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5 min read•june 18, 2024
Josh Argo
Jed Quiaoit
Josh Argo
Jed Quiaoit
Once you determine which test is appropriate, the next step is to write your hypotheses. Regardless of the test, be sure to include context in your hypotheses, either by using meaningful subscripts or identifying the parameters of interest. ✍️
The appropriate hypotheses for a chi-square test for homogeneity are:
H0: There is no difference in distributions of a categorical variable across populations or treatments.
Ha: There is a difference in distributions of a categorical variable across populations or treatments. The appropriate hypotheses for a chi-square test for independence are:
H0: There is no association between two categorical variables in a given population or the two categorical variables are independent.
Ha: Two categorical variables in a population are associated or dependent
When writing a set of hypotheses for a test for chi-squared test for independence, your null hypothesis is that there is no association between the two categorical variables in your given population. Your alternative hypothesis is that there IS an association between the two categorical variables of interest.
For example, let’s say that we are looking at how our favorite sport affects someone’s grade in an AP Statistics class. We could take a random sample of 100 students from your high school’s AP Statistics class and ask them what is their favorite sport, football, basketball or baseball, along with their letter grade for the class. 🏈
Our hypotheses would be as follows:
When writing a set of hypotheses for a test for chi-squared test for homogeneity, your null hypothesis is that there is no difference in the distribution of the categorical variables between population 1 and population 2. The alternate hypothesis would be that there is a difference between the distribution of the categorical variable between the two populations of interest.
For example, if we wanted to observe how the distribution of sports preference differs among AP Statistics students and AP Calculus students, we could take a random sample of 100 Stats students and 100 Calculus students and determine if the distribution of football, baseball, or basketball preference differs between these two groups. ⚾
Our hypotheses would be as follows:
A test for homogeneity is also used in a randomized experiment since our sample is creating two “populations.” For instance, individuals receiving new drug treatment & individuals receiving placebo. 💉
Chi-squared tests require two familiar conditions for inference:
For our large counts condition, we need to verify that all of our expected counts are at least 5 (similar to other chi-square test set-ups). 🗼
For our test for independence, we need to verify that our data was collected using a simple random sample.
To verify that your data was collected using a simple random sample, you can check that the following conditions have been met:
For our test for homogeneity, we need to verify that our data was collected using a stratified random sample or treatments were randomly assigned (experimental design).
To verify that your data was collected using a stratified random sample, you can check that the following conditions have been met:
Alternatively, if you are conducting an experimental study, you can verify that treatments were randomly assigned by checking that the following conditions have been met:
🎥 Watch: AP Stats Unit 8 - Chi Squared Tests
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