SOLUTION: Since the event has only two outcomes, the probability of a and the
probability of b must add to 1. Thus p 3 + p 5 = 1. To solve for p, multiply across
the equation by 15:
5 p + 3p = 15
8 p = 15
p =^158
Probability of Multiple Events
In the previous example, you looked at the probability of a single event occurring
(selecting a black marble). Tougher probability questions will concern the
probability that multiple events will occur. These questions will take two forms:
probability questions with “and” and probability questions with “or.”
Probability with “or”: Add Them Up
If a probability question concerns the likelihood that one event or another event
will happen, add up the probabilities of each event. For example:
In a certain bookcase, 10 books are about science, 8 are about literature, 5 are
about history, and 2 are about psychology. If a book is selected at random,
what is the probability that the book is about science or history?
A 0.08
B 0.2
C 0.3
D 0.4
E 0.6
SOLUTION: Two different events, a science book or history book, would satisfy
the desired outcome. Thus to determine the number of desired outcomes,
you should add the number of science books and the number of history
books: 10 + 5 = 15. The total number of outcomes is the sum of the books:
10 + 8 + 5 + 2 = 25. The probability of selecting a science book or history
book is thus^1525 =^35 = 0.6. The correct answer is E.
356 PART 4 ■ MATH REVIEW
04-GRE-Test-2018_313-462.indd 356 12/05/17 12:04 pm