An ordinary deck of cards contains 52 cards divided into four suits. The red suits are diamonds (◆) and hearts (♥), and the black suits are clubs (♣) and spades (♠). Each suit contains 13 cards of the following denominations: 2, 3, 4, 5, 6, 7, 8, 9, 10, J (jack), Q (queen), K (king), and A (ace). The cards J, Q, and K are called face cards. Imagine choosing a card at random from a thoroughly mixed deck. Consider the event that the denomination of the chosen card is at most 4 (counting aces as 14). Which of the following expresses this event as a set? {2♠, 3♠, 4♠, 2◆, 3◆, 4◆, 2♣, 3♣, 4♣, 2♥, 3♥, 4♥} {2♠, 3♠, 2◆, 3◆, 2♣, 3♣, 2♥, 3♥} {A♠, 2♠, 3♠, 4♠, A◆, 2◆, 3◆, 4◆, A♣, 2♣, 3♣, 4♣, A♥, 2♥, 3♥, 4♥} {A♠, 2♠, 3♠, A◆, 2◆, 3◆, A♣, 2♣, 3♣, A♥, 2♥, 3♥} {4♠, 4◆, 4♣, 4♥} What is the probability of this event?