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cypherskull
- Senior | Next Rank: 100 Posts
- Posts: 94
- Joined: Sat Mar 31, 2012 3:39 am
- Location: Calcutta
- Thanked: 8 times
Bill has a small deck of 12 playing cards made up of only 2 suits of 6 cards each. Each of the 6 cards within a suit has a different value from 1 to 6; thus, for each value from 1 to 6, there are two cards in the deck with that value. Bill likes to play a game in which he shuffles the deck, turns over 4 cards, and looks for pairs of cards that have the same value. What is the chance that Bill finds at least one pair of cards that have the same value?
a. 8/33
b. 62/165
c. 17/33
d. 103/165
e. 25/33
I got the solution but then I don't fully understand. My initial approach to this problem was as follows:
P(at least 1 pair) = 1 - P(no pair)
P(no pair) = (12*10*8*6)/12C4
However, as it turns out, 12C4 yields a wrong answer. If I use 12P4 instead, I get the right answer.
Can some one please explain the gap in my understanding here? Thanks!
[Moderator edit: Moved the post to a relevant forum]
a. 8/33
b. 62/165
c. 17/33
d. 103/165
e. 25/33
I got the solution but then I don't fully understand. My initial approach to this problem was as follows:
P(at least 1 pair) = 1 - P(no pair)
P(no pair) = (12*10*8*6)/12C4
However, as it turns out, 12C4 yields a wrong answer. If I use 12P4 instead, I get the right answer.
Can some one please explain the gap in my understanding here? Thanks!
[Moderator edit: Moved the post to a relevant forum]
Regards,
Sunit
________________________________
Kill all my demons..And my angels might die too!
Sunit
________________________________
Kill all my demons..And my angels might die too!
