Question

An education minister would like to know whether students at Gedrassi high school on average perform better at English or at Mathematics. Denoting by μ₁ the mean score for all Gedrassi students in a standardized English exam and μ₂ the mean score for all Gedrassi students in a standardized Mathematics exam, the minister would like to get a 95% confidence interval estimate for the difference between the means: μ₁ - μ₂.

A study was conducted where many students were given a standardized English exam and a standardized Mathematics exam and their pairs of scores were recorded. Unfortunately, most of the data has been misplaced and the minister only has access to scores for 4 students.

Student	English	Mathematics
Student 1	78	66
Student 2	76	69
Student 3	78	67
Student 4	80	65

The populations of test scores are assumed to be normally distributed. The minister decides to construct the confidence interval with these 4 pairs of data points. This Student's t distribution table may assist you in answering the following questions.

a)Calculate the lower bound for the confidence interval. Give your answer to 3 decimal places.

Lower bound =

b)Calculate the upper bound for the confidence interval. Give your answer to 3 decimal places.

Upper bound =

An assistant claims that there is no difference between the average English score and the average Math score for a student at Gedrassi high school.

c)Based on the confidence interval the minister constructs, the claim by the assistant

be ruled out.

Answer 1

Solution: Here the concept of paired t-test is used.