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03 Aug 2020, 02:27
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B
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
75%
(hard)
Question Stats:
47% (01:48) correct
53%
(01:44)
wrong
based on 234
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If \((a^{(\frac{1}{2})}*b^{(\frac{1}{3})})^6=2000\), what is the value of ab?
(1) a = 5
(2) a and b are positive integers
Are You Up For the Challenge: 700 Level Questions
(1) a = 5
(2) a and b are positive integers
Are You Up For the Challenge: 700 Level Questions
yashikaaggarwal
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Joined: 19 Jan 2020
Last visit: 29 Mar 2026
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03 Aug 2020, 02:59
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{A^1/2*B^1/3}^6 = 2000
A^3*B^2 = 2000
A^3*B^2 = 2*2*2*2*5*5*5
A^3*B^2 = (±2)^4*5^3
Statement 1: A = 5
But B can be +4 or -4
(Insufficient)
Statement 2: a and b are positive.
A = 5 and B = 4
Therefore a*b = 4*5 = 20
(Sufficient)
Answer is B
Posted from my mobile device
A^3*B^2 = 2000
A^3*B^2 = 2*2*2*2*5*5*5
A^3*B^2 = (±2)^4*5^3
Statement 1: A = 5
But B can be +4 or -4
(Insufficient)
Statement 2: a and b are positive.
A = 5 and B = 4
Therefore a*b = 4*5 = 20
(Sufficient)
Answer is B
Posted from my mobile device
03 Aug 2020, 03:52
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Bunuel
Solution
Step 1: Analyse Question Stem
- • \((a^{(\frac{1}{2})}*b^{(\frac{1}{3})})^6 = 2000\)
• \(⟹ a^{(\frac{6}{2})}*b^{(\frac{6}{3})} = 2000\)
• \( ⟹ a^3*b^2 = 125*16\)
Step 2: Analyse Statements Independently (And eliminate options) – AD/BCE
Statement 1: a = 5
- • So, \(5^3*b^2 = 125*16⟹ b^2 =16 ⟹ b = 4\) or \(-4\)
• So, a*b can be either 20 or -20
• We are getting contradictory results.
Statement 2: a and b are positive integers
- • Since, a and b are positive,
- o \(a^3*b^2 = 125*16⟹a^3*b^2 = 5^3*4^2 \)
o so a = 5 and b = 4
o Thus, \(a*b = 5*4 = 20\)
Thus, the correct answer is Option B.
