Test scores of students in one large Statistics class are normally distributed w

Question

Test scores of students in one large Statistics class are normally distributed with a mean of 80 and a 1. If one student from the class is randomly selected, what is the probability that his/her test score is below 76 using empirical rule? 2. If one student from the class is randomly selected, what is the probability that his/her test score is above 86 using the z-table? If one student from the class is randomly selected, what is the probability that his/her test score is either below 70 or above 86 using the z-table? 4. If 40 students are randomly selected from the class, what is the probability that their average test scores is below 78? A professor is interested in knowing if the score on the first test can be used to predict score on the final exam in an elementary statistics course. He randomly selected 8 students and got the following data: 1. Compute and interpret the correlation coefficient between the two variables. 2. Using the equation of the regression line, what will be the predicted final exam score of a student whose first test score is 120? In a study to determine if gender and level of physical activity are related, researchers obtained the following data 1. What percent of the individuals in the study are females who engage in high physical activity? 2. Calculate and interpret the value of the chi-squared test statistic. What is the conclusion of the test?

Explanation / Answer

Problem-E I am not doing because standard deviation value is not in the image

Problem-F

From following results correlation=-0.1651

Regression line Y=177.0037-0.1414*X

So predicted score=177.0037-0.1414*120 =160.0357

S.No.

First Test Score (X)

Final Exam1Score (Y)

x^2

y^2

xy

1

153

145

23409

21025

22185

2

144

140

20736

19600

20160

3

162

145

26244

21025

23490

4

149

170

22201

28900

25330

5

127

145

16129

21025

18415

6

118

175

13924

30625

20650

7

158

170

24964

28900

26860

8

163

160

26569

25600

26080

Total

1174

1250

174176

196700

183170

Mean

146.75

156.25

SD

16.44

14.08

Correlation=(Sum(xy)-nMeanx*Meany)/(sqrt(Sumx^2-n*Meanx^2)*(Sumy^2-n*Meany^2))

-0.1651

Slope=r*sy/sx

-0.1414

Intercept=Meany-slope*meanx

177.0037

Problem-G

Part-1-P(Female and High)=38/(20+92+41+38)=0.1990

Part-2-From following results chi-square test statistic =24.69591 with p-value=6.71E-07

As p-value is less than 0.001 we conclude that physical activity depends on gender

Chi-Square Test

Observed Frequencies

Physical

Calculations

Gender

Low

High

Total

fo-fe

Male

20

92

112

-15.7696

15.76963

Female

41

38

79

15.76963

-15.7696

Total

61

130

191

Expected Frequencies

Physical

Gender

Low

High

Total

(fo-fe)^2/fe

Male

35.76963

76.23037

112

6.952303

3.262235

Female

25.23037

53.76963

79

9.85643

4.62494

Total

61

130

191

Data

Level of Significance

0.05

Number of Rows

2

Number of Columns

2

Degrees of Freedom

1

Results

Critical Value

3.841459

Chi-Square Test Statistic

24.69591

p-Value

6.71E-07

Reject the null hypothesis

S.No.

First Test Score (X)

Final Exam1Score (Y)

x^2

y^2

xy

1

153

145

23409

21025

22185

2

144

140

20736

19600

20160

3

162

145

26244

21025

23490

4

149

170

22201

28900

25330

5

127

145

16129

21025

18415

6

118

175

13924

30625

20650

7

158

170

24964

28900

26860

8

163

160

26569

25600

26080

Total

1174

1250

174176

196700

183170

Mean

146.75

156.25

SD

16.44

14.08

Correlation=(Sum(xy)-nMeanx*Meany)/(sqrt(Sumx^2-n*Meanx^2)*(Sumy^2-n*Meany^2))

-0.1651

Slope=r*sy/sx

-0.1414

Intercept=Meany-slope*meanx

177.0037

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