PROBABILITY AND STATISTICS previous question paper for JNTU university CSE,IT,CSSE

II B.Tech I Semester Regular Examinations, November 2007

PROBABILITY AND STATISTICS

( Common to Computer Science & Engineering, Information Technology

and Computer Science & Systems Engineering)

Time: 3 hours Max Marks: 80

Answer any FIVE Questions

All Questions carry equal marks

>>> download <<<

⋆ ⋆ ⋆ ⋆ ⋆

1. (a) If A and B are events with P(A) = 1/3, P(B) = 1/4, and P(A U B) = 1/2,

find

i. P(A/B)

ii. P(A \Bc )

(b) Three students A,B,C are in a running race. A and B have the same probability

of wining and each is twice as likely to win as C. Find the probability that B

or C wins.

(c) The students in a class are selected at random one after the other for an

examination. Find the probability that the boys and girls are alternate if

there are

i. 5 boys and 4 girls

ii. 4 boys and 4 girls. [6+5+5]

2. (a) If X is a continuous random variable and K is a constant then prove that

i. Var (X+K) = Var (X)

ii. Var(kX) = k2 Var (X)

(b) Determine the probability of getting 9 exactly twice in 3 throws with a pair

of fair dice. [8+8]

3. (a) The average number of phone calls/minute coming into a switch board be-

tween 2 p.m. and 4. p.m. is 2.5. Determine the probability that during one

particular minute there will be

i. 4 or fewer

ii. more than 6 calls

(b) The marks obtained in mathematics by 1000 students is normally distributed

with mean 78% and standard deviation 11%. Determine

i. how many students got marks above 90%

ii. what was the highest mark obtained by the lowest 10% of the student

iii. within what limits did the middle of 90% of the students lie [8+8]

4. Samples of size 2 are taken from the population 4, 8, 12, 16, 20, 24 without re-

placement. Find

(a) mean of the population

(b) standard deviation of population

(c) the mean of sampling distribution of means

(d) standard deviation of sampling distribution of means. [16]

5. (a) A lady stenographer claims that she can take dictation at the rate of 118

words per minute can we reject her claim on the basis of 100 trials in which

she demonstrates a mean of 116 words and a S.D of 15 words.

(b) In a large consignment of oranges a random sample of 64 oranges revealed

that 14 oranges were bad. If it reasonable to ensure that 20% of the oranges

are bad? [8+8]

6. (a) The measurements of the output of two units have given the following results.

Assuming that both samples have been level whether the two populations have

the same varience.

Unit-A 14.1 10.1 14.7 13.7 14.0

Unit-B 14.0 14.5 13.7 12.7 14.1

(b) The following are the samples of skills. Test the significant difference between

the means at .05 level. [8+8]

Sample-I 74.1 77.7 74.4 74 73.8 -

Sample-II 70.8 74.9 74.2 70.4 69.2 72.2

7. (a) Fit the curve y = aebx to the following data

x: 0 1 2 3 4 5 6 7 8

y: 20 30 52 77 135 211 326 550 1052

(b) Fit a second degree polynomial to the following data, taking x as independent

variable: [8+8]

x: 1 2 3 4 5 6 7 8 9

y: 2 6 7 8 10 11 11 10 15

8. (a) A sample of 12 fathers and their eldest sons gave the following data about

their height in inches calculate the coefficient of rank correlation. [8+8]

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

(b) Given that x = 4y + 5 and y = k x +4 are the regression lines of x on y and y

on x, respectively, show that 0 k 25. If k = 0.10 actually, find the means

of the variables x and y and also their coefficient of correlation.

⋆ ⋆ ⋆ ⋆ ⋆

II B.Tech I Semester Regular Examinations, November 2007

PROBABILITY AND STATISTICS

( Common to Computer Science & Engineering, Information Technology

and Computer Science & Systems Engineering)

Time: 3 hours Max Marks: 80

Answer any FIVE Questions

All Questions carry equal marks

⋆ ⋆ ⋆ ⋆ ⋆

1. (a) Two cards are selected at random from 10 cards numbered 1 to 10. Find theprobability that the sum is even if

i. the two cards are drawn together

ii. the two cards are drawn one after the other with replacement.

(b) State and prove Baye’s theorem.

(c) The probabilities of A,B,C to become M.D’S of a factory are 5

10 ,

3

10 ,

2

10 . The

probabilities that bonus scheme will be introduced if they become M.D’s are

.02, 03 and .04. Find the probabilities A,B,C to be become M.D’s if bonus

scheme introduced. [5+5+6]

2. (a) Two dice are thrown. Let X the random variable assign to each point (a,b) in

S the maximum of its numbers. Find the distribution, the mean and variance

of the distribution.

(b) Ten coins are tossed simultaneously. Find the probability of getting at

least 7 heads. [8+8]

3. (a) If the variance of a poisson variate is 3. Find the probability that

i. x=0

ii. 1 x <4

iii. 0 < x 3

(b) Given that the mean heights of students in a class is 158 cms with standard

deviation of 20cms. Find how many students heights lie between 150 cms and

170 cms, if there are 100 students in the class. [8+8]

4. Samples of size 2 are taken from the population 4, 8, 12, 16, 20, 24 without re-

placement. Find

(a) mean of the population

(b) standard deviation of population

(c) the mean of sampling distribution of means

(d) standard deviation of sampling distribution of means. [16]

5. (a) A sample of 100 iron bars is said to be drawn from a large number of bars.

Whose lengths are normally distributed with mean 4 feet and S.D 0.6ft. If the

sample mean is 4.2 ft, can the sample be regarded as a truly random sample?

(b) A random sample of 500 apples was taken from a large consignment and 60

were found to be bad. Within the 98% confidence limits for the percentage

number of bad apples in the consignment. [8+8]

6. The following are the average weekly losses of worker hours due to accidents in 10

industrial plants before and after a certain safety programme was put into opera-

tion:

Before: 45 73 46 124 33 57 83 34 26 17

After: 36 60 44 119 35 51 77 29 24 11

Test whether the safety programme is effective in reducing the number of accidents

at the level of significance of 0.05? [16]

7. (a) The measurements of humidity and the moisture content in a raw material

are given in the following table. Fit a Straight line of the form y = ax + b

Humidity (x) 42 35 50 43 48 62 31 36 44 39 55 48

Moisture 12 8 14 9 1 16 7 9 12 10 13 11

(b) Find the most plausible values of x and y

x + 2y – 7 = 0 2x + 3y –2 = 0

x + 8y – 3 =0 3x – y + 5 = 0. [8+8]

8. (a) The regression equations of two variables x and y are

x = 0.7 y + 5.2, y = 0.3x + 2.8. Find the mean of the variables and the

coefficient of correlation between them

(b) Consider the following data:

x -4 -3 -2 -1 0 1 2 3 4

y 0.1 2.5 3.4 3.9 4.1 3.8 3.5 2.8 0.3

Find the correlation coefficient ‘r’. [6+10]

⋆ ⋆ ⋆ ⋆ ⋆

II B.Tech I Semester Regular Examinations, November 2007

PROBABILITY AND STATISTICS

( Common to Computer Science & Engineering, Information Technology

and Computer Science & Systems Engineering)

Time: 3 hours Max Marks: 80

Answer any FIVE Questions

All Questions carry equal marks

⋆ ⋆ ⋆ ⋆ ⋆1. (a) Of the three men, the chances that a politician, a businessman or an acad-

emician will be appointed as a Vice-Chancellor (V.C.) of a University are 0.5,

0.3, 0.2 respectively. Probability that research is promoted by these persons

if they are appointed as V.C. are 0.3, 0.7, 0.8 respectively.

i. Determine the probability that research is promoted

ii. If research is promoted, what is the probability that V.C. is an academi-

cian

(b) There are two boxes inbox I, 11 cards are there numbered 1 to 11 and in

box II, 5 cards numbered 1 to 5. A box is chosen and a card is drawn. If the

card shows an even number then another card is drawn from the same box. If

card shows an odd number another card is drawn from the other box. Find

the probability that

i. both are even

ii. both are odd

iii. if both are even. What is the probability that they are from box I. [8+8]

2. (a) Define random variable, discrete probability distribution, continuous proba-

bility distribution and cumulative distribution. Give an example of each.

(b) The mean of Binomial distribution is 3 and the variance is 9

4 . Find

i. The value of n

ii. p(x 7)

iii. p(1 x < 6). [8+8]

3. (a) Average number of accidents on any day on a national highway is 1.8. Deter-

mine the probability that the number of accidents are

i. at least one

ii. at most one

(b) If X is a normal variate, Find the probability

i. to the left of z = –1.78

ii. to the right of z = – 1.45

iii. corresponding to – 0.80 z 1.53

iv. to the left of z= – 2.52 and to the right of z= 1.83. [8+8]

4. (a) A random sample of size 81 is taken from an infinite population having the

mean 65 and standard deviation 10. What is the probability that x will be

between 66 and 68?

(b) Write about

i. Critical region

ii. Two tailed test. [8+8]

5. (a) A random sample of size 100 has a standard deviation of 5. What can you say

about the maximum error with 95% confidence.

(b) Among 900 people in a state 90 are found to be chapatti eaters. Construct

99% confidence interval for the true proportion.

(c) A random sample of 1200 apples was taken from a large consignment and

found that 10% of them are bad. The supplier claims that only 2% are bad.

Test his claim at 95% level. [5+5+6]

6. Measurements of the fat content of two kinds of ice creams brand A and brand B

yielded the following sample data.

Brand A 13.5 14.0 13.6 12.9 13.0

Brand B 12.9 13.0 12.4 13.5 12.7

Test the significant between the means at 0.05 level. [16]

7. (a) Derive normal equations to fit the parabola y = a0 + a1x + a2x

2

(b) Fit the parabola y = a0 + a1x + a2x

2 for the following data [6+10]

X 0 1 2 3 4

Y 1 1.8 1.3 2.5 6.3

8. A chemical company wishing to study the effect of extraction time on the efficiently

of an extraction operation obtained in the data shown in the following table.

Extraction time x 27 45 41 19 35 39 19 49 15 31

Extraction efficiency y 57 64 80 46 62 72 52 77 57 68

Calculate the coefficient of correlation between x and y and the two lines of regres-

sion. [16]

⋆ ⋆ ⋆ ⋆ ⋆

II B.Tech I Semester Regular Examinations, November 2007

PROBABILITY AND STATISTICS

( Common to Computer Science & Engineering, Information Technology

and Computer Science & Systems Engineering)

Time: 3 hours Max Marks: 80

Answer any FIVE Questions

All Questions carry equal marks⋆ ⋆ ⋆ ⋆ ⋆

1. (a) If A and B are any two arbitrary events of the sample space then Prove that

P( A U B) = P(A) + P(B) - P(A \ B)

(b) A problem in statistics is given to three students A,B,C whose chances of solv-

ing it are 1

2 , 3

4 and 1

4 respectively. What is the probability that the problem

is solved.

(c) Find the probability of getting a sum of 10 if we throw two dice. [5+5+6]

2. (a) For the continuous probability function f (x) = kx2 e−x when x 0 find

i. k

ii. mean

iii. variance

(b) 20% of items produced from a factory are defective. Find the probability that

in a sample of 5 chosen at random.

i. none is defective

ii. one is defective

iii. p(1 < x < 4) [8+8]

3. (a) The average number of phone calls/minute coming into a switch board be-

tween 2 p.m. and 4. p.m. is 2.5. Determine the probability that during one

particular minute there will be

i. 4 or fewer

ii. more than 6 calls

(b) The marks obtained in mathematics by 1000 students is normally distributed

with mean 78% and standard deviation 11%. Determine

i. how many students got marks above 90%

ii. what was the highest mark obtained by the lowest 10% of the student

iii. within what limits did the middle of 90% of the students lie [8+8]

4. Samples of size 2 are taken from the population 4, 8, 12, 16, 20, 24 without re-

placement. Find

(a) mean of the population

(b) standard deviation of population

(c) the mean of sampling distribution of means

1 of 2

Code No: R059210501 Set No. 4

(d) standard deviation of sampling distribution of means. [16]

5. (a) In a study of an automobile insurance a random sample of 80 body repair

costs had a mean of Rs. 472.35 and a standard deviation of Rs 62.35. If x is

used as a point estimate to the true average repair costs, with what confidence

we can assert that the maximum error doesn’t exceed Rs. 10. Find also the

confidence interval with that confidence.

(b) A manufacturer of electric bulbs claims that the percentage defectives in his

product doesn’t exceed 6. A sample of 40 bulbs is found to contain 5 defectives.

Would you consider the claim justified? [8+8]

6. (a) It has been suggested that an average college teacher in Andhra Pradesh

spends less than 10 hours in a week on his own academic schedule. The

figures for the time spent during a week are given below for 12 teachers.

7.1 13.1 7.8 3.6 8.4 4.9

9.6 3.4 0.1 7.2 20.3 11.1

Is the claim justified with the level of significance of 0.05?

(b) Test of the fidelity and the selectivity of 190 radio receivers produced the

results shown in the following table: [8+8]

Fidility

Low Average High

Low 6 12 32

Selectivity Average 33 61 18

High 13 15 0

7. Fit an equation of the form Y=abx to the following data: [16]

x: 2 3 4 5 6

y: 144 172.8 207.4 248.8 298.5

8. A chemical company wishing to study the effect of extraction time on the efficiently

of an extraction operation obtained in the data shown in the following table.

Extraction time x 27 45 41 19 35 39 19 49 15 31

Extraction efficiency y 57 64 80 46 62 72 52 77 57 68

Calculate the coefficient of correlation between x and y and the two lines of regres-

sion. [16]

⋆ ⋆ ⋆ ⋆ ⋆

2 of 2

find

i. P(A/B)

ii. P(A \Bc )

(b) Three students A,B,C are in a running race. A and B have the same probability

of wining and each is twice as likely to win as C. Find the probability that B

or C wins.

(c) The students in a class are selected at random one after the other for an

examination. Find the probability that the boys and girls are alternate if

there are

i. 5 boys and 4 girls

ii. 4 boys and 4 girls. [6+5+5]

2. (a) If X is a continuous random variable and K is a constant then prove that

i. Var (X+K) = Var (X)

ii. Var(kX) = k2 Var (X)

(b) Determine the probability of getting 9 exactly twice in 3 throws with a pair

of fair dice. [8+8]

3. (a) The average number of phone calls/minute coming into a switch board be-

tween 2 p.m. and 4. p.m. is 2.5. Determine the probability that during one

particular minute there will be

i. 4 or fewer

ii. more than 6 calls

(b) The marks obtained in mathematics by 1000 students is normally distributed

with mean 78% and standard deviation 11%. Determine

i. how many students got marks above 90%

ii. what was the highest mark obtained by the lowest 10% of the student

iii. within what limits did the middle of 90% of the students lie [8+8]

4. Samples of size 2 are taken from the population 4, 8, 12, 16, 20, 24 without re-

placement. Find

(a) mean of the population

(b) standard deviation of population

(c) the mean of sampling distribution of means

(d) standard deviation of sampling distribution of means. [16]

5. (a) A lady stenographer claims that she can take dictation at the rate of 118

words per minute can we reject her claim on the basis of 100 trials in which

she demonstrates a mean of 116 words and a S.D of 15 words.

(b) In a large consignment of oranges a random sample of 64 oranges revealed

that 14 oranges were bad. If it reasonable to ensure that 20% of the oranges

are bad? [8+8]

6. (a) The measurements of the output of two units have given the following results.

Assuming that both samples have been level whether the two populations have

the same varience.

Unit-A 14.1 10.1 14.7 13.7 14.0

Unit-B 14.0 14.5 13.7 12.7 14.1

(b) The following are the samples of skills. Test the significant difference between

the means at .05 level. [8+8]

Sample-I 74.1 77.7 74.4 74 73.8 -

Sample-II 70.8 74.9 74.2 70.4 69.2 72.2

7. (a) Fit the curve y = aebx to the following data

x: 0 1 2 3 4 5 6 7 8

y: 20 30 52 77 135 211 326 550 1052

(b) Fit a second degree polynomial to the following data, taking x as independent

variable: [8+8]

x: 1 2 3 4 5 6 7 8 9

y: 2 6 7 8 10 11 11 10 15

8. (a) A sample of 12 fathers and their eldest sons gave the following data about

their height in inches calculate the coefficient of rank correlation. [8+8]

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

(b) Given that x = 4y + 5 and y = k x +4 are the regression lines of x on y and y

on x, respectively, show that 0 k 25. If k = 0.10 actually, find the means

of the variables x and y and also their coefficient of correlation.

⋆ ⋆ ⋆ ⋆ ⋆

II B.Tech I Semester Regular Examinations, November 2007

PROBABILITY AND STATISTICS

( Common to Computer Science & Engineering, Information Technology

and Computer Science & Systems Engineering)

Time: 3 hours Max Marks: 80

Answer any FIVE Questions

All Questions carry equal marks

⋆ ⋆ ⋆ ⋆ ⋆

1. (a) Two cards are selected at random from 10 cards numbered 1 to 10. Find theprobability that the sum is even if

i. the two cards are drawn together

ii. the two cards are drawn one after the other with replacement.

(b) State and prove Baye’s theorem.

(c) The probabilities of A,B,C to become M.D’S of a factory are 5

10 ,

3

10 ,

2

10 . The

probabilities that bonus scheme will be introduced if they become M.D’s are

.02, 03 and .04. Find the probabilities A,B,C to be become M.D’s if bonus

scheme introduced. [5+5+6]

2. (a) Two dice are thrown. Let X the random variable assign to each point (a,b) in

S the maximum of its numbers. Find the distribution, the mean and variance

of the distribution.

(b) Ten coins are tossed simultaneously. Find the probability of getting at

least 7 heads. [8+8]

3. (a) If the variance of a poisson variate is 3. Find the probability that

i. x=0

ii. 1 x <4

iii. 0 < x 3

(b) Given that the mean heights of students in a class is 158 cms with standard

deviation of 20cms. Find how many students heights lie between 150 cms and

170 cms, if there are 100 students in the class. [8+8]

4. Samples of size 2 are taken from the population 4, 8, 12, 16, 20, 24 without re-

placement. Find

(a) mean of the population

(b) standard deviation of population

(c) the mean of sampling distribution of means

(d) standard deviation of sampling distribution of means. [16]

5. (a) A sample of 100 iron bars is said to be drawn from a large number of bars.

Whose lengths are normally distributed with mean 4 feet and S.D 0.6ft. If the

sample mean is 4.2 ft, can the sample be regarded as a truly random sample?

(b) A random sample of 500 apples was taken from a large consignment and 60

were found to be bad. Within the 98% confidence limits for the percentage

number of bad apples in the consignment. [8+8]

6. The following are the average weekly losses of worker hours due to accidents in 10

industrial plants before and after a certain safety programme was put into opera-

tion:

Before: 45 73 46 124 33 57 83 34 26 17

After: 36 60 44 119 35 51 77 29 24 11

Test whether the safety programme is effective in reducing the number of accidents

at the level of significance of 0.05? [16]

7. (a) The measurements of humidity and the moisture content in a raw material

are given in the following table. Fit a Straight line of the form y = ax + b

Humidity (x) 42 35 50 43 48 62 31 36 44 39 55 48

Moisture 12 8 14 9 1 16 7 9 12 10 13 11

(b) Find the most plausible values of x and y

x + 2y – 7 = 0 2x + 3y –2 = 0

x + 8y – 3 =0 3x – y + 5 = 0. [8+8]

8. (a) The regression equations of two variables x and y are

x = 0.7 y + 5.2, y = 0.3x + 2.8. Find the mean of the variables and the

coefficient of correlation between them

(b) Consider the following data:

x -4 -3 -2 -1 0 1 2 3 4

y 0.1 2.5 3.4 3.9 4.1 3.8 3.5 2.8 0.3

Find the correlation coefficient ‘r’. [6+10]

⋆ ⋆ ⋆ ⋆ ⋆

II B.Tech I Semester Regular Examinations, November 2007

PROBABILITY AND STATISTICS

( Common to Computer Science & Engineering, Information Technology

and Computer Science & Systems Engineering)

Time: 3 hours Max Marks: 80

Answer any FIVE Questions

All Questions carry equal marks

⋆ ⋆ ⋆ ⋆ ⋆1. (a) Of the three men, the chances that a politician, a businessman or an acad-

emician will be appointed as a Vice-Chancellor (V.C.) of a University are 0.5,

0.3, 0.2 respectively. Probability that research is promoted by these persons

if they are appointed as V.C. are 0.3, 0.7, 0.8 respectively.

i. Determine the probability that research is promoted

ii. If research is promoted, what is the probability that V.C. is an academi-

cian

(b) There are two boxes inbox I, 11 cards are there numbered 1 to 11 and in

box II, 5 cards numbered 1 to 5. A box is chosen and a card is drawn. If the

card shows an even number then another card is drawn from the same box. If

card shows an odd number another card is drawn from the other box. Find

the probability that

i. both are even

ii. both are odd

iii. if both are even. What is the probability that they are from box I. [8+8]

2. (a) Define random variable, discrete probability distribution, continuous proba-

bility distribution and cumulative distribution. Give an example of each.

(b) The mean of Binomial distribution is 3 and the variance is 9

4 . Find

i. The value of n

ii. p(x 7)

iii. p(1 x < 6). [8+8]

3. (a) Average number of accidents on any day on a national highway is 1.8. Deter-

mine the probability that the number of accidents are

i. at least one

ii. at most one

(b) If X is a normal variate, Find the probability

i. to the left of z = –1.78

ii. to the right of z = – 1.45

iii. corresponding to – 0.80 z 1.53

iv. to the left of z= – 2.52 and to the right of z= 1.83. [8+8]

4. (a) A random sample of size 81 is taken from an infinite population having the

mean 65 and standard deviation 10. What is the probability that x will be

between 66 and 68?

(b) Write about

i. Critical region

ii. Two tailed test. [8+8]

5. (a) A random sample of size 100 has a standard deviation of 5. What can you say

about the maximum error with 95% confidence.

(b) Among 900 people in a state 90 are found to be chapatti eaters. Construct

99% confidence interval for the true proportion.

(c) A random sample of 1200 apples was taken from a large consignment and

found that 10% of them are bad. The supplier claims that only 2% are bad.

Test his claim at 95% level. [5+5+6]

6. Measurements of the fat content of two kinds of ice creams brand A and brand B

yielded the following sample data.

Brand A 13.5 14.0 13.6 12.9 13.0

Brand B 12.9 13.0 12.4 13.5 12.7

Test the significant between the means at 0.05 level. [16]

7. (a) Derive normal equations to fit the parabola y = a0 + a1x + a2x

2

(b) Fit the parabola y = a0 + a1x + a2x

2 for the following data [6+10]

X 0 1 2 3 4

Y 1 1.8 1.3 2.5 6.3

8. A chemical company wishing to study the effect of extraction time on the efficiently

of an extraction operation obtained in the data shown in the following table.

Extraction time x 27 45 41 19 35 39 19 49 15 31

Extraction efficiency y 57 64 80 46 62 72 52 77 57 68

Calculate the coefficient of correlation between x and y and the two lines of regres-

sion. [16]

⋆ ⋆ ⋆ ⋆ ⋆

II B.Tech I Semester Regular Examinations, November 2007

PROBABILITY AND STATISTICS

( Common to Computer Science & Engineering, Information Technology

and Computer Science & Systems Engineering)

Time: 3 hours Max Marks: 80

Answer any FIVE Questions

All Questions carry equal marks⋆ ⋆ ⋆ ⋆ ⋆

1. (a) If A and B are any two arbitrary events of the sample space then Prove that

P( A U B) = P(A) + P(B) - P(A \ B)

(b) A problem in statistics is given to three students A,B,C whose chances of solv-

ing it are 1

2 , 3

4 and 1

4 respectively. What is the probability that the problem

is solved.

(c) Find the probability of getting a sum of 10 if we throw two dice. [5+5+6]

2. (a) For the continuous probability function f (x) = kx2 e−x when x 0 find

i. k

ii. mean

iii. variance

(b) 20% of items produced from a factory are defective. Find the probability that

in a sample of 5 chosen at random.

i. none is defective

ii. one is defective

iii. p(1 < x < 4) [8+8]

3. (a) The average number of phone calls/minute coming into a switch board be-

tween 2 p.m. and 4. p.m. is 2.5. Determine the probability that during one

particular minute there will be

i. 4 or fewer

ii. more than 6 calls

(b) The marks obtained in mathematics by 1000 students is normally distributed

with mean 78% and standard deviation 11%. Determine

i. how many students got marks above 90%

ii. what was the highest mark obtained by the lowest 10% of the student

iii. within what limits did the middle of 90% of the students lie [8+8]

4. Samples of size 2 are taken from the population 4, 8, 12, 16, 20, 24 without re-

placement. Find

(a) mean of the population

(b) standard deviation of population

(c) the mean of sampling distribution of means

1 of 2

Code No: R059210501 Set No. 4

(d) standard deviation of sampling distribution of means. [16]

5. (a) In a study of an automobile insurance a random sample of 80 body repair

costs had a mean of Rs. 472.35 and a standard deviation of Rs 62.35. If x is

used as a point estimate to the true average repair costs, with what confidence

we can assert that the maximum error doesn’t exceed Rs. 10. Find also the

confidence interval with that confidence.

(b) A manufacturer of electric bulbs claims that the percentage defectives in his

product doesn’t exceed 6. A sample of 40 bulbs is found to contain 5 defectives.

Would you consider the claim justified? [8+8]

6. (a) It has been suggested that an average college teacher in Andhra Pradesh

spends less than 10 hours in a week on his own academic schedule. The

figures for the time spent during a week are given below for 12 teachers.

7.1 13.1 7.8 3.6 8.4 4.9

9.6 3.4 0.1 7.2 20.3 11.1

Is the claim justified with the level of significance of 0.05?

(b) Test of the fidelity and the selectivity of 190 radio receivers produced the

results shown in the following table: [8+8]

Fidility

Low Average High

Low 6 12 32

Selectivity Average 33 61 18

High 13 15 0

7. Fit an equation of the form Y=abx to the following data: [16]

x: 2 3 4 5 6

y: 144 172.8 207.4 248.8 298.5

8. A chemical company wishing to study the effect of extraction time on the efficiently

of an extraction operation obtained in the data shown in the following table.

Extraction time x 27 45 41 19 35 39 19 49 15 31

Extraction efficiency y 57 64 80 46 62 72 52 77 57 68

Calculate the coefficient of correlation between x and y and the two lines of regres-

sion. [16]

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