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12 Nov 2020, 13:55
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D
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
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Question Stats:
42% (02:01) correct
58%
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wrong
based on 84
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What is the largest prime factor of \((2^a+2^b)^2\), where \(a\) and \(b\) are positive integers?
(1) a - b = 1
(2) a + b = 5
(1) a - b = 1
(2) a + b = 5
12 Nov 2020, 15:15
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solve a and b from both statements
a=3, b=2
putting values back
\((2^a+2^b)^2\)
=\((8+4)^2\)
=144
largest prime factor = 3
Answer: C
a=3, b=2
putting values back
\((2^a+2^b)^2\)
=\((8+4)^2\)
=144
largest prime factor = 3
Answer: C
14 Nov 2020, 04:39
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First step: Modify \((2^a + 2^b)^2 = 2^2^a + 2^2^b + 2*2^(^a^+^b^) = 2^(^a^+^b^) [2^(^b^-^a^) + 2^(^a^-^b^) + 2]\)
To find the largest prime factor, we have to find the prime factors in the square brackets, [ ].
Condition 1: a and b are positive integers.
1) Condition 2: a-b = 1. So b-a = -1. This is sufficient to find out the values in square brackets.
2) Condition 3: a+b = 5. At first this does not appears to be helpful. However, using condition 1, we can have two cases.
Case 1: (a,b) = (2,3)
Case 2: (a,b) = (4,1)
Applying values from case 1 for a-b and b-a, we will get \(2^(^-^1^) + 2^1 + 2 = 9/2\)
Similarly applying values from case 2, we will get \(2^(^-^3^) + 2^3 + 2 = 81/8\)
In both cases, we will get 3 as the largest prime factor. Hence, the condition is sufficient.
Therefore, option D is the correct answer.
Please kudos!
To find the largest prime factor, we have to find the prime factors in the square brackets, [ ].
Condition 1: a and b are positive integers.
1) Condition 2: a-b = 1. So b-a = -1. This is sufficient to find out the values in square brackets.
2) Condition 3: a+b = 5. At first this does not appears to be helpful. However, using condition 1, we can have two cases.
Case 1: (a,b) = (2,3)
Case 2: (a,b) = (4,1)
Applying values from case 1 for a-b and b-a, we will get \(2^(^-^1^) + 2^1 + 2 = 9/2\)
Similarly applying values from case 2, we will get \(2^(^-^3^) + 2^3 + 2 = 81/8\)
In both cases, we will get 3 as the largest prime factor. Hence, the condition is sufficient.
Therefore, option D is the correct answer.
Please kudos!
