QuestionDo men score higher on average compared to women on their statistics finals? Final exam scores of thirteen randomly selected male statistics students and twelve randomly selected female statistics students are shown below.
Male:
Assume both follow a Normal distribution. What can be concluded at the the level of significance level of significance?
For this study, we should use
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a. The null and alternative hypotheses would be:
:
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(6) (please enter a decimal)
:
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(Please enter a decimal)
b. The test statistic ? (please show your answer to 3 decimal places.)
c. The -value (Please show your answer to 4 decimal places.)
d. The -value is
?
e. Based on this, we should
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the null hypothesis.
f. Thus, the final conclusion is that ...
The results are statistically insignificant at , so there is statistically significant evidence to conclude that the population mean statistics final exam score for men is equal to the population mean statistics final exam score for women.
The results are statistically significant at , so there is sufficient evidence to conclude that the population mean statistics final exam score for men is more than the population mean statistics final exam score for women.
The results are statistically significant at , so there is sufficient evidence to conclude that the mean final exam score for the thirteen men that were observed is more than the mean final exam score for the twelve women that were observed.
The results are statistically insignificant at , so there is insufficient evidence to conclude that the population mean statistics final exam score for men is more than the population mean statistics final exam score for women.
Studdy Solution
STEP 1
What is this asking?
Do men, *on average*, score higher than women on their statistics finals, and is the difference statistically significant?
Watch out!
Don't mix up the sample means with what we're *really* interested in: the *population* means!
Also, keep an eye on that significance level, .
It's stricter than the usual !
STEP 2
1. State the Hypotheses
2. Calculate the Sample Statistics
3. Perform the t-Test
4. Find the p-value
5. Make a Decision
STEP 3
We want to see if men score higher, so our **alternative hypothesis** is that the population mean for men () is greater than the population mean for women ().
That's written as .
STEP 4
The **null hypothesis** is the opposite: there's no difference between the population means, or .
We're trying to find enough evidence to *reject* this null hypothesis!
STEP 5
**Calculate the mean for men**: Add up all the men's scores (93 + 77 + ... + 94 = 976) and divide by the number of men (13).
So, .
STEP 6
**Calculate the mean for women**: Add up all the women's scores (83 + 46 + ... + 68 = 768) and divide by the number of women (12).
So, .
STEP 7
**Calculate the sample standard deviation for men**: First, find the variance.
For each male score, subtract the mean (), square the result, and add those squared differences together.
This sum is .
Divide by to get the variance, .
The standard deviation is the square root of the variance: .
STEP 8
**Calculate the sample standard deviation for women**: Follow the same process as with the men's scores.
The sum of squared differences is .
Divide by to get the variance, .
The standard deviation is .
STEP 9
We're using a **two-sample t-test** because we're comparing the means of two independent groups.
The formula is:
STEP 10
Plug in our values:
STEP 11
Our **t-statistic** is .
We need to find the probability of getting a t-statistic this large or larger *if the null hypothesis is true*.
This is our **p-value**.
STEP 12
Using a t-table or calculator (with degrees of freedom calculated as and rounded down to 22), we find that the p-value is approximately .
STEP 13
Our **p-value** () is greater than our **significance level** ().
STEP 14
Since the p-value is greater than alpha, we *fail to reject* the null hypothesis.
STEP 15
a. and b. The test statistic is . c. The p-value is . d. The p-value is . e. Based on this, we should *fail to reject* the null hypothesis. f. Thus, there is *insufficient* evidence at the level to conclude that the population mean statistics final exam score for men is greater than the population mean score for women.
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