The probability of students who will drop out is 1/4.

Therefore, we are looking for the probability that a student will NOT drop out, which is 3/4.

A randomly selected student will not drop out of college with a probability of 3/4.

The fact that there is 10,000 students in the school is not relevant to calculate this probability.

The number of students who have over seven years of experience is:

The probability that a randomly selected student has at least four years of experience is:

Substituting in our values for these variables, we get:

The probability that a randomly selected customer is in the moderate- or high-risk class is simply the sum of the number of clients in the moderate-risk class and the number of clients in the high-risk class divided by the  total number of clients:

This is also equivalent to just summing up the probability of being in the high-risk class and the probability of being in the moderate-risk class. Since the 3 classes are mutually exclusive, we do not have to worry about subtracting the probability of mutual elements.

The probability that a randomly selected applicant has a score lower than 560 is:

Out of the  patients,  wrongly tested positive and  wrongly tested negative. There is a total of  patients whose tests were not accurate.

The probability that a randomly selected patient was accurately tested is:

The probablilty of a fair coin coming up heads is . 

If the coin is altered as in the problem, then the odds of the coin coming up heads as opposed to tails are 105 to 100; restated, the probability of it coming up heads is

John has increased the probability of the coin coming up heads by

The probability that a card, randomly drawn from a standard deck of 52 cards without the joker, is an ace (or any other given rank) is ; if the joker is added, the probability decreases to . The decrease in probability is

The probability that a card, randomly drawn from a standard deck of 52 cards without the joker, is a diamond (or any other given suit) is ; if the joker is added, the probability decreases to . The decrease in probability is

.

The probability of rolling a 6 with a fair die is .

Since a roll of 6 is 5% more likely than any one of the other rolls, and the other rolls are equally probable, then, theoretically, there should be 105 rolls of 6 for every 100 rolls of 5, 100 rolls of 4, etc. - that is, 105 out of 605, rolls should theoretically be a 6. This makes the probability of rolling a 6 on the altered die

.

Therefore, Judy's alteration has increased the probability of rolling a 6 by

The probability of rolling a 5 with a fair die is .

Since a roll of 6 on the altered die is 4% more likely than any one of the other rolls, and the other rolls are equally probable, then, theoretically, there should be 104 rolls of 6 for every 100 rolls of 5, 100 rolls of 4, etc. Consequently, 100 out of 604 rolls should theoretically result in a 5. This makes the probability of rolling a 5 on the altered die

.

Therefore, Pilar's alteration has decreased the probability of rolling a 5 by