Answer: (1) There are 233 parking spots on the top level
(2) There are 72 parking spots reserved for drivers with disabilities
(3) There are 970 spots for hourly parking
(4) He would spend $7200 for parking in a year
Step-by-step explanation: In the first instance, there is a total of 1327 parking spots altogether allocated into various categories.
(1) There are 6 levels in all, and the first level has 162 parking spots. herefore the remaining 5 levels would have 1165 parking spots left as shown below;
Remainder = 1327 - 162
Remainder = 1165
If however the remaining 1165 parking spots are distributed equally among the other 5 levels, then each level would have 233 parking spots each as shown below;
Five levels = 1165
Each level = 1165/5
Each level = 233
Therefore the top level has 233 parking spots
(2) On each level (out of all 6 levels), there are 12 spots reserved for drivers with disability. Therefore at all parking levels you would have 72 spots as shown;
Reserved spot per level = 12
Reserved spot for 6 levels = 12 * 6
Reserved spot for 6 levels = 72
Therefore there are 72 spots reserved for driver with disability
(3) Other than the spots reserved for drivers with disability (72), there are 285 parking spots for monthly rental. The rest are for hourly parking, and this is calculated as shown;
Hourly parking + monthly rental + reserved parking = 1327
Hourly parking + 285 + 72 = 1327
Hourly parking + 357 = 1327
Hourly parking = 1327 - 357
Hourly parking = 970
Therefore there are 970 spots available for hourly parking.
(4) If the daily parking rate is $30, and Jack parks his car for 5 days in a week, then he would spend
30 * 5 = 150
If he parks for 4 weeks in a month, then he would spend
150 * 4 = 600
Therefore to pay for parking in a year (12 months) he would spend
600 * 12 = 7200
Therefore he would spend $7,200 for parking in a year
