9.7 Probability - College Algebra | OpenStax (2024)

Constructing Probability Models

Suppose we roll a six-sided number cube. Rolling a number cube is an example of an experiment, or an activity with an observable result. The numbers on the cube are possible results, or outcomes, of this experiment. The set of all possible outcomes of an experiment is called the sample space of the experiment. The sample space for this experiment is $\left\{1,2,3,4,5,6\right\}.$ An event is any subset of a sample space.

The likelihood of an event is known as probability. The probability of an event $p$ is a number that always satisfies $0\le p\le 1,$ where 0 indicates an impossible event and 1 indicates a certain event. A probability model is a mathematical description of an experiment listing all possible outcomes and their associated probabilities. For instance, if there is a 1% chance of winning a raffle and a 99% chance of losing the raffle, a probability model would look much like Table 1.

The sum of the probabilities listed in a probability model must equal 1, or 100%.

Computing Probabilities of Equally Likely Outcomes

Let $S$ be a sample space for an experiment. When investigating probability, an event is any subset of $S.$ When the outcomes of an experiment are all equally likely, we can find the probability of an event by dividing the number of outcomes in the event by the total number of outcomes in $S.$ Suppose a number cube is rolled, and we are interested in finding the probability of the event “rolling a number less than or equal to 4.” There are 4 possible outcomes in the event and 6 possible outcomes in $S,$ so the probability of the event is $\frac{4}{6}=\frac{2}{3}.$

Computing the Probability of the Union of Two Events

We are often interested in finding the probability that one of multiple events occurs. Suppose we are playing a card game, and we will win if the next card drawn is either a heart or a king. We would be interested in finding the probability of the next card being a heart or a king. The union of two events $E\text{and}F,\text{written}E\cup F,$ is the event that occurs if either or both events occur.

$$P(E\cup F)=P(E)+P(F)-P(E\cap F)$$

Suppose the spinner in Figure 2 is spun. We want to find the probability of spinning orange or spinning a $b.$

Figure 2

There are a total of 6 sections, and 3 of them are orange. So the probability of spinning orange is $\frac{3}{6}=\frac{1}{2}.$ There are a total of 6 sections, and 2 of them have a $b.$ So the probability of spinning a $b$ is $\frac{2}{6}=\frac{1}{3}.$ If we added these two probabilities, we would be counting the sector that is both orange and a $b$ twice. To find the probability of spinning an orange or a $b,$ we need to subtract the probability that the sector is both orange and has a $b.$

$$\frac{1}{2}+\frac{1}{3}-\frac{1}{6}=\frac{2}{3}$$

The probability of spinning orange or a $b$ is $\frac{2}{3}.$

Computing the Probability of Mutually Exclusive Events

Suppose the spinner in Figure 2 is spun again, but this time we are interested in the probability of spinning an orange or a $d.$ There are no sectors that are both orange and contain a $d,$ so these two events have no outcomes in common. Events are said to be mutually exclusive events when they have no outcomes in common. Because there is no overlap, there is nothing to subtract, so the general formula is

$$P(E\cup F)=P(E)+P(F)$$

Notice that with mutually exclusive events, the intersection of $E$ and $F$ is the empty set. The probability of spinning an orange is $\frac{3}{6}=\frac{1}{2}$ and the probability of spinning a $d$ is $\frac{1}{6}.$ We can find the probability of spinning an orange or a $d$ simply by adding the two probabilities.

$$\begin{array}{l}P(E{{\displaystyle \cup }}^{\text{}}F)=P(E)+P(F)\hfill \\ =\frac{1}{2}+\frac{1}{6}\hfill \\ =\frac{2}{3}\hfill \end{array}$$

The probability of spinning an orange or a $d$ is $\frac{2}{3}.$

Using the Complement Rule to Compute Probabilities

We have discussed how to calculate the probability that an event will happen. Sometimes, we are interested in finding the probability that an event will not happen. The complement of an event $E,$ denoted $E^{\prime },$ is the set of outcomes in the sample space that are not in $E.$ For example, suppose we are interested in the probability that a horse will lose a race. If event $W$ is the horse winning the race, then the complement of event $W$ is the horse losing the race.

To find the probability that the horse loses the race, we need to use the fact that the sum of all probabilities in a probability model must be 1.

$$P(E^{\prime })=1-P(E)$$

The probability of the horse winning added to the probability of the horse losing must be equal to 1. Therefore, if the probability of the horse winning the race is $\frac{1}{9},$ the probability of the horse losing the race is simply

$$1-\frac{1}{9}=\frac{8}{9}$$

Computing Probability Using Counting Theory

Many interesting probability problems involve counting principles, permutations, and combinations. In these problems, we will use permutations and combinations to find the number of elements in events and sample spaces. These problems can be complicated, but they can be made easier by breaking them down into smaller counting problems.

Assume, for example, that a store has 8 cellular phones and that 3 of those are defective. We might want to find the probability that a couple purchasing 2 phones receives 2 phones that are not defective. To solve this problem, we need to calculate all of the ways to select 2 phones that are not defective as well as all of the ways to select 2 phones. There are 5 phones that are not defective, so there are $C(5,2)$ ways to select 2 phones that are not defective. There are 8 phones, so there are $C(8,2)$ ways to select 2 phones. The probability of selecting 2 phones that are not defective is:

$$\begin{array}{l}\frac{\text{waystoselect2phonesthatarenotdefective}}{\text{waystoselect2phones}}=\frac{C(5,2)}{C(8,2)}\hfill \\ =\frac{10}{28}\hfill \\ =\frac{5}{14}\hfill \end{array}$$