cloaked_vessel wrote:
One week, a certain truck rental lot had a total of 20 trucks, all of which were on the lot Monday morning. If 50% of the trucks that were rented out during the week were returned to the lot on or before Saturday morning of that week, and if there were at least 12 trucks on the lot that Saturday morning, what is the greatest number of different trucks that could have been rented out during the week?
A 18
B 16
C 12
D 8
E 4
There are numerous ways in which you can solve this question. Brute force method if the relation between rented and non-rented trucks in not very clear:
Monday morning - 20 trucks
Saturday morning - at least 12 trucks
50% trucks rented in the week were returned.
maximum no of trucks rented out = ?
I want to maximize the no. of trucks rented so I say - If 20 trucks were rented (i.e. all of them), then we should have 50% i.e. 10 of them back. But we have more; we have at least 12.
So the no. of trucks rented out must be less than 20 (because they cannot be more than 20).
What about 18? If 18 trucks are rented out, 2 remain in the lot through the week. Out of 18, 9 are returned so total 11 are in the lot. But we need at least 12 in the lot.
Let's go further down and try 16. 4 trucks do not leave the lot. Out of 16, 8 come back so we have 12 trucks in the lot.
(As we keep reducing the number of trucks rented out, the total number of trucks in the lot of Saturday morning keeps increasing. We need to maximize the number of trucks rented out which will be at the minimum possible value of total number of trucks in the lot.)
Therefore, 16 trucks must have been rented out.
Algebraic approach:
As we increase the number of trucks rented, the total number of trucks in the lot on Saturday morning decreases since out of the rented trucks only 50% come back (while all non-rented trucks stay in the lot).
(e.g If none of the 20 trucks are rented, the lot will have 20 trucks on Saturday. If 18 trucks are not rented, the lot will have 19 (18 + 1 rented comes back) trucks on Saturday morning.)
So maximize the number of trucks rented, we should try to minimize the number of trucks in the lot on Saturday morning i.e. make it 12.
N - Not rented trucks; R - Rented trucks
N + R = 20
N + R/2 = 12
R = 16