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T-test

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Intro to Statistics

Definition

The t-test is a statistical hypothesis test that is used to determine if the mean of a population is significantly different from a hypothesized value or the mean of another population. It is commonly used in various statistical analyses, including those related to probability distributions, hypothesis testing, and regression.

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5 Must Know Facts For Your Next Test

  1. The t-test is used when the population standard deviation is unknown and the sample size is small (typically less than 30).
  2. The t-test follows a t-distribution, which is a probability distribution that is similar to the normal distribution but has heavier tails.
  3. There are three main types of t-tests: one-sample, two-sample, and paired t-tests, each used for different types of comparisons.
  4. The t-test is used to test hypotheses about the mean of a population, such as determining if a new drug is effective or if the mean score of a group is significantly different from a hypothesized value.
  5. The choice of t-test (one-sample, two-sample, or paired) depends on the specific research question and the structure of the data.

Review Questions

  • Explain how the t-test is used in the context of hypothesis testing of a single mean.
    • In the context of hypothesis testing of a single mean, the t-test is used to determine if the mean of a population is significantly different from a hypothesized value. The test compares the sample mean to the hypothesized mean, taking into account the sample size and the variability of the data. The t-test generates a test statistic that is compared to a critical value from the t-distribution to determine if the difference between the sample mean and the hypothesized mean is statistically significant, allowing the researcher to make a decision about the null hypothesis.
  • Describe how the t-test is used in the context of probability distributions needed for hypothesis testing.
    • The t-test is based on the t-distribution, which is a probability distribution used when the population standard deviation is unknown and the sample size is small. The t-distribution is similar to the normal distribution but has heavier tails, meaning it is more likely to observe extreme values. When conducting hypothesis testing, the choice of using the t-distribution versus the normal distribution depends on the available information about the population standard deviation. If the standard deviation is known, the normal distribution is used; if the standard deviation is unknown, the t-distribution is the appropriate probability distribution to use for the t-test.
  • Analyze how the t-test is used in the context of regression analysis, specifically for the textbook cost example.
    • In the context of regression analysis, the t-test can be used to determine the statistical significance of the regression coefficients, including the slope and intercept terms. For the textbook cost example, the t-test would be used to assess whether the slope coefficient, which represents the change in textbook cost associated with a one-unit change in an independent variable (such as page count or publication year), is significantly different from zero. A statistically significant slope coefficient would indicate that the independent variable has a meaningful impact on textbook cost, allowing the researcher to draw conclusions about the relationship between the variables. The t-test provides a way to quantify the uncertainty around the estimated regression coefficients and evaluate the strength of the evidence supporting the hypothesized relationships.

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