Slope in Real-World Problems Quick Check%0d%0a3 of 53 of 5 Items%0d%0a%0d%0a%0d%0a%0d%0a%0d%0a%0d%0aQuestion%0d%0aA linear graph of parking fees in dollars based on hours parked has the points (2,20) and (6,44). How would you interpret the slope of the graph as the rate of change in the parking fee for each additional hour of parking?(1 point)%0d%0aResponses%0d%0a%0d%0aThe parking fee rises by $10 with each additional hour. %0d%0aThe parking fee rises by $10 with each additional hour. %0d%0a%0d%0aThe parking fee rises by $8 with each additional hour.%0d%0aThe parking fee rises by $8 with each additional hour.%0d%0a%0d%0aThe parking fee rises by $7.33 with each additional hour. %0d%0aThe parking fee rises by $7.33 with each additional hour. %0d%0a%0d%0aThe parking fee rises by $6 with each additional hour.
The correct interpretation of the slope of the graph is:
The parking fee rises by $6 with each additional hour.