Math

QuestionDraw a card from a deck: win \$6 for a face card, \$5 for an ace, lose \$3 for others. Find the probability distribution and expected gain.

Studdy Solution

STEP 1

Assumptions1. The game is played with a standard deck of52 cards. . The deck contains4 aces,12 face cards (jacks, queens, and kings), and36 other cards (numbers through10 in four suits).
3. The winnings are 6forafacecard,6 for a face card, 5 for an ace, and a loss of $3 for any other card.
4. The probability of drawing a particular type of card is the number of that type of card divided by the total number of cards.

STEP 2

First, we need to calculate the probability of drawing a face card, an ace, and any other card. The probability is calculated as the number of that type of card divided by the total number of cards.
(facecard)=NumberoffacecardsTotalnumberofcards(face\, card) = \frac{Number\, of\, face\, cards}{Total\, number\, of\, cards}(ace)=NumberofacesTotalnumberofcards(ace) = \frac{Number\, of\, aces}{Total\, number\, of\, cards}(othercard)=NumberofothercardsTotalnumberofcards(other\, card) = \frac{Number\, of\, other\, cards}{Total\, number\, of\, cards}

STEP 3

Now, plug in the given values for the number of face cards, aces, other cards, and the total number of cards to calculate the probabilities.
(facecard)=1252(face\, card) = \frac{12}{52}(ace)=52(ace) = \frac{}{52}(othercard)=3652(other\, card) = \frac{36}{52}

STEP 4

implify the probabilities.
(facecard)=1252=313(face\, card) = \frac{12}{52} = \frac{3}{13}(ace)=452=113(ace) = \frac{4}{52} = \frac{1}{13}(othercard)=3652=913(other\, card) = \frac{36}{52} = \frac{9}{13}

STEP 5

Now, we can create the probability distribution table. The table has two columns xx for the winnings and (x)(x) for the probability of that winnings.
\begin{tabular}{|c|c|} \hlinexx & (x)(x) \\ \hline$$ & $\frac{3}{13}$ \\ $5$ & $\frac{1}{13}$ \\ $-3$ & $\frac{9}{13}$ \\ \hline\end{tabular}

STEP 6

To find the expected gain from this game, we need to multiply each possible winnings by its probability and then sum these products.
(x)=x(x)(x) = \sum x \cdot(x)

STEP 7

Now, plug in the values from the probability distribution table to calculate the expected gain.
(x)=6313+51133913(x) =6 \cdot \frac{3}{13} +5 \cdot \frac{1}{13} -3 \cdot \frac{9}{13}

STEP 8

Calculate the expected gain.
(x)=6313+5113313=1813+5132713=413(x) =6 \cdot \frac{3}{13} +5 \cdot \frac{1}{13} -3 \cdot \frac{}{13} = \frac{18}{13} + \frac{5}{13} - \frac{27}{13} = -\frac{4}{13}The expected gain from this game is 413-\frac{4}{13} dollars. This means that, on average, the player will lose about 0.310.31 dollars each time they play the game.

Was this helpful?

Studdy solves anything!

banner

Start learning now

Download Studdy AI Tutor now. Learn with ease and get all help you need to be successful at school.

ParentsInfluencer programContactPolicyTerms
TwitterInstagramFacebookTikTokDiscord