1 Answer

Phil Anderson · Answer 1 · 2021-08-15T11:22:27+0000

Answer:

The probability is
$P(| \= X- \mu| < 199 ) = 0.733$

Explanation:

From the question we are told that

The mean mileage of a tire is
$\mu = 44663$

The standard deviation is
$\sigma = 2594$

The sample size is n = 209

Generally the standard error of mean is mathematically represented as

$\sigma_(x)  =  (\sigma)/(√(n) )$

=>
$\sigma_(x)  =  (2594)/(√(209) )$

=>
$\sigma_(x)  =   179.4$

Generally the probability that the sample mean would differ from the population mean by less than 199 miles is mathematically represented as

$P(| \= X- \mu| < 199 ) = P(|(\= X - \mu)/( \sigma_(x))| < (199)/( 179.4))$

$(\= X -\mu)/(\sigma )  =  Z (The  \ standardized \  value\  of  \ \= X )$

=>
$P(| \= X- \mu| < 199 ) = P(|Z| < (199)/( 179.4))$

=>
$P(| \= X- \mu| < 199 ) = P(|Z|< 1.11)$

=>
$P(| \= X- \mu| < 199 ) = P(-1.11 \le Z \le 1.11 )$

=>
$P(| \= X- \mu| < 199 ) = P(Z \le 1.11 ) - P( Z \le -1.11 )$

From the z table the area under the normal curve to the left corresponding to 1.11 and -1.11 is

$P(Z \le 1.11 ) = 0.8665$

and

$P(Z \le - 1.11 ) = 0.1335$

So

$P(| \= X- \mu| < 199 ) = 0.8665 - 0.1335$

=>
$P(| \= X- \mu| < 199 ) = 0.733$

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