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Applied probability is a significant area of mathematics that connects theoretical probability concepts with their practical applications across various disciplines. It uses mathematical tools and frameworks to model, analyze, and interpret random phenomena. Central to applied probability are the concepts of random variables, representing outcomes of stochastic systems. These variables can be discrete, representing countable outcomes, or continuous, representing outcomes within a range, and their associated probability distributions provide a detailed description of the likelihood of different outcomes. Key topics in this field include probability measures, expectation, variance, higher-order moments, and the relationships between random variables through concepts such as covariance and correlation. These tools enable the quantification of uncertainty and variability, making applied probability essential for decision-making in situations with incomplete or uncertain information. Applications of applied probability extend across multiple disciplines. In engineering, it supports signal processing, network reliability, and system optimization.