Select TWO tables that represent a proportional relationship between x and y.
Responses
Enid jogs on a treadmill for exercise. Each time she finishes jogging, the treadmill will report the number of calories she burned. Enid claims that the distance she jogs and the number of calories she burns are in a proportional relationship. Data from her last four jogs are shown.
Which of the following methods can Enid use to test her claim? Choose the two correct answers.
Responses
She could calculate the ratio change in calories burned to change in miles jogged for two data point and compare the results to the same ratio with two other data points.
She could calculate the ratio change in calories burned to change in miles jogged for two data point and compare the results to the same ratio with two other data points.
She could plot the data on a coordinate plane and see if a straight line starting at (0, 0) passes through all the data points.
She could plot the data on a coordinate plane and see if a straight line starting at (0, 0) passes through all the data points.
She could put the data in a table and check to see that the difference between the number of calories burned changes by the same amount for each row.
She could put the data in a table and check to see that the difference between the number of calories burned changes by the same amount for each row.
She could calculate the ratio between the number of calories burned for each pair of jogs and see if the ratio is always the same.
She could calculate the ratio between the number of calories burned for each pair of jogs and see if the ratio is always the same.
The correct answers are:
- She could plot the data on a coordinate plane and see if a straight line starting at (0, 0) passes through all the data points.
- She could calculate the ratio between the number of calories burned for each pair of jogs and see if the ratio is always the same.
These methods are appropriate for testing whether the relationship between distance jogged and calories burned is proportional, as they involve examining the pattern of the data points and the ratios between the variables.
you were wrong answer right this time
Enid jogs on a treadmill for exercise. Each time she finishes jogging, the treadmill will report the number of calories she burned. Enid claims that the distance she jogs and the number of calories she burns are in a proportional relationship. Data from her last four jogs are shown.
Which of the following methods can Enid use to test her claim? Choose the two correct answers.
Responses
She could calculate the ratio change in calories burned to change in miles jogged for two data point and compare the results to the same ratio with two other data points.
She could calculate the ratio change in calories burned to change in miles jogged for two data point and compare the results to the same ratio with two other data points.
She could plot the data on a coordinate plane and see if a straight line starting at (0, 0) passes through all the data points.
She could plot the data on a coordinate plane and see if a straight line starting at (0, 0) passes through all the data points.
She could put the data in a table and check to see that the difference between the number of calories burned changes by the same amount for each row.
She could put the data in a table and check to see that the difference between the number of calories burned changes by the same amount for each row.
She could calculate the ratio between the number of calories burned for each pair of jogs and see if the ratio is always the same.
She could calculate the ratio between the number of calories burned for each pair of jogs and see if the ratio is always the same.
I apologize for the confusion in the previous answer. The correct answers are:
- She could plot the data on a coordinate plane and see if a straight line starting at (0, 0) passes through all the data points.
- She could calculate the ratio between the number of calories burned for each pair of jogs and see if the ratio is always the same.
These methods are appropriate for testing whether the relationship between distance jogged and calories burned is proportional, as they involve examining the pattern of the data points and the ratios between the variables.
As an AI language model, I cannot see the tables you are referring to. Please provide the tables or more specific information.
just try to answer
Select TWO tables that represent a proportional relationship between x and y.
Responses
I'm sorry, as an AI language model, I am unable to answer this question without any given information or tables. Please provide the necessary information so I may assist you better.
your wrong again
Enid jogs on a treadmill for exercise. Each time she finishes jogging, the treadmill will report the number of calories she burned. Enid claims that the distance she jogs and the number of calories she burns are in a proportional relationship. Data from her last four jogs are shown.
Which of the following methods can Enid use to test her claim? Choose the two correct answers.
Responses
She could calculate the ratio change in calories burned to change in miles jogged for two data point and compare the results to the same ratio with two other data points.
She could calculate the ratio change in calories burned to change in miles jogged for two data point and compare the results to the same ratio with two other data points.
She could plot the data on a coordinate plane and see if a straight line starting at (0, 0) passes through all the data points.
She could plot the data on a coordinate plane and see if a straight line starting at (0, 0) passes through all the data points.
She could put the data in a table and check to see that the difference between the number of calories burned changes by the same amount for each row.
She could put the data in a table and check to see that the difference between the number of calories burned changes by the same amount for each row.
She could calculate the ratio between the number of calories burned for each pair of jogs and see if the ratio is always the same.
She could calculate the ratio between the number of calories burned for each pair of jogs and see if the ratio is always the same.
I apologize for the mistake in my previous responses. The correct answers are:
- She could plot the data on a coordinate plane and see if a straight line starting at (0, 0) passes through all the data points.
- She could calculate the ratio between the number of calories burned and the distance jogged for each of the four jogs and see if the ratios are the same.
These methods are appropriate for testing whether the relationship between distance jogged and calories burned is proportional. Checking the ratios of calories burned to distance jogged will help to determine if they have a constant ratio and plot the data on a coordinate plane to see if the points fall on a straight line through the origin.
The vertices of △ABC are (−6, 2), (−4, 6), and (−2, 2), and the vertices of △DEF are (5,-2), (3, −6), and (1, −2). Which of these sequences of transformations of △ABC exhibit the congruence between the two triangles? Select TWO that apply.
Responses
a reflection across the x-axis, a reflection across the y-axis, and a translation 1 unit right
a reflection across the x-axis, a reflection across the y-axis, and a translation 1 unit right
a rotation of 180° about the origin and a translation of 1 unit left
a rotation of 180° about the origin and a translation of 1 unit left
a reflection across the x-axis, a reflection across the y-axis, and a translation 1 unit left
a reflection across the x-axis, a reflection across the y-axis, and a translation 1 unit left
a rotation of 180° about the origin and a translation of 1 unit right
a rotation of 180° about the origin and a translation of 1 unit right
a reflection across the x-axis and a translation 1 unit right
a reflection across the x-axis and a translation 1 unit right
a reflection across the y-axis and a translation 1 unit left
a reflection across the y-axis and a translation 1 unit left