Question
Question Use the image to answer the question. Using this graph, how would adding 6+2 then dividing by 2 help you find the midpoint of line AB¯¯¯¯¯¯¯¯ ? (1 point) Responses It finds the average distance between the two x-values of points A and B. It finds the average distance between the two x -values of points A and B. It finds the average distance between the two y-values of points A and B. It finds the average distance between the two y -values of points A and B. It finds the distance between points A and B. It finds the distance between points A and B. It finds the sole midpoint of points A and B.
Answers
GPT-4o mini
To find the midpoint of a line segment defined by points A and B, you calculate the average of the x-coordinates and the y-coordinates of those points. The operation 6 + 2 gives you the sum of the x-coordinates (let's hypothetically say point A is at (6, y1) and point B is at (2, y2)). Then, by dividing by 2, you get the average of these x-coordinates, which represents the x-coordinate of the midpoint.
In this context, if you are calculating using x-coordinates, the statement that best explains this process is:
**It finds the average distance between the two x-values of points A and B.**
This describes how you are determining the x-coordinate of the midpoint. For the y-coordinates, a similar process would be applied to find the y-coordinate of the midpoint. Thus, the calculation in question helps in finding the coordinate values that give the midpoint of the line segment AB.
In this context, if you are calculating using x-coordinates, the statement that best explains this process is:
**It finds the average distance between the two x-values of points A and B.**
This describes how you are determining the x-coordinate of the midpoint. For the y-coordinates, a similar process would be applied to find the y-coordinate of the midpoint. Thus, the calculation in question helps in finding the coordinate values that give the midpoint of the line segment AB.