One card is selected at random from a deck of cards. Determine the probability that the card is a black heart.

0 probability.

Hearts are only red.

To determine the probability of selecting a black heart from a deck of cards, we first need to understand how many black hearts are in the deck.

A standard deck of cards contains 52 cards, with four suits: hearts, diamonds, clubs, and spades. Each suit has thirteen cards: ace, 2-10, and the face cards (jack, queen, and king).

Among the four suits, there is only one black suit, which is spades. Therefore, there are no black hearts in a standard deck of cards. Hearts are always red in color.

So, the probability of selecting a black heart from a deck of cards is zero, since there are no black hearts in the deck.

In summary, the probability of selecting a black heart from a standard deck of cards is 0.

To determine the probability of selecting a black heart from a deck of cards, we first need to find the number of black hearts in the deck and the total number of cards.

A standard deck of playing cards contains 52 cards, divided into four suits: clubs (♣), diamonds (♦), hearts (♥), and spades (♠).

Among these suits, two are black (clubs and spades) and two are red (diamonds and hearts).

However, the suit of hearts also contains a red heart suit (♥), which means there are no black hearts in a standard deck of cards.

Therefore, the probability of selecting a black heart from a deck of cards is zero.