Classical or Mathematical Probability

Introduction to Probability

 

Welcome to PostNetwork Academy! This article explains the fundamentals of Classical or Mathematical Probability, including definitions, examples, key characteristics, and limitations.

What is Classical Probability?

Definition: If an experiment has \( n \) mutually exclusive, equally likely, and exhaustive cases, and \( m \) of these cases are favorable for an event \( A \), then the probability of \( A \) is given by:

\[
P(A) = \frac{\text{Number of favorable cases (m)}}{\text{Total number of cases (n)}}
\]

Examples of Classical Probability

Example 1: Tossing a Coin

• Sample Space: \( S = \{H, T\}, \quad n(S) = 2 \)
• Event \( A \): Getting a Head \( \{H\} \), \( m = 1 \)
• Probability:
  \[
  P(A) = \frac{1}{2}
  \]

Example 2: Rolling a Die

• Sample Space: \( S = \{1, 2, 3, 4, 5, 6\}, \quad n(S) = 6 \)
• Event \( B \): Getting an even number \( \{2, 4, 6\} \), \( m = 3 \)
• Probability:
  \[
  P(B) = \frac{3}{6} = \frac{1}{2}
  \]

Key Characteristics of Classical Probability

Limitations of Classical Probability

Example: Biased Coin

If a coin is biased, \( P(H) \neq P(T) \), the classical definition fails because the outcomes are not equally likely.

Example: Infinite Sample Space

Probability of selecting a specific integer from \( \{-\infty, …, -2, -1, 0, 1, 2, \infty\} \):

\[
P = \frac{1}{\infty} = 0
\]

This contradicts the actual chances of occurrence.

Summary

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