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1 October, 20:10

A consumer affairs investigator records the repair cost for 4 randomly selected TVs. A sample mean of $91.78 and standard deviation of $23.13 are subsequently computed. Determine the 90% confidence interval for the mean repair cost for the TVs. Assume the population is approximately normal. Step 1 of 2 : Find the critical value that should be used in constructing the confidence interval. Round your answer to three decimal places.

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  1. 1 October, 20:21
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    = ($72.756, $110.804)

    Therefore, the 90% confidence interval (a, b) = ($72.756, $110.804)

    Critical value at 90% confidence = 1.645

    Step-by-step explanation:

    Confidence interval can be defined as a range of values so defined that there is a specified probability that the value of a parameter lies within it.

    The confidence interval of a statistical data can be written as.

    x+/-zr/√n

    Given that;

    Mean x = $91.78

    Standard deviation r = $23.13

    Number of samples n = 4

    Confidence interval = 90%

    Using the z table;

    z (α=0.05) = 1.645

    Critical value at 90% confidence = 1.645

    Substituting the values we have;

    $91.78+/-1.645 ($23.13/√4)

    $91.78+/-1.645 ($11.565)

    $91.78+/-$19.024425

    $91.78+/-$19.024

    = ($72.756, $110.804)

    Therefore, the 90% confidence interval (a, b) = ($72.756, $110.804)
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