The gas mileage for a certain model of car is known to have a standard deviation of 6 mi/gallon. A simple random sample of 49 cars of this model is chosen and found to have a mean gas mileage of 28.4 mi/gallon.

asked Jan 6, 2022 227k views

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4 votes

Answer:

The answer is "(27.030,29.770)"

Explanation:

$(\bar{x}) = 28.4$

(n)= 49

$(\sigma) = 6$

$(CI) = \bar{x}\pm z^*_{(\alpha)/(2)} (\sigma)/(√(n))$

$z^*_{(\alpha)/(2)}\ for \ 89\%\ confidence = 1.598 \\\\\text{Using z table }\\\\ NORM.S.INV(1-((1-0.89))/(2))$

$CI = 28.4 \pm 1.598 * (6)/(√(49))=(27.030,29.770)$

Rohit Kumar answered Jan 12, 2022

7.6k points

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