Question: Let Y be a continuous random variable which assumes any value between [1, 1] with equal chance a. Find the density function f(y) of Y

Let Y be a continuous random variable which assumes any value between [1, 1] with equal chance

a. Find the density function f(y) of Y .

b. Check that this f(y) satisfies the properties that a density function should have.

c. Find its distribution function F(y) for all y (,).

d. Show that this F(y) satisfies the properties that a distribution function should have.

Im unable to write an equation for the density function. In other words, i dont understand how to start this problem knowing that they are equal chance jQuery22403743236576628619_1605466528431?

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