All Common Core: 8th Grade Math Resources
Example Questions
Example Question #1 : Drawing Conclusions From Graphs & Tables
Matt conducted a statistical experiment to determine the relationship between yearly salary earned and age. In this study, he assigned age (in years) as the independent variable, and yearly salary as the dependent variable. He drew a line of best fit and found a slope of . What does this mean?
Each year, a person's salary increases by
Each month, a person's salary decreases by
Each month, a person's salary increases by
Each year, a person's salary decreases by
Each year, a person's salary increases by
The slope of a line is the rate that a line increases or decreases. The question tells us that Matt looked at the relationship between age, in years; thus, the correct answer should include "each year", which eliminates the answer choices that include "each month". Finally the slope is , which is a positive number; thus, the line increases by each year. This means that the correct answer is "Each year, a person's salary increases by ".
Example Question #2 : Drawing Conclusions From Graphs & Tables
Mrs. Frame conducted a statistical experiment to determine the relationship between test grades and the number of hours her students spent studying. In this study, she assigned the number of hours spent studying as the independent variable, and the test grades (in percentages) were assigned as the dependent variable. She plotted the data on a scatter plot and drew a line of best fit. If the slope of the best fit line was and one of her data points was , can we determine the of the best fit line? If yes, determine the .
Yes, the can be determined:
Yes ,the can be determined:
Yes ,the can be determined:
No, the can't be determined.
Yes ,the can be determined:
The equation of the best fit line will be in slope intercept form:
The question tells us that the slope is and we are provided with a data point, so we can plug in the known values into the equation to solve for the
We had to convert our percentage into a decimal in order to multiple, but we need to change it back to a percent before we subtract so that we arrive at the correct answer because is a percent based on the information from the question
which means the y-intercept is
Example Question #1 : Use The Equation Of A Linear Model To Solve Problems: Ccss.Math.Content.8.Sp.A.3
Mr. Miller conducted a statistical experiment to determine the relationship between final grades and the number of school days that his students missed. In this study, he assigned the number of missed school days as the independent variable, and the final grade was assigned as the dependent variable. He plotted his results on a scatter plot. If the results follow a linear relationship, what is a reasonable conclusion that could be found based these results?
A slope of
An undefined slope
A negative slope
A positive slope
A negative slope
We know, from attending school ourselves, that every day we learn something new in school. When a day of school is missed, there is a lot of catch up that needs to be done, but the teacher's instructions and lesson given each day can't be repeated the day you return, because the teacher has to move on with the rest of the class. If you missed a week of school, that's five days of lessons that were missed. Wouldn't it be challenging to catch up on what was missed, as well as learning what the teacher is currently teaching when you return? This would likely be challenging; thus, we can conclude that the more days of school missed, the lower a students final grade will be. As the number of days missed increases, the final grade will decrease; thus, the best fit line will have a negative slope.
Example Question #2 : Use The Equation Of A Linear Model To Solve Problems: Ccss.Math.Content.8.Sp.A.3
Matt conducted a statistical experiment to determine the relationship between yearly salary earned and age. In this study, he assigned age (in years) as the independent variable, and yearly salary as the dependent variable. He plotted his results on a scatter plot. If the results follow a linear relationship, what is a reasonable conclusion that could be found based these results?
A negative slope
A slope of
An undefined slope
A positive slope
A positive slope
To help us answer this question, let's think about what we know about jobs:
If you were to get a part time job when you turn , it's likely that you'll make minimum wage because it's your first job and you haven't finished high school, nor would you have a college education. However, if you think about a doctor, graduating from medical school when he/she is about years old, the doctor is likely going to make a lot more than minimum wage because he's gone through high school, college, and medical school. As you can probably assume, doctors make a salary much higher than minimum wage. Based on this scenario, we can conclude that as age increases, salary increases; thus, the slope of the best fit line will have a positive slope.
Example Question #1 : Use The Equation Of A Linear Model To Solve Problems: Ccss.Math.Content.8.Sp.A.3
Mrs. Frame conducted a statistical experiment to determine the relationship between test grades and the number of hours her students spent studying. In this study, she assigned the number of hours spent studying as the independent variable, and the test grades (in percentages) were assigned as the dependent variable. She plotted her results on a scatter plot. If the results follow a linear relationship, what is a reasonable conclusion that could be found based these results?
A slope of
An undefined slope
A negative slope
A positive slope
A positive slope
We know, from attending school ourselves, that when we have a test coming up that we want to do well on, we'll study for the test. Normally, the harder you study and the more time you spend studying, the more likely you are to do well on the test. If you don't study at all, and don't know the material that's being covered on a test, you'll like do poorly on a test; thus, we can conclude that the more time we spend studying, the higher our test grade will be. As the number of hours studied increases, the score on the test will increase; thus, the best fit line will have a positive slope.
Example Question #1 : Use The Equation Of A Linear Model To Solve Problems: Ccss.Math.Content.8.Sp.A.3
A doctor conducted a statistical experiment to determine the relationship between age and height. In this study, she assigned age as the independent variable, and height (in inches) as the dependent variable. She plotted the data on a scatter plot. The doctor drew a line of best fit and found the to be . What does this mean?
A newborn baby will have an average height of
Every year a person grows by
Every month a person grows by
The average person has a height of
A newborn baby will have an average height of
The question tells us that age is the independent variable, or the , and height is the dependent variable, or the
The is when ; thus, when a person is just born their age is and their average height is
Example Question #7 : Drawing Conclusions From Graphs & Tables
A used car dealership conducted a statistical experiment to determine the relationship between the age of a car and the cost. In this study, he assigned age as the independent variable, and price as the dependent variable. He plotted the data on a scatter plot and drew a line of best fit. The was . What does this mean?
AS a car ages, the price decreases by
The price of a brand new car is
The slope for the best fit line of this data set is
As a car ages, the price increases by
The price of a brand new car is
The question tells us that age is the independent variable, or the , and price is the dependent variable, or the
The is when ; thus, when a car is brand new its age is and the average price is
Example Question #2 : Use The Equation Of A Linear Model To Solve Problems: Ccss.Math.Content.8.Sp.A.3
A used car dealership conducted a statistical experiment to determine the relationship between the age of a car and the cost. In this study, he assigned age as the independent variable, and price as the dependent variable. He plotted the data on a scatter plot and drew a line of best fit. If the results follow a linear relationship, what is a reasonable conclusion that could be found based these results?
An undefined slope
A negative slope
A positive slope
A slope of
A negative slope
Imagine that you were buying a car. You have two options: a brand new car for or the same car, but a ten year older model for , which one would you pick? Most likely, you would take the brand new car because they are the same price. As a car get's older, it decreases in value because it becomes outdated and it the car will likely have been driven a lot more miles the older it gets. This means that the slope of the best fit line will be negative, since the price will decrease as the age increases.
Example Question #6 : Use The Equation Of A Linear Model To Solve Problems: Ccss.Math.Content.8.Sp.A.3
A doctor conducted a statistical experiment to determine the relationship between weight and height. In this study, she assigned weight as the independent variable, and height (in inches) as the dependent variable. She plotted the data on a scatter plot. If the results follow a linear relationship, what is a reasonable conclusion that could be found based these results?
A positive slope
A slope of
An undefined slope
A negative slope
A positive slope
Let's think about ourselves in this scenario, as you've gotten taller, has your weight increased or decreased? Most likely, as your height has increased your weight has also increased; thus the slope of the best fit line for this data would be positive.
Example Question #32 : Statistics & Probability
Mr. Miller conducted a statistical experiment to determine the relationship between final grades and the number of school days that his students missed. In this study, he assigned the number of missed school days as the independent variable, and the final grade was assigned as the dependent variable. Every student started the class with a , and based on class assignments, tests scores, etc. the students' final grade was determined. Mr. Miller found that for every one day missed, the students' grade dropped by . Based on this data, select the equation of the best fit line for this scenario.
The equation of the best fit line will be in slope intercept form:
The question tells us that days are the independent variable, or , and the dependent variable is the final class grade, or
Every students starts with a . If we think about a graph, then the start of the graph is when is equal to zero, which is the ; thus, the value of the equation should be
The final piece that we need is the slope, or value, which is associated with the number of days missed. Let's recall from the question that for every single day missed the students grade dropped by . "Drops" means that we are going to have a negative slope; thus, the slope for this scenario is the following:
If we put all of the pieces together, then the equation for the line of best fit is the following: