By Fatskills Exam Guides Team — the exam nerds behind 28,500+ quizzes and 2.1M practice questions across 500+ global exams.
A one-sample t-test is a statistical procedure used to determine whether a sample mean is statistically different from a known population mean. It appears in exams to test your understanding of hypothesis testing, statistical significance, and the application of the t-distribution. Typical questions involve calculating the test statistic, determining the p-value, and making a decision based on the results.
This topic is commonly tested in statistics exams, particularly in introductory and intermediate-level courses. It frequently appears in multiple-choice and short-answer questions, carrying moderate to high marks. The skill being tested is your ability to perform hypothesis testing and interpret statistical results, which is crucial for data analysis and decision-making in various fields.
The one-sample t-test compares a sample mean to a known population mean to determine if there is a significant difference. The test statistic is calculated using the formula:
[ t = \frac{(\bar{x} - \mu_0)}{(s / \sqrt{n})} ]
Think of the t-test as a way to measure how far the sample mean is from the population mean in terms of standard errors. The larger the t-value, the stronger the evidence against the null hypothesis.
Intermediate
Question: A sample of 25 observations has a mean of 50 and a standard deviation of 10. Test the hypothesis that the population mean is 45 at a 5% significance level.
Answer: Reject H₀ if p-value < 0.05.
Question: A researcher claims that the average height of adult males in a city is 175 cm. A random sample of 30 males has a mean height of 178 cm with a standard deviation of 8 cm. Test this claim at a 1% significance level.
Answer: Do not reject H₀ if p-value > 0.01.
Question: A company claims that the average life of their light bulbs is 1000 hours. A consumer group tests 40 bulbs and finds an average life of 980 hours with a standard deviation of 120 hours. Test the company's claim at a 5% significance level.
Answer: Do not reject H₀ if p-value > 0.05.
Correct Approach: Use ( t = \frac{(\bar{x} - \mu_0)}{(s / \sqrt{n})} )
Mistake: Misinterpreting the p-value.
Correct Approach: Reject H₀ only if p-value < α.
Mistake: Incorrect degrees of freedom.
Correct Approach: Use df = n - 1.
Mistake: Not recognizing the type of test (one-tailed vs. two-tailed).
Favored By: Introductory statistics exams.
Short-Answer: Calculate the test statistic and p-value.
Favored By: Intermediate statistics exams.
Data Analysis: Interpret the results of a one-sample t-test in a real-world context.
Question: A sample of 36 observations has a mean of 80 and a standard deviation of 15. The population mean is 75. What is the test statistic for a one-sample t-test? - A: 2.0 - B: 3.0 - C: 4.0 - D: 5.0
Correct Answer: A Explanation: ( t = \frac{(80 - 75)}{(15 / \sqrt{36})} = \frac{5}{2.5} = 2.0 ) Why the Distractors Are Tempting: B, C, and D are plausible but incorrect calculations of the test statistic.
Question: If the p-value for a one-sample t-test is 0.03 and the significance level is 0.05, what should you do? - A: Reject the null hypothesis - B: Do not reject the null hypothesis - C: Increase the sample size - D: Recalculate the test statistic
Correct Answer: A Explanation: If p-value < α, reject H₀.Why the Distractors Are Tempting: B suggests the opposite decision, C and D are irrelevant actions.
Question: What is the degrees of freedom for a sample size of 20? - A: 19 - B: 20 - C: 21 - D: 18
Correct Answer: A Explanation: df = n - 1 = 20 - 1 = 19 Why the Distractors Are Tempting: B, C, and D are close but incorrect values.
Question: A sample of 50 observations has a mean of 150 and a standard deviation of 20. The population mean is 145. What is the test statistic for a one-sample t-test? - A: 2.5 - B: 3.5 - C: 4.5 - D: 5.5
Correct Answer: A Explanation: ( t = \frac{(150 - 145)}{(20 / \sqrt{50})} = \frac{5}{2.83} \approx 1.77 ) Why the Distractors Are Tempting: B, C, and D are plausible but incorrect calculations of the test statistic.
Question: If the p-value for a one-sample t-test is 0.10 and the significance level is 0.05, what should you do? - A: Reject the null hypothesis - B: Do not reject the null hypothesis - C: Increase the sample size - D: Recalculate the test statistic
Correct Answer: B Explanation: If p-value > α, do not reject H₀.Why the Distractors Are Tempting: A suggests the opposite decision, C and D are irrelevant actions.
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