l Exam.(Jan 15) Circle out your Class Mon& Wed or Mon.Evening 3) Suppose X,x,X, (n>1) is...
3) Suppose X,,X,,X, (n > 1) is a random sample from Bernoulli distribution with Circle out your Class: Mon&Wed or Mon.Evening p.mf. p(x)=p"(I-p)'-x , x = 0,1, , thenyi follows ( ). Binomial distribution B(a.p) eNormal distribution N(p,mp(- O Poisson distribution P(np) Dcan not be determined. 4) Suppose X-N(0,1) and Y~N(24), they are independent, then )is incorrect. X+Y N(2, 5) C X-Y-NC-2,5) BP(Y <2)>0.5 D Var(X) < Var(Y) x,X,, ,X, (n>1) is a random sample from N(μσ2), let-1ΣΧί 5) Suppose...
Circle out your Class: Mon&Wed or Mon.Evening om Final Exam.(Jan 15) Question 7. Suppose that X,X2,. , X is a simple random sample fr distribution with the following p.d.f. 0-1 f(x,) 0, otherwise where θ > 0, a random sample of size 10 yields data 092 0.79 0.9 0.65 0.86 0.47 0.73 0.97 0.94 0.77 1) (6 points) Get the moment estimator of θ, and compute the estimate for this data,
Exam.(Jan 15) Circle out your Class Mon&Wed or Mon.Evening /uestion 7. Suppose that Xi, distribution with the following p.d.f. Aio is a simple random sample from the , f(x8) 0x01,for0sxsi 0, otherwise where 0 0, a random sample of size 10 yields data 0.92 0.79 0.9 0.65 0.86 0.47 0.73 0.97 0.94 0.77 1) (6 points) Get the moment estimator of 0, and compute the estimate for this data; Page 8 of8 2) (O points) Get the maximum likelihood estimator...
Circle out your Class: Mon&Wed or Mon.Evening om Final Exam.(Jan 15) Question 7. Suppose that X,X2,. , X is a simple random sample fr distribution with the following p.d.f. 0-1 f(x,) 0, otherwise where θ > 0, a random sample of size 10 yields data 092 0.79 0.9 0.65 0.86 0.47 0.73 0.97 0.94 0.77 1) (6 points) Get the moment estimator of θ, and compute the estimate for this data, Lucky Number 6 L2013266 ζ012 ID No. Page 8...
Exam.(Jan 15) Question 7. Suppose that Xi,X2,X distribution with the following p.d.f Cirele out your Class Mon&Wed or (Mon.Evening o is a simple random sample from the 12 s f(x,8)= 0, otherwise where θ > 0, a random sample of size 10 yields data 0.92 0.79 0.9 0.65 0.86 0.47 0.73 0.97 0.94 0.77 1) (6 points) Get the moment estimator of, and compute the estimate for this data;
Rinal Exam.Dan 15) Circle out your Class Mon& Wed or Mon Eveniag Question 7. SupposethatX,is a simple random sample from the distribution with the following p.d.f. f(x,otherwise where θ > 0, a random sample of size 10 yields data 0.92 0.79 0.9 0.65 0.86 0.47 0.73 0.97 0.94 0.77 1) (6 points) Get the moment estimator of θ, and compute the estimate for this data;
Rinal Exam.Dan 15) Circle out your Class Mon& Wed or Mon Eveniag Question 7. SupposethatX,is a simple random sample from the distribution with the following p.d.f. f(x,otherwise where θ > 0, a random sample of size 10 yields data 0.92 0.79 0.9 0.65 0.86 0.47 0.73 0.97 0.94 0.77 1) (6 points) Get the moment estimator of θ, and compute the estimate for this data;
Exam.(Jan 15) Question 7. Suppose thatX,x,, Xo is a simple random samp distribution with the following p.d.f Circle out yoar Class: Mee& Wed or Mon.Evening le from the f(x0) otherwise where 0>0, a random sample of size 10 yields data 092 0.79 0.9 0.65 0.86 0.47 0.73 0.97 0.94 0.77 1) (6 points) Get the moment estimator of θ, and compute the estimate for this data;
EamJan 15) Circle out your Class Mon& Wed or Mow Exening estion 7. Suppose that a simple random sample from the distribution with the following p.d.f f(x:8) 0, otherwise where θ > 0, a random sample of size 10 yields data .92 0.79 0.9 0.65 0.86 0.47 0.73 0.97 0.94 0.77 1) (6 points) Get the moment estimator of θ, and compute the estimate for this data;
Cirele out your Cast Mon& Wed or Mon. Evening. am (lan 15 that X,, X2, .,X Question 7. Suppose distribution with the following p.d.f. ,X is a simple random sample from th 0, otherwise where θ > 0, a random sample of size 10 yields data 0.92 0.79 0.9 0.65 0.86 0.47 0.73 0.97 0.94 0.77 1) (6 points) Get the moment estimator of θ, and compute the estimate for this data;