Asked by SK
Bias and MSE
We estimate the unknown mean θ of a random variable X with unit variance by forming the sample mean Mn=(X1+⋯+Xn)/n of n i.i.d. samples Xi and then forming the estimator
Θˆn=13⋅Mn.
Your answers below can be functions of θ and n. Follow standard notation and use 'theta' to indicate θ.
The bias E[Θˆn]−θ of this estimator is:
unanswered
The mean squared error of this estimator is:
unanswered
We estimate the unknown mean θ of a random variable X with unit variance by forming the sample mean Mn=(X1+⋯+Xn)/n of n i.i.d. samples Xi and then forming the estimator
Θˆn=13⋅Mn.
Your answers below can be functions of θ and n. Follow standard notation and use 'theta' to indicate θ.
The bias E[Θˆn]−θ of this estimator is:
unanswered
The mean squared error of this estimator is:
unanswered
Answers
Answered by
Meeto
For biais: -2*theta/3
Answered by
Cheat
-2*theta/3
Answered by
Helper
mse: 4*theta^2/9
Answered by
Hierarchy is important
Helper's answer is kinda right, but input it like:
(4*theta^2)/9
(4*theta^2)/9
Answered by
alpha
Actually above is just part of the answer, mse is 1/9+(4*theta^2)/9
Answered by
alpha
typo above: (1/9*n)+(4*theta^2)/9
Answered by
Humble1
(1/(9*n))+(4*theta^2)/9
Answered by
Anonymous
-2*theta/3
Answered by
RandomGuesser 2.0
bias: -2*theta/3
mse: (1/(9*n))+(4*theta^2)/9
mse: (1/(9*n))+(4*theta^2)/9
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