Last visit was: 24 Apr 2026, 11:34 It is currently 24 Apr 2026, 11:34
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
User avatar
Bunuel
User avatar
Math Expert
Joined: 02 Sep 2009
Last visit: 24 Apr 2026
Posts: 109,816
Own Kudos:
811,046
 [13]
Given Kudos: 105,873
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: 109,816
Kudos: 811,046
 [13]
If a < b, is a > 0? (1) a^2 < b^2 (2) a^2 < ab < b^2 10 Aug 2018, 03:21
1
Kudos
Add Kudos
12
Bookmarks
Bookmark this Post
00:00
Start Timer
Pause Timer
Resume Timer
Show Answer
Hide
Show
History
B
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!

Difficulty:

65% (hard)

Question Stats:

55% (02:00) correct 45% (02:08) wrong based on 291 sessions

History

Date
Time
Result
Not Attempted Yet
If a < b, is a > 0?


(1) a^2 < b^2

(2) a^2 < ab < b^2
ShowHide Answer
Official Answer
B
avatar
Gemelo90
avatar
Joined: 06 May 2018
Last visit: 11 Oct 2018
Posts: 42
Own Kudos:
19
 [2]
Given Kudos: 8
Posts: 42
Kudos: 19
 [2]
If a < b, is a > 0? (1) a^2 < b^2 (2) a^2 < ab < b^2 10 Aug 2018, 09:29
1
Kudos
Add Kudos
1
Bookmarks
Bookmark this Post
If a < b, is a > 0?


(1) a^2 < b^2

(2) a^2 < ab < b^2

Choosing different values for (1): a=-2 < b=3 or a=2 < b=3 Hence, not sufficient

Choosing different values for (2): a=2 < 2*3 < 3 but a=-2 <-2*3 <3 violates the statement. Hence, B is sufficient
avatar
devlin
avatar
Joined: 23 Aug 2017
Last visit: 11 Oct 2018
Posts: 19
Own Kudos:
4
 [2]
Given Kudos: 5
Posts: 19
Kudos: 4
 [2]
If a < b, is a > 0? (1) a^2 < b^2 (2) a^2 < ab < b^2 10 Aug 2018, 14:00
2
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Bunuel
If a < b, is a > 0?


(1) a^2 < b^2

(2) a^2 < ab < b^2
Show more

1) any square number hide its signal. Not sufficient
2) ab > 0, so a > 0. Sufficient
User avatar
Skyline393
User avatar
Joined: 04 Oct 2018
Last visit: 07 May 2020
Posts: 113
Own Kudos:
1,082
 [1]
Given Kudos: 141
Location: Viet Nam
Posts: 113
Kudos: 1,082
 [1]
If a < b, is a > 0? (1) a^2 < b^2 (2) a^2 < ab < b^2 05 Mar 2019, 02:30
1
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Bunuel
If a < b, is a > 0?


(1) a^2 < b^2

(2) a^2 < ab < b^2
Show more

(1) |a| < |b|
a = 5, b = 7 =>|a| < |b| => a > 0
a = -5, b = 7 => |a| < |b| => a < 0
=> Stm1 insufficient.
(2) a^2 < ab < b^2 => ab > 0 => a & b are both negative or positive
a = 5, b = 7 => a^2 < ab < b^2 => a > 0
a= -5, b = -3 ( a<b) => this violates a^2 < ab < b^2 (since 25 can't < 15 can't < 9) => This case can not be existed...
=> a & b are only positive => a > 0 => Sufficient
Hence B
User avatar
exc4libur
User avatar
Joined: 24 Nov 2016
Last visit: 22 Mar 2022
Posts: 1,680
Own Kudos:
1,469
Given Kudos: 607
Location: United States
Posts: 1,680
Kudos: 1,469
If a < b, is a > 0? (1) a^2 < b^2 (2) a^2 < ab < b^2 Updated on: 21 Aug 2019, 03:51
Originally posted by exc4libur on 20 Aug 2019, 04:59.
Last edited by exc4libur on 21 Aug 2019, 03:51, edited 1 time in total.
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Bunuel
If a < b, is a > 0?

(1) a^2 < b^2
(2) a^2 < ab < b^2
Show more

\(a<b…a-b<0\)

(1) \(a^2 < b^2…|a|<|b|\):
if \(a<0\) then \(b>0\) (\(b\) ≠ negative because \(a<b\) and \(|a|<|b|\))
if \(a>0\) then \(b>0\)
both cases are possible, insufi.

(2) \(a^2 < ab < b^2…a^2 < ab…a^2-ab<0…a(a-b)<0\):
if \(a<0\) then \(a-b>0…or…a>b\): but given \(a<b\) this is not possible
if \(a>0\) then \(a-b<0…or…a<b\): this is sufi.

Answer (B).
User avatar
Kinshook
User avatar
Major Poster
Joined: 03 Jun 2019
Last visit: 24 Apr 2026
Posts: 5,986
Own Kudos:
5,859
 [1]
Given Kudos: 163
Location: India
Schools: HBS '26 CBS '26 Wharton '26
GMAT 1: 690 Q50 V34
WE:Engineering (Transportation)
Products:
My Reviews
Schools: HBS '26 CBS '26 Wharton '26
GMAT 1: 690 Q50 V34
Posts: 5,986
Kudos: 5,859
 [1]
If a < b, is a > 0? (1) a^2 < b^2 (2) a^2 < ab < b^2 20 Aug 2019, 05:33
1
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Bunuel
If a < b, is a > 0?


(1) a^2 < b^2

(2) a^2 < ab < b^2
Show more

Given: a < b

Asked: Is a > 0?

(1) \(a^2 < b^2\)
|a|<|b|
a can be +ve or -ve and b must be +ve
NOT SUFFICIENT

(2) a^2 < ab < b^2
ab > a^2 > 0
ab>0
a & b have same sign
\(a^2 < ab < b^2\) => |a|<|b|
a can be +ve or -ve and b must be +ve
But a & b have same sign
b = +ve => a = +ve
a>0
SUFFICIENT

IMO B
User avatar
KarishmaB
User avatar
Joined: 16 Oct 2010
Last visit: 23 Apr 2026
Posts: 16,442
Own Kudos:
79,404
Given Kudos: 485
Location: Pune, India
Expert
Expert reply
Active GMAT Club Expert! Tag them with @ followed by their username for a faster response.
Posts: 16,442
Kudos: 79,404
If a < b, is a > 0? (1) a^2 < b^2 (2) a^2 < ab < b^2 21 Aug 2019, 03:14
Kudos
Add Kudos
Bookmarks
Bookmark this Post
exc4libur
Bunuel
If a < b, is a > 0?

(1) a^2 < b^2
(2) a^2 < ab < b^2

VeritasKarishma hey how are you, could you check this out?

\(a<b…a-b<0\)

(1) \(a^2 < b^2…|a|<|b|\):
if \(a<0\) then \(b<0…or…b>0\)
if \(a>0\) then \(b>0\)
both cases are possible, insufi.

(2) \(a^2 < ab < b^2…a^2 < ab…a^2-ab<0…a(a-b)<0\):
if \(a<0\) then \(a-b>0…or…a>b\): but given \(a<b\) this is not possible
if \(a>0\) then \(a-b<0…or…a<b\): this is sufi.

Answer (B).
Show more

In stmnt 1, in the highlighted part, b cannot be negative.
a can be positive or negative, as you mentioned.

Rest all is good.
User avatar
exc4libur
User avatar
Joined: 24 Nov 2016
Last visit: 22 Mar 2022
Posts: 1,680
Own Kudos:
1,469
Given Kudos: 607
Location: United States
Posts: 1,680
Kudos: 1,469
If a < b, is a > 0? (1) a^2 < b^2 (2) a^2 < ab < b^2 21 Aug 2019, 03:49
Kudos
Add Kudos
Bookmarks
Bookmark this Post
VeritasKarishma
exc4libur
Bunuel
If a < b, is a > 0?

(1) a^2 < b^2
(2) a^2 < ab < b^2

VeritasKarishma hey how are you, could you check this out?

\(a<b…a-b<0\)

(1) \(a^2 < b^2…|a|<|b|\):
if \(a<0\) then \(b<0…or…b>0\)
if \(a>0\) then \(b>0\)
both cases are possible, insufi.

(2) \(a^2 < ab < b^2…a^2 < ab…a^2-ab<0…a(a-b)<0\):
if \(a<0\) then \(a-b>0…or…a>b\): but given \(a<b\) this is not possible
if \(a>0\) then \(a-b<0…or…a<b\): this is sufi.

Answer (B).

In stmnt 1, in the highlighted part, b cannot be negative.
a can be positive or negative, as you mentioned.

Rest all is good.
Show more

ah yes, bc of the \(|a|<|b|\)
thank you! :)
User avatar
Archit3110
User avatar
Major Poster
Joined: 18 Aug 2017
Last visit: 24 Apr 2026
Posts: 8,629
Own Kudos:
5,190
Given Kudos: 243
Status:You learn more from failure than from success.
Location: India
Concentration: Sustainability, Marketing
GMAT Focus 1: 545 Q79 V79 DI73
GMAT Focus 2: 645 Q83 V82 DI81
GPA: 4
WE:Marketing (Energy)
Products:
GMAT Club Tests Forum Quiz
GMAT Focus 2: 645 Q83 V82 DI81
Posts: 8,629
Kudos: 5,190
If a < b, is a > 0? (1) a^2 < b^2 (2) a^2 < ab < b^2 23 Aug 2019, 08:07
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Bunuel
If a < b, is a > 0?


(1) a^2 < b^2

(2) a^2 < ab < b^2
Show more

test with values ;
a,b ; 2,3 , 1/4,1,3 , -2,-1

#1
a^2 < b^2
not sufficeint as a >0 as 1/4 and -ve as -2
#2a^2 < ab < b^2
can be re written as ; a<1<b
sufficient to say that a is -ve
IMO B
User avatar
GMATGuruNY
User avatar
Joined: 04 Aug 2010
Last visit: 02 Apr 2026
Posts: 1,347
Own Kudos:
3,905
Given Kudos: 9
Schools:Dartmouth College
Expert
Expert reply
Posts: 1,347
Kudos: 3,905
If a < b, is a > 0? (1) a^2 < b^2 (2) a^2 < ab < b^2 09 Sep 2020, 12:53
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Bunuel
If a < b, is a > 0?


(1) a^2 < b^2

(2) a^2 < ab < b^2
Show more

Statement 1:
Case 1: a=1 and b=2
In this case, a>0, so the answer to the question stem is YES.
Case 2: a=0 and b=2
In this case, a=0, so the answer to the question stem is NO.
INSUFFICIENT.

Statement 2:
Since \(a^2<ab\) only if \(a\) is NONZERO, \(a^2>0\).
Thus:
\(0<a^2< ab\)
\(0<ab\)
Implication:
\(a\) and \(b\) have the SAME SIGN.

Prompt: \(a<b\) --> \(a-b<0\)
Statement 2: \(a^2<b^2\) --> \(a^2-b^2<0\) --> \((a+b)(a-b)<0\)

Since \(a-b<0\) and \((a+b)(a-b)<0\), we know that \(a+b>0\).
Since \(a+b>0\) and \(a\) and \(b\) have the same sign, they must both be POSITIVE.
Thus, the answer to the question stem is YES.

Show Spoiler
B
User avatar
bumpbot
User avatar
Non-Human User
Joined: 09 Sep 2013
Last visit: 04 Jan 2021
Posts: 38,974
Own Kudos:
1,117
Posts: 38,974
Kudos: 1,117
If a < b, is a > 0? (1) a^2 < b^2 (2) a^2 < ab < b^2 16 Apr 2022, 06:03
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Automated notice from GMAT Club BumpBot:

A member just gave Kudos to this thread, showing it’s still useful. I’ve bumped it to the top so more people can benefit. Feel free to add your own questions or solutions.

This post was generated automatically.
Moderators:
Bunuel
Math Expert
109816 posts
kingbucky
498 posts
Gmat860sanskar
212 posts