University Question Papers: Basic Statistics

Basic Statistics

Monday, June 1, 2015

Sathyabama University B.Tech BTE/BME/BIN 5ET102B-6C0013 (2006/07/08/09) Basic Statistics Dec 2010

SATHYABAMA UNIVERSITY

(Established under section 3 of UGC Act, 1956)

Course & Branch: B.Tech - BTE/BME/BIN

Title of the Paper: Basic Statistics Max. Marks: 80

Sub. Code: 5ET102B-6C0013 (2006/07/08/09) Time: 3 Hours

Date: 11/12/2010 Session: AN

______________________________________________________________________________________________________________________

PART - A (10 X 2 = 20)

Answer ALL the Questions

1. State the empirical relationship between the averages.

2. Write Bowley’s coefficient of skewness.

3. Write probable error in the correlation coefficient.

4. Write the correlation formula for tied ranks.

5. The letters of the word “REGULATIONS” be arranged at random. What is the chance that there are exactly 4 letters between R and E?

6. From a pack of 52 cards 3 cards are drawn at random find the chance that they are king, queen and a knave.

7. A continuous random variable has the probability function f(x) = Ax², 0 £ x £ 1. Find A, also find the probability that x lies between 0.2 and 0.5.

8. Write the general form of marginal and conditional distributions in the case of continuous functions.

9. Comment: the mean of binomial distribution is 3 and variance 4.

10. If x is a Poisson variate such that p(x = 2) = 9p(x=4) + 90p(x = 6) Find l.

PART – B (5 x 12 = 60)

Answer All the Questions

11. (a) Find the median and two quartiles.

Marks	below 10“	20“	30“	40“	50“	60	below 70
Freq.:	15	35	60	84	106	120	125

(b) In an experiment the mean and standard deviation of 20 observations are 25 and 10 respectively. Later it was found that one entry was wrongly recorded as 34 instead of 44. Calculate the correct mean and standard deviation.

(or)

12. (a) Find out the missing frequencies. The arithmetic mean is 67.45

Height	60 - 62	63 - 65	66 - 68	69 - 71	72 - 74	total
Value	5	18	f₃	f₄	8	100

(b) Calculate mean deviation about mean.

Interval	20 - 30	30 - 40	40 - 50	50 – 60	60 – 70	70 – 80	80 – 90	90 – 100
Freq.:	3	8	9	15	20	13	8	4

13. Fit a parabolic curve.

X: 1 2 3 4 5 6 7 8 9

2 6 7 8 10 11 10 9

(or)

14. (a) Calculate the coefficient of correlation.

X: 1 3 5 8 9 10

Y: 3 4 8 10 12 11

(b) In partially destroyed records the following data available. Variance of x is 25, regression equation x on y is 5x – y = 22, regression equation y on x is 64x – 45y = 24. Find mean values of x and y, coefficient of correlation, standard deviation of y.

15. (a) Three groups of children contains respectively 3 girls and 1 boy, 2 girls and 2 boys and 1 girl and 3 boys. One child is selected at random from each group. Find the chance that the three selected consists of 1 girl and 2 boys.

(b) Three boxes contains 1 white, 2 black and 3 red balls, 2 white, 1 black and 1 red ball, 4 white, 5 black and 3 red balls respectively. One box is selected at random and two balls are drawn. They happen to be white and red. What is the probability that they came from box 1,2, or 3.

(or)

16. (a) In a bolt factory machines A,B and C manufacture 25%, 35%, 40% of the total. Of their output 5,4,2 per cent defective. A bolt is drawn at random and found to be defective. What is the probability that is was manufactured by machines A,B, and C.

(b) Box A contains 2 white 1 black and 3 red balls. Box B contains 3 white 2 black and 4 red balls. Box C contains 4 white 3 black and 2 red balls. One box is selected at random and two balls are drawn, they are red and black. What is the probability that both balls came from box B?

17. (a) A the diameter of an electric cable say X is assumed to be a continuous random variable with pdf f(x) = 6x (1 – x) 0 £ x £ 1, find 1. Check that it is pdf. 2. Determine the number b such that p(X < b) = p (X> b).

(b) The joint probability density function of a two dimensional random variable (X,Y) is given by f(x,y) = 2,0 < x < 1,0<y<x,= 0 otherwise. Find the marginal density functions of X and Y. Find the conditional density function of Y given X = x and conditional density function of X given Y = y.

(or)

18. (a) If X and Y are two random variables having joint density function f(x,y) = 1/8 * (6-x-y); 0 <x<2, 2<x<4 = 0 otherwise. Find p(X<1 È Y<3), P(X+Y<3), p(X<1/Y<3).

(b) A petrol pump is supplied with petrol once a day. If its daily volume X of sales in thousands of liters is distributed by f(X) = 5(1-x)⁴, 0 £ x £ 1 what must be the capacity of its tank in order that its supply will be exhausted in a given day shall be 0.01?

19. (a) An irregular six faced die is thrown and the expectation that in 10 throws it will give five even numbers is twice the expectation that it will give four even numbers. How many times in 10,000 sets of 10 throws each would you expect it to give no even number?

(b) A manufacturer of cotter pins knows that 5% of his product is defective. If he sells cotter pins in boxes of 100 and guaranties that not more than 10 pins will be defective, What is the approximate probability that a box will fail to meet the guaranteed quality?

(or)

20. (a) If X is a normal variate with mean 30 and SD 5, Find the probabilities that i. 26 £ X £ 40, ii. X ³ 45 and |X – 30| > 5. (4)

(b) In an examination it is laid down that a student passes if he secures 30% or more marks. He is placed in the first, second or third division according as he secures 60% or more marks, between 45% and 60% and between 30% and 45% respectively. He gets distinction in case he secures 80% or more marks. From the result that 10% students failed in the examination, whereas 5% of them obtained distinction, Calculate percentage of students placed in the second division. (Assume the distribution is normal). (8)

Friday, March 27, 2015

Basic Statistics SATHYABAMA UNIVERSITY, B.Tech December 2014 Question Paper

Duraimani March 27, 2015 2014 Question Papers 6C0013(2008/2009) B.Tech Degree Examination Basic Statistics Sathyabama University Question Papers Leave a Reply

SATHYABAMA UNIVERSITY

(Established under section 3 of UGC Act,1956)

Course & Branch :B.Tech - BIN/BME/BTE

Title of the Paper :Basic Statistics Max. Marks:80

Sub. Code :6C0013(2008/2009) Time : 3 Hours

Date :13/12/2014 Session :AN

_________________________________________________________________________________________________________________________

PART - A (10 x 2 = 20)

Answer ALL the Questions

1. Define Skewness and Kurtosis.

2. If the Karl-Pearson’s Coefficient of skewness of a distribution is 0.32, its standard deviation is 6.5 and the mean is 25, find the mode.

3. Define correlation coefficient of two random variables X and Y.

4. What are the normal equation to estimate the values of a and b in fitting a line y = a + bx.

5. State Baye’s theorem.

6. From a pack of 52 cards 3 cards are drawn at random find the chance that they are king, queen and a knave.

7. Define random variable.

8. Find E(X) where X is the outcome of a die when a die is rolled.

9. Define Binomial distribution.

10. If X follows Poisson distribution and P(X = 1) = 0.3 P(X = 2) = 0.2, find P(X = 0).

PART – B (5 x 12 = 60)

Answer All the Questions

11. (a) Compute mean, median and mode for the following data:

Class	10-15	15-20	20-25	25-30	30-35	35-40	40-45	45-50
Frequency	2	28	125	270	303	197	65	10

(b) The index number of prices of two articles X and Y for six consecutive weeks is given below.

X	314	326	336	368	404	412
Y	330	331	320	318	321	330

Find which has a more variable price?

(or)

12. Calculate the mean, median and variance of the following data:

Height in cm	95-105	105-115	115-125	125-135	135-145
No. of Children	19	23	36	70	52

13. (a) Find the coefficient of correlation between industrial production and export using the following data:

Production(X)	55	56	58	59	60	60	62
Export(Y)	35	38	37	39	44	43	44

(b) A sample of 12 fathers and their eldest sons has the following data: About their heights in inches.

Fathers	65	63	67	64	68	62	70	66	68	67	69	71
Sons	68	66	68	65	69	66	68	65	71	67	68	70

Calculate the rank correlation coefficient.

(or)

14. (a) For a certain X and Y series which are correlated, the regression lines are 8x – 10y = -66, 40x – 18y = 214.

Find (i) The correlation coefficient between them and

(ii) The mean of the two series.

(b) Fit a straight line to the following data:

X	1	2	3	4	6	8
Y	2.4	3	3.6	4	5	6

15. (a) There are 3 true coins and 1 false coin with ‘head’ on both sides. A coin is chosen at random and tossed 4 times. If ‘head’ occurs all the 4 times, what is the probability that the false coin has been chosen and used.

(b) From 6 positive and 8 negative numbers, 4 numbers are chosen at random(with out replacement) and multiplied. What is the probability that the product is positive?

(or)

16. The contents of urns I, II, III are as follows: 1 white, 2 black and 3 red balls, 2 white, 1 black and 1 red balls, 4 white, 5 black and 3 red balls. One urn is chosen at random and two balls are drawn. They happen to be white and red. What is the probability that they come from urns I, II, or III?

17. (a) A random variables X has the following probability distribution.

x	0	1	2	3	4	5	6	7
P(x)	0	K	2K	2K	3K	K²	2K²	7K² + K

Find (i) the value of K,, (ii) P(1.5 < x < 4.5 / X > 2) and (iii) the smallest value of y for which Pr(X £ y) > ½.

(b) A continuous random variable X has a probability density function f(x) = kx²e^-x; x ³ 0 Find k, mean and variance.

(or)

18. (a) Let X denote a random variable that takes on any of the values -1, 0, 1 with respective probabilities P(X = -1) = 0.2, P(X = 0) = 0.5, P(X = 1) = 0.3. compute E(X²).

(b) Suppose that the error in the reaction temperature in °C for a controlled laboratory experiment is a continuous random variable X having the probability density function

(i) verify that

(ii) find P(0 < x £ 1).

19. (a) Find the mean and variance of Binomial distribution.

(b) Prove that Poisson distribution is the limiting case of Binomial Distribution.

(or)

20. (a) A random variable X follows poisson distribution and if

P(X = 1) = 2 P(X = 2),

find (i) P(X = 0)

(ii) standard deviation of X.

(b) A normal distribution has mean m = 20 and standard deviation s = 10. Find P(15 £ x £ 40).