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24 Feb 2017, 10:13
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E
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
45%
(medium)
Question Stats:
62% (01:31) correct
38%
(01:53)
wrong
based on 673
sessions
History
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Not Attempted Yet
Mike, a DJ at a high school radio station, needs to play two or three more songs before the end of the school dance. If each composition must be selected from a list of the 10 most popular songs of the year, how many unique song schedules are available for the remainder of the dance, if the songs cannot be repeated?
(A) 6
(B) 90
(C) 120
(D) 720
(E) 810
(A) 6
(B) 90
(C) 120
(D) 720
(E) 810
24 Feb 2017, 17:16
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vikasp99
Dear vikasp99,
I'm happy to respond.
This is another good Veritas question. For this question, we will use the Fundamental Counting Principle.
We can have either two-song lists or three-song lists. We will count them separate an add. Notice that having the same songs in different orders count as different playlists, according to this setup.
For two-song lists, DJ Mike has 10 choices for the first song, and then 9 remaining choices for the second song. This means
# of two-song playlists = 10*9 = 90
For three-song lists, DJ Mike has 10 choices for the first song, then 9 remaining choices for the second song, then 8 remaining choices for the third song. This means
# of three-song playlists = 10*9*8 = 10*72 = 720
Add those
total number of playlists = 720 + 90 = 810
OA = (E)
That's a great problem!
Does all this make sense?
Mike
General Discussion
Shruti0805
19 Mar 2017, 22:12
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mikemcgarry
Hi mikemcgarry,
Are we using permutations and not combinations because it says unique sequences and thus order matters ?
I'm new to combinatorics and so, my concepts are extremely shaky when it comes to identifying when does the arrangement matter and when does it not. Kindly help.
Thanks in advance.
