Last visit was: 21 Apr 2026, 13:57 It is currently 21 Apr 2026, 13:57
Home
Messages
Tests
Schools
Events
Close
GMAT Club Daily Prep
Thank you for using the timer - this advanced tool can estimate your performance and suggest more practice questions. We have subscribed you to Daily Prep Questions via email.

Customized
for You

we will pick new questions that match your level based on your Timer History

Track
Your Progress

every week, we’ll send you an estimated GMAT score based on your performance

Practice
Pays

we will pick new questions that match your level based on your Timer History
Not interested in getting valuable practice questions and articles delivered to your email? No problem, unsubscribe here.
Go to My Error Log Learn more
Close
Request Expert Reply
Confirm Cancel
Back to Forum
Create Topic
 1   2   
User avatar
alchemist009
User avatar
Joined: 22 Apr 2011
Last visit: 06 Oct 2016
Posts: 102
Own Kudos:
675
 [144]
Given Kudos: 18
Concentration: Accounting
Schools:Mccombs business school, Mays business school, Rotman Business School,
GPA: 3.44
Posts: 102
Kudos: 675
 [144]
A “Sophie Germain” prime is any positive prime number p for 15 May 2012, 21:48
19
Kudos
Add Kudos
124
Bookmarks
Bookmark this Post
00:00
Start Timer
Pause Timer
Resume Timer
Show Answer
Hide
Show
History
D
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!

Difficulty:

95% (hard)

Question Stats:

36% (02:37) correct 64% (02:28) wrong based on 1249 sessions

History

Date
Time
Result
Not Attempted Yet
A “Sophie Germain” prime is any positive prime number p for which 2p + 1 is also prime. The product of all the possible units digits of Sophie Germain primes greater than 5 is

A. 3
B. 7
C. 21
D. 27
E. 189
ShowHide Answer
Official Answer
D
Most Helpful Reply
User avatar
Bunuel
User avatar
Math Expert
Joined: 02 Sep 2009
Last visit: 21 Apr 2026
Posts: 109,729
Own Kudos:
810,460
 [55]
Given Kudos: 105,798
Products:
GMAT Club Tests Forum Quiz
Expert
Expert reply
Active GMAT Club Expert! Tag them with @ followed by their username for a faster response.
Posts: 109,729
Kudos: 810,460
 [55]
A “Sophie Germain” prime is any positive prime number p for 16 May 2012, 00:38
27
Kudos
Add Kudos
27
Bookmarks
Bookmark this Post
alchemist009
A “Sophie Germain” prime is any positive prime number p for which 2p + 1 is also prime. The product of all the possible units digits of Sophie Germain primes greater than 5 is

A. 3
B. 7
C. 21
D. 27
E. 189
Show more

A prime number greater than 5 can have only the following four units digits: 1, 3, 7, or 9.

If the units digit of p is 1 then the units digit of 2p+1 would be 3, which is a possible units digit for a prime. For example consider p=11=prime --> 2p+1=23=prime;

If the units digit of p is 3 then the units digit of 2p+1 would be 7, which is a possible units digit for a prime. For example consider p=23=prime --> 2p+1=47=prime;

If the units digit of p is 7 then the units digit of 2p+1 would be 5, which is NOT a possible units digit for a prime;

If the units digit of p is 9 then the units digit of 2p+1 would be 9, which is a possible units digit for a prime. For example consider p=29=prime --> 2p+1=59=prime.

The product of all the possible units digits of Sophie Germain primes greater than 5 is 1*3*9=27.

Answer: D.

Hope it's clear.
General Discussion
User avatar
geno5
User avatar
Joined: 05 Dec 2011
Last visit: 29 Mar 2022
Posts: 66
Own Kudos:
99
 [1]
Given Kudos: 2
Location: Canada
Concentration: Accounting, Finance
GMAT Date: 09-08-2012
GPA: 3
Products:
My Reviews
Posts: 66
Kudos: 99
 [1]
A “Sophie Germain” prime is any positive prime number p for Updated on: 16 May 2012, 00:47
Originally posted by geno5 on 15 May 2012, 23:33.
Last edited by geno5 on 16 May 2012, 00:47, edited 1 time in total.
1
Kudos
Add Kudos
Bookmarks
Bookmark this Post
+1 D

1*3*9=27, Rest of the Digits cannot be prime.

even cannot be prime. 5 not prime and (7)*2+1=15 not prime.
User avatar
kinjiGC
User avatar
Joined: 03 Feb 2013
Last visit: 12 Oct 2025
Posts: 789
Own Kudos:
2,736
 [3]
Given Kudos: 567
Location: India
Concentration: Operations, Strategy
Schools: Tepper '17 (M$) W.P. Carey '17 (A$) NUS '17 (A)
GMAT 1: 760 Q49 V44
GPA: 3.88
WE:Engineering (Computer Software)
Products:
My Reviews
Schools: Tepper '17 (M$) W.P. Carey '17 (A$) NUS '17 (A)
GMAT 1: 760 Q49 V44
Posts: 789
Kudos: 2,736
 [3]
A “Sophie Germain” prime is any positive prime number p for 11 Jan 2014, 09:06
2
Kudos
Add Kudos
1
Bookmarks
Bookmark this Post
Bunuel
alchemist009
A “Sophie Germain” prime is any positive prime number p for which 2p + 1 is also prime. The product of all the possible units digits of Sophie Germain primes greater than 5 is

A. 3
B. 7
C. 21
D. 27
E. 189

A prime number greater than 5 can have only the following four units digits: 1, 3, 7, or 9.

If the units digit of p is 1 then the units digit of 2p+1 would be 3, which is a possible units digit for a prime. For example consider p=11=prime --> 2p+1=23=prime;

If the units digit of p is 3 then the units digit of 2p+1 would be 7, which is a possible units digit for a prime. For example consider p=23=prime --> 2p+1=47=prime;

If the units digit of p is 7 then the units digit of 2p+1 would be 5, which is NOT a possible units digit for a prime;

If the units digit of p is 9 then the units digit of 2p+1 would be 9, which is a possible units digit for a prime. For example consider p=29=prime --> 2p+1=59=prime.

The product of all the possible units digits of Sophie Germain primes greater than 5 is 1*3*9=27.

Answer: D.

Hope it's clear.
Show more

Why 7 is not considered for the final answer?
User avatar
Bunuel
User avatar
Math Expert
Joined: 02 Sep 2009
Last visit: 21 Apr 2026
Posts: 109,729
Own Kudos:
810,460
 [1]
Given Kudos: 105,798
Products:
GMAT Club Tests Forum Quiz
Expert
Expert reply
Active GMAT Club Expert! Tag them with @ followed by their username for a faster response.
Posts: 109,729
Kudos: 810,460
 [1]
A “Sophie Germain” prime is any positive prime number p for 11 Jan 2014, 09:09
Kudos
Add Kudos
1
Bookmarks
Bookmark this Post
kinjiGC
Bunuel
alchemist009
A “Sophie Germain” prime is any positive prime number p for which 2p + 1 is also prime. The product of all the possible units digits of Sophie Germain primes greater than 5 is

A. 3
B. 7
C. 21
D. 27
E. 189

A prime number greater than 5 can have only the following four units digits: 1, 3, 7, or 9.

If the units digit of p is 1 then the units digit of 2p+1 would be 3, which is a possible units digit for a prime. For example consider p=11=prime --> 2p+1=23=prime;

If the units digit of p is 3 then the units digit of 2p+1 would be 7, which is a possible units digit for a prime. For example consider p=23=prime --> 2p+1=47=prime;

If the units digit of p is 7 then the units digit of 2p+1 would be 5, which is NOT a possible units digit for a prime;

If the units digit of p is 9 then the units digit of 2p+1 would be 9, which is a possible units digit for a prime. For example consider p=29=prime --> 2p+1=59=prime.

The product of all the possible units digits of Sophie Germain primes greater than 5 is 1*3*9=27.

Answer: D.

Hope it's clear.

Why 7 is not considered for the final answer?
Show more

If the units digit of p is 7 then the units digit of 2p+1 would be 5, which is NOT a possible units digit for a prime greater than 5.
User avatar
kinjiGC
User avatar
Joined: 03 Feb 2013
Last visit: 12 Oct 2025
Posts: 789
Own Kudos:
2,736
Given Kudos: 567
Location: India
Concentration: Operations, Strategy
Schools: Tepper '17 (M$) W.P. Carey '17 (A$) NUS '17 (A)
GMAT 1: 760 Q49 V44
GPA: 3.88
WE:Engineering (Computer Software)
Products:
My Reviews
Schools: Tepper '17 (M$) W.P. Carey '17 (A$) NUS '17 (A)
GMAT 1: 760 Q49 V44
Posts: 789
Kudos: 2,736
A “Sophie Germain” prime is any positive prime number p for 11 Jan 2014, 09:21
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Bunuel
kinjiGC
Bunuel
A “Sophie Germain” prime is any positive prime number p for which 2p + 1 is also prime. The product of all the possible units digits of Sophie Germain primes greater than 5 is

A. 3
B. 7
C. 21
D. 27
E. 189

A prime number greater than 5 can have only the following four units digits: 1, 3, 7, or 9.

If the units digit of p is 1 then the units digit of 2p+1 would be 3, which is a possible units digit for a prime. For example consider p=11=prime --> 2p+1=23=prime;

If the units digit of p is 3 then the units digit of 2p+1 would be 7, which is a possible units digit for a prime. For example consider p=23=prime --> 2p+1=47=prime;

If the units digit of p is 7 then the units digit of 2p+1 would be 5, which is NOT a possible units digit for a prime;

If the units digit of p is 9 then the units digit of 2p+1 would be 9, which is a possible units digit for a prime. For example consider p=29=prime --> 2p+1=59=prime.

The product of all the possible units digits of Sophie Germain primes greater than 5 is 1*3*9=27.

Answer: D.

Hope it's clear.

Why 7 is not considered for the final answer?

If the units digit of p is 7 then the units digit of 2p+1 would be 5, which is NOT a possible units digit for a prime greater than 5.
Show more

It might be simple, but I have a doubt here. The question asks product of all the possible unit digits of Sophie Germain primes.

As 47 is a sophie germain prime number and prime number and 47 is > than 5, so 7 being the unit digit should be included in the product to get the final answer. That is why I marked 189.
User avatar
Bunuel
User avatar
Math Expert
Joined: 02 Sep 2009
Last visit: 21 Apr 2026
Posts: 109,729
Own Kudos:
810,460
 [2]
Given Kudos: 105,798
Products:
GMAT Club Tests Forum Quiz
Expert
Expert reply
Active GMAT Club Expert! Tag them with @ followed by their username for a faster response.
Posts: 109,729
Kudos: 810,460
 [2]
A “Sophie Germain” prime is any positive prime number p for 11 Jan 2014, 09:26
2
Kudos
Add Kudos
Bookmarks
Bookmark this Post
kinjiGC
Bunuel
kinjiGC
Why 7 is not considered for the final answer?

If the units digit of p is 7 then the units digit of 2p+1 would be 5, which is NOT a possible units digit for a prime greater than 5.

It might be simple, but I have a doubt here. The question asks product of all the possible unit digits of Sophie Germain primes.

As 47 is a sophie germain prime number and prime number and 47 is > than 5, so 7 being the unit digit should be included in the product to get the final answer. That is why I marked 189.
Show more

A “Sophie Germain” prime is any positive prime number p for which 2p + 1 is also prime. 47 is NOT a “Sophie Germain” prime because 2p+1=95, which is NOT a prime. Again, a “Sophie Germain” prime cannot have 7 as its units digit because the units digit of 2p+1 in this case would be 5. No prime greater than 5 has 5 as its units digit.

Hope it's clear.
User avatar
kinjiGC
User avatar
Joined: 03 Feb 2013
Last visit: 12 Oct 2025
Posts: 789
Own Kudos:
2,736
Given Kudos: 567
Location: India
Concentration: Operations, Strategy
Schools: Tepper '17 (M$) W.P. Carey '17 (A$) NUS '17 (A)
GMAT 1: 760 Q49 V44
GPA: 3.88
WE:Engineering (Computer Software)
Products:
My Reviews
Schools: Tepper '17 (M$) W.P. Carey '17 (A$) NUS '17 (A)
GMAT 1: 760 Q49 V44
Posts: 789
Kudos: 2,736
A “Sophie Germain” prime is any positive prime number p for 11 Jan 2014, 10:34
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Thanks Banuel.

I read the premise wrongly. :cry:
User avatar
iPen
User avatar
Joined: 08 Jun 2015
Last visit: 20 Dec 2020
Posts: 80
Own Kudos:
109
 [4]
Given Kudos: 40
Posts: 80
Kudos: 109
 [4]
A “Sophie Germain” prime is any positive prime number p for 19 Jul 2015, 11:01
4
Kudos
Add Kudos
Bookmarks
Bookmark this Post
I see - I misunderstood the question at first...

It's asking for all of the possible UNIQUE units digits, not all of the units digits of SG primes multiplied out.

For example, 11, 23, 29, 53... are primes. Unique units are only 1, 3, and 9, which multiply to 27.

If interpreted literally, it would go on forever (i.e. answer = infinite).

Knowing this and the answer choices, there's only one intended Q&A combo possible - unique units and not infinite.

I do think, however, that they should have worded it more clearly as it is ambiguous.
User avatar
warrior1991
User avatar
Joined: 03 Mar 2017
Last visit: 03 Feb 2022
Posts: 540
Own Kudos:
438
Given Kudos: 596
Location: India
Concentration: Operations, Technology
Products:
My Reviews
Posts: 540
Kudos: 438
A “Sophie Germain” prime is any positive prime number p for 01 Jul 2019, 20:13
Kudos
Add Kudos
Bookmarks
Bookmark this Post
VeritasKarishma Bunuel chetan2u egmat AjiteshArun

taking prime number as p=23 , its 2p+1 =47 and 47 is a prime number.

Then why are we not considering unit digit of 47 (i.e 7) here.
User avatar
AjiteshArun
User avatar
Major Poster
Joined: 15 Jul 2015
Last visit: 21 Apr 2026
Posts: 6,074
Own Kudos:
5,139
 [1]
Given Kudos: 743
Location: India
GMAT Focus 1: 715 Q83 V90 DI83
GMAT 1: 780 Q50 V51
GRE 1: Q170 V169
Expert
Expert reply
Active GMAT Club Expert! Tag them with @ followed by their username for a faster response.
GMAT Focus 1: 715 Q83 V90 DI83
GMAT 1: 780 Q50 V51
GRE 1: Q170 V169
Posts: 6,074
Kudos: 5,139
 [1]
A “Sophie Germain” prime is any positive prime number p for 01 Jul 2019, 21:20
1
Kudos
Add Kudos
Bookmarks
Bookmark this Post
warrior1991
VeritasKarishma Bunuel chetan2u egmat AjiteshArun

taking prime number as p=23 , its 2p+1 =47 and 47 is a prime number.

Then why are we not considering unit digit of 47 (i.e 7) here.
Show more
The question says:

A “Sophie Germain” prime is any positive prime number p for which 2p + 1 is also prime.

This means that it is 23 that is a Sophie Germain prime, not 47, because;

if p=23, 2p+1 is prime
but
if p=47, 2p+1 is not prime

Therefore, we won't consider 47 a Sophie Germain prime.
User avatar
KarishmaB
User avatar
Joined: 16 Oct 2010
Last visit: 21 Apr 2026
Posts: 16,438
Own Kudos:
79,375
 [2]
Given Kudos: 484
Location: Pune, India
Expert
Expert reply
Active GMAT Club Expert! Tag them with @ followed by their username for a faster response.
Posts: 16,438
Kudos: 79,375
 [2]
A “Sophie Germain” prime is any positive prime number p for 01 Jul 2019, 22:46
2
Kudos
Add Kudos
Bookmarks
Bookmark this Post
warrior1991
VeritasKarishma Bunuel chetan2u egmat AjiteshArun

taking prime number as p=23 , its 2p+1 =47 and 47 is a prime number.

Then why are we not considering unit digit of 47 (i.e 7) here.
Show more

Only p is the Sophie Germain prime, not the corresponding 2p + 1.
User avatar
IanStewart
User avatar
GMAT Tutor
Joined: 24 Jun 2008
Last visit: 17 Apr 2026
Posts: 4,143
Own Kudos:
11,267
 [1]
Given Kudos: 99
Expert
Expert reply
Posts: 4,143
Kudos: 11,267
 [1]
A “Sophie Germain” prime is any positive prime number p for 02 Jul 2019, 05:45
1
Kudos
Add Kudos
Bookmarks
Bookmark this Post
It's strange to ask for the "product of all the possible units digits" here, because then there's no reason to bother checking numbers with a units digit of "1" -- a product will be the same whether we include "1" or not. So you can save yourself a quarter of the work here and only check 3, 7 and 9, which was done perfectly in other solutions above.
User avatar
unraveled
User avatar
Joined: 07 Mar 2019
Last visit: 10 Apr 2025
Posts: 2,706
Own Kudos:
2,328
Given Kudos: 763
Location: India
WE:Sales (Energy)
Posts: 2,706
Kudos: 2,328
A “Sophie Germain” prime is any positive prime number p for 13 Jul 2019, 10:38
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Here's my take.

Since the question talks about "Sophie Germain" Primes we have to check for same.
2, 3, 5, 11, 23, 29, 41, 53, 71, 83, 89 and so on are all "Sophie Germain" Primes. For these primes greater than 5 units digits are 1,3,9 which repeats, hence product is 1*3*9=27.

Answer (D)
User avatar
Fdambro294
User avatar
Joined: 10 Jul 2019
Last visit: 20 Aug 2025
Posts: 1,333
Own Kudos:
771
Given Kudos: 1,656
Posts: 1,333
Kudos: 771
A “Sophie Germain” prime is any positive prime number p for 10 Sep 2020, 19:23
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Rule: the only Possible Units Digits that a Prime Number > 5 can have are the following: 1 - 3 - 7 - or 9

2p + 1 ALSO must = a Prime No.

Just using the Units Digits of the Possible Prime Numbers after applying 2p + 1:

Prime No. with a Units Digit of 1: the Units Digit = 2(......1) + 1 = ......2 + 2 = ......3

There must exist a Prime No. in the Infinite Amount of Primes that ends in a 1 and that is also a "Sophie Gemaine" Prime

(in fact 11 works: 2 * 11 + 1 = 23, another Prime Number)


Prime No. with a Units Digit of 3: the Units Digit = 2* (.....3) + 1 = ....6 + 1 = 7 Units Digit
There will be a Sophie-Germain Prime with a Units Digit of 3.


Prime No. with a Units Digit of 7: the Units Digit = 2 * (.....7) + 1 = .....4 + 1 = 5 Units Digit
The Number will be Divisible by 5, because the Units Digit will end in a 5. Thus, Any Primes > 5 that end in a Units Digit of 7 will never be a Sophie-Germain Prime

Prime No. with a Units Digit of 9: the Units Digit = 2 * (....9) + 1 = .....8 + 1 = 9 Units Diigt
There will be a Sophie-Germain Prime with a Units Digit of 9


The Product of all the Possible Units Digits = 1 * 3 * 9 = 27

Answer -D-
avatar
robinbjoern
avatar
Joined: 22 Mar 2020
Last visit: 13 Aug 2021
Posts: 25
Own Kudos:
11
Given Kudos: 102
Posts: 25
Kudos: 11
A “Sophie Germain” prime is any positive prime number p for 25 Sep 2020, 04:39
Kudos
Add Kudos
Bookmarks
Bookmark this Post
how do we know that there is no other sophie prime after 29? I mean there are infinitive prime numbers?
User avatar
IanStewart
User avatar
GMAT Tutor
Joined: 24 Jun 2008
Last visit: 17 Apr 2026
Posts: 4,143
Own Kudos:
11,267
Given Kudos: 99
Expert
Expert reply
Posts: 4,143
Kudos: 11,267
A “Sophie Germain” prime is any positive prime number p for 25 Sep 2020, 07:29
Kudos
Add Kudos
Bookmarks
Bookmark this Post
robinbjoern
how do we know that there is no other sophie prime after 29? I mean there are infinitive prime numbers?
Show more

Yes, there is an infinite number of prime numbers. And there are lots of Sophie Germain primes larger than 29 -- for example, 41 is another.

No one knows for sure if there are infinitely many Sophie Germain primes; that's a famous unsolved problem in mathematics. Mathematicians suspect there are infinitely many, because they aren't so rare that one would expect there to be a finite number of them, but no one has proved that yet.

Fortunately in this question, you don't need to establish how many Sophie Germain primes there are. The question only asks about their possible units digits, so you only need to consider the very finite set of possible units digits a number can have.
avatar
robinbjoern
avatar
Joined: 22 Mar 2020
Last visit: 13 Aug 2021
Posts: 25
Own Kudos:
11
Given Kudos: 102
Posts: 25
Kudos: 11
A “Sophie Germain” prime is any positive prime number p for 25 Sep 2020, 07:39
Kudos
Add Kudos
Bookmarks
Bookmark this Post
IanStewart
robinbjoern
how do we know that there is no other sophie prime after 29? I mean there are infinitive prime numbers?

Yes, there is an infinite number of prime numbers. And there are lots of Sophie Germain primes larger than 29 -- for example, 41 is another.

No one knows for sure if there are infinitely many Sophie Germain primes; that's a famous unsolved problem in mathematics. Mathematicians suspect there are infinitely many, because they aren't so rare that one would expect there to be a finite number of them, but no one has proved that yet.

Fortunately in this question, you don't need to establish how many Sophie Germain primes there are. The question only asks about their possible units digits, so you only need to consider the very finite set of possible units digits a number can have.
Show more


actually the questions asks abou "The product of all the possible units digits of Sophie Germain primes greater than 5 is" and we can't know this for sure. The question should ask about "A possible product of the unit digits.."
User avatar
IanStewart
User avatar
GMAT Tutor
Joined: 24 Jun 2008
Last visit: 17 Apr 2026
Posts: 4,143
Own Kudos:
11,267
 [2]
Given Kudos: 99
Expert
Expert reply
Posts: 4,143
Kudos: 11,267
 [2]
A “Sophie Germain” prime is any positive prime number p for 25 Sep 2020, 08:18
2
Kudos
Add Kudos
Bookmarks
Bookmark this Post
robinbjoern

actually the questions asks abou "The product of all the possible units digits of Sophie Germain primes greater than 5 is" and we can't know this for sure. The question should ask about "A possible product of the unit digits.."
Show more

I think you might be interpreting the question to mean something more like "what is the product of the units digits of all Sophie Germain primes greater than 5", and if the question asked that, it would be unanswerable -- no one even knows if there's a finite number of that type of prime. But the question asks something different; it asks for the product of the possible units digits of those primes. So we just need to consider each possible units digit from 0 through 9, work out if each is a possible units digit of a Sophie Germain prime, and multiply together those that we find are possible.

I do find it strange to ask for a product in this question though, as I mentioned in an earlier post.
User avatar
Giyo
User avatar
Joined: 28 May 2023
Last visit: 16 Jan 2024
Posts: 6
Given Kudos: 6
Posts: 6
Kudos: 0
A “Sophie Germain” prime is any positive prime number p for 19 Oct 2023, 20:55
Kudos
Add Kudos
Bookmarks
Bookmark this Post
geno5
+1 D

1*3*9=27, Rest of the Digits cannot be prime.

even cannot be prime. 5 not prime and (7)*2+1=15 not prime.
Show more
But when we take 23 , we get 47. Both are prime...so condition is satisfied...then how u can use the logic 7*2+1 = 5. ? I'm not getting it

Posted from my mobile device
 1   2   
Moderators:
Bunuel
Math Expert
109729 posts
Krunaal
Tuck School Moderator
853 posts