The probability that a continuous random variable equals a specific value is always equal to 1
In the case of continuous random variables, the probability that the variable will equal a specific value is actually zero, not one
In the case of continuous random variables, the probability that the variable will equal a specific value is actually zero, not one.
Continuous random variables can take on an infinite number of possible values within a certain range. The probability is distributed over intervals rather than specific points. Since the number of possible values is uncountable, the probability of any individual value is infinitesimally small.
To illustrate this, consider a continuous random variable representing the height of individuals. It can take on any value within a certain range, let’s say from 150 cm to 200 cm. The probability that someone’s height is exactly 170 cm is infinitesimally small. However, the probability that the height falls within a small interval, for example, between 169.9 cm and 170.1 cm, is positive.
To calculate probabilities with continuous random variables, we use probability density functions (PDFs) instead of probability mass functions (PMFs) used for discrete random variables. PDFs provide the probability density at each point within the range of the variable, and calculating probabilities involves integrating over intervals rather than summing.
In summary, when dealing with continuous random variables, the probability of the variable taking on a specific value is zero, while the probability of the variable falling within an interval is positive.
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