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Updated on: 13 Aug 2018, 02:52
Originally posted by EgmatQuantExpert on 28 Feb 2018, 03:14.
Last edited by EgmatQuantExpert on 13 Aug 2018, 02:52, edited 3 times in total.
Last edited by EgmatQuantExpert on 13 Aug 2018, 02:52, edited 3 times in total.
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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:
25%
(medium)
Question Stats:
76% (02:04) correct
24%
(02:08)
wrong
based on 583
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e-GMAT Question:
If \(N=5^4-3^4\), then which of the following is not divisible by the greatest prime factor of \(N\).
A) 51
B) 119
C) 187
D) 218
E) 340
This is
Question 8 of The e-GMAT Number Properties Marathon
28 Feb 2018, 03:52
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EgmatQuantExpert
5^4 = 625
3^4 = 81
625-81 = 544
544 = 17 x 2^5 ( prime factorisation)
largest prime = 17
we know multiples of 17 are 51,119, 187, 340
218/17 = 12.xx
(D) imo
28 Feb 2018, 04:23
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We have to prime factorize N
\(N = 5^4-3^4 = 625-81 = 544 = 17*2^5\)
Evaluating answer options,
A) 51 = 3*17
B) 119 = 7*17
C) 187 = 11*17
D) 218 = 2*109
E) 340 = 2*2*5*17
Therefore, Only Option D(218) is not divisble by the greatest prime factor of \(N\)
\(N = 5^4-3^4 = 625-81 = 544 = 17*2^5\)
Evaluating answer options,
A) 51 = 3*17
B) 119 = 7*17
C) 187 = 11*17
D) 218 = 2*109
E) 340 = 2*2*5*17
Therefore, Only Option D(218) is not divisble by the greatest prime factor of \(N\)
