����app

A discrete random variable is one that can take on a countable number of distinct values. Examples include the number of students in a class or the outcome of rolling a die. In the context of grades, if we consider only whole number scores (0, 1, 2, ..., 100), the variable is discrete because it cannot take on values like 75.5.

A continuous random variable can take on an infinite number of values within a given range. This means it can represent measurements that can be infinitely divided, such as height or weight. If grades were measured with decimals (e.g., 75.5), then the variable would be considered continuous, as it could take any value within the range of possible scores.

A random variable is a numerical outcome of a random phenomenon. It can be classified as either discrete or continuous based on the nature of its possible values. Understanding whether a random variable is discrete or continuous is crucial for selecting appropriate statistical methods for analysis, such as probability distributions.