Show that the probability density function of a uniform distribution satisfies the two conditions for a probability density function A uniform distribution is a continuous probability distribution for a random variable x between two values a and b (a The probability density function of a uniform distribution is y 1 b a On the interval from x a to x b For any value of x less than a or greater than b, y 0 Ca

Question: Show that the probability density function of a uniform distribution satisfies the two conditions for a probability density function. A uniform distribution is a continuous

Show that the probability density function of a uniform satisfies the two conditions for a probability density function.
A uniform is a continuous probability for a random variable x between two values a and b (a

The probability density function of a uniform distribution is
y = 1/b €“ a
On the interval from x = a to x = b. For any value of x less than a or greater than b, y = 0.

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