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28 Jul 2020, 02:45
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E
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Difficulty:
45%
(medium)
Question Stats:
65% (02:03) correct
35%
(01:57)
wrong
based on 170
sessions
History
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If p and q are two nonzero integers, is p^q > q^p ?
(1) p = √q
(2) p ≠ 1
Are You Up For the Challenge: 700 Level Questions
yashikaaggarwal
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28 Jul 2020, 03:01
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To find: p^q > q^p ?
(1) p = √q
Case1: p = 1 = q
1 = 1 {Incorrect}
Case2: p = 2 , q = 4
2^4 = 4^2
16 = 16 {Incorrect}
Case3: p = 3 , q = 9
3^9 > 9^3
19683 > 729 {correct}
{Insufficient}
(2) p ≠ 1
Case1: p = 2 , q = 4
2^4 = 4^2
16 = 16 {Incorrect}
Case2: p = 3 , q = 9
3^9 > 9^3
19683 > 729 {correct}
Case3: p = 4 , q = 16
4^16 > 16^4 {correct}
{Insufficient}
Combining both :
Case1: p = 2 , q = 4
2^4 = 4^2
16 = 16 {Incorrect}
Case2: p = 3 , q = 9
3^9 > 9^3
19683 > 729 {correct}
Both have many 2 & 3 integer common
(Insufficient)
IMO E
Posted from my mobile device
(1) p = √q
Case1: p = 1 = q
1 = 1 {Incorrect}
Case2: p = 2 , q = 4
2^4 = 4^2
16 = 16 {Incorrect}
Case3: p = 3 , q = 9
3^9 > 9^3
19683 > 729 {correct}
{Insufficient}
(2) p ≠ 1
Case1: p = 2 , q = 4
2^4 = 4^2
16 = 16 {Incorrect}
Case2: p = 3 , q = 9
3^9 > 9^3
19683 > 729 {correct}
Case3: p = 4 , q = 16
4^16 > 16^4 {correct}
{Insufficient}
Combining both :
Case1: p = 2 , q = 4
2^4 = 4^2
16 = 16 {Incorrect}
Case2: p = 3 , q = 9
3^9 > 9^3
19683 > 729 {correct}
Both have many 2 & 3 integer common
(Insufficient)
IMO E
Posted from my mobile device
28 Jul 2020, 03:47
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Quote:
Step 1: Understanding statement 1 alone
Squaring both sides
\(p^2\) = q
Using values of p and q
When p=1, q = 1, then value of \(p^q\) = 1 is equal to value of \(q^p\) =1
When p = 3, q = 9, then value of \(p^q = 3^9\) is greater than \(q^p =9^3= 3^6\)
Insufficient
Quote:
Step 2: Understanding statement 2 alone
Again using values of p and q
When p=2, q=2, then value of \(p^q\) = 4 is equal to value of \(q^p \)=4
When p = 3, q = 9, then value of \(p^q = 3^9\) is greater than \(q^p =9^3= 3^6\)
Insufficient
Step 3: Clubbing statement 1 and 2
When p=2, q=4, then value of \(p^q = 2^4\) = 16 is equal to value of \(q^p =4^2\) = 16
When p = 3, q = 9, then value of \(p^q\) = \(3^9\) is greater than \(q^p =9^3= 3^6\)
Insufficient
IMO E
