Math  /  Data & Statistics

QuestionA fashion company releases a new line of prom dresses that are all under $100\$ 100. They claim this is a bargain because the average cost of a prom dress is over $300\$ 300. A customer decide to test this, and takes a random sample of 25 dresses. She finds the mean is $250\$ 250 with a standard deviation of $10\$ 10. Assume the population is normally distributed and use α=0.0\alpha=0.0 to test the claim.
Which distribution should be used to test the claim? Z-test for the Mean T-test for the Mean p-distribution c-distribution

Studdy Solution

STEP 1

1. The sample size is n=25 n = 25 .
2. The sample mean is xˉ=250 \bar{x} = 250 .
3. The sample standard deviation is s=10 s = 10 .
4. The population is normally distributed.
5. The significance level is α=0.0 \alpha = 0.0 .

STEP 2

1. Determine the appropriate test for the mean.
2. Justify the choice of test based on the given data and assumptions.

STEP 3

Since the population standard deviation is not provided and the sample size is small (n<30 n < 30 ), we typically use the t-test for the mean when the population standard deviation is unknown.

STEP 4

The t-test is appropriate here because: - The sample size is small (n=25 n = 25 ). - The population standard deviation is unknown. - The population is normally distributed.
The appropriate distribution to use for testing the claim is:
T-test for the Mean \text{T-test for the Mean}

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