in another word, find E[Yt] and var[Yt] t X be a random variable with mean 0...

Question

Question

in another word, find E[Yt] and var[Yt]

Answer 1

Answer #1

ns: Guteo Jelined a neto proas. า- GVaronte fontton of

es depend on -time :. oualance tnetton depend on taue scnot statio s not S toe pro LLLA YoCLAS

Answer 2

Similar Homework Help Questions

Problem 2. Let X be a random variable with mean 0 and variance σ2. Define the...

Problem 2. Let X be a random variable with mean 0 and variance σ2. Define the process Yt-(-1) Compute the mean and covariance function of the process {Yt). Is this process stationary?
Onsider the process Y, = Y + Σ|e, where Yo ~ (μ, σ2) and the e's are 0-mean, a stationary process...

onsider the process Y, = Y + Σ|e, where Yo ~ (μ, σ2) and the e's are 0-mean, a stationary process? independent identically distributed random variables with variance 1. Is (Y How about the process ▽Yǐ = Yt-)t-1 ? Explain. onsider the process Y, = Y + Σ|e, where Yo ~ (μ, σ2) and the e's are 0-mean, a stationary process? independent identically distributed random variables with variance 1. Is (Y How about the process ▽Yǐ = Yt-)t-1 ? Explain.
Problem 1. (a) Let X be a Binomial random variable such that E(X) 4 and Var(x)...

Problem 1. (a) Let X be a Binomial random variable such that E(X) 4 and Var(x) 2. Find the parameters of X (b) Let X be a standard normal random variable. Write down one function f(t) so that the random variable Y-f(X) is normal with mean a and variance b.

2. Consider the random process x(t) defined by x(t) a cos(wt 6), where w and 0 are constants, and a is a random variable uniformly distributed in the range (-A, A). a. Sketch the ensemble (sample...

2. Consider the random process x(t) defined by x(t) a cos(wt 6), where w and 0 are constants, and a is a random variable uniformly distributed in the range (-A, A). a. Sketch the ensemble (sample functions) representing x(t). (2.5 points). b. Find the mean and variance of the random variable a. (5 points). c. Find the mean of x(t), m(t) E((t)). (5 points). d. Find the autocorrelation of x(t), Ra (t1, t2) E(x (t)x2 )). (5 points). Is the...
find mean and variance ,MGF of one random variable derive that step by step for number...

find mean and variance ,MGF of one random variable derive that step by step for number 2,3,4.Thank you 2 Chi-square f(x)= 22)/72 2 Exponential Gamma 0<α M (t) = (1-et)" t < Normal N (μ, σ2) E (X) = μ, Var(X) = σ2
5) Let X be a random variable with mean E(X) = μ < oo and variance...

5) Let X be a random variable with mean E(X) = μ < oo and variance Var(X) = σ2メ0. For any c> 0, This is a famous result known as Chebyshev's inequality. Suppose that Y,%, x, ar: i.id, iandool wousblsxs writia expliiniacy" iacai 's(%) fh o() airl íinic vaikuitx: Var(X) = σ2メ0. With Υ = n Ση1 Y. show that for any c > 0 Tsisis the celebraed Weak Law of Large Numben

2. Consider the random process x(t) defined by x(t) a cos(wt + 6).where w and a...

2. Consider the random process x(t) defined by x(t) a cos(wt + 6).where w and a are constants, and 0 is a random variable uniformly distributed in the range (-T, ) Sketch the ensemble (sample functions) representing x(t). (2.5 points). a. b. Find the mean and variance of the random variable 0. (2.5 points). Find the mean of x(t), m (t) E(x(t)). (2.5 points). c. d. Find the autocorrelation of x(t), R (t,, t) = E(x, (t)x2 (t)). (5 points)....
a) Consider the following moving average process, MA(2):

a) Consider the following moving average process, MA(2): Yt = ut + α1ut-1 + α2ut-2 where ut is a white noise process, with E(ut)=0, var(ut)=σ2 and cov(ut,us)=0 . Derive the mean, E(Yt), the variance, var(Yt), and the covariances cov( Yt,Yt+1 ) and cov(Yt,Yt+2 ), of this process. b) Give a definition of a (covariance) stationary time series process. Is the MA(2) process (covariance) stationary?
Let X variable Y by be a normal random variable with mean 0 and variance 1....

Let X variable Y by be a normal random variable with mean 0 and variance 1. We define the random y2 if x 20, Y= (a For t E R, compute Mr()-Elen'], the moment generating function of Y. Compute EY

Suppose that Z1 and Z2 are uncorrelated random variables with zero mean and unit variance. Consider...

Suppose that Z1 and Z2 are uncorrelated random variables with zero mean and unit variance. Consider the process deﬁned by Yt = Z1 cos(ωt) + Z2 sin(ωt) + et where et ∼ iid N(0,σ2 e) and {et} is independent of both Z1 and Z2. Prove that {Yt} is stationary.