Question
Consider a standard 52 card deck of playing cards. In total there are four cards that are Aces, four cards that are Kings, four cards
Consider a standard 52 card deck of playing cards. In total there are four cards that are Aces, four cards that are Kings, four cards that are Queens and four cards that are Jacks. The remaining 36 cards are four each of the numbers 2, 3, . . . , 10. That is there are four cards that are twos, four cards that are threes etc. For this question, suppose that we reduce the number of cards in the deck by
removing three of the Aces
removing two other cards that are not Aces
The cards that are removed are discarded and are not used for the remainder of this question. As such we now have a deck that consists of just 47 cards. Suppose that a card is randomly drawn from this reduced sized deck. Let A1 denote the event that this card is an Ace. This card that was drawn from the deck of cards is now discarded and we continue with a deck of just 46 cards. Suppose that a second card is now randomly drawn from this 46-card deck and let A2 denote the event that this card is an Ace. Answer the following questions.
(a) What is P(AC 1 )?
(b) Given that the first card drawn was not an Ace, what is the probability that the second card drawn is not an Ace? That is, using our notation, what is P(A C 2 |A C 1 )?
(c) What is the probability that both of the cards are not aces? That is, what is P(AC 1 and AC 2 )? Show your workings.
(d) What is the probability that at least one of the cards is an ace? Show your workings
(e) Given that the first card drawn was an Ace, what is the probability that the second card drawn is not an Ace?
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