Probability
Ever wondered if it will rain tomorrow or if you will win a game? That’s probability! It is a mathematical way to measure how likely an event is to happen.
Outcomes
Definition Outcome
An outcome is one possible result of a random experiment.
Definition All Possible Outcomes
All possible outcomes are the complete list of all the outcomes that can happen in a random experiment.
Example
What are all the possible outcomes when you flip a coin? 
All possible outcomes are Heads (H)=
and Tails (T)=
.
and Tails (T)=.
Example
What are all the possible outcomes when you roll a six-sided die?
All possible outcomes are 1=
, 2=
, 3=
, 4=
, 5=
, and 6=
.
, 2=, 3=, 4=, 5=, and 6=.Events
Definition Event
An event is a set of outcomes from the set of all possible outcomes.
Example
In the experiment of rolling a die, find the outcomes that correspond to rolling an even number.
The outcomes for “rolling an even number” are 2=, 4=, and 6=.
, 4=, and 6=.Using Words to Describe Probability
We use special words to describe the chance of an event happening. We can place these words on a line from least likely to most likely.
Definition Probability Line
- Impossible: It can’t happen.
Example: Riding a dinosaur. - Less likely: It probably won’t happen.
Example: Rolling a die and getting a 3. - Even chance: It has the same chance to happen or not to happen.
Example: Tossing a coin and getting heads. - More likely: It will probably happen.
Example: Drinking water at school today. - Certain: It will happen.
Example: The sun will rise tomorrow.
Using Numbers to Quantify Probability
When you flip a coin, there are two possible outcomes: heads or tails. The chance of getting heads is 1 out of 2. We can write this as a fraction:
Definition Probability
The probability of an event, written \(P(\text{event})\), is a number from 0 (impossible) to 1 (certain).