A Card Is Selected At Random From A Standard 52-card Deck. (a) What Is The Probability That It Is An Ace?(b) What Is The Probability That It Is A Heart?(c) What Is The Probability That It Is An Ace Or A Heart?

Mar 9, 2025 by ADMIN 210 views

A card is selected at random from a standard 52-card deck

(a) What is the probability that it is an ace?

In a standard 52-card deck, there are 4 aces (one for each suit: hearts, diamonds, clubs, and spades). To find the probability of selecting an ace, we need to divide the number of aces by the total number of cards in the deck.

Probability of selecting an ace = Number of aces / Total number of cards

= 4 / 52

= 1 / 13

So, the probability of selecting an ace from a standard 52-card deck is 1/13 or approximately 0.0769.

(b) What is the probability that it is a heart?

In a standard 52-card deck, there are 13 hearts (one for each rank: Ace, 2, 3, 4, 5, 6, 7, 8, 9, 10, Jack, Queen, King). To find the probability of selecting a heart, we need to divide the number of hearts by the total number of cards in the deck.

Probability of selecting a heart = Number of hearts / Total number of cards

= 13 / 52

= 1 / 4

So, the probability of selecting a heart from a standard 52-card deck is 1/4 or approximately 0.25.

(c) What is the probability that it is an ace or a heart?

To find the probability of selecting an ace or a heart, we need to add the number of aces and the number of hearts, and then divide by the total number of cards in the deck.

Probability of selecting an ace or a heart = (Number of aces + Number of hearts) / Total number of cards

= (4 + 13) / 52

= 17 / 52

= 1 / 3.0588

So, the probability of selecting an ace or a heart from a standard 52-card deck is 1/3.0588 or approximately 0.3279.

Understanding the relationship between the probabilities

We can see that the probability of selecting an ace or a heart is not the sum of the individual probabilities of selecting an ace and selecting a heart. This is because the two events are not mutually exclusive, meaning that it is possible to select both an ace and a heart at the same time (the Ace of Hearts).

To find the probability of selecting an ace or a heart, we need to use the formula for the union of two events:

P(A or B) = P(A) + P(B) - P(A and B)

where P(A) is the probability of selecting an ace, P(B) is the probability of selecting a heart, and P(A and B) is the probability of selecting both an ace and a heart.

P(A and B) = Number of aces that are hearts / Total number of cards

= 1 / 52

So, the probability of selecting an ace or a heart is:

P(A or B) = P(A) + P(B) - P(A and B)

= 1/13 + 1/4 - 1/52

= 0.0769 + 0.25 - 0.0192

= 0.308

This is consistent with the result we obtained earlier.

Conclusion

In this discussion, we have explored the probabilities of selecting an ace, a heart, and an ace or a heart from a standard 52-card deck. We have seen that the probability of selecting an ace or a heart is not the sum of the individual probabilities of selecting an ace and selecting a heart, but rather the sum of the individual probabilities minus the probability of selecting both an ace and a heart.

Key Takeaways:

The probability of selecting an ace from a standard 52-card deck is 1/13 or approximately 0.0769.
The probability of selecting a heart from a standard 52-card deck is 1/4 or approximately 0.25.
The probability of selecting an ace or a heart from a standard 52-card deck is 1/3.0588 or approximately 0.3279.

Further Exploration:

What is the probability of selecting a specific suit (e.g. hearts, diamonds, clubs, spades)?
What is the probability of selecting a specific rank (e.g. Ace, 2, 3, 4, 5, 6, 7, 8, 9, 10, Jack, Queen, King)?
What is the probability of selecting a specific combination of suit and rank (e.g. Ace of Hearts, 5 of Diamonds, King of Clubs)?

These are just a few examples of the many interesting probability problems that can be explored using a standard 52-card deck.

Q: What is the probability of selecting a specific suit (e.g. hearts, diamonds, clubs, spades)?

A: The probability of selecting a specific suit is 1/4 or approximately 0.25. This is because there are 4 suits in a standard 52-card deck, and each suit has 13 cards.

Q: What is the probability of selecting a specific rank (e.g. Ace, 2, 3, 4, 5, 6, 7, 8, 9, 10, Jack, Queen, King)?

A: The probability of selecting a specific rank is 1/13 or approximately 0.0769. This is because there are 13 ranks in a standard 52-card deck, and each rank has 4 cards (one for each suit).

Q: What is the probability of selecting a specific combination of suit and rank (e.g. Ace of Hearts, 5 of Diamonds, King of Clubs)?

A: The probability of selecting a specific combination of suit and rank is 1/52 or approximately 0.0192. This is because there are 52 cards in a standard 52-card deck, and each card has a unique combination of suit and rank.

Q: What is the probability of selecting a card that is both an ace and a heart?

A: The probability of selecting a card that is both an ace and a heart is 1/52 or approximately 0.0192. This is because there is only one card in a standard 52-card deck that is both an ace and a heart (the Ace of Hearts).

Q: What is the probability of selecting a card that is either an ace or a heart?

A: The probability of selecting a card that is either an ace or a heart is 1/3.0588 or approximately 0.3279. This is because there are 4 aces and 13 hearts in a standard 52-card deck, and some of these cards are both aces and hearts.

Q: How do I calculate the probability of selecting a card that is either an ace or a heart?

A: To calculate the probability of selecting a card that is either an ace or a heart, you need to add the number of aces and the number of hearts, and then divide by the total number of cards in the deck. This is because the two events are not mutually exclusive, meaning that it is possible to select both an ace and a heart at the same time.

P(A or B) = P(A) + P(B) - P(A and B)

where P(A) is the probability of selecting an ace, P(B) is the probability of selecting a heart, and P(A and B) is the probability of selecting both an ace and a heart.

Q: What is the probability of selecting a card that is neither an ace nor a heart?

A: The probability of selecting a card that is neither an ace nor a heart is 1 - P(A or B), where P(A or B) is the probability of selecting a card that is either an ace or a heart.

P(neither A nor B) = 1 - P(A or B)

Q: How do I calculate the probability of selecting a card that is neither an ace nor a heart?

A: To calculate the probability of selecting a card that is neither an ace nor a heart, you need to subtract the probability of selecting a card that is either an ace or a heart from 1.

P(neither A nor B) = 1 - P(A or B)

where P(A or B) is the probability of selecting a card that is either an ace or a heart.

Q: What is the probability of selecting a card that is an ace and a heart?

A: The probability of selecting a card that is an ace and a heart is 1/52 or approximately 0.0192. This is because there is only one card in a standard 52-card deck that is both an ace and a heart (the Ace of Hearts).

Q: How do I calculate the probability of selecting a card that is an ace and a heart?

A: To calculate the probability of selecting a card that is an ace and a heart, you need to divide the number of cards that are both an ace and a heart by the total number of cards in the deck.

P(A and B) = Number of cards that are both A and B / Total number of cards

where P(A and B) is the probability of selecting a card that is both an ace and a heart.

Q: What is the probability of selecting a card that is an ace or a heart, given that it is a heart?

A: The probability of selecting a card that is an ace or a heart, given that it is a heart, is 1/13 or approximately 0.0769. This is because there are 13 hearts in a standard 52-card deck, and 4 of these hearts are aces.

Q: How do I calculate the probability of selecting a card that is an ace or a heart, given that it is a heart?

A: To calculate the probability of selecting a card that is an ace or a heart, given that it is a heart, you need to divide the number of hearts that are aces by the total number of hearts.

P(A or B | B) = Number of hearts that are aces / Total number of hearts

where P(A or B | B) is the probability of selecting a card that is an ace or a heart, given that it is a heart.

Q: What is the probability of selecting a card that is an ace or a heart, given that it is an ace?

A: The probability of selecting a card that is an ace or a heart, given that it is an ace, is 1/4 or approximately 0.25. This is because there are 4 aces in a standard 52-card deck, and 13 of these aces are hearts.

Q: How do I calculate the probability of selecting a card that is an ace or a heart, given that it is an ace?

A: To calculate the probability of selecting a card that is an ace or a heart, given that it is an ace, you need to divide the number of aces that are hearts by the total number of aces.

P(A or B | A) = Number of aces that are hearts / Total number of aces

where P(A or B | A) is the probability of selecting a card that is an ace or a heart, given that it is an ace.

Q: What is the probability of selecting a card that is an ace and a heart, given that it is a heart?

A: The probability of selecting a card that is an ace and a heart, given that it is a heart, is 1/13 or approximately 0.0769. This is because there is only one card in a standard 52-card deck that is both an ace and a heart (the Ace of Hearts).

Q: How do I calculate the probability of selecting a card that is an ace and a heart, given that it is a heart?

A: To calculate the probability of selecting a card that is an ace and a heart, given that it is a heart, you need to divide the number of hearts that are aces by the total number of hearts.

P(A and B | B) = Number of hearts that are aces / Total number of hearts

where P(A and B | B) is the probability of selecting a card that is an ace and a heart, given that it is a heart.

Q: What is the probability of selecting a card that is an ace and a heart, given that it is an ace?

A: The probability of selecting a card that is an ace and a heart, given that it is an ace, is 1/4 or approximately 0.25. This is because there is only one card in a standard 52-card deck that is both an ace and a heart (the Ace of Hearts).

Q: How do I calculate the probability of selecting a card that is an ace and a heart, given that it is an ace?

A: To calculate the probability of selecting a card that is an ace and a heart, given that it is an ace, you need to divide the number of aces that are hearts by the total number of aces.

P(A and B | A) = Number of aces that are hearts / Total number of aces

where P(A and B | A) is the probability of selecting a card that is an ace and a heart, given that it is an ace.

Q: What is the probability of selecting a card that is an ace and a heart, given that it is neither an ace nor a heart?

A: The probability of selecting a card that is an ace and a heart, given that it is neither an ace nor a heart, is 0. This is because it is impossible to select a card that is both an ace and a heart, given that it is neither an ace nor a heart.

Q: How do I calculate the probability of selecting a card that is an ace and a heart, given that it is neither an ace nor a heart?

A: To calculate the probability of selecting a card that is an ace and a heart, given that it is neither an ace nor a heart, you need to divide the number of cards that are both an ace and a heart by the total number of cards that are neither an ace nor a heart.

P(A and B | neither A nor B) = Number of cards that are both A and B / Total number of cards that are neither A nor B

where P