Mathematics, 10.06.2020 02:57 haileysolis5
Let X denote an exponential random variable with unknown parameter λ >0 . Let Y = ζ (X > 5), the indicator that X is larger than 5.
Recall the definition of the indicator function here is:
ζ(X>5)= 1 if X>5
0 if X<=5
We think of Y as a censored version of the Exponential random variable X: we cannot directly observe X, but we are able to gather some information about it in this case, whether or not X is larger than 5.).
Observe that Y is a Bernoulli random variable. Thus, the statistical model for Y can be written ({0,1}, {Ber (f (λ))} λ>0)for some function of f of λ.
What is f (λ)?
Answers: 2
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Let X denote an exponential random variable with unknown parameter λ >0 . Let Y = ζ (X > 5), t...
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