Four cards are drawn from a standard deck. No cars are returned.

A) Given that four cards are drawn from a standard deck without replacement, the probability of drawing a straight is higher than the probability of drawing four consecutive Queens.

To calculate the probability of drawing a straight, we can consider the number of ways a straight can occur and divide it by the total number of possible outcomes. There are 10 possible straights in a standard deck (A,2,3,4; 2,3,4,5; ...; 10,J,Q,K), and the total number of possible outcomes without replacement is the number of ways to choose 4 cards out of 52, which is given by the combination formula: C(52, 4) = 52! / (4! * (52-4)!). Therefore, the probability of drawing a straight is: P(A) = 10 / C(52, 4).

On the other hand, the probability of drawing four consecutive Queens is given by the number of ways four Queens can be drawn divided by the total number of possible outcomes without replacement. There is only one way to draw four consecutive Queens, and the total number of possible outcomes without replacement is C(52, 4). Therefore, the probability of drawing four consecutive Queens is: P(B) = 1 / C(52, 4).

Since P(A) > P(B), it is more likely to draw a straight than to draw four consecutive Queens.

B) If cards are returned after each draw, the probabilities of drawing a straight and drawing four consecutive Queens would change. Returning cards after each draw means that the deck is effectively reset to its original composition before each draw, so the probability of drawing any particular card remains the same at each draw.

Drawing a straight: Each draw is independent of the previous draws because the cards are returned, maintaining a uniform distribution in the deck. Therefore, the probability of drawing a straight is the product of the probabilities of drawing each card of the straight consecutively. For example, the probability of drawing 5,6,7,8 in order would be (4/52) * (4/52) * (4/52) * (4/52).

Drawing four consecutive Queens: With cards returned after each draw, the probability of drawing four consecutive Queens would remain the same as drawing any four specific cards in order: (4/52) * (4/52) * (4/52) * (4/52).

If cards are returned after each draw, the probabilities of drawing a straight and drawing four consecutive Queens would remain the same as calculating the probabilities for drawing any specific set of four cards in order, which is much lower than drawing a straight in general.