-
MFaulkner
- Senior | Next Rank: 100 Posts
- Posts: 38
- Joined: Sat Nov 21, 2009 1:56 pm
- Location: Indianapolis
- Thanked: 2 times
- GMAT Score:760
What is the greatest number of identical bouquets that can be made out of 21 white and 91 red tulips if no flowers are to be left out? (Two bouquets are identical whenever the number of red tulips in the two bouquets is equal and the number of white tulips in the two bouquets is equal)
(A) 3
(B) 4
(C) 5
(D) 6
(E) 7
Source: OG Quant Review 2nd Edition
Answer: E
Here is my question (Spoiler alert)
So, the answer is found by finding the greatest common factor of 21 and 91->
21=(7)(3) and 91=(7)(13)
GCF = 7
The explanation then says that 7 bouquets can be made, each with 3 white tulips and 13 red tulips.
However, I just cannot conceptualize why the GCF is the answer to this problem. I am still unclear with the explanation and would have never guessed to have taken the GCF to solve the problem. Can someone please shed some light for me?
Thanks,
Michael
(A) 3
(B) 4
(C) 5
(D) 6
(E) 7
Source: OG Quant Review 2nd Edition
Answer: E
Here is my question (Spoiler alert)
So, the answer is found by finding the greatest common factor of 21 and 91->
21=(7)(3) and 91=(7)(13)
GCF = 7
The explanation then says that 7 bouquets can be made, each with 3 white tulips and 13 red tulips.
However, I just cannot conceptualize why the GCF is the answer to this problem. I am still unclear with the explanation and would have never guessed to have taken the GCF to solve the problem. Can someone please shed some light for me?
Thanks,
Michael
