Complementary Probability Calculator
Discover the probability of an event not happening. Simply input the probability of the event occurring to calculate its complementary probability.
Understanding Complementary Probability
In probability theory, the complementary event of an event A is the event that A does not occur. If we denote the probability of event A as P(A), then the probability of the complementary event, denoted as P(A') or P(not A), is given by:
This calculator helps you find P(A') when you know P(A). Enter the probability of the event below.
Probability Visualization
Understanding Complementary Probability
In probability, a complementary event is the opposite of another event. If you have an event 'A', its complement 'A-prime' (or 'not A') includes all outcomes that are NOT in 'A'. The sum of the probabilities of an event and its complement always equals 1.
Formula
The formula to calculate complementary probability is simple:
- P(A') is the probability of the complementary event (event not happening).
- P(A) is the probability of the event happening.
- 1 represents the total probability of all possible outcomes.
Example
If the probability of rain today is 0.3 (or 30%), then the complementary event is 'it will not rain today'. Using the formula:
So, the probability of no rain today is 0.7 (or 70%).
Use Cases
- Calculating the chance of failure when you know the chance of success.
- Determining the probability of not winning a lottery.
- Assessing risks in various scenarios by understanding the probability of adverse events not occurring.