IGNOU MSTE 4 SOLVED ASSIGNMENT
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MSTE 4: Biostatistics-II
| Title Name | IGNOU MSTE 4 SOLVED ASSIGNMENT |
|---|---|
| Type | Soft Copy (E-Assignment) .pdf |
| University | IGNOU |
| Degree | PG DIPLOMA PROGRAMMES |
| Course Code | PGDAST |
| Course Name | Post Graduate Diploma in Applied Statistics |
| Subject Code | MSTE 4 |
| Subject Name | Biostatistics-II |
| Year | 2026 |
| Session | - |
| Language | English Medium |
| Assignment Code | MSTE 4/Assignment-1/2026 |
| Product Description | Assignment of PGDAST (Post Graduate Diploma in Applied Statistics) 2026. Latest MSTE 004 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) |
📅 Important Submission Dates
- January 2026 Session: 31st March, 2026
- July 2026 Session: 30th September, 2026
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MSTE 4 2025 - English
MSTE-004: Biostatistics-II
Course Code: MSTE-004
Assignment Code: MSTE-004/TMA/2022
Maximum Marks: 100
Note: All questions are compulsory. Answer in your own words.
1. State whether the following statements are True or False. Give reason in support of your answer:
(a) The value of sensitivity of the following results of a diagnostic test is 0.85
| Disease | Test result | Total | ||||
| + | – | |||||
| Present | 170 | 30 | 200 | |||
| Absent | 20 | 280 | 300 | |||
(b) For the following cohort study, the relative risk for the lung cancer among smokers is 3.5.
| Lung Cancer | No Lung Cancer | Total | |||||||
| Smokers | 100 | 1220 | 1320 | ||||||
| Non-smokers | 50 | 2260 | 2310 | ||||||
(c) The logit link function is loglog .
(d) We define three indicator/dummy variables for a regressor variable with three categories.
(e) Left censoring occurs whenever the exact time of occurrence of an event is not known.
2. Differentiate between Chi-square tests for association and homogeneity of proportions. Also mention the assumptions of these tests.
3. A random sample of 250 patients was selected and their workout timing and diabetes status were recorded. The following table shows the workout timing and severity of diabetes:
| Workout (in minutes) | Severity of diabetes status | |||||||||
| Low | Moderate | High | ||||||||
| 0 −15 | 06 | 27 | 19 | |||||||
| 15 to 30 | 08 | 36 | 17 | |||||||
| 30 to 45 | 21 | 45 | 33 | |||||||
| ≥ 45 | 14 | 18 | 06 | |||||||
Test at 5% level of significance whether workout habit and diabetes are associated with to each other or not.
4. (a) Explain the assumptions underlying multiple linear regression model.
(b) Suppose a researcher wants to evaluate the effect of cholesterol on the blood pressure. The following data on serum cholesterol (in mg/dL) and systolic blood pressure (in mm/Hg) were obtained for 15 patients to explore the relationship between cholesterol and blood pressure:
| S. No. | Cholesterol (mg/dL) | SBP (mm/Hg) | ||||
| 1 | 300 | 150 | ||||
| 2 | 410 | 270 | ||||
| 3 | 380 | 210 | ||||
| 4 | 530 | 310 | ||||
| 5 | 570 | 350 | ||||
| 6 | 490 | 310 | ||||
| 7 | 340 | 210 | ||||
| 8 | 320 | 150 | ||||
| 9 | 280 | 110 | ||||
| 10 | 550 | 320 | ||||
| 11 | 340 | 220 | ||||
| 12 | 350 | 170 | ||||
| 13 | 410 | 260 | ||||
| 14 | 390 | 230 | ||||
| 15 | 450 | 270 | ||||
(i) Fit a linear regression model using the method of least squares.
(ii) Construct the normal probability plot for the data on serum cholesterol and systolic blood pressure. (iii) Test the significance of the fitted regression model.
5. Write a short note on the following:
(i) Polytomous logistic models
(ii) Poisson regression
(iii) Kaplan and Meier method
6. The following data on diagnosis of coronary heart disease (where 0 indicating absence and 1 indicating presence), serum cholesterol (in mg/dl), resting blood pressure (in mmHg) and weight (in kg) were obtained for 80 patients to explore the relationship of coronary heart disease with cholesterol and weight.
| S. No. | Serum Cholesterol (mg/dl) | Weight (kg) | Number of Patients having CHD | Total Number of Patients | |||
| 1 | 420 | 60 | 10 | 20 | |||
| 2 | 450 | 68 | 15 | 30 | |||
| 3 | 400 | 54 | 4 | 15 | |||
| 4 | 510 | 74 | 2 | 10 | |||
| 5 | 480 | 62 | 1 | 5 | |||
(i) Fit a multiple logistic model for the dependence of coronary heart disease on the average serum cholesterol and weight considering
as the initial values of the parameters (solve only for one Iteration).
(ii) Test the significance of the fitted model using Hosmer-Lemeshow test at 5% level of significance.
7.(a) Describe censoring and differentiate between different types of censoring with the help of examples which are not considered in Block 4 of MSTE-004.
(b) A study was conducted on 185 patients aged more than 45 years which are followed until the time of death or up to 10 years, whichever comes first. The patients have different covariates: age, gender (male/female), systolic blood pressure, smoking (yes/no), total serum cholesterol and diabetes (yes/no). The objective of this study is to determine which covariate influences the survival time. An analysis is conducted to investigate differences in all-cause mortality between men and women participating in the study. Suppose we obtain the following results after applying the Cox regression hazard model analyses:
| Risk Factor | Parameter Estimate | SE |
| Age | 0.150 | 0.010 |
| Gender | 0.450 | 0.150 |
| Systolic Blood Pressure | 0.015 | 0.008 |
| Smoking | 0.650 | 0.170 |
| Total Serum Cholesterol | 0.002 | 0.004 |
| Diabetes | -0.350 | 0.250 |
(i) Obtain hazard ratio and interpret the results.
(ii) Find the 99% confidence interval for the hazard ratio.
(iii) Test whether the covariates are significant or not at 1% level of significance.
MSTE 004 (January 2026 - July 2026) - ENGLISH
TUTOR MARKED ASSIGNMENT
MSTE-004: Biostatistics-II
Course Code: MSTE-004
Assignment Code: MSTE-004/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. Give reason in support of your answer:
(a) If there are 170 true positive cases out of 200 diseased cases, the sensitivity of the test will be 0.85.
(b) A multiple regression model with three regressor variables was fitted on 15 observations, and the following values were obtained:
Then, the adjusted R2 will be 0.9618.
(c) The method of least squares is used for fitting the logistic model.
(d) The survival function is the probability of an individual surviving less than a specified time t.
(e) If the relative risk for a clinical trial is , the relative risk reduction will be
.
2. A study was conducted to compare two diagnostic methods, say, Method-I and Method-II. The following table shows the classification of the presence of infection on a 5-point Likert Scale (none, mild, moderate, severe and extreme):
| Method-II | Method-I | ||||
| None | Mild | Moderate | Severe | Extreme | |
| None | 89 | 5 | 16 | 2 | 4 |
| Mild | 36 | 3 | 15 | 6 | 2 |
| Moderate | 20 | 4 | 22 | 6 | 1 |
| Severe | 14 | 2 | 37 | 18 | 16 |
| Extreme | 4 | 1 | 16 | 23 | 50 |
Compute simple and weighted Kappa Statistic(s) to compare both methods.
3. To study the relationship between age (in years) and cholesterol level (in mg/dL) of two groups of patients, the following data were recorded:
Group 1
| Age (years) | 46 | 52 | 39 | 65 | 54 | 49 | 76 | 71 |
|---|---|---|---|---|---|---|---|---|
| Cholesterol | 185 | 218 | 182 | 220 | 224 | 193 | 232 | 228 |
Group 2
| Age (years) | 20 | 33 | 78 | 51 | 43 | 44 | 63 |
|---|---|---|---|---|---|---|---|
| Cholesterol | 180 | 238 | 275 | 244 | 242 | 268 | 260 |
(i) Fit the multiple regression model.
(ii) Obtain the regression models for each group separately.
(iii) Test the significance of the fitted model at 5% level of significance.
4. The amount of dose (xi), total number of patients who received medicine (ni) and number of cured patients (yi) are recorded in the following table:
| S. No. | | | |
| 1 | 5 | 24 | 60 |
| 2 | 10 | 18 | 48 |
| 3 | 15 | 12 | 40 |
| 4 | 20 | 20 | 80 |
| 5 | 25 | 26 | 104 |
(i) Fit a logistic model considering initial values of and
up to only one iteration.
(ii) Test the significance of the fitted model using the Hosmer-Lemeshow test at 5% level of significance.
5 (a). Explain the Kaplan and Meier method of estimation with an example.
(b) A hypothetical study was conducted on ten participants who were followed up for the development of coronary heart disease (CHD) over a period of 10 years. The recorded data are given as follows:
| Participant ID | CHD Time |
|---|---|
| P1 | 5 |
| P2 | 8 |
| P3 | 2 |
| P4 | 6+ |
| P5 | 9 |
| P6 | 6 |
| P7 | 10+ |
| P8 | 4 |
| P9 | 8 |
| P10 | 4+ |
Estimate the survival function using the K-M method.
6. Differentiate the following with an example:
(a) Left and Right censoring
(b) Chi-square test and McNemar’s test.
(c) Coefficient of determination and adjusted coefficient of determination.
(d) Probit model and Complementary log-log model.
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