Last visit was: 21 Nov 2024, 17:53 It is currently 21 Nov 2024, 17:53

Close

GRE Prep 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 GRE 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.

Close

Request Expert Reply

Confirm Cancel
avatar
Manager
Manager
Joined: 22 Jul 2018
Posts: 80
Own Kudos [?]: 105 [0]
Given Kudos: 0
Send PM
avatar
Manager
Manager
Joined: 22 Jul 2018
Posts: 80
Own Kudos [?]: 105 [0]
Given Kudos: 0
Send PM
avatar
Supreme Moderator
Joined: 01 Nov 2017
Posts: 371
Own Kudos [?]: 470 [0]
Given Kudos: 0
Send PM
avatar
Manager
Manager
Joined: 22 Jul 2018
Posts: 80
Own Kudos [?]: 105 [0]
Given Kudos: 0
Send PM
Re: In which of the following scenarios is p>q? [#permalink]
I have attached a screenshot.
Attachments

Screenshot_2018-11-12 GRE Prep Club Tests.png
Screenshot_2018-11-12 GRE Prep Club Tests.png [ 9.53 KiB | Viewed 2347 times ]

avatar
Supreme Moderator
Joined: 01 Nov 2017
Posts: 371
Own Kudos [?]: 470 [0]
Given Kudos: 0
Send PM
Re: In which of the following scenarios is p>q? [#permalink]
2
Expert Reply
Sawant91 wrote:
In which of the following scenarios is p>q?

Indicate all possible scenarios.
A. \((0.11)^p>(0.11)^q\)
B. \(1^p>1^q\)
C. \((1.11)^p>(1.11)^q\)
D. \((1.01)^p>(1.01)^q\)
E. \((p+q)(p−q)>0\)
F. \(|p|>|q|\)


So where are the variables p and q - they are used as exponent or power..
some rules for the terms when the base is positive..
1) when the number, say x, is between 0 and 1 that is 0<x<1...
Higher the power, lower the value so x^3<x^2
2) when x=1
the values are always same irrespective of the power. 1^7 = 1^1
3) when x>1
Higher the power , higher the value so x^3>x^2

now let us see the choices..
A. \((0.11)^p>(0.11)^q\).....0<0.11<1 so case (1) p<q
B. \(1^p>1^q\).......... case (2).. cannot be determined
C. \((1.11)^p>(1.11)^q\).......1.11>1, so case (3).. p>q
D. \((1.01)^p>(1.01)^q\).......1.01>1, so case (3).. p>q
E. \((p+q)(p−q)>0.......p^2-q^2>0.....p^2>q^2\), we can just say |p|>|q|... say p is negative (-3)^2>2^2 but -3<2, so p<q and if both positive p>q
F. \(|p|>|q|\).... same as E above

thus only C and D

hope it helps
Retired Moderator
Joined: 07 Jan 2018
Posts: 739
Own Kudos [?]: 1447 [0]
Given Kudos: 93
Send PM
Re: In which of the following scenarios is p>q? [#permalink]
chetan2u wrote:
Sawant91 wrote:
In which of the following scenarios is p>q?

Indicate all possible scenarios.
A. \((0.11)^p>(0.11)^q\)
B. \(1^p>1^q\)
C. \((1.11)^p>(1.11)^q\)
D. \((1.01)^p>(1.01)^q\)
E. \((p+q)(p−q)>0\)
F. \(|p|>|q|\)


So where are the variables p and q - they are used as exponent or power..
some rules for the terms when the base is positive..
1) when the number, say x, is between 0 and 1 that is 0<x<1...
Higher the power, lower the value so x^3<x^2
2) when x=1
the values are always same irrespective of the power. 1^7 = 1^1
3) when x>1
Higher the power , higher the value so x^3>x^2

now let us see the choices..
A. \((0.11)^p>(0.11)^q\).....0<0.11<1 so case (1) p<q
B. \(1^p>1^q\).......... case (2).. cannot be determined
C. \((1.11)^p>(1.11)^q\).......1.11>1, so case (3).. p>q
D. \((1.01)^p>(1.01)^q\).......1.01>1, so case (3).. p>q
E. \((p+q)(p−q)>0.......p^2-q^2>0.....p^2>q^2\), we can just say |p|>|q|... say p is negative (-3)^2>2^2 but -3<2, so p<q and if both positive p>q
F. \(|p|>|q|\).... same as E above

thus only C and D

hope it helps


I think E and F are also correct because the question stem is looking for possible scenarios and not must be scenarios so it is possible that p is greater than q in both cases when p and q are both +ve terms and P>Q for ex. P=4 and Q=3
avatar
Supreme Moderator
Joined: 01 Nov 2017
Posts: 371
Own Kudos [?]: 470 [0]
Given Kudos: 0
Send PM
Re: In which of the following scenarios is p>q? [#permalink]
Expert Reply
amorphous wrote:
chetan2u wrote:
Sawant91 wrote:
In which of the following scenarios is p>q?

Indicate all possible scenarios.
A. \((0.11)^p>(0.11)^q\)
B. \(1^p>1^q\)
C. \((1.11)^p>(1.11)^q\)
D. \((1.01)^p>(1.01)^q\)
E. \((p+q)(p−q)>0\)
F. \(|p|>|q|\)


So where are the variables p and q - they are used as exponent or power..
some rules for the terms when the base is positive..
1) when the number, say x, is between 0 and 1 that is 0<x<1...
Higher the power, lower the value so x^3<x^2
2) when x=1
the values are always same irrespective of the power. 1^7 = 1^1
3) when x>1
Higher the power , higher the value so x^3>x^2

now let us see the choices..
A. \((0.11)^p>(0.11)^q\).....0<0.11<1 so case (1) p<q
B. \(1^p>1^q\).......... case (2).. cannot be determined
C. \((1.11)^p>(1.11)^q\).......1.11>1, so case (3).. p>q
D. \((1.01)^p>(1.01)^q\).......1.01>1, so case (3).. p>q
E. \((p+q)(p−q)>0.......p^2-q^2>0.....p^2>q^2\), we can just say |p|>|q|... say p is negative (-3)^2>2^2 but -3<2, so p<q and if both positive p>q
F. \(|p|>|q|\).... same as E above

thus only C and D

hope it helps


I think E and F are also correct because the question stem is looking for possible scenarios and not must be scenarios so it is possible that p is greater than q in both cases when p and q are both +ve terms and P>Q for ex. P=4 and Q=3



I believe the part - indicate all possible scenarios- is to tell you that you have to pick more than one choice.
The main question asks you "is p>q?".
However, maybe a word must can be added to make it more clear.
Prep Club for GRE Bot
Re: In which of the following scenarios is p>q? [#permalink]
Moderators:
GRE Instructor
84 posts
GRE Forum Moderator
37 posts
Moderator
1111 posts
GRE Instructor
234 posts

Powered by phpBB © phpBB Group | Emoji artwork provided by EmojiOne