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3. What is the probability of drawing two Kings in a row, without replacement?

A. [tex]\(\frac{12}{2652} = 0.005 = 0.5\%\)[/tex]

B. [tex]\(\frac{2}{52} = 0.038 = 3.8\%\)[/tex]

C. [tex]\(\frac{16}{2652} = 0.006 = 0.6\%\)[/tex]

D. [tex]\(\frac{12}{52} = 0.231 = 23.1\%\)[/tex]

Sagot :

GinnyAnsweridn
To find the probability of drawing two Kings in a row without replacement from a standard deck of 52 cards, we need to go through the problem step-by-step. Here is the detailed solution:

1. Total Number of Cards in a Deck: There are 52 cards in a standard deck.

2. Total Number of Kings in a Deck: There are 4 Kings in a standard deck.

3. Probability of Drawing the First King:
- When you draw the first card, there are 52 cards available.
- The probability that the first card drawn is a King is the number of Kings divided by the total number of cards.
- So, the probability of drawing the first King is [tex]\( \frac{4}{52} \)[/tex].

4. Probability of Drawing the Second King:
- After drawing the first King, you have 51 cards left in the deck.
- There are now 3 Kings remaining.
- The probability of drawing the second King is the number of remaining Kings divided by the remaining number of cards.
- So, the probability of drawing the second King after having already drawn a King is [tex]\( \frac{3}{51} \)[/tex].

5. Overall Probability:
- The overall probability of both events occurring (drawing the first King and then the second King) is the product of the two probabilities:
- [tex]\( \text{Overall Probability} = \left(\frac{4}{52}\right) \times \left(\frac{3}{51}\right) \)[/tex].

6. Calculating the Overall Probability:
- Calculating [tex]\( \frac{4}{52} \)[/tex]:
[tex]\[ \frac{4}{52} = 0.07692307692307693 \][/tex]
- Calculating [tex]\( \frac{3}{51} \)[/tex]:
[tex]\[ \frac{3}{51} = 0.058823529411764705 \][/tex]
- Multiplying both probabilities:
[tex]\[ 0.07692307692307693 \times 0.058823529411764705 = 0.004524886877828055 \][/tex]

7. Converting to Percentage:
- To express this probability as a percentage, multiply by 100:
[tex]\[ 0.004524886877828055 \times 100 = 0.4524886877828055 \% \][/tex]

So, the probability of drawing two Kings in a row without replacement is approximately [tex]\( 0.4525\% \)[/tex].

Considering the provided choices, the correct answer is not explicitly listed among them, but the exact detailed calculation aligns closely with:

[tex]\[ 0.004524886877828055 \text{ (which is approximately 0.4525%)} \][/tex]
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