Asked by HaydenReturned
Use the image to answer the question.
A line graph is shown, starting at the origin and continues off the graph. The x axis is labeled Minutes, and ranges from 0 to 25 in increments of 5. The y axis is labeled Miles, and ranges from 0 to 10 in increments of 5.
Based on the graph of the function, what value will correctly complete the sentence?
(1 point)
Josie can run two miles in
minutes.
Remaining Attempts : 2
A line graph is shown, starting at the origin and continues off the graph. The x axis is labeled Minutes, and ranges from 0 to 25 in increments of 5. The y axis is labeled Miles, and ranges from 0 to 10 in increments of 5.
Based on the graph of the function, what value will correctly complete the sentence?
(1 point)
Josie can run two miles in
minutes.
Remaining Attempts : 2
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To answer the question based on the described graph, we need to determine how many minutes it takes Josie to run two miles.
If the graph shows a direct relationship between the minutes and the miles, we can look for the point where the y-axis value (Miles) equals 2. Typically, the x-axis corresponds to the time in minutes.
Assuming the line graph steadily increases, and based on the range given (0 to 10 miles), we need to pinpoint where 2 miles lies on the graph.
If the relationship is linear and you mention the increments on the x-axis (minutes) are in 5-minute intervals, it is likely that the graph intersects the line for 2 miles at some specific point:
- If the value aligns with the graph correctly and rises evenly, then it may suggest that 2 miles could correspond to 10 minutes or 5 minutes depending on the slope of the line.
Based on common patterns, if we assume a consistent speed that allows the running to be easy for the graph's interpretation, we could conclude:
Josie can run two miles in **10 minutes**.
Please verify against the graph visibility to ensure this is indeed the outcome indicated on the visual representation you've described. If you're uncertain, consider checking the exact point where the y-axis reading of 2 miles hits across to the x-axis representing minutes.
If the graph shows a direct relationship between the minutes and the miles, we can look for the point where the y-axis value (Miles) equals 2. Typically, the x-axis corresponds to the time in minutes.
Assuming the line graph steadily increases, and based on the range given (0 to 10 miles), we need to pinpoint where 2 miles lies on the graph.
If the relationship is linear and you mention the increments on the x-axis (minutes) are in 5-minute intervals, it is likely that the graph intersects the line for 2 miles at some specific point:
- If the value aligns with the graph correctly and rises evenly, then it may suggest that 2 miles could correspond to 10 minutes or 5 minutes depending on the slope of the line.
Based on common patterns, if we assume a consistent speed that allows the running to be easy for the graph's interpretation, we could conclude:
Josie can run two miles in **10 minutes**.
Please verify against the graph visibility to ensure this is indeed the outcome indicated on the visual representation you've described. If you're uncertain, consider checking the exact point where the y-axis reading of 2 miles hits across to the x-axis representing minutes.
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