Random Variable and Probability Distribution
In this class, We discuss Random Variable and Probability Distribution.
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The reader should have prior knowledge of probability basics. Click Here.
Focus much on the concept. The probability distribution is used much in data science and analysis.
Random Variable: A random variable is a function that assigns a real number to each sample point in the sample space of a random experiment.
Random variable denoted by X
The value present in the random variable X. is given by small x.
X = x
We go with an example to understand the definition of a random variable.
Example:
Tossing two coins.
Sample space = {HH, HT, TH, TT}
Consider Random variable X.
X denotes the number of heads.
The random variable X contains values {0, 1, 2}
0 heads, 1 head, or 2 heads.
Range of random variable X = 0 – 2
From the definition of a random variable: A random variable assigns a value to each sample point in the sample space.
Take a sample point HH from the sample space.
The random variable assigned to sample point HH is 2.
Below are the probabilities for the random variable X = x.
P(X = 0) = 1/4
P(X = 1) = 2/4
P(X = 2) = 1/4
Another random variable Y.
The random variable Y denotes the number of tails.
Important: We can assign more than one random variable to the random experiment.
Probability Distribution or Distribution
It gives a set of possible values of the random variable X and its probability values.