Respuesta :
Since the cards are being replaced, the total number of cards in the deck remain the same and the probability of picking one card is not affecting the probability of next cards.
Total number of cards in the deck = 52
Number of Aces = 4
Number of Red Cards = 26
Number of Face Cards = 12
Probability of picking an Ace = 4/52
Probability of picking a Red Card = 26/52
Probability of picking a Face Card = 12/52
The probability of picking an ace, then a red card, and then a face card will be = [tex] \frac{4}{52}* \frac{26}{52}* \frac{12}{52} = \frac{3}{338} [/tex]
Thus the probability of picking an ace, then a red card, and then a face card will be 3/338
Total number of cards in the deck = 52
Number of Aces = 4
Number of Red Cards = 26
Number of Face Cards = 12
Probability of picking an Ace = 4/52
Probability of picking a Red Card = 26/52
Probability of picking a Face Card = 12/52
The probability of picking an ace, then a red card, and then a face card will be = [tex] \frac{4}{52}* \frac{26}{52}* \frac{12}{52} = \frac{3}{338} [/tex]
Thus the probability of picking an ace, then a red card, and then a face card will be 3/338
Answer:
B) two number cards, two face cards, one number card and one face card
Step-by-step explanation:
Since order doesn't matter all you need to know is whether you got two number cards, two face cards, or one number card and one face card.
