Let X1, …,Xn be a random sample from f(x; θ) = θ exp(-xθ) , x>0. Use...

Let X1, X2, · · · , Xn be a random sample from an exponential distribution...

Let X1, X2, · · · , Xn be a random sample from an exponential distribution f(x) = (1/θ)e^(−x/θ) for x ≥ 0. Show that likelihood ratio test of H0 : θ = θ0 against H1 : θ ≠ θ0 is based on the statistic n∑i=1 Xi.

Let X1,..., Xn be a random sample from the Rayleigh distribution: Use the likelihood ratio test...

Let X1,..., Xn be a random sample from the Rayleigh distribution: Use the likelihood ratio test to give a form of test (without specifying the value of the critical value) for H0: θ= 1 versus H1:≠1

Let X1,...,Xn be a random sample from the pdf f(x;θ) = θx^(θ−1) , 0 ≤ x...

Let X1,...,Xn be a random sample from the pdf f(x;θ) = θx^(θ−1) , 0 ≤ x ≤ 1 , 0 < θ < ∞ Find the method of moments estimator of θ.

Let X1, X2, · · · , Xn be a random sample from the distribution, f(x;...

Let X1, X2, · · · , Xn be a random sample from the distribution, f(x; θ) = (θ + 1)x^ −θ−2 , x > 1, θ > 0. Find the maximum likelihood estimator of θ based on a random sample of size n above

Let X¯ be the sample mean of a random sample X1, . . . , Xn...

Let X¯ be the sample mean of a random sample X1, . . . , Xn from the exponential distribution, Exp(θ), with density function f(x) = (1/θ) exp{−x/θ}, x > 0. Show that X¯ is an unbiased point estimator of θ.

Let X1, . . . , Xn ∼ iid Exp (θ). Find the UMP test for...

Let X1, . . . , Xn ∼ iid Exp (θ). Find the UMP test for H0 : θ ≥ θ0 vs H1 : θ < θ0.

Let X1, . . . , Xn be a random sample from the following pdf: f(x|θ)=...

Let X1, . . . , Xn be a random sample from the following pdf: f(x|θ)= (x/θ)*e^(-x^2/2θ). x>0 (a) Find a sufficient statistic for θ.

Let X1, X2 · · · , Xn be a random sample from the distribution with...

Let X1, X2 · · · , Xn be a random sample from the distribution with PDF, f(x) = (θ + 1)x^θ , 0 < x < 1, θ > −1. Find an estimator for θ using the maximum likelihood

Let X1,..., Xn be a random sample from the Geometric distribution: Use the likelihood ratio test...

Let X1,..., Xn be a random sample from the Geometric distribution: Use the likelihood ratio test to give a form of test (without specifying the value of the critical value) for H0: p= 1 versus H1:p≠1

6. Let θ > 1 and let X1, X2, ..., Xn be a random sample from...

6. Let θ > 1 and let X1, X2, ..., Xn be a random sample from the distribution with probability density function f(x; θ) = 1/(xlnθ) , 1 < x < θ. a) Obtain the maximum likelihood estimator of θ, ˆθ. b) Is ˆθ a consistent estimator of θ? Justify your answer.