LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034 B.Sc. DEGREE EXAMINATION – STATISTICS

AB 13

FIFTH SEMESTER – NOV 2006

ST 5500 – ESTIMATION THEORY

(Also equivalent to STA 505)

Date & Time : 25-10-2006/9.00-12.00 Dept. No. Max. : 100 Marks

Answer all the questions. 10 X 2 = 20

Define bias of an estimator in estimating the parametric function.
Explain efficiency of an estimator.
Explain Uniformly Minimum Variance Unbiased Estimator (UMVUE).
What is Cramer-Rao lower bound?
Define bounded completeness.
State Bhattacharyya inequality.
Let X_1,X₂ denote a random sample of size 2 from B (1, θ), 0 < θ < 1. Show that X₁+ 3X₂ is sufficient for θ.
Describe sufficient statistic.
Explain Bayes estimation.
What is BLUE?

Let X_1,X₂, … , X_n denote a random sample of size n from B(1, p), 0 < p < 1. Suggest an unbiased estimator of (i) p and (ii). p (1- p).
If T_n asymptotically unbiased with variance approaching zero as n ® ¥ then show that T_n is consistent.
State and establish Factorization Theorem in the discrete case.
Show that the family of Bernoulli distributions { B(1,p), 0< p < 1} is complete.
State and establish Lehmann-Scheffe theorem.
Let X₁, X₂, … , X_n denote a random sample of size n from a distribution with p.d.f. e^{– (x-}^q), x ³q, q Î Â

f(x; q) = 0 , otherwise.

Obtain UMVUE of q.

a). Let X₁, X₂, … ,.X_n denote a random sample of size n from P(q), q >0. Suggest

an unbiased estimator of i) q ii) 5q + 7.

b). If T_nis consistent estimator for and g is continuous then show that g(T_n)

is consistent for g(). (10 +10)

b). Obtain CRLB for estimating q in case of

f(x ; q) = , – µ < x < µ and – µ < q < µ,

based on a random sample of size n. (10 +10)

b). Describe the method of moments with an illustration. (12 + 8)

MLE of q = (m, s²).

b). Illustrate the method of moments with the help of G (a, p). (12 + 8)

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