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MST 5: TUTOR MARKED ASSIGNMENT

Title Name	IGNOU MST 5 SOLVED ASSIGNMENT
Type	Soft Copy (E-Assignment) .pdf
University	IGNOU
Degree	CERTIFICATE PROGRAMMES
Course Code	CCOMO
Course Name	CERTIFICATE IN CONDITION MONITORING
Subject Code	MST 5
Subject Name	TUTOR MARKED ASSIGNMENT
Year	2026
Session	-
Language	English Medium
Assignment Code	MST 5/Assignment-1/2026
Product Description	Assignment of CCOMO (CERTIFICATE IN CONDITION MONITORING) 2026. Latest MST 005 2026 Solved Assignment Solutions
Last Date of IGNOU Assignment Submission	Last Date of Submission of IGNOU BEGC-131 (BAG) 2025-26 Assignment is for January 2026 Session: 30th September, 2026 (for December 2025 Term End Exam). Semester Wise January 2025 Session: 30th March, 2026 (for June 2026 Term End Exam). July 2025 Session: 30th September, 2025 (for December 2025 Term End Exam).
Format	Ready-to-Print PDF (.soft copy)

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January 2026 Session: 31st March, 2026
July 2026 Session: 30th September, 2026

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MST 5 2025 - English

MST-005: Statistical Techniques

Course Code: MST-005

Assignment Code: MST-005/TMA/2025

Maximum Marks: 100

Note: All questions are compulsory. Answer in your own words.

1. State whether the following statements are true or false and also give the reason in support of your answer:

(a) The total number of all possible samples of size 2 without replacement from a population of size 7 is 21.

(b) Consecutive 3 random numbers starting from 8937 by 'middle square method' are 8937, 8699, 6726.

(c) RBD is suitable in situations where it is not possible to divide the experimental material into a number of homogeneous blocks.

(d) As we increase the sample size, representativeness of the population by the sample decreases.

(e) In a big hall, there are 50 rows and each row has 60 students. A research scholar selects 10 rows randomly and then randomly selects 15 students from each selected row. It is an example of cluster sampling procedure.

2. (a) Draw all possible samples of size 2 from the population [2, 3, 4] and verify that

$E_1ar{X}-ar{X}$ Also find variance of^f

(b) A sample of 60 students is to be drawn from a population consisting of 600 students belonging to two villages, A and B. The means and standard deviations of their marks are give below:

Villages	Stratum sizes (N_i)	Means (x_i)	Standard deviations
Village A	400	60	20
Village B	200	120	80

What are the sample sizes for the two villages using proportional allocation technique?

3. To determine the yield rate of wheat in a district of Punjab, 6 groups of 6 plots each were constructed. The data are given in the following table:

Plot No.	Group 1	Group 2	Group 3	Group 4	Group 5	Group 6
1	8	6	18	13	17	12
2	13	5	8	7	15	15
3	11	16	6	13	10	11
4	26	5	10	6	21	17
5	13	16	16	7	20	8
6	31	5	20	2	25	10

Select a cluster sample of 3 clusters from the above data and find its sample mean. Further, explain the procedure of two-stage sampling if we want to draw a sample of 6 plots. Which are the 6 plots in your sample?

4. The following data relate to production in kg of three varieties P, Q, R of wheat:

P	:	14	16	18
Q :	14	13	15	22
R :	18	16	19	15	20

Is there any significant difference among the three varieties at 5% level of significance?

5. A researcher wants to test four diets A, B, C, D on growth rate in mice. These animals are divided into 3 groups according to their weights. Heaviest 4, next 4 and lightest 4 are put in Block I, Block II, and Block III, respectively. Within each block, one of the diets is given at random to the animals. After 15 days, increase in weight is noted, which is given in the following table:

Blocks	Treatments/Diets
	A	B	C	D
I	12	8	6	5
II	15	12	9	6
III	14	10	8	5

Perform a two-way ANOVA to test whether the data indicates any significant difference between' the four diets due to different blocks.

6. In the following data, two values are missing. Estimate these values by Yates method and analyse the data by suitable technique.

Treatments	Blocks
	I	II	III
A	12	14	12
B	10	y	8
C	x	15	10

7. Identify the design given in the following table and then carry out the analysis:

Column	Row
	I	II	III	IV
I	A 8	C 18	B 11	D 8
II	C 16	B 10	D 7	A 4
III	B 12	D 10	A 6	C 20
IV	D 10	A 9	C 28	B 16

8. (a) The distribution function of Pareto distribution is given by

$f(cdot)*frac{k}{1+x^a},quad a>0,0<kle x.$

Given a U~ U(0, 1), generate a random number from the above distribution, when a = 2 and k = 1. Suppose U = 0.5, then find x.

(b) Generate a complete cycle for the LCG given below:

$x^5equiv x^3pmod{16}$ with x_o= 5. A man tosses an unbiased coin ten times. Using the first ten random numbers generated above, obtain a sequence of heads and tails by taking Head (H) as u ≥ 0-5

9. Times between successive crashes of a computer system were generated for a 6-month period and are given in increasing order as follows (time in hours):

1	10	20	30	40		52	63	70	80		90 100	102
130	140	190	210	266		310	530	590	640		1340

The parameter a = 0.00435, mean = 1/α = 230 hrs.

Use the Kolmogorov-Smirnov test to examine the goodness of fit of exponential distribution.

MST 005 (January 2026 - July 2026) - ENGLISH

TUTOR MARKED ASSIGNMENT

MST-005: Statistical Techniques

Course Code: MST-005
Assignment Code: MST-005/TMA/2026
Maximum Marks: 100

Note: All questions are compulsory. Answer in your own words.

1. State whether the following statements are true or false and also give the reason in support of your answer:

(a) The total number of all possible samples of size 2 without replacement from a population of size 7 is 21.

(b) Consecutive 3 random numbers starting from 8937 by 'middle square method' are 8937, 8699, 6726.

(c) RBD is suitable in situations where it is not possible to divide the experimental material into a number of homogeneous blocks.

(d) As we increase the sample size, representativeness of the population by the sample decreases.

(e) In a big hall, there are 50 rows and each row has 60 students. A research scholar selects 10 rows randomly and then randomly selects 15 students from each selected row. It is an example of cluster sampling procedure.

2. (a) Draw all possible samples of size 2 from the population [2, 3, 4] and verify that $\text{E}(\bar{x}) = \bar{X}$ . Also find variance of $\bar{x}$ .

(b) A sample of 60 students is to be drawn from a population consisting of 600 students belonging to two villages, A and B. The means and standard deviations of their marks are give below:

Villages	Stratum sizes ($N_i$)	Means ($x_i$)	Standard deviations
Village A	400	60	20
Village B	200	120	80

What are the sample sizes for the two villages using proportional allocation technique?

3. To determine the yield rate of wheat in a district of Punjab, 6 groups of 6 plots each were constructed. The data are given in the following table:

Plot No.	Group 1	Group 2	Group 3	Group 4	Group 5	Group 6
1	8	6	18	13	17	12
2	13	5	8	7	15	15
3	11	16	6	13	10	11
4	26	5	10	6	21	17
5	13	16	16	7	20	8
6	31	5	20	2	25	10

4. The following data relate to production in kg of three varieties P, Q, R of wheat:

P :	14	16	18
Q:	14	13	15	22
R :	18	16	19	15	20

Is there any significant difference among the three varieties at 5% level of significance?

Blocks	Treatments/Diets
	A	B	C	D
I	12	8	6	5
II	15	12	9	6
III	14	10	8	5

Perform a two-way ANOVA to test whether the data indicates any significant difference between' the four diets due to different blocks.

6. In the following data, two values are missing. Estimate these values by Yates method and analyse the data by suitable technique.

Treatments	Blocks
	I	II	III
A	12	14	12
B	10	y	8
C	x	15	10

7. Identify the design given in the following table and then carry out the analysis:

Column	Row
	I	II	III	IV
I	A 8	C 18	B 11	D 8
II	C 16	B 10	D 7	A 4
III	B 12	D 10	A 6	C 20
IV	D 10	A 9	C 28	B 16

8. (a) The distribution function of Pareto distribution is given by $f(x) = 1 - \left( \frac{k}{x} \right)^a$ , $a > 0, 0 < k \leq x$ .

Given a $U \sim U(0, 1)$ , generate a random number from the above distribution, when $a = 2$ and $k = 1$ .
Suppose $U = 0.5$ , then find x.

(b) Generate a complete cycle for the LCG given below: $x_i = (5x_{i-1} + 3) \text{mod} 16$ , with $x_0 = 5$ . A man tosses an unbiased coin ten times. Using the first ten random numbers generated above, obtain a sequence of heads and tails by taking Head (H) as $u \ge 0\text{-}5$ .

9. Times between successive crashes of a computer system were generated for a 6-month period and are given in increasing order as follows (time in hours):
1 10 20 30 40 52 63 70 80 90 100 102
130 140 190 210 266 310 530 590 640 1340
The parameter $a = 0.00435$ , mean $= 1/\alpha = 230\text{ hrs}$ .
Use the Kolmogorov-Smirnov test to examine the goodness of fit of exponential distribution.

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Plot No.	Group 1	Group 2	Group 3	Group 4	Group 5	Group 6
1	8	6	18	13	17	12
2	13	5	8	7	15	15
3	11	16	6	13	10	11
4	26	5	10	6	21	17
5	13	16	16	7	20	8
6	31	5	20	2	25	10

Plot No.	Group 1	Group 2	Group 3	Group 4	Group 5	Group 6
1	8	6	18	13	17	12
2	13	5	8	7	15	15
3	11	16	6	13	10	11
4	26	5	10	6	21	17
5	13	16	16	7	20	8
6	31	5	20	2	25	10

Plot No.	Group 1	Group 2	Group 3	Group 4	Group 5	Group 6
1	8	6	18	13	17	12
2	13	5	8	7	15	15
3	11	16	6	13	10	11
4	26	5	10	6	21	17
5	13	16	16	7	20	8
6	31	5	20	2	25	10