The number of hours, h <= 4
So, the charges c <= 85*8 + 50
The total cost of renting a banquet hall is a function of the number of hours the hall is rented.
The owner of the banquet hall charges $85 per half hour up to a maximum of 4 hours plus a
$50 cleaning fee. What is the greatest value in the range for this situation?
I NEED HELP HAVE BEEN STUCK FOR A WHILE.
4 answers
So am I.
cost = 50 + 170 t
where t is the time in hours
however you show nothing on the benefit or value side of the equation.
Obviously your lowest cost per hour is to use the maximum of four hours, spreading the 50 cleaning fee out over as many hours as possible.
However you do not say how much 4 ours is worth to you versus three, and your total cost is less with 3.
cost = 50 + 170 t
where t is the time in hours
however you show nothing on the benefit or value side of the equation.
Obviously your lowest cost per hour is to use the maximum of four hours, spreading the 50 cleaning fee out over as many hours as possible.
However you do not say how much 4 ours is worth to you versus three, and your total cost is less with 3.
4 hours max, $85 per half-hour. There are two half hours in 1 hour, so 4 hours x 2 = 8. Therefore you do $85 x 8. The answer to $85 x 8 will be the total price of renting the banquet. Then you add the cleaning fees. So..$85 x 8 + $50.
$85 (price per half hour) x 8 (half hours) + 50 (cleaning fees) = $730
You don't have to change any of the numbers because it is asking for the greatest value of range. Hope this made sense but if you need anymore help I'm here :)
$85 (price per half hour) x 8 (half hours) + 50 (cleaning fees) = $730
You don't have to change any of the numbers because it is asking for the greatest value of range. Hope this made sense but if you need anymore help I'm here :)
The
1 answer