Continuous random variables can take on values between whole integers that contain decimal points
Continuous random variables are a type of random variable in statistics and probability theory that can take on any value within a specified range
Continuous random variables are a type of random variable in statistics and probability theory that can take on any value within a specified range. This includes values that are not necessarily whole integers and may contain decimal points.
For example, consider a continuous random variable representing the height of individuals. Heights can vary continuously between whole integers (e.g., 150 cm, 151 cm, 152.5 cm, etc.) and can take on any value within a certain range, such as from 140 cm to 180 cm.
Unlike discrete random variables that can only take on specific values (such as the number of heads obtained when flipping a coin), continuous random variables can have an infinite number of possible values within a given interval.
To describe continuous random variables mathematically, we often use probability density functions (PDFs) such as the normal distribution, exponential distribution, or uniform distribution. These functions assign probabilities to different intervals on the real number line, indicating the likelihood of a continuous random variable falling within a particular range of values.
It is important to note that when working with continuous random variables, probabilities are represented by the area under the probability density function curve within a specific interval.
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