Question

asked Dec 27, 2021 75.4k views

1 Answer

Adam Markowitz · Answer 1 · 2022-01-01T09:01:32+0000

Complete Question

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Answer:

The estimate of the average stopping distance of all model A tires with a 94% confidence interval is

$132.94 <  \mu < 144.86$

Explanation:

From the question we see that

The sample size is n = 8

The population standard deviation is
$\sigma = 6.7$

Generally the sample mean is mathematically represented as

$\= x = (\sum x_i )/(n)$

=>
$\= x = ( 145 + 152 + \cdots + 133)/(8)$

=>
$\= x = 138.9$

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

$\alpha = (100 - 94 ) \%$

=>
$\alpha = 0.04$

Generally the degree of freedom is mathematically represented as

df = n - 1

=>
df = 8 - 1

=>
df = 7

Because the n < 30 we will making use of the t table

Generally from the t distribution table the critical value of
$(\alpha )/(2)$ at a degree of freedom of
df = 7 is

$t_{(\alpha )/(2), 7 } = 2.517$

Generally the margin of error is mathematically represented as

$E = t_{(\alpha )/(2) , df} *  (\sigma )/(√(n) )$

=>
E = 2.517 * (6.7 )/(√(8) )

=>
E =5.96

Generally 94% confidence interval is mathematically represented as

$\= x -E <  \mu <  \=x  +E$

=>
$138.9  -5.96 <  \mu < 138.9  + 5.96$

=>
$132.94 <  \mu < 144.86$

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