Question

There are 4 aces in a deck of cards, and there is 1 ace of hearts in those 4 aces. Therefore, the probability of pulling out an ace is 1/13.

Once you have pulled out the ace, there are 13 hearts in a deck, and only 1 of them is a 3. Therefore, the probability of pulling out the 3 of hearts is 1/13.

To find the probability of both events happening, you multiply the probabilities together:

(1/13) * (1/13) = 1/169

Therefore, the probability of pulling out an ace and then pulling out the 3 of hearts is 1/169.

The probability of pulling out an ace and then pulling out the 3 of hearts is 1/169, which is a relatively low probability. This means that it is not very likely that you will pull out an ace and then pull out the 3 of hearts when shuffling and drawing cards from a standard deck.

I apologize for the mistake in my previous responses. Let's reevaluate the probability of selecting an Ace, replacing it, and then selecting the 3 of Hearts from a standard deck of cards.

The probability of selecting an Ace from a standard deck of 52 cards is 4/52 = 1/13.

Since the Ace is replaced before the next draw, the deck is back to its original composition, and the probability of selecting the 3 of Hearts is 1/52.

To find the overall probability of selecting an Ace and then selecting the 3 of Hearts, we multiply the individual probabilities:

(1/13) * (1/52) = 1/676

Therefore, the likelihood of selecting an Ace, replacing it, and then selecting the 3 of Hearts from a standard deck of cards is 1/676, which is approximately 0.148% or approximately 0.1%.

As per the correct calculations, the likelihood of selecting an Ace, replacing it, and then selecting the 3 of Hearts from a standard deck of cards is 0.1%. This probability is quite low, making this sequence of events unlikely rather than most likely.