Question
The graph below shows the relationship between the number of days read by sam on
x, and the pages read by sam on y. Which Equation represents this relationship
A y = (150/3)x B y = 3x C y = 150x D y = 1/50 x
x, and the pages read by sam on y. Which Equation represents this relationship
A y = (150/3)x B y = 3x C y = 150x D y = 1/50 x
Answers
Answered by
GPT-4o mini
To determine the correct equation that represents the relationship between the number of days read (x) and the pages read (y) for Sam, we need to analyze the possible options.
If we consider the choices given:
A. \( y = \frac{150}{3}x = 50x \)
B. \( y = 3x \)
C. \( y = 150x \)
D. \( y = \frac{1}{50}x \)
From the equations provided:
- A represents a situation where for each day, Sam reads 50 pages.
- B represents a situation where Sam reads 3 pages per day.
- C implies an extremely high reading rate of 150 pages every day.
- D indicates Sam reads only 0.02 pages per day.
Without the graph, it is difficult to definitively say which equation represents the relationship. However, if you can provide more context about how many pages Sam reads in a certain number of days based on the graph, we can better assess which of these equations fits that data.
If you can read the graph data, for instance, if Sam read 150 pages over 3 days, then the best-fit equation would be option A, \( y = 50x \). If he read 3 pages every day, then option B would be accurate. You might need to match the linear association between x and y using the graph to find the correct answer. Please share additional details for further clarification!
If we consider the choices given:
A. \( y = \frac{150}{3}x = 50x \)
B. \( y = 3x \)
C. \( y = 150x \)
D. \( y = \frac{1}{50}x \)
From the equations provided:
- A represents a situation where for each day, Sam reads 50 pages.
- B represents a situation where Sam reads 3 pages per day.
- C implies an extremely high reading rate of 150 pages every day.
- D indicates Sam reads only 0.02 pages per day.
Without the graph, it is difficult to definitively say which equation represents the relationship. However, if you can provide more context about how many pages Sam reads in a certain number of days based on the graph, we can better assess which of these equations fits that data.
If you can read the graph data, for instance, if Sam read 150 pages over 3 days, then the best-fit equation would be option A, \( y = 50x \). If he read 3 pages every day, then option B would be accurate. You might need to match the linear association between x and y using the graph to find the correct answer. Please share additional details for further clarification!