Notice: This page requires JavaScript to function properly.
Please enable JavaScript in your browser settings or update your browser.
Addition Rule for Non-Mutually Exclusive Events | Statistical Dependence
Probability Theory Update
course content

Course Content

Probability Theory Update

Probability Theory Update

1. Probability Basics
2. Statistical Dependence
3. Learn Crucial Terms
4. Probability Functions
5. Distributions

bookAddition Rule for Non-Mutually Exclusive Events

When do we use the addition rule?

If we want to calculate the probability of event A occurring or event B occurring, taking into account that they are mutually exclusive, we use the addition rule.

Formula:

P(A or B) = P(A) + P(B) - P(A and B), where

  • P(A or B) - the probability of event A occurring or event B occurring,
  • P(A) - the probability of event A occurring
  • P(B) - the probability of event B occurring
  • P(A and B) - the probability of events A and B occurring simultaneously

Task example:

In the class, there are 18 boys and 12 girls; 15 people have dark hair (3 girls and 12 boys). What is the probability of randomly choosing a girl or a dark-haired student?

  1. P(girl) = 12/30 = 0.4 = 40%
  2. P(dark-haired student) = 15/30 = 0.5 = 50%
  3. P(girl and dark-haired student) = 3/15 = 20%
  4. P(girl or dark-haired student) =P(girl) + P(dark-haired student) - P(girl and dark-haired student) = 40% + 50% - 20%= 70%.

Everything was clear?

How can we improve it?

Thanks for your feedback!

Section 2. Chapter 4
some-alt