The equivalent question is this: What is the probability that all three dice will show 1, 2, 3, or 4? 

The probability that one fair die will show a 1, 2, 3, or 4 is , so the probability that all three will show 1, 2, 3, or 4 is 

.

If four more threes are added to a deck of fifty-two playing cards, then the deck will have fifty-six playing cards, including four aces, four twos, and eight threes. This makes sixteen ways to draw an ace, a two, or a three out of a possible fifty-six draws, or a probability of 

.

This can more easily be solved by finding the probability that neither draw will result in a blue ball, then subtracting it from 1.

The probability that the first ball will not be blue will be seven (balls that are not blue) out of ten (balls total), or . Since the ball is replaced, this is also the probability that the second will not be blue. Therefore, the probability that neither will be blue is . 

The probability that at least one draw will result in a blue ball is therefore .

The best way to find this probability is to find the probability that both will show a 1, 2, 3, or 4, and subtract that probability from 1. 

The probability that one fair die will show a 1, 2, 3, or 4 is , so the probability that both will show 1, 2, 3, or 4 is 

.

The probability that at least one die will show a 5 or a 6 is therefore 

.

If four more tens are added to a deck of fifty-two playing cards, then the deck will have fifty-six playing cards, including four aces, four twos, and four threes. This makes twelve ways to draw an ace, a two, or a three out of a possible fifty-six draws, or a probability of 

.

There are 19 winning cards: the 13 clubs, the other 3 queens, and the other 3 kings (the queen and king of clubs are already counted). There are subsequently 33 losing cards, so the odds against a winning card are the number of losing cards, 33, to the number of winning cards, 19. This cannot be reduced, so the correct choice is 33 to 19.

There are 10 winning cards: the 4 twos, the 4 threes, and the 2 black fours. There are subsequently 42 losing cards, so the odds against a winning card are the number of losing cards, 42, to the number of winning cards, 10. This can be reduced to 

or 21 to 5.

There are 4 winning cards: the 2 red fours and the 2 black nines. There are subsequently 48 losing cards, so the odds against a winning card are the number of losing cards, 48, to the number of winning cards, 4. This can be reduced to 

or 12 to 1.

Since there is only one card out of 52 (ace of spades) that wins John the $25 prize, the probability of this happening is . The value of this outcome to John is $24 - the $25 prize minus the $1 he paid to play.

Since there are three cards out of 52 (ace of clubs, ace of diamonds, ace of hearts) that win John a $5 prize, the probability of this happening is . The value of this outcome to John is $4 - the $5 prize minus the $1 he paid to play.

Since there are 48 out of 52 cards that do not win John a prize, the probability of this happening is . The value of this outcome to John is , since he had to pay $1 to play.

To find an expected value of a game, multiply the probability of each outcome by its value, then add the products. The expected value of this game to John is therefore

 dollars, or

The expected value of the game to Johnny rounds to .

Since there is only one card out of 53 (joker) that wins Sharon the $25 prize, the probability of this happening is . The value of this outcome to Sharon is $23 - the $25 prize minus the $2 she paid to play.

Since there is only one card out of 53 (ace of spades) that wins Sharon the $10 prize, the probability of this happening is . The value of this outcome to Sharon is $8 - the $10 prize minus the $2 she paid to play.

Since there are three cards out of 53 (ace of clubs, ace of diamonds, ace of hearts) that win Sharon a $7 prize, the probability of this happening is . The value of this outcome to Sharon is $5 - the $7 prize minus the $2 she paid to play.

Since there are 48 out of 53 cards that do not win Sharon a prize, the probability of this happening is . The value of this outcome to Sharon is , since he had to pay $2 to play.

To find an expected value of a game, multiply the probability of each outcome by its value, then add the products. The expected value of this game to Sharon is therefore

  dollars, or

The expected value of the game to Sharon rounds to .