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A ride-sharing service charges $4.25 for every ride, plus $0.30 per mile. If m represents miles, which rule for p(m) models the situation? Responses p(m)=0.30m 4.25 p times m is equal to 0 point 3 0 m plus 4 point 2 5 p(m)=−0.30m 4.25 p times m is equal to negative 0 point 3 0 m plus 4 point 2 5 p(m)=0.30m−4.25 p times m is equal to 0 point 3 0 m minus 4 point 2 5 p(m)=4.25m 0.30

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Answer:

[tex]\sf p(m) = 0.30m + 4.25 [/tex]

Step-by-step explanation:

To model the situation, we use the function [tex]\sf p(m) [/tex] where [tex]\sf m [/tex] represents the number of miles traveled.

The function is given by:

[tex]\sf p(m) = 0.30m + 4.25 [/tex]

Here's how this function represents the cost:

  • [tex]\sf 0.30m [/tex] represents the cost per mile traveled.
  • [tex]\sf 4.25 [/tex] represents the fixed cost for each ride, regardless of the distance traveled.

Therefore, the correct model for [tex]\sf p(m) [/tex] is:

[tex]\large\boxed{\boxed{\sf p(m) = 0.30m + 4.25 }}[/tex]

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