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26 Apr 2012, 02:54
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If m is a positive odd integer between 2 and 30, then m is divisible by how many different positive prime numbers?
(1) m is not divisible by 3.
(2) m is not divisible by 5.
(1) m is not divisible by 3.
(2) m is not divisible by 5.
My doubt is when we analyse stat. 1, aren’t we left with
7,11,13,17,19,23,25,29
out of which isn’t 25 has a different answer to the question than the other numbers?
don’t we need stat. 2 to answer it?
7,11,13,17,19,23,25,29
out of which isn’t 25 has a different answer to the question than the other numbers?
don’t we need stat. 2 to answer it?
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26 Apr 2012, 04:26
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kashishh
The question asks for "... how many different prime numbers?"
If you are thinking that 25 is divisible by 5 and 5, it still counts as one.
(1) m is not divisible by 3
m is not divisible by 2 anyway since we are talking about odd numbers. Next prime number is 5. The next one is 7 but 5*7 = 35 which is greater than 30. So even if we take the two smallest possible primes, no odd number in the given range can have both as factors. So m must have only one prime number as a factor.
(2) m is not divisible by 5
m could be divisible by 3 and 7 (since 3*7 = 21 which lies in our range). So m could be divisible by one prime or by two different primes. So this statement is not sufficient.
Answer (A)
26 Apr 2012, 03:08
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kashishh
No, since 25 (as well as all other possible values of m from statement (1)), is divisible only by one prime number - 5.
If m is a positive odd integer between 2 and 30, then m is divisible by how many different positive prime numbers?
Since the range is not that big we can write down all possible value of m for each statement.
(1) m is not divisible by 3 --> m can be: 5, 7, 11, 13, 17, 19, 23, 25, and 29. Each has only one distinct prime in its prime factorization. Sufficient.
(2) m is not divisible by 5 --> m can be: 3, 7, 9, 11, 13, 17, 19, 21, STOP. Each but 21 has one prime in its prime factorization, while 21 has two primes: 3 and 7. Not sufficient.
Answer: A.
Hope it's clear.
