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A study of the noise level on takeoff of jets at a particular airport is studied. The random variable X, the noise level in decibels of the jet as it passes over the first residential area adjacent to the airport. This random variable is assumed to have a gamma distribution with alpha = 2 and beta unknown. What is the maximum likelihood function L(LaTeX: \betaβ) for this distribution?

Please demonstrate each step well so I can follow. The answer should be: L(LaTeX: \beta ) = LaTeX: \frac{1}{\beta^{2n}}\left(x_1\:\cdot\:x^{_{_2}\:}\cdot x_3...x_n\right)e^{-\frac{1}{\beta}\sum x_i}

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