assume there are 300 students in total, and we let X be the number of students...

Suppose the random variable X has pdf f(x;?, ?)=??x?−1e−?x? for x≥0;?, ? > 0. a) Find...

Suppose the random variable X has pdf f(x;?, ?)=??x?−1e−?x? for x≥0;?, ? > 0. a) Find the maximum likelihood estimator for ?, assuming that ? is known. b) Suppose ? and ? are both unknown. Write down the equations that would be solved simultaneously to find the maximum likelihood estimators of ? and ?.

Let we have a sample of 100 numbers from exponential distribution with parameter θ f(x, θ)...

Let we have a sample of 100 numbers from exponential distribution with parameter θ f(x, θ) = θ e- θx      , 0 < x. Find MLE of parameter θ. Is it unbiased estimator? Find unbiased estimator of parameter θ.

6. Let X1, X2, ..., Xn be a random sample of a random variable X from...

6. Let X1, X2, ..., Xn be a random sample of a random variable X from a distribution with density f (x)  ( 1)x 0 ≤ x ≤ 1 where θ > -1. Obtain, a) Method of Moments Estimator (MME) of parameter θ. b) Maximum Likelihood Estimator (MLE) of parameter θ. c) A random sample of size 5 yields data x1 = 0.92, x2 = 0.7, x3 = 0.65, x4 = 0.4 and x5 = 0.75. Compute ML Estimate...

Consider the binomial model, where the variable X is the total number of failures from a...

Consider the binomial model, where the variable X is the total number of failures from a set of N produced electronic components. Let p be the probability of a failure and x the number of failures during a one year observation period. What is the standard deviation of the maximum likelihood estimator given that there were 37 failures observed out of a group of 840 electronic components during the one year observation period?

Let X1, X2,..., Xn be a random sample from a population with probability density function f(x)...

Let X1, X2,..., Xn be a random sample from a population with probability density function f(x) = theta(1-x)^(theta-1), where 0<x<1, where theta is a positive unknown parameter a) Find the method of moments estimator of theta b) Find the maximum likelihood estimator of theta c) Show that the log likelihood function is maximized at theta(hat)

Assume that any student has a 25% chance of getting into a certain college. Let the...

Assume that any student has a 25% chance of getting into a certain college. Let the random variable X denote the number of students (from a total of 5 students who apply) who get into the school. For the following problems do not use calculator commands. a. What are the parameters n and p for the distribution? b. What is the expected number of students (out of the 5) who will be accepted to the school? c. Find the standard...

Let B > 0 and let X1 , X2 , … , Xn be a random...

Let B > 0 and let X1 , X2 , … , Xn be a random sample from the distribution with probability density function. f( x ; B ) = β/ (1 +x)^ (B+1), x > 0, zero otherwise. (i) Obtain the maximum likelihood estimator for B, β ˆ . (ii) Suppose n = 5, and x 1 = 0.3, x 2 = 0.4, x 3 = 1.0, x 4 = 2.0, x 5 = 4.0. Obtain the maximum likelihood...

Suppose 5% of college students don’t use social media. We randomly sampled 1000 college students. Let...

Suppose 5% of college students don’t use social media. We randomly sampled 1000 college students. Let X denote the number of students who don’t use social media in this sample. Calculate the expected value and the standard deviation for X. Find the probability of observing 50 or less students who don’t use social media in this sample. If you would like to use normal approximation for binomial distribution, make sure to check the conditions and you don’t need to do...

Suppose 5% of college students don’t use social media. We randomly sampled 1000 college students. Let...

Suppose 5% of college students don’t use social media. We randomly sampled 1000 college students. Let X denote the number of students who don’t use social media in this sample. Calculate the expected value and the standard deviation for X. (4 pts) Find the probability of observing 50 or less students who don’t use social media in this sample. If you would like to use normal approximation for binomial distribution, make sure to check the conditions and you don’t need...

Let X1,X2,...,Xn be i.i.d. Geometric(θ), θ = 1,2,3,... random variables. a) Find the maximum likelihood estimator...

Let X1,X2,...,Xn be i.i.d. Geometric(θ), θ = 1,2,3,... random variables. a) Find the maximum likelihood estimator of θ. b) In a certain hard video game, a player is confronted with a series of AI opponents and has an θ probability of defeating each one. Success with any opponent is independent of previous encounters. Until first win, the player continues to AI contest opponents. Let X denote the number of opponents contested until the player’s first win. Suppose that data of...