Two different primes may be said to "rhyme" around an integer if they are the same distance from the integer on the number line. For instance, 3 and 7 rhyme around 5. What integer between 1 and 20, inclusive, has the greatest number of distinct rhyming primes around it?
A. 12
B. 15
C. 17
D. 18
E. 20
The OA is D
Source: Manhattan Prep
Two different primes may said to "rhyme" around an
This topic has expert replies
GMAT/MBA Expert
- Brent@GMATPrepNow
- GMAT Instructor
- Posts: 16207
- Joined: Mon Dec 08, 2008 6:26 pm
- Location: Vancouver, BC
- Thanked: 5254 times
- Followed by:1268 members
- GMAT Score:770
If two numbers are rhyming primes, then the integer the rhyme around will be the AVERAGE of the two primes.swerve wrote:Two different primes may be said to "rhyme" around an integer if they are the same distance from the integer on the number line. For instance, 3 and 7 rhyme around 5. What integer between 1 and 20, inclusive, has the greatest number of distinct rhyming primes around it?
A. 12
B. 15
C. 17
D. 18
E. 20
The OA is D
Source: Manhattan Prep
For example, 3 and 7 rhyme around 5. Notice that the AVERAGE of 3 and 7 is 5.
Likewise, 5 and 23 rhyme around 14, and the AVERAGE of 5 and 23 is 14.
Now onto the solution...
List several primes: 2,3,5,7,11,13,17,19,23,29,31,37,41....
Now check the answer choices:
A)12
For 12 to be the integer that two primes rhyme around, we need 2 primes that have an AVERAGE of 12. In other words, we need 2 primes that ADD to 24. Now check the list of primes to find pairs that satisfy this condition.
We get: 5 & 19, 7 & 17, 11 & 13
Total of 3 pairs.
B)15
So, we need 2 distinct primes that ADD to 30.
We get: 7 & 23, 11 & 19, 13 & 17
Total of 3 pairs.
C)17
So, we need 2 distinct primes that ADD to 34.
We get: 3 & 31, 5 & 29, 11 & 23
Total of 3 pairs.
D)18
So, we need 2 distinct primes that ADD to 36.
We get: 5 & 31, 7 & 29, 13 & 23, 17 & 19
Total of 4 pairs.
E)20
So, we need 2 distinct primes that ADD to 40.
We get: 3 & 37, 11 & 29, 17 & 23
Total of 3 pairs.
Answer: D
Cheers,
Brent
GMAT/MBA Expert
- Jeff@TargetTestPrep
- GMAT Instructor
- Posts: 1462
- Joined: Thu Apr 09, 2015 9:34 am
- Location: New York, NY
- Thanked: 39 times
- Followed by:22 members
swerve wrote:Two different primes may be said to "rhyme" around an integer if they are the same distance from the integer on the number line. For instance, 3 and 7 rhyme around 5. What integer between 1 and 20, inclusive, has the greatest number of distinct rhyming primes around it?
A. 12
B. 15
C. 17
D. 18
E. 20
The OA is D
Source: Manhattan Prep
Since a pair of distinct numbers equidistant from an integer must have the same parity (i.e., both odd or both even), we don't need to check if the pair are even numbers. We also don't need to check if 1 is one of the two numbers of the pair since 1 is not a prime. With these facts in mind, let's check each given answer choice.
A. 12
11, 13 ... Yes; 9, 15 ... No; 7, 17 ... Yes; 5, 19 ... Yes; 3, 21 ... No
We see that 12 has 6 distinct rhyming primes around it.
B. 15
13, 17 ... Yes; 11, 19 ... Yes; 9, 21 ... No; 7, 23 ... Yes; 5, 25 ... No; 3, 27 ... No
We see that 15 has 6 distinct rhyming primes around it.
C. 17
15, 19 ... No; 13, 21... No; 11, 23 ... Yes; 9, 25 ... No; 7, 27 ... No; 5, 29 ... Yes; 3, 3... Yes
We see that 17 has 6 distinct rhyming primes around it.
D. 18
17, 19... Yes; 15, 21 ... No; 13, 23 ... Yes; 11, 25 ... No; 9, 27 ... No; 7, 29 ... Yes; 5, 31 ... Yes;
3, 33 ... No
We see that 18 has 8 distinct rhyming primes around it.
E. 20
19, 21 ... No; 17, 23 ... Yes; 15, 25 ... No; 13, 27 ... No; 11, 29 ... Yes; 9, 31 ... No; 7, 33 ... No;
5, 35 ... No; 3, 37 ... Yes
We see that 20 has 6 distinct rhyming primes around it.
Answer: D
Jeffrey Miller
Head of GMAT Instruction
[email protected]
See why Target Test Prep is rated 5 out of 5 stars on BEAT the GMAT. Read our reviews