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08 Nov 2021, 02:30
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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:
65%
(hard)
Question Stats:
56% (01:58) correct
44%
(01:50)
wrong
based on 134
sessions
History
Date
Time
Result
Not Attempted Yet
In how many ways can the letters in MATTERS be arranged if no two identical letters can be adjacent?
(A) 1680
(B) 1800
(C) 2514
(D) 2520
(E) 4320
(A) 1680
(B) 1800
(C) 2514
(D) 2520
(E) 4320
08 Nov 2021, 02:59
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Bunuel
In how many ways can the letters in MATTERS be arranged if no two identical letters can be adjacent?
(A) 1680
(B) 1800
(C) 2514
(D) 2520
(E) 4320
MATTERS can be arranged in 7!/2! ways which is 2520(A) 1680
(B) 1800
(C) 2514
(D) 2520
(E) 4320
Let TT=x
MAXERS can be arranged in 6! ways which is 720
Thus, total ways in which 2 identical letters are not adjacent= Total number of ways-Number of ways in which identical are together=2520-720=1800
Answer (B)
General Discussion
asishron29181
Joined: 04 May 2020
Last visit: 04 Nov 2022
Posts: 185
Given Kudos: 68
Location: India
Schools: Great Lakes (I)
GMAT 1: 610 Q47 V27
WE:Programming (Computer Software)
08 Nov 2021, 19:31
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MATTERS be arranged if no two identical letters can be adjacent
Total ways in which MATTERS can be arranged = 7!/2! = 2520
Total ways in which MATTERS can be arranged where 2T's are always together = 6! * 2!/2! = 6! = 720
Total ways in which no two T's are together = 2520 - 720 = 1800
IMO B
Total ways in which MATTERS can be arranged = 7!/2! = 2520
Total ways in which MATTERS can be arranged where 2T's are always together = 6! * 2!/2! = 6! = 720
Total ways in which no two T's are together = 2520 - 720 = 1800
IMO B
