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How many 3-digit integers can be chosen such that
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22 Aug 2017, 02:26
22 Aug 2017, 02:26
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Question Stats:
40% (02:13) correct
59% (01:31) wrong based on 103 sessions
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How many 3-digit integers can be chosen such that none of the digits appear more than twice, and none of the digits equal 0?
(A) 729
(B) 720
(C) 648
(D) 640
(E) 576
Re: How many 3-digit integers can be chosen such that
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Updated on: 25 Aug 2017, 06:47
Updated on: 25 Aug 2017, 06:47
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Expert Reply
boxing506 wrote:
Can somebody explain? I think I did not get the question.
The question askes you to select a 3 digit number. So we need to selct 3 digits from {1, 2, 3, 4, 5, 6, 7, 8, 9}.
Now number of ways we can select 1 digits = 9. Since there are 9 options to choose from!
Now number of ways we can select 3 digits = \(9 \times 9 \times 9 = 729\)
Now the above section contains digits like = 999, 888, 777 ..... they are not allowed (3-digit integers with all alike digits )
So correct answer is \(729 - 9 = 720\). Hence B.
General Discussion
Re: How many 3-digit integers can be chosen such that
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25 Aug 2017, 04:16
25 Aug 2017, 04:16
Can somebody explain? I think I did not get the question.
