ST 5505/ST 5501 – TESTING OF HYPOTHESES

Date : 01-11-10 Dept. No. Max. : 100 Marks

Time : 9:00 – 12:00

SECTION – A

ANSWER ALL QUESTIONS. (10 X 2 =20 marks)

What is a composite hypothesis? Give an example.
Define: Critical region.
Given an example of a density function which is not a member of the one parameter exponential family.
When do you say a given family of density functions has MLR property?
What are Type I and II errors?
Define: Likelihood ratio.
What are confidence intervals?
State the test statistic for testing the equality of variances of two normal populations.
Define: Empirical Distribution Function.
Mention the use of Kolmogrov one sample test.

SECTION – B

ANSWER ANY FIVE QUESTIONS (5 X 8 =40 marks)

A sample of size one is drawn from a population with probability density function . To test the hypothesis against the following test is suggested: “Reject H if x > 4”. Compute the size and power of the test.
Obtain the Best Critical Region for testing H: q = q₁ versus K: q = q₂ ( > q₁) when a sample of size ‘n’ is drawn from f(x; q ) = , 0 < x < 1 ( q > 0)
Show that the family of Binomial densities has MLR property.
Explain SPRT in detail.
Derive the likelihood ratio test for testing against based on a sample of size 10 drawn from
Explain the process of testing the significance of correlation coefficient.
Obtain the confidence interval for the mean of a normal distribution with unknown variance.
Explain in detail Median test.

(P.T.O)

SECTION – C

ANSWER ANY TWO QUESTIONS (2 X 20 = 40 marks)

of size two drawn from

b) Derive the UMPT of level 0.05 for testing against based on a sample of size 10

drawn from

a) Obtain the SPRT for testing H: p =1/2 versus K: p = 1/3 when a sample is drawn sequentially

from B(1,p) with α = β = 0.1.

b) Explain the procedure for testing the equality of means of two independent normal populations

with common unknown variance.

Latest Govt Job & Exam Updates:

Loyola College B.Sc. Statistics Nov 2010 Testing Of Hypotheses Question Paper PDF Download