Probability
a measure of the chance or likelihood of an event happening, often represented as a number. This can be expressed as 0 (impossible), 1 (certain), or a fraction in between 0 and 1.
Probability is the branch of mathematics that deals with the study of the likelihood of a particular event or outcome occurring. It is concerned with the mathematical modeling and measurement of uncertain events. Probability theory is essential in the formulation of mathematical models of phenomena that incorporate randomness or variability.
Some important concepts in probability theory include:
1. Probability Space: A probability space is a mathematical model that specifies the possible outcomes of a random experiment and assigns a probability to each outcome.
2. Random Variables: A random variable is a variable whose value depends on the outcome of a random experiment. For example, the number of heads that come up in a series of coin flips is a random variable.
3. Probability Density Function: The probability density function (PDF) is a function that describes the probability distribution of a continuous random variable.
4. Cumulative Distribution Function: The cumulative distribution function (CDF) is a function that describes the probability of a random variable taking a value less than or equal to a given value.
5. Bayes’ Theorem: Bayes’ theorem is a formula that describes how to revise the probability of a hypothesis in light of new evidence.
Some of the applications of probability theory include risk assessment and management, statistical inference, decision-making under uncertainty, and many more. In everyday life, probability is used in areas such as gambling, insurance, weather forecasting, and sports.
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