Loyola College B.Sc. Statistics April 2006 Testing Of Hypothesis Question Paper PDF Download

             LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

B.Sc. DEGREE EXAMINATION – STATISTICS

AC 19

FIFTH SEMESTER – APRIL 2006

                                                    ST 5501 – TESTING OF HYPOTHESIS

(Also equivalent to STA 506)

 

 

Date & Time : 22-04-2006/1.00-4.00 P.M.   Dept. No.                                                       Max. : 100 Marks

 

 

PART – A

Answer all the questions.                                               (10 x 2 = 20 Marks)

 

  1. Define a simple and composite hypothesis.
  2. Distinguish between a randomized and non-randomized test.
  3. Provide the form of one-parameter exponential family.
  4. When a test of hypothesis is called uniformly most powerful?
  5. Define likelihood ratio test.
  6. What is a sequential probability ratio test?
  7. Write two uses of chi-square distribution in tests of significance.
  8. Write the 95% confidence interval for the population mean based on large sample.
  9. Define the concept of a quantile of a distribution of a random variable of the continuous type.
  10. Write a note on the sign test.

 

PART – B

Answer any Five questions.                                                       (5 x 8 = 40 Marks)

  1. If X1 X2 …..Xn is a random sample from N (q, 1) ,  q Î R , find a most powerful test for testing H0 : q = 0 against H1 : q = 1.
  2. Let X1 X2 …..X10 denote a random sample of size 10 from a Poisson distribution with mean q. Show that the critical region C defined by  is a best critical region for testing H0: q = 0.1 against H1 : q = 0.5.  For this test determine the significance level   a and the power at  q = 0.5.
  3. X1 X2 …..X25 denote a random sample of size 25 from a normal distribution

N (q, 100).  Find a uniformly most powerful critical region of size a = 0.10 for testing H0: q  = 75 against H1: q > 75.

 

  1. Let Y1 < Y2 < …. < Y5 be the order statistics of a random sample of size n =5 from a distribution with p.d.f

f (x; q) = ½  e– |x– q|,   x Î R, for all real q.  Find the likelihood ratio test for testing Ho : q = q0 against H1 : q ¹ q0.

 

  1. Let X be N (0, q) and let q¢ = 4, q¢¢ = 9, a0 = 0.05 and b0 = 0.10. Show that the SPRT can be based upon the statistic .  Determine c0 (n) and c1 (n).

 

  1. A random sample of 100 units was drawn from a large population. The mean and standard error of the sample are respectively 45 and 8.   Obtain 95% confidence interval for the population mean.

 

  1. For the following data:

X1  :        25        30        45        52        65        75        80        42        50        60

X2 :         60        40        35        50        60        72        63        40        55        62

Test whether the two population variances are equal.  Use 5% significance level.

 

  1. Let X denote the length of time in seconds between two calls entering a college switch board. Let p denote the unique median of this continuous type distribution.  Test H0: p = 6.2 against H1: p < 6.2 based on a random sample of size 20.

 

6.8          5.7       6.9       5.3       4.1       9.8       6.7       7.0       2.1       19.0     18.9

16.9        10.4     44.1     2.9       2.4       4.8       18.9     4.8       7.9

 

PART – C

Answer any Two questions.                                           (2 x 20 = 40 Marks)

 

  1. (a) State and prove Neyman – Pearson theorem.

(b) If  X1 X2 …..Xn  is a random sample from a distribution having p.d.f. of the form f (x; q) = q xq–1,  0 < x < 1, zero elsewhere, show that a best critical region for testing Ho: q = 1 against H1: q = 2 is C = {(x1, x2,…..xn)  :                                     (10+10)

 

  1. Let X1 X2 …..Xn be a random sample from N (q1, q2) and let
    W = {(q1, q2) : –¥ < q1 < ¥, 0 < q2 < ¥} and w = {(q1, q2) : q1 = 0, 0 < q2 < ¥)}.

Perform the likelihood ratio test for testing H0: q1 = 0, q2 > 0            against H1: q1 ¹ 0,
q2 > 0.

  1. (a) Consider the following data:

X:        32        40        50        62        70        35        42        45        19        30

Y:           30        43        55        60        65        23        32        40        20        35

Test whether the two population means are equal at 1% significance level.

 

  • The number of transactions in a teller’s counter during the days of the week is given below:

Mon.             Tue.                 Wed.               Thu.                 Fri.                   Sat

33                 28                    24                    22                    30                    19

Test whether the number of transactions are uniformly distributed or not.  Use 1% level of significance.                                                                                                                    (10+10)

 

  1. Let X and Y denote the weights of ground cinnamon in 120 gram tins packaged by companies A and B respectively. Use Wilcoxon test to test the hypothesis
    H0 : px = py against H0 : px < py.  The weights of n1 = 8 and n2 = 8 tins of cinnamon packages by the companies A and B selected at random yielded the following observations of X and Y respectively.

X:  117.1       121.3        127.8        121.9          117.4       124.5      119.5        115.1

Y:  123.5       125.3        126.5        127.9          122.1       125.6      129.8        117.2

 

 

Go To Main page

Latest Govt Job & Exam Updates:

View Full List ...

© Copyright Entrance India - Engineering and Medical Entrance Exams in India | Website Maintained by Firewall Firm - IT Monteur