Question: I need help with 2, 3, and 4. For 3, the example that is referenced is involving manipulating an integral into a gamma distribution to

I need help with 2, 3, and 4. For 3, the example that is referenced is involving manipulating an integral into a gamma distribution to solve.

``) Assume now that what hir category is introducal - "extremely violent , which includes the prisoners whose Boare on the test is in the top 196\\ 1. The demand for water thuring early afternoon hours has been aheeral to have an exponential I'm ander for a prisoner to he classificaal as " extremely violent , the prison's ITmust Beare At distribution with meas Ion Its ( cubic feet per second! ) .` least how many prints on the test ?* ( a ) Find the probability that an a randomly selected day the demand will exceed 270 cri` ( b) What water-pumping capacity should the station maintain during early afterunning #` that the probability that demand will exceed [ parity in a randomly selected day in only . 017\\ 2. Prove the Armand part of the* Empirical Rule of the normal distribution . In at her words .* show that if * ~ Normally . `^] then Flu - 20 = = = * + 2013. 15\\ Guidance Flu - 20= * S * + 201 = Pl ...

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