## Free AIOU Solved Assignment Code 8674 Spring 2024

Download *Aiou solved assignment* 2024 free autumn/spring, aiou updates solved assignments. Get free AIOU All Level Assignment from aiousolvedassignment.

**Course: Department of Science Education (8674)
**

**Semester: Spring, 2024**

**ASSIGNMENT No. 1**

# ALLAMA IQBAL OPEN UNIVERSITY, ISLAMABAD

*(Department of Science Education)*

**WARNING**

**PLAGIARISM OR HIRING OF GHOST WRITER(S) FOR SOLVING THE ASSIGNMENT(S) WILL DEBAR THE STUDENT FROM AWARD OF DEGREE/CERTIFICATE, IF FOUND AT ANY STAGE.****SUBMITTING ASSIGNMENT(S) BORROWED OR STOLEN FROM OTHER(S) AS ONE’S OWN WILL BE PENALIZED AS DEFINED IN “AIOU PLAGIARISM POLICY”.**

## AIOU Solved Assignment Code 8674 Spring 2024

*Note: Before attempting assignments, please read the following instructions:*

- All questions are compulsory.
- Read each question carefully before writing an answer.
- Read the relevant units of the study guide for writing the answer of a question and arrange the points in an appropriate manner for the answer.
- You may take help from other resources such as books, websites and other online resources for writing the answer of a question.
- You must mention the resources used for writing an answer, at the end of the answer.
- Write the answer in your own words.
- Leave 2-3 lines after every answer so that the tutor may provide feedback on your answer.

**Course: Mathematics V (8674)
Semester: Spring, 2024
**

**Level: B.Ed (2.5 & 4 Year)**

Total Marks: 100

Total Marks: 100

**Pass Marks: 50**

**ASSIGNMENT No. 1**

**(Units: 1-4)**

## AIOU Solved Assignment 1 & 2 Code 8674 Spring 2024

Q.1 a) The Division Algorithm. Given positive integers a and , there exist unique integers and , with such that . (10)

b) Discuss integers and the properties of integers with examples. (10)

Q.2 a) A person invests $1000 at 12 percent interest compounded annually. If an represents the amount ayears, find a recurrence relation and initial conditions that, define the sequence {An}. (10)

b) Solve General and Second-order Homogenous liner recurrence relations. (10)

Q.3 a) Solve the congruence equation 2395 (10)

b) Discuss Chinese Remainder theorem. (10)