MM101 : General Mathematics 1

Department

Academic Program

Type

Compulsory

Credits

Prerequisite

Overview

This course provides students with a general study of sets and inequalities, as well as relationships and functions. This course aims to develop the student's ability to find the limits of functions and prove continuity. The course also aims to enhance students' skills in deriving real algebraic functions and applications (incremental and decreasing functions - Rolle's theory - mean value theory - maximum and minimum limits - concavity and convexity inflection points - drawing curves). The course focuses on methods of finding the derivative of algebraic and non-algebraic real functions and applications of the derivative.

Intended learning outcomes

By the end of the course, the student should be able to: 1. Explain group concepts, periods, and inequalities. 2. Show how to find the range and range of real functions and represent them graphically. 3. Show the presence of the end and connection. 4. Compare groups and periods. 5. Distinguish even, odd, unary, superlative, and unary symmetry functions. 6. Prove theories, laws and rules of limits and connection. 7. Solve problems involving derivation rules, mathematical and physics applications and problems. 8. Solve inequalities using periods. 9. The student draws and represents the real algebraic and non-algebraic functions. 10. Apply the laws of limits and connection to solve problems with more than one idea. 11. Derivative applications are used to draw curves and some other applications.

Teaching and learning methods

. Theoretical lectures 2. Description and dialogue 3. Brainstorm 4. Using mathematical proof methods 5. Exercise episodes, exercises and frequently asked questions

Methods of assessments

. A written exam (essay + objective) = 25 marks, or its assessment is left to the course instructor 2. Short tests (written or oral), demonstration tasks, quizes, exercises, and presentation = 15 marks or left to the course instructor 3. Written final exam (essay + objective) = 60 marks

Course content:

Week	Scientific Subject	Number of Hours	Lecture	exercises
1-2	sets	8	6	2
3-4	Periods and contrasts	8	6	2
5	First Midterm( 2 hours)
5-6	Binary relations and function	6	4	2
7-8	limits	8	6	2
9-10	Connection	6	4	2
10	Second Midterm( 2 hours)
11-12	derivational laws	8	6	2
13	Higher order derivation	4	2	2
14	Derivation applications	4	2	2
15-16	Final Exam
	Total	56

References

Reference Title

National Research Center

Release copy

author

where it is located

Basic principles of mathematics

1998

Dr. Zawam Dallah Dr. Kamal Abu Dayyeh A. Abdulmutallab Omar

Department library

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computer 1 (CS100)
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