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ProfChaos
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How many four lettered words can be formed using the letters of the wo 26 Nov 2020, 11:59
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!

Difficulty:

95% (hard)

Question Stats:

46% (02:45) correct 54% (02:39) wrong based on 108 sessions

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How many four lettered words can be formed using the letters of the word ARRANGE?

A. 120
B. 144
C. 264
D. 270
E. 290

Source: Indian B-school entrance exam
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D
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BrentGMATPrepNow
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How many four lettered words can be formed using the letters of the wo 26 Nov 2020, 12:08
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ProfChaos
How many four lettered words can be formed using the letters of the word ARRANGE?

A. 120
B. 144
C. 264
D. 270
E. 290

Source: Indian B-school entrance exam
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Unless I'm missing a super fast shortcut, I think this question is too time consuming to be an official GMAT question.
The reason for this is that we need to consider for separate cases:
- All 4 letters are different (5x4x3x2) = 120
- The word consists of two A's and two R's = 4!/(2!2!) = 6
- The word consists of two A's and two different letters = (4C2)(4!/2!) = 72
- The word consists of two R's and two different letters = (4C2)(4!/2!) = 72

TOTAL = 120 + 6 + 72 + 72 = 270

Answer: D
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How many four lettered words can be formed using the letters of the wo 20 Dec 2020, 07:21
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kawal27
How many four lettered words can be formed using the letters of the word ARRANGE?

A)120
B)144
C)264
D)270
E)290
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Concepts: (a) The number of arrangements of n things all taken together = n!

(b) Out of n things, x things of 1 type are similar, y things of another type are similar and so on, then the total arrangements = \(\frac{n!}{x!y!...}\)


ARRANGE has 2 A's, 2 R's and 1 each of N, G and E (There are 5 distinct letters)

(i) all 4 letters are different

Choices = Choose 4 letters out of 5 = 5C4 = 5

Arrangements = 4! = 24 words

Total words of this type = 5 * 24 = 120


(ii) 2 similar and 2 different: for eg we choose A, then the 2 remaining letters can be chosen from R, N, G or E

Choices = choose 1 of A or R and then choose 3 among 4 remaining = 2C1 * 4C2 = 2 * 6 = 12

Number of arrangements = \(\frac{4!}{2!} = 12\)

Total words of this form = 12 * 12 = 144


(iii) 2 A's and 2 R's = \(\frac{4!}{2!2!} = 6\)



Total number of words = 120 + 144 + 6 = 270



Option D

Arun Kumar
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How many four lettered words can be formed using the letters of the wo 26 Nov 2020, 12:28
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Way Time Consuming :dazed
Case 1: the word is formed using 2R and 2A (AARR can be written in)= 4!/2!*2! = 6 Ways

Case 2: All four letters are different then the number of words (A,R,N,G,E) = 5C4*4! =120

Case 3: 2 letters are A and the other 2 different letters (R, N, G, E), then the number of words (A A _ _ Can be written in)= 4C2*4!/2! = 72

Case 4: Similarly with R, when 2 letters in 4 letter words are R and the other 2 different letters (A, N, G, E), then the number of words (R R _ _ Can be written in)= 4C2*4!/2! = 72

Then the number of four-letter words that can be formed=6+120+72+72=270

Answer is D
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How many four lettered words can be formed using the letters of the wo 20 Dec 2020, 18:32
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kawal27
How many four lettered words can be formed using the letters of the word ARRANGE?

A)120
B)144
C)264
D)270
E)290
Show more

We want to write the letter as AA, RR, N, G, E to begin. We have 5 different letters with possible repeats.

Case 1: No repeats.

We have only 5 letters, pick 4 out of 5 then randomize their order. \(5C4 * 4! = 5*4! = 120\)

Case 2: One repeat only. (AANR, RRGE etc)

Let's say we're working with two A, then we need to pick 2 more letters out of the remaining 4 to assemble a word. That is 4C2 cases. Next, we can scramble the letters so multiply by 4!, but divide by 2! at the end to account for A repeating.

\(4C2 * 4! / 2! = 6 * 4* 3 = 72\). Multiply this by two to get 144 as we can use R instead of A.

Case 3: Two repeats (AARR, ARAR).

If we scramble we have 4! cases but divide by 2! for A and R each.

\(4!/(2!*2!) = 4*3/2 = 6\).

In total we have 120 + 144 + 6 = 270 cases.

Ans: D
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How many four lettered words can be formed using the letters of the wo 28 Jul 2025, 02:55
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