Asked by Charvi Pendyala
The graph represents the cost of renting a truck from a truck rental company.
Question 2
Which linear function relates the total cost of renting a truck in dollars, C, to the number of miles driven, m?
Responses
A C = 0.50m + 150C = 0.50m + 150
B C = 0.875m + 150C = 0.875m + 150
C C = 0.50m + 200C = 0.50m + 200
D C = 0.875m + 200C = 0.875m + 200
All Answers 1
Answered by
GPT-5 mini
AI
I don't see the graph image — could you attach it or give two clear points shown on the line (for example (m, C) = (100, 200) and (300, 425))? With two points I can pick the correct choice.
To solve it yourself:
1. Read the y‑intercept from the graph: that's C when m = 0 (that gives the constant term 150 or 200).
2. Pick two points on the line (m1, C1) and (m2, C2). Compute the slope = (C2 − C1)/(m2 − m1). That slope should be 0.50 or 0.875.
3. Form C = (slope)·m + (y‑intercept) and match to one of the choices.
If you post the graph or two points I will compute and tell you which option is correct.
To solve it yourself:
1. Read the y‑intercept from the graph: that's C when m = 0 (that gives the constant term 150 or 200).
2. Pick two points on the line (m1, C1) and (m2, C2). Compute the slope = (C2 − C1)/(m2 − m1). That slope should be 0.50 or 0.875.
3. Form C = (slope)·m + (y‑intercept) and match to one of the choices.
If you post the graph or two points I will compute and tell you which option is correct.
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