Asked by Anonymous
Let X and W be independent and uniformly distributed on [−1,1]. We have given the following facts:
E[X]=E[X^3]=E[X^5]=0
E[X^2]=1/3
E[X^4]=1/5
Suppose that Y=X^3+W
Find the LMS estimate of Y, given that X=x.
(Notice we are trying to estimate Y from X, not the opposite direction. ) (Your answer should be a function of x.)
Y^LMS(x)= ?
Find the LLMS estimate for Y, given that X=x. (Your answer should be a function of x.)
Y^LLMS(x)= ?
E[X]=E[X^3]=E[X^5]=0
E[X^2]=1/3
E[X^4]=1/5
Suppose that Y=X^3+W
Find the LMS estimate of Y, given that X=x.
(Notice we are trying to estimate Y from X, not the opposite direction. ) (Your answer should be a function of x.)
Y^LMS(x)= ?
Find the LLMS estimate for Y, given that X=x. (Your answer should be a function of x.)
Y^LLMS(x)= ?
Answers
Answered by
Anonymous
can anyone please help here?
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.