-
saintforlife
- Senior | Next Rank: 100 Posts
- Posts: 37
- Joined: Tue Aug 16, 2011 12:41 pm
Does there exist an integer d such that x>d>1 and x/d is an integer?
(1) 11!+2≤x≤11!+12
(2) x≥2^5
My answer was A. Is that that correct answer?
My thought process was:
(2) x≥2^5 - Not sufficient => Because there are many numbers greater than 32 that are both primes and composites. Eliminates B and D.
(1) 11!+2≤x≤11!+12 - Sufficient => Because in the first expression 2 can be factored out between 11! and 2 and in the 2nd expression, 6 can be factored out between 11! and 12.
I've seen problems before where the choice is something like 11!+2≤x≤11!+11, where the 2nd term in the 2nd expression is the same as the factorial (11!+11). But in this problem, the 2nd term is 12 (11!+12). Does this change anything? In my opinion it doesn't, because the 2nd expression (11!+12) is still a multiple of 6. Thoughts?
Also I'd like an expert to comment on this:
Somebody told me that if the (1)st answer choice said: 11!+2<x<11!+12 instead of 11!+2≤x≤11!+12, there is no way to solve this problem. I am thinking it is the "=" to sign that is the difference maker. Can somebody explain if I am on the right track and the exact reasoning behind this assertion?
(1) 11!+2≤x≤11!+12
(2) x≥2^5
My answer was A. Is that that correct answer?
My thought process was:
(2) x≥2^5 - Not sufficient => Because there are many numbers greater than 32 that are both primes and composites. Eliminates B and D.
(1) 11!+2≤x≤11!+12 - Sufficient => Because in the first expression 2 can be factored out between 11! and 2 and in the 2nd expression, 6 can be factored out between 11! and 12.
I've seen problems before where the choice is something like 11!+2≤x≤11!+11, where the 2nd term in the 2nd expression is the same as the factorial (11!+11). But in this problem, the 2nd term is 12 (11!+12). Does this change anything? In my opinion it doesn't, because the 2nd expression (11!+12) is still a multiple of 6. Thoughts?
Also I'd like an expert to comment on this:
Somebody told me that if the (1)st answer choice said: 11!+2<x<11!+12 instead of 11!+2≤x≤11!+12, there is no way to solve this problem. I am thinking it is the "=" to sign that is the difference maker. Can somebody explain if I am on the right track and the exact reasoning behind this assertion?
