Loyola College M.Sc. Statistics April 2006 Computational Statistics – III Question Paper PDF Download

             LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

M.Sc. DEGREE EXAMINATION – STATISTICS

AC 41

THIRD SEMESTER – APRIL 2006

                                            ST 3803 – COMPUTATIONAL STATISTICS – III

 

 

Date & Time : 02-05-2006/1.00-4.00 P.M.   Dept. No.                                                       Max. : 100 Marks

 

 

Answer THREE questions choosing one from each section.

SECTION – A

  1. A Scientist studied the relationship of size and shape for painted turtles. The following table contains their measurements on 10 females and 10 male turtles.  Test for equality of the two population mean vectors.

 

FEMALE

MALE

Length (x1) Width (x2) Height (x3) Length (x1) Width (x2) Height (x3)
98 81 38 93 74 37
103 84 38 94 78 35
103 86 42 96 80 35
105 86 42 101 84 39
109 88 44 102 85 38
123 92 50 103 81 37
123 95 46 104 83 39
133 99 51 106 83 39
133 102 51 107 82 38
133 102 51 112 89 40
  1. Given the following trivariate Normal distribution with mean vector and variance covariance matrix.

 

  1. Obtain the conditional distribution of X1 and X2 given X3 = 10

(15 marks)

  1. Obtain the distribution of CX where

(6 marks)

  • Find the correlation matrix for the data of Female turtles given in question No.1. Find whether the correlations are significant.                    (13 marks)

 

SECTION – B

Answer any ONE question

  1. a) Use two-phase method to solve following linear programming problem:

Max Z =

Sub. To

 

(18.5 marks)

 

  1. b) Solve the following transportation problem:

 

9   10  11                                                                              (15 marks)

  1. a) Solve the following game graphically:

B

(18.5 marks)

  1. b) Patients arrive at a clinic according to a Poisson distribution at a rate of 30

patients per hour.  The waiting room does not accommodate more than 14

patients.  Examination time per patient is exponential with mean rate 20 per hour.

  1. Find the effective arrival rate at the clinic.
  2. What is the probability that an arriving patient will not wait? Will find a vacant seat in the room?
  • What is the expected waiting time until a patient is discharged from the clinic?                                                              (15 marks)

SECTION – C

 

Answer any ONE question

  1. a) Suppose the one step transition probability matrix (tpm) is given as below: Find Poo(2), foo(n), f13(u) and f33(u).

 

 

(17 marks)

  1. b) For a three state Markov Chain with states {0,1,2} and tpm.

P = ,   Find m0, m1 and m2.

(17 marks)

  1. a) An infinite Markov Chain on the set of non-negative integers has the transition

function as follows:

Pko =    and Pk1 k+1 =

 

  • Find whether the chain is positive recurrent, null recurrent or transient.
  • Find stationary distribution if it exists.
  1. b) For a Branching process with off-spring distribution given by p(0) = p (3) =

Find the probability of extinction, when   (i) X0 = 1    and    (ii)  X0 > 1.

(17+17 marks)

 

 

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