To rent a conoe, you pay a fee of $25 and an hourly rate of $5. Express the total cost of a rental as a function of hours, h. Then use the fuction to dertmine the total cost to rent a conoe for 8 hours.
The equation should be written in slope intercept form
c(h) = 25+5h
now, just find c(8)
5x8=40 40+25=__
find the answer then change it into slope intercept form....
EASY!
To express the total cost of renting a canoe as a function of hours, we can use the equation:
Total Cost = (hourly rate * number of hours) + fee
Where:
Hourly rate = $5
Number of hours = h (variable)
Fee = $25
So the equation in slope-intercept form would be:
Total Cost = 5h + 25
To determine the total cost to rent a canoe for 8 hours, we can substitute h = 8 into the function:
Total Cost = 5(8) + 25
Total Cost = 40 + 25
Total Cost = $65
Therefore, the total cost to rent a canoe for 8 hours would be $65.
To express the total cost of renting a canoe as a function of hours (h), we need to consider both the fixed fee and the hourly rate.
The fixed fee for renting a canoe is $25, which means regardless of the number of hours rented, this fee will always be present. This gives us the y-intercept of the equation, which is $25.
The hourly rate for renting a canoe is $5, which means for every hour rented, an additional $5 will be charged. This gives us the slope of the equation, which is $5.
To write the equation in slope-intercept form (y = mx + b), where y represents the total cost and x represents the number of hours rented, we have:
y = 5h + 25
This equation represents the total cost of renting a canoe as a function of hours.
Now, to find the total cost of renting a canoe for 8 hours, we substitute h = 8 into the equation:
y = 5(8) + 25
= 40 + 25
= $65
Therefore, the total cost of renting a canoe for 8 hours would be $65.