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Question: Assume you have a deck with with $52$ cards ($4$ suites of $13$ cards: numbers $1\ldots 9$, and faces J,Q,K). What is the probability you draw jack of hearts in a hand of $5$?

My way of thinking is the following:

$\frac{\left(\dfrac{1\cdot51\cdot50\cdot49\cdot48}{4!}\right)}{ \left(\dfrac{52\cdot51\cdot50\cdot49\cdot48}{5!}\right)}$

$1$ is for the jack of hearts being drawn, and then $51\ldots48$ for the rest of the $4$ cards

4 Answers 4

4

Your thinking is correct, though let me provide another way of looking at the problem that might make its structure clearer:

  • There are ${51\choose 4}$ ways to pick a hand that include the Jack of Hearts (because once we've picked the Jack, we can choose 4 other cards from the remaining 51)
  • There are ${52\choose 5}$ ways to pick a hand, with no restrictions.

Therefore the probability of getting a hand with the Jack of Hearts is

$\frac{51\choose 4}{52\choose 5} = \frac{51!5!47!}{4!47!52!} = \frac{5}{52}$

You can check that the obvious generalization is, in fact, true: the probability of drawing a particular card in a hand of $m$ cards with a deck of size $n$ is $m/n$.

3

The probability you draw the jack of hearts is the same as the probability of drawing any other particular card. Since you draw 5 cards, the 52 individual probabilities have to add up to 5, so each probability is 5/52. In particular, the probability of drawing the jack of hearts is 5/52.

3

Alternatively, there are $\binom{51}{5}$ ways of picking a hand that does not have the Jack of Hearts. There are a total of $\binom{52}{5}$ ways of picking $5$ cards, so the probability of choosing a hand with the Jack of Hearts is: $1 - \frac{\binom{51}{5}}{\binom{52}{5}} = 1-\frac{47}{52} = \frac{5}{52}$

  • 0
    Although a bit more complicated, this is valid (+1)2014-03-05
0
 5/52 seems wrong to me.    I suggest the slightly higher probability of:                           n = (1/52 + 1/51 + 1/50 + 1/49 + 1/48)  Which approximates to:                           n = 5/50  Each time a cards is picked the deck gets smaller, and the probability of  picking the "good" card the next round increases.   5/52 would be the probability ONLY if after each time you drew one card,  you replaced it into the deck before the next draw. 
  • 1
    With replacement, the probability would be $1-\left(\frac{51}{52}\right)^5$2014-03-05