu$ = [
$\bar X-2.728 * {(s)/(√(n) ) }$ ,
$\bar X+2.728 * {(s)/(√(n) ) }$ ]

= [
13-2.728 * {(2)/(√(35) ) } ,
13+2.728 * {(2)/(√(35) ) } ]

= [12.08 , 13.92]

Therefore, 99% confidence interval for the true mean lifespan of this product is [12.08 years , 13.92 years].

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