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CaptainLevi
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A person has five tickets of a lucky draw for which a total of 12 25 Nov 2019, 02:50
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62% (02:45) correct 38% (02:35) wrong based on 209 sessions

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A person has five tickets of a lucky draw for which a total of 12 tickets were sold and exactly six prizes are to be given. The probability that the person will win at least one prize is

(A) \(\frac{61}{32}\)

(B)\(\frac{131}{132}\)

(C)\(\frac{31}{132}\)

(D)\(\frac{11}{12}\)

(E)\(\frac{13}{17}\)
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B
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A person has five tickets of a lucky draw for which a total of 12 29 Nov 2019, 10:45
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P(At least one prize) = 1- P(No Prize)
= 1- (6C5)/(12C5)
= 1- (6.5.4.3.2.1)/(12.11.10.9.8)
=1-1/132
= 131/132

Answer = B

CaptainLevi
A person has five tickets of a lucky draw for which a total of 12 tickets were sold and exactly six prizes are to be given. The probability that the person will win at least one prize is

(A) \(\frac{61}{32}\)

(B)\(\frac{131}{132}\)

(C)\(\frac{31}{132}\)

(D)\(\frac{11}{12}\)

(E)\(\frac{13}{17}\)
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devavrat
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A person has five tickets of a lucky draw for which a total of 12 30 Nov 2019, 00:36
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gmatbusters
How is 6C5 / 12C5 the probability of winning no ticket?
Can you please explain in detail
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A person has five tickets of a lucky draw for which a total of 12 30 Nov 2019, 00:39
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Out of 12 tickets, 6 tickets are lucky tickets and other 6 are unlucky tickets
If the person gets all 5 tickets from this 6- unlucky tickets, he will not earn prize.
The no of ways of selecting 5 tickets out of 6-unlucky tickets = 6C5.


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How is 6C5 / 12C5 the probability of winning no ticket?
Can you please explain in detail
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A person has five tickets of a lucky draw for which a total of 12 22 Jul 2022, 18:19
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CaptainLevi
A person has five tickets of a lucky draw for which a total of 12 tickets were sold and exactly six prizes are to be given. The probability that the person will win at least one prize is

(A) \(\frac{61}{32}\)

(B)\(\frac{131}{132}\)

(C)\(\frac{31}{132}\)

(D)\(\frac{11}{12}\)

(E)\(\frac{13}{17}\)
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Note the following formula:

\( \Rightarrow\) P(at least one prize) + P(no prizes) = 1

Thus, if we can determine P(no prizes), we can simply subtract it from 1 to calculate P(at least one prize).

To determine P(no prizes), notice that 6 tickets to earn a prize can be selected from among 12 tickets in 12C6 ways.

\( \Rightarrow\) 12C6

\( \Rightarrow\) 12!/(6! * 6!)

\( \Rightarrow\) (12 * 11 * 10 * 9 * 8 * 7 * 6!)/(6 * 5 * 4 * 3 * 2 * 6!)

\( \Rightarrow\) 2 * 11 * 2 * 3 * 7

If none of the 5 tickets that the person bought earned a prize, then all 6 prizes were chosen from among the remaining 7 tickets. This choice can be made in 7C6 = 7 ways. Thus:

\( \Rightarrow\) P(no prizes) = 7/(2 * 11 * 2 * 3 * 7)

\( \Rightarrow\) 1/(2 * 11 * 2 * 3)

\( \Rightarrow\) 1/132

Since P(no prizes) = 1/132, it follows that P(at least one prize) = 1 - 1/132 = 131/132.

Answer: B
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A person has five tickets of a lucky draw for which a total of 12 24 Jul 2022, 03:23
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CaptainLevi
A person has five tickets of a lucky draw for which a total of 12 tickets were sold and exactly six prizes are to be given. The probability that the person will win at least one prize is

(A) \(\frac{61}{32}\)

(B)\(\frac{131}{132}\)

(C)\(\frac{31}{132}\)

(D)\(\frac{11}{12}\)

(E)\(\frac{13}{17}\)
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This is my favorite type of question.
For questions of "whats the probability of getting at least 1 xxx", you always follow the same method: you find the chance of getting 0 xxx, then subtract by 1.

Now for this question, we have 6 tickets with prize, and the other 6 without prize. The combination of getting [5 tickets] and [none of the 5 with prize] is 6C0 * 6C5, this is read as "select 0 from the 6 with prize, and select 5 from the 6 without prize", this will give you 6 combinations.

Now we need to find out how many combinations out there in total for randomly selecting 5 tickets out of 12, this is straight 12C5 = 132*6

Notice that the combination of getting at least 1 ticket with prize = 132 * 6 - 6 = 131*6. The probability as such is: 131/132
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A person has five tickets of a lucky draw for which a total of 12 24 Jul 2022, 06:11
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CaptainLevi
A person has five tickets of a lucky draw for which a total of 12 tickets were sold and exactly six prizes are to be given. The probability that the person will win at least one prize is

(A) \(\frac{61}{32}\)

(B)\(\frac{131}{132}\)

(C)\(\frac{31}{132}\)

(D)\(\frac{11}{12}\)

(E)\(\frac{13}{17}\)
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What's the probability of NOT winning?
Don't win on the first drawing: 7/12
Don't win on the second drawing: 6/11
Don't win on the third drawing: 5/10
Don't win on the fourth drawing: 4/9
Don't win on the fifth drawing: 3/8
Don't win on the sixth drawing: 2/7

\(\frac{7}{12}*\frac{6}{11}*\frac{5}{10}*\frac{4}{9}*\frac{3}{8}*\frac{2}{7} = \frac{1}{132}\)

What's the probability of YES winning?
\(1-\frac{1}{132} = \frac{131}{132}\)
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A person has five tickets of a lucky draw for which a total of 12 20 Feb 2025, 04:12
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