8th Grade. Data.

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8th Grade Data 2015 11 20 www.njctl.org 2

Table of Contents click on the topic to go to that section Two Variable Data Line of Best Fit Determining the Prediction Equation Two Way Table Glossary Teacher Notes 3

Two Variable Data Return to Table of Contents 4

Two Variable Data Two Variable Data is also called Bivariate Data With bivariate data there are two sets of related data that you want to compare. 5

Temperature degrees F Ice Cream Sales $ 57.5 215 61.5 325 53 185 60 332 65 406 72 522 67 412 77 614 74 541 Scatter Plot Example 1: An ice cream shop keeps track of how much ice cream they sell versus the temperature on that day. This table shows 10 days of data. The two variables are: Temperature and Ice Cream Sales. We can create a scatter plot by plotting the points. Temperature is the x variable Sales is the y variable. 64.5 421 6

Scatter Plot Ten Days of Ice Cream Shop Sales Ice Cream Sales $ Temperature degrees F 7

Scatter Plot What did the scatter plot show us? Using the Scatter Plot it is easy to see that: warmer weather leads to more sales. click to reveal 8

Scatter Plot Scatter Plots are either: Linear Non linear 9

Scatter Plot These scatter plot are also non linear. 10

Scatter Plot If a scatter plot is linear it can be described 3 ways: Negative Association Positive Association No Association 11

1 What type of scatter plot is shown from the Ice Cream Shop example 1? A B C D non linear linear, positive association linear, negative association linear, no association Ice Cream Sales $ Temperature degrees F Answer 12

Example 2: Data for 10 students math and science grades are shown in the table. Plot the points to create the scatter plot. Math Grade Science Grade 56 62 96 93 Scatter Plot 85 81 84 82 63 60 100 98 Science Grades 78 81 89 91 46 48 75 75 Math Grades 13

2 What type of scatter plot is shown for the math and science grades from example 2? A B C D non linear linear, positive association linear, negative association linear, no association Science Grades Click to reveal solved graph. Math Grades Answer 14

3 What kind of association is shown in the graph? A non linear B linear, positive association C linear, negative association D linear, no association Test Score Time spent studying Answer 15

4 What kind of association is shown in the graph? A non linear Shoe size & Height B linear, positive association C linear, negative association D linear, no association shoe size Answer height in inches 16

5 What association is shown in this graph? A non linear B linear, positive correlation C linear, negative correlation D linear, no correlation Weight in Pounds Boy's Height and Weight Height in inches Answer 17

6 Which of the following scenarios would produce a linear scatter plot with a positive correlation? A Miles driven and money spent on gas B Number of pets and how many shoes you own C Work experience and income D Time spent studying and number of bad grades Answer 18

7 Which of the following would have no association if plotted on a scatter plot? A Number of toys and calories consumed in a day B Number of books read and reading scores C Length of hair and amount of shampoo used D Person's weight and calories consumed in a day Answer 19

Predictions What kind of predictions can you make from looking at the graph? 20

Survey Data A student wanted to find out if there was a relationship between the number of hours a person exercised in one week and their resting heart rate. 15 people were surveyed and the table at the right shows the results. Number of Hours Resting Heart Rate 12 61 6 78 10 70 0 90 16 65 2 85 4 75 14 62 3 78 1 87 8 69 21

Scatter Plot Plot the results of the survey on a scatter plot. Number of Hours Resting Heart Rate 12 61 6 78 10 70 0 90 16 65 2 85 4 75 14 62 3 78 1 87 8 69 22

Linear Relationship? Association? Is there a linear relationship? Is there a positive or negative association? According to your scatter plot, does a person who exercise generally have a lower resting heart rate than a person that doesn't exercise? 23

Survey Data Sandy wanted to find out if there was a relationship between the number of hours a student spent browsing the Internet in each day and their math grades for the marking period. She surveyed several students and the results are shown in the table at the right. Math Hours Grade 2 96 7 75 4 86 1 94 0.5 97 8 70 2 90 3 87 10 68 1 94 6 75 4 88 24

Linear Relationship? Association? Look at your results. Is the scatter plot linear or non linear? Is there a positive or negative association? What can you say about the math scores as more hours are spent browsing the Internet? 25

Linear Relationship? Association? The table shows average temperatures for the month of January in New Jersey from 2000 to 2009. Is it linear? Is there a positive association, negative association, or neither? Year Temperatur e in F 2,000 30.4 2,001 30.1 2,002 37.3 2,003 26.7 2,004 24.8 2,005 30.3 2,006 38.9 2,007 37.1 2,008 34.5 2,009 27.3 2,010 31.4 26

Linear Relationship? Association? The table shows average temperature by month for New Jersey. Month 1 = January, Month 2 = February, etc. Make a scatter plot using the data from the table. Is the graph linear? Is there an association? Month Temperatur e in F 1 35.4 2 38.8 3 49.8 4 52.8 5 65.3 6 70.2 7 78.2 8 75 9 67 10 57 11 49 12 40.8 Answer 27

8 What association is shown in this graph? A non linear B linear, positive association C linear, negative association D linear, no association Shoe Size Girl's Height in Inches 5 55 5.5 54 8 64 7.5 65 9 70 6 52 7.5 63 8 66 Shoe Size v. Girl's Height Height in Inches Shoe Size Answer 28

Girls Height (in inches) Shoe Size Boys Height (in inches) Shoe Size Poll Poll 10 girls and 10 boys from your class on their heights and shoe size. Make a scatter plot for your observations. Teacher Notes 29

Wake Up Time How Long to Get Ready Survey Survey your classmates and to find out what time they wake up on a school day and how long it takes them to get ready. Make a scatter plot of your results. Is there an association with the time a student wakes up and how long it takes them to get ready? 30

Line of Best Fit Return to Table of Contents 31

Line of Best Fit Bivariate data plotted on a scatter plot shows us negative or positive association (correlation). A line of best fit, or trend line, can help us predict outcomes using the data that you already have. It is drawn on a scatter plot that best fits the data points. 32

Line of Best Fit Notice that the points form a linear like pattern. To draw a line of best fit, use two points so that the line is as close as possible to the data points. Our line is drawn so that it fits as close as possible to the data points. This line was drawn through (35,82) and (50,90). 33

Line of Best Fit Test Score Time spent studying Predict the test score of someone who spends 52 minutes studying. Predict the test score of someone who spends 75 minutes studying. 34

Line of Best Fit Shoe size & Height height in inches Draw a line of best fit, or trend line, on this graph. shoe size Predict the height of a person who wears a size 8 shoe. Predict the shoe size of a person who is 50 inches tall. 35

9 Consider the scatter graph to answer the following: Which 2 points would give the best line of fit? A A and D B B and C C C and D D there is no pattern A B C D X Y 3 9 4.5 8 5 7 6 5 8 4 9 3 10 1 Answer 36

10 Consider the scatter graph to answer the following: Which 2 points would give the best line of fit? A A and D B B and C C C and D D there is no pattern B C D X Y 5 2 6 4 7 3 8 4 A 9 4.5 9 5 10 3 Answer 37

11 Which two points would you pick to draw the line of best fit? A A and B B B and C C C and D D A and D X Y 2 96 7 75 4 86 1 94 A B C 0.5 97 8 70 D 2 90 3 87 10 68 1 94 6 75 Answer 4 88 38

12 Which two points would you use to draw the line of best fit? A A and D B C and D C B and D Shoe Size v. Girl's Height Height in Inches D C A B Shoe Size Shoe Size Girl's Height in Inches 5 55 5.5 54 8 64 7.5 65 9 70 6 52 7.5 63 8 66 Answer 39

13 A scatter plot is shown on the coordinate plane. Which of these most closely approximates the line of best fit for the data in the scatter plot? A C Answer B D From PARCC EOY sample test non calculator #15 40

Line of Best Fit Using the scatter plot you created for shoe size v. girls' heights and shoe size v. boys' heights, determine line of best fit that goes through each of these scatter plots. 41

Determining the Prediction Equation Return to Table of Contents 42

Line of Best Fit The points form a linear like pattern, so use two of the points to draw a line of best fit. Our line is drawn so that it fits as close as possible to the data points. This line was drawn through (35,82) and (50,90). 43

Prediction Equation Use the two points that formed the line to write an equation for the line. Find m Find b Where S is the score for t minutes of studying. This equation is called the Prediction Equation. The slope also shows that a student's score will increase by 8 for every 15 minutes of studying they do. 44

Prediction Equation Prediction Equations can be used to predict other related values. If a person studies 15 minutes, what would be the predicted score? This is an extrapolation, because the time was outside the range of the original times. 45

Prediction Equation If a person studies 42 minutes, what would be the predicted score? This is an interpolation, because the time was inside the range of the original times. 46

Prediction Equation Interpolations are more accurate because they are within the set. The farther points are away from the data set the less reliable the prediction. Using the same prediction equation, consider: If a person studies 120 minutes, what will be their score? What is wrong with this prediction? 47

Prediction Equation If a student got an 80 on the test, What would be the predicted length of their study time? The student studied about 31 minutes. 48

14 Consider the scatter graph to answer the following: What is the slope of the line of best fit going through A and D? A B C D A (3, 9) (9, 3) D X Y 3 9 5 7 6 5 8 4 9 3 10 1 Answer 49

15 Consider the scatter graph to answer the following: What is the y intercept of the line of best fit going through A and D? A 9 B 10 C 11 D 12 A (3, 9) D (9, 3) X Y 3 9 4. 5 8 5 7 6 5 8 4 9 3 10 1 Answer 50

16 Consider the scatter graph to answer the following: The equation for our line is y = 1x + 12. What would the prediction be if x = 7? Is this an interpolation or extrapolation? A 5, interpolation B 5, extrapolation C 6, interpolation D 6, extrapolation A D X Y 3 9 4. 5 8 5 7 6 5 8 4 9 3 10 1 Answer 51

17 Consider the scatter graph to answer the following: The equation for our line is y = 1x + 12. What would the prediction be if x = 14? Is this an interpolation or extrapolation? A 4, interpolation B 4, extrapolation C 2, interpolation D 2, extrapolation A D X Y 3 9 4. 5 8 5 7 6 5 8 4 9 3 10 1 Answer 52

18 Consider the scatter graph to answer the following: The equation for our line is y = 1x + 12. What would the prediction be if x = 11? Is this an interpolation or extrapolation? A 1, interpolation B 1, extrapolation C 2, interpolation D 2, extrapolation A D X Y 3 9 4.5 8 5 7 6 5 8 4 9 3 10 1 Answer 53

19 In the previous questions, we began by using the table at the right. Which of the predicted values: (7,5) or (14, 2) will be more accurate and why? A B C D (7,5); it is an interpolation. (7,5); there already is a 5 and a 7 in the table (14, 2) it is an extrapolation (14, 2); the line is going down and will become negative X Y 3 9 4.5 8 5 7 6 5 8 4 9 3 10 1 Answer 54

20 What is the slope of this best fit line that goes through A and C? A B C D X Y 3 6 2 5 5 9 4 8 1 3 6 10 7 12 9 14 A C Answer 55

21 What is the y intercept of the line of best fit that goes through A and C? X Y 3 6 A B C 2 5 5 9 4 8 1 3 6 10 7 12 9 14 A C D Answer 56

22 The equation for the line of best fit is. What would the prediction be if y = 4.5? Is this an interpolation or extrapolation? X Y 3 6 2 5 Answer A 8, interpolation B 8, extrapolation C 6.5, interpolation D 6.5, extrapolation 5 9 4 8 1 3 6 10 7 12 9 14 57

23 The equation for the line of best fit is. What would the prediction be if y = 8? Is this an interpolation or extrapolation? X Y 3 6 Answer A B C D interpolation extrapolation interpolation extrapolation 2 5 5 9 4 8 1 3 6 10 7 12 9 14 58

Prediction Equation Calculate the prediction equation using the two labeled points. Shoe Size v. Girl's Height Height in Inches Shoe Size Shoe Size Girl's Height in Inches 5 55 5.5 54 8 64 7.5 65 9 70 6 52 7.5 63 8 66 59

24 What is the slope of the prediction equation for this graph? Shoe Size v. Girl's Height Height in Inches Shoe Size Shoe Size Girl's Height in Inches 5 55 5.5 54 8 64 7.5 65 9 70 6 52 7.5 63 8 66 Answer 60

25 A girl with a size 7 shoe and height of 56 inches will be an interpolation. True Shoe Size v. Girl's Height False Height in Inches Shoe Size Girl's Height in Inches 5 55 5.5 54 8 64 7.5 65 9 70 6 52 7.5 63 Answer Shoe Size 8 66 61

26 A girl with a size 4 shoe and height of 51 inches will be an interpolation. True Shoe Size v. Girl's Height False Height in Inches Shoe Size Girl's Height in Inches 5 55 5.5 54 8 64 7.5 65 9 70 6 52 7.5 63 Answer 8 66 Shoe Size 62

27 What will the height be of a girl with a size 8.5? Shoe Size v. Girl's Height Height in Inches Shoe Size Shoe Size Girl's Height in Inches 5 55 5.5 54 8 64 7.5 65 9 70 6 52 7.5 63 8 66 Answer 63

28 A girl with a size 10 shoe and height of 71 inches will be an extrapolation. True Shoe Size v. Girl's Height False Height in Inches Shoe Size Shoe Size Girl's Height in Inches 5 55 5.5 54 8 64 7.5 65 9 70 6 52 7.5 63 8 66 Answer 64

29 Using the prediction equation, what will the height be of a girl who has a size 10 shoe? Shoe Size v. Girl's Height Height in Inches Shoe Size Girl's Height in Inches 5 55 5.5 54 8 64 7.5 65 9 70 6 52 7.5 63 8 66 Answer Shoe Size 65

Prediction Equation Using the scatter plot you created for the shoe size v. girls' heights and shoe size v. boys' heights from your class, determine the prediction equation for each graph. Using the equation, how tall is a girl that wears a 9.5 size shoe? How tall is a boy that wears a 6.5 shoe? 66

Two Way Tables Return to Table of Contents 67

Two Way Tables We can also organize data gathered in a two way table. Two way tables display information as it pertains to two different categories. Here is an example of a two way table: Take a Bicycle to School Do Not Take a Bicycle to School Total Take the Bus to School 5 7 12 Do Not Take the Bus to School 6 12 18 Total 11 19 30 68

Two Way Tables What does the two way table show us? The table below shows information gathered from 30 students. They were asked if they took a bus or a bicycle to school. Take a Bicycle to School Do Not Take a Bicycle to School Total Take the Bus to School 5 7 12 Do Not Take the Bus to School 6 12 18 Total 11 19 30 69

Two Way Tables As you can see from the table, some students take the bus, other students ride their bicycles, take the bus or ride a bicycle to school. Several students do not take a bus nor ride their bicycles to school. Take a Bicycle to School Do Not Take a Bicycle to School Total Take the Bus to School 5 7 12 Do Not Take the Bus to School 6 12 18 Total 11 19 30 Let's answer some questions using the data from the table. 70

30 From this table, how many students take the bus or ride their bicycle to school? Take a Bicycle to School Do Not Take a Bicycle to School Total Take the Bus to School 5 7 12 Do Not Take the Bus to School 6 12 18 Total 11 19 30 Answer 71

31 How many students take the bus, but do not ride their bicycles to school? Take a Bicycle to School Do Not Take a Bicycle to School Total Take the Bus to School 5 7 12 Do Not Take the Bus to School 6 12 18 Total 11 19 30 Answer 72

32 How many students do not take the bus to school? Take a Bicycle to School Do Not Take a Bicycle to School Total Take the Bus to School 5 7 12 Do Not Take the Bus to School 6 12 18 Total 11 19 30 Answer 73

33 How many students ride their bicycles to school, but do not take the bus? Take a Bicycle to School Do Not Take a Bicycle to School Total Take the Bus to School 5 7 12 Do Not Take the Bus to School 6 12 18 Total 11 19 30 Answer 74

Two Way Tables Henry surveyed students from several classes to find out if they did chores and received an allowance. 65 students did chores. Of those 65 students, 49 received an allowance. There were 26 students that did not do chores and did not receive an allowance. 10 students that did not do chores, but received an allowance. Set up your table, and label the categories. Chores No Chores Total Allowance No Allowance Total 75

Two Way Tables 65 students did chores. Where would you write that number? Allowance No Allowance Total Chores 65 No Chores Total Notice that the "Chores" and "No Chores" categories are in the rows, and the "Allowance" and "No Allowance" categories are in the columns. 76

Two Way Tables Of those 65 students, 49 received an allowance. Where would you write the 49? Allowance No Allowance Total Chores 49 65 No Chores Total Look at the "Chores" category, then "Allowance" since the 49 students who did chores received an allowance. 77

Two Way Tables There were 26 students that did not do chores and did not receive an allowance. Allowance No Allowance Total Chores 49 65 No Chores 26 Total Look at the "No Chores" category and "No Allowance" category. 78

Two Way Tables 10 students that did not do chores, but received an allowance. Allowance No Allowance Total Chores 49 65 No Chores 10 26 Total Look for the "No Chores" category then "Allowance" category. 79

Allowance Two Way Tables This is the table filled using the information that was given. Although some of the cells are not filled, you can easily find the rest of the information with simple math. No Allowance Total Chores 49 65 49 = 16 65 No Chores 10 26 10 + 26 = 36 Total 49 + 10 = 59 16 + 26 = 42 65 + 36 = 101 or 59 + 42= 101 If you did your math correctly, the total row and column should be the same. 80

Two Way Tables Here is the final table. Now you can answer some questions using the data. Allowance No Allowance Total Chores 49 16 65 No Chores 10 26 36 Total 59 42 101 81

34 How many students took this survey? Allowance No Allowance Total Chores 49 16 65 No Chores 10 26 36 Total 59 42 101 Answer 82

35 How many students do chores, but do not receive an allowance? Allowance No Allowance Total Chores 49 16 65 No Chores 10 26 36 Total 59 42 101 Answer 83

36 How many students do not do chores, but still receive an allowance? Allowance No Allowance Total Chores 49 16 65 No Chores 10 26 36 Total 59 42 101 Answer 84

Two Way Tables Survey your class to find out if each student has a laptop computer and/or desktop computer at home. Make a two way table showing your results. Desktop Computer No Desktop Computer Laptop Computer No Laptop Computer Total Total 85

Relative Frequency Using two way tables, we can calculate relative frequencies. Relative frequencies are ratios that compares the value of a certain category to the subtotal in that category. As you have previously learned, the frequency is the quantity of just how many of a certain event occurs. Relative frequency is how many compared to the subtotal. The relative frequency is written as a fraction or decimal. 86

Relative Frequency Example: There are 12 girls in a class of 20 students. The frequency of number of girls in a class is 12. The relative frequency of the number of girls in the class is or 0.60. What is the frequency of girls in your class? What is the relative frequency? What is the frequency of boys in your class? What is the relative frequency? 87

Relative Frequency Calculate the relative frequency for the two way table from earlier by row and then by column. Take a Bicycle to School Do Not Take a Bicycle to School Total Take the Bus to School 5 7 12 Do Not Take the Bus to School 6 12 18 Total 11 19 30 88

Relative Frequency For this cell, the relative frequency of students taking a bicycle to school or the bus to school is divided by the total number of students that take the bus to school. By row: Take the Bus to School Do Not Take the Bus to School Total Take a Bicycle to School Do Not Take a Bicycle to School Total 0.42 + 0.58 = 1.00 0.33 + 0.67 = 1.00 0.37 + 0.63 = 1.00 89

Relative Frequency For relative frequency by column, the number of students that take a bicycle to school or take a bus to school is divided by the number of students that take a bicycle to school. By column: Take a Bicycle to School Do Not Take a Bicycle to School Total Take the Bus to School Do Not Take the Bus to School Total 1.00 1.00 1.00 90

Relative Frequency Let's answer some questions using the relative frequencies. What is the relative frequency of students that take a bicycle to school and also take a bus to all students taking a bus to school? By row: Take the Bus to School Do Not Take the Bus to School Total Take a Bicycle to School Do Not Take a Bicycle to School Total 0.42 + 0.58 = 1.00 0.33 + 0.67 = 1.00 0.37 + 0.63 = 1.00 Answer 91

Relative Frequency What is the relative frequency of students that do not take a bicycle to school and do not take a bus to all students that do not take a bus to school? By row: Take the Bus to School Do Not Take the Bus to School Total Take a Bicycle to School Do Not Take a Bicycle to School Total 0.42 + 0.58 = 1.00 0.33 + 0.67 = 1.00 0.37 + 0.63 = 1.00 Answer 92

37 What is the relative frequency of students that take a bicycle to school but do not take a bus to the total number of students that do not take the bus? By row: Take the Bus to School Do Not Take the Bus to School Total Take a Bicycle to School Do Not Take a Bicycle to School Total 0.42 + 0.58 = 1.00 0.33 + 0.67 = 1.00 0.37 + 0.63 = 1.00 Answer 93

38 What is the relative frequency of the students that do not take a bicycle to school, but do take the bus to the all the students that take the bus to school? By row: Take the Bus to School Do Not Take the Bus to School Total Take a Bicycle to School Do Not Take a Bicycle to School Total 0.42 + 0.58 = 1.00 0.33 + 0.67 = 1.00 0.37 + 0.63 = 1.00 Answer 94

39 By Column: What is the relative frequency of students that take a bicycle to school and also take a bus to school, to the total number of students that take a bicycle to school? By column: Take a Bicycle to School Do Not Take a Bicycle to School Total Take the Bus to School Do Not Take the Bus to School Total 1.00 1.00 1.00 Answer 95

40 What is the relative frequency of students that do not take a bicycle to school and do not take the school bus to the total number of students that do not take a bicycle to school? By column: Take the Bus to School Do Not Take the Bus to School Take a Bicycle to School Do Not Take a Bicycle to School Total Total 1.00 1.00 1.00 Answer 96

41 What is the relative frequency of students that take a bicycle to school, but do not take the bus to all students that take a bicycle to school? By column: Take the Bus to School Do Not Take the Bus to School Take a Bicycle to School Do Not Take a Bicycle to School Total Total 1.00 1.00 1.00 Answer 97

Relative Frequency By Row Use the following two way table to calculate the relative frequencies by row. Allowance No Allowance Total Chores 49 16 65 No Chores 10 26 36 Total 59 42 101 Chores No Chores Total Allowance No Allowance Total 98

Relative Frequency Why do we calculate relative frequencies? We can use relative frequencies to determine if there is an association between the two categories. For example, does there seem to be a relationship between whether or not a student receives an allowance compared to whether or not a student does chores? By row: Allowance No Allowance Total Chores 1.00 No Chores 1.00 Total 1.00 Approximately 0.75 or 75% of students that receive an allowance do chores, and out of those that do chores only 0.25 or 25% of students receive no allowance. 99

Relative Frequency By Column Use the following two way table to calculate the relative frequencies by column. Allowance No Allowance Total Chores 49 16 65 No Chores 10 26 36 Total 59 42 101 Chores Allowance No Allowance Total Is there a relationship between students that do chores to the amount of students that receive an allowance? No Chores Total 100

Two way Table Construct a two way table using the following information. Kelly found that 49 people had dogs in her school. Out of the 49 people, 30 people had cats. 50 people had cats in her school. 22 people had neither cats nor dogs at home. Dog No Dog Total Cat No Cat Total 101

Relative Frequency Using the two way table, calculate the relative frequencies by column and by row. By row: Dog No Dog Total Cat No Cat Total By column: Dog No Dog Total Cat No Cat Total 102

42 What is the relative frequency of the people who have a cat and a dog at home to the number of people that have cats? Dog No Dog Total Cat No Cat Total Cat No Cat Total Dog 30 19 49 Answer No Dog 20 22 42 Total 50 41 91 103

43 What is the relative frequency of the people who have a dog and a cat to the number of people that have a dog? Dog No Dog Total Cat No Cat Total Answer 104

44 What is the relative frequency of the people who have no cat, but have a dog to the number of people that have no cats? Dog No Dog Total Cat No Cat Total Answer 105

45 The table shows the results of a random survey of students in grade 7 and grade 8. Every student surveyed gave a response. Each student was asked if he or she exercised less than 5 hours last week or 5 or more hours last week. Based on the results of the survey, which statements are true? Select each correct statement. A More grade 8 students were surveyed than grade 7 students. B A total of 221 students were surveyed. C Less than 50% of the grade 8 students surveyed exercised 5 or more hours last week. D More than 50% of the students surveyed exercised less than 5 hours last week. E A total of 107 grade 7 students were surveyed. Answer From PARCC EOY sample test calculator #3 106

Construct a Two way Table Survey your classmates to find out if they play sports and/or play an instrument. Construct a two way table displaying the results. (Write "yes" or "no") Then calculate the relative frequencies by row and by column. Is there a relationship between the number of students that play sports vs. the number of students that play an instrument? 107

Glossary Teacher Notes Return to Table of Contents 108

Bivariate Data Two sets of related data that is being compared. Data of two variables. (Two Variable Data) Variables: 1. Shoe Size Bivariate Data Variables: 1. Temperature 2. Sales Variables: 1. Hours 2. Math Grade 1 variable Univariate Data Back to Instruction 109

Extrapolation A data point that is outside the range of data. If it is 50 o outside, what would If it is 90 o outside, what would (77,610) be the predicted ice cream sales? be the predicted ice cream sales? (53,180) range = 610 180 y = 17x 721 y = 17(50) 721 y = 851 721 y = 129 $129 $129 < $180 y = 17x 721 y = 17(90) 721 y = 1,530 721 y = 809 $809 $809 > $610 Back to Instruction 110

Frequency The quantity of just how many of a certain even occurs. The frequency of kids who take the bus to school is 12. The frequency of kids who ride their bikes to school is 11. The frequency of kids who do not take the bus to school is 18. Back to Instruction 111

Interpolation A data point that is inside the range of data. If it is 70 o outside, what would If it is 63 o outside, what would (77,610) be the predicted ice cream sales? be the predicted ice cream sales? (53,180) range = $610 $180 y = 17x 721 y = 17(70) 721 y = 1,190 721 y = 469 $469 $180 < $469 < $610 y = 17x 721 y = 17(63) 721 y = 1,071 721 y = 350 $350 $180 < $350 < $610 Back to Instruction 112

Linear A graph that is represented by a straight line. Back to Instruction 113

Line of Best Fit A line on a graph showing the general direction that a group of points seem to be heading. Trend Line. Back to Instruction 114

Negative Association A correlation of points that is linear with a negative slope. Back to Instruction 115

No Association A correlation of points that is linear with a slope of zero. A horizontal line graph. Back to Instruction 116

Non Linear A graph that is not represented by a straight line. A curved line. Back to Instruction 117

Positive Association A correlation of points that is linear with a positive slope. Back to Instruction 118

Prediction Equation An equation that is created using the line of best fit. A line that can predict outcomes using the given data. y = mx+b If it is 70 o outside, what would be the predicted ice cream sales? Ice Cream Sales $ (53,180) (73,520) Temperature degrees F y = 17x 721 y = 17x 721 y = 17(70) 721 y = 1,190 721 y = 469 $469 Back to Instruction 119

Relative Frequency Ratios that compares the value of a certain category to the subtotal in that category. The relative frequency of students who only take the bus to the total bus riders is 0.58. The relative frequency of students who only ride their bikes to the total bike riders is 0.33. The relative frequency of students who only ride their bikes to the total students is 0.37. Back to Instruction 120

Scatter Plot A graph of plotted points that show the relationship between two sets of data. Back to Instruction 121

Two Way Table A table that displays information as it pertains to two different categories. Allowance vs. Chores School Bus vs. Bicycle Back to Instruction 122