Power parameter in the Tweedie family that corresponds to a gamma/exponential distribution.

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Multiple Choice

Power parameter in the Tweedie family that corresponds to a gamma/exponential distribution.

Explanation:
In Tweedie models, the variance of the response is linked to the mean by Var(Y) = φ μ^p, so the power parameter p sets how the variance grows with the mean. Gamma and exponential distributions both have variance that grows with the square of the mean, i.e., Var(Y) ∝ μ^2. That corresponds to p = 2. The other values map to different distributions: p = 0 gives a normal with constant variance, p = 1 gives a Poisson with Var(Y) = μ, and p around 3 relates to the inverse Gaussian family within the Tweedie class. So p = 2 is the correct match for gamma/exponential.

In Tweedie models, the variance of the response is linked to the mean by Var(Y) = φ μ^p, so the power parameter p sets how the variance grows with the mean. Gamma and exponential distributions both have variance that grows with the square of the mean, i.e., Var(Y) ∝ μ^2. That corresponds to p = 2. The other values map to different distributions: p = 0 gives a normal with constant variance, p = 1 gives a Poisson with Var(Y) = μ, and p around 3 relates to the inverse Gaussian family within the Tweedie class. So p = 2 is the correct match for gamma/exponential.

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