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#1 2008-02-05 23:05:04
- goed
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- Registered: 2008-02-05
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Permutations and Combinations
How to find the total number of permutations of four letters selected from the word 'ARRANGEMENT'.How many of these permutations contain two R's??
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#2 2008-02-05 23:55:27
- JaneFairfax
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- Registered: 2007-02-23
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Re: Permutations and Combinations
Case 1: No repeated letter.
This would be the number of permutations of 4 letters from the 7 distinct letters in the word, which is [sup]7[/sup]P[sub]4[/sub].
Case 2: Exactly one repeated letter.
Suppose the A is repeated. The two As can space themselves out in the four-letter word in 6 ways (AA**, A*A*, A**A, *AA*, *A*A, **AA). Then the other two spots are filled by 2 letters from the other 6, so the number of permutations in which the A is repeated is 6×[sup]6[/sup]P[sub]2[/sub]. This goes for the E, N and R as well. Hence the total number of permutations containing exactly one repeated letter is 4×6×[sup]6[/sup]P[sub]2[/sub].
Case 3: Two repeated letters.
Such a word can only contain the letters A, E, N, R. We choose two letters from them in [sup]4[/sup]C[sub]2[/sub] = 6 ways, and the two letters can arrange themselves in the word in 6 ways. So the total number of such words is 6×6.
Hence the total number of 4-letter permutations is sum of the permutations found in Cases 13.
Of these, the number of permutations containing two Rs and two different other letters is 6×[sup]6[/sup]P[sub]2[/sub]. The number of permutations containing two Rs and two As or two Es or two Ns is 6×[sup]3[/sup]C[sub]2[/sub] = 6×3. Add the two to find the total number of permutations containing two Rs.
Last edited by JaneFairfax (2008-02-06 01:39:47)
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#3 2008-02-06 00:31:56
- goed
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- Registered: 2008-02-05
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Re: Permutations and Combinations
Thank you for your quick reply.....but the answers are 1596(for selecting 4 letters from the given word) and 198 (containing 2 R's)and no clue how he gets that?? Waiting for your reply
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#4 2008-02-06 00:55:58
- JaneFairfax
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Re: Permutations and Combinations
I made a slight mistake in my original working. I have edited my post and corrected it now. See my edited post. It should be correct now. 
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#5 2008-02-06 01:21:01
- goed
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- Registered: 2008-02-05
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Re: Permutations and Combinations
Thanks again,
I got the first one but the second one is a bit confusing.......but 4c2 = 4!/2!.2! = 6 then the final answer is 6x6p2 + 6x4c2 = 6x30 + 6x6 = 180+36 = 216.
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#6 2008-02-06 01:41:26
- JaneFairfax
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- Registered: 2007-02-23
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Re: Permutations and Combinations
Sorry, I meant to write 6×[sup]3[/sup]C[sub]2[/sub].
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