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? \( p(m)=-0.30 m+4.25 \) \( p(m)=0.30 m+4.25 \) \( p(m)=4.25 m+0.30 \) \( p(m)=0.30 m-4.25 \)

The correct rule that models the situation is \( p(m)=0.30 m+4.25 \). In this formula, \( 4.25 \) represents the base fare for the ride, while \( 0.30 m \) adds the cost of travel per mile, making it the total price of the ride based on the distance traveled. To break it down, think of it this way: whenever you hop into that ride-sharing vehicle, you're paying for the privilege to ride and then an extra bit for each mile you zoom along. So, whether you're going just around the corner or on a longer adventure, that formula captures your ride's cost perfectly!