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KanishkM
Joined: 09 Mar 2018
Last visit: 18 Dec 2021
Posts: 755
Given Kudos: 123
Location: India
Schools: DeGroote'21 Desautels '21 NUS '21
A
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
95%
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Question Stats:
26% (01:27) correct
74%
(01:19)
wrong
based on 198
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If a and b, are positive, what is the value of a + b ?
(1) \((3^a) (3^b)=81\)
(2) \((3^a) (5^b)=225\)
(1) \((3^a) (3^b)=81\)
(2) \((3^a) (5^b)=225\)
01 Jan 2019, 21:01
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(1) \((3^a) (3^b)\)=81 - Sufficient- as \((3^a) (3^b)\)=\(3^{a+b}\)=\(3^4\) ==>a+b=4
(2) \((3^a) (5^b)\)=225 - Not Sufficient - remember the cond is only positive not positive integer.
One way to think of the proof is :
225= 3.3.5.5 = 5.45
Case 1: \(3^2\) * \(5^2\) ==>a=2 & b=2.Hence a+b=4
Case 2:one component is 5 so b=1
Now 45 could be \(3^a\) ==>a=log45/log3 = 3.465 ( \(3^{3.465}\) almost=45). Hence a+b=4.465
Hence Ans is A.
(2) \((3^a) (5^b)\)=225 - Not Sufficient - remember the cond is only positive not positive integer.
One way to think of the proof is :
225= 3.3.5.5 = 5.45
Case 1: \(3^2\) * \(5^2\) ==>a=2 & b=2.Hence a+b=4
Case 2:one component is 5 so b=1
Now 45 could be \(3^a\) ==>a=log45/log3 = 3.465 ( \(3^{3.465}\) almost=45). Hence a+b=4.465
Hence Ans is A.
soloyolodolo
01 Jan 2019, 22:24
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u1983
GMAT will not give false information between the two facts so if
1.) A+B = 4, then
2.) A+B = 4 as well. and in your explanation A+B = 4.465.
Wouldn't the correct solution be D?
2.) A = 2, B = 2?
