University :Mansoura University |
Faculty :Faculty of Science |
Department :Mathematics Department |
|
| 1- Course data :- |
| | Code: | 31104 | | Course title: | تفاضل وتكامل - جبر وهندسة | | Year/Level: | أولى جيولوجيا | | Program Title: | | | Specialization: | | | Teaching Hours: | Theoretical: | 4 | Tutorial: | 4 | Practical: | |
|
| 2- Course aims :- |
| - To provide an elementary itroduction to the caculus including a review of foundation in algebra and geomtry.
- This course is designed to introduce and develop skill in the mathematics needed to guarantee a solid foundation for the applications of calculus to follow in later courses
|
| 3- Course Learning Outcomes :- |
| |
| 4- Course contents :- |
| | No | Topics | Week |
|---|
| 1 | sets - determinants | | | 2 | matrices | | | 3 | complex numbers | | | 4 | the solution of the equations of the third and fourth degree | | | 5 | partial fractions | | | 6 | mathematical inductions | | | 7 | translation and rotation of axes | | | 8 | pairs of straight lines | | | 9 | conic sections | | | 10 | Functions ~ Inequalities; domain and co-domain of a function; types of function; graph of a function; continuity; curve sketching; the function sin, cos, tan | | | 11 | Differentiation ~ Basic ideas; tangent to a curve; the product and quotient rule; the chain rule for differentiating f(g(x)); the idea of implicit functions, implicit differentiation; use of derivatives in curve sketching; higher derivatives; maxima and minima of functions; conic sections, Leibniz rule. | | | 12 | Mean value theorem and Leibniz rule | | | 13 | Further functions and its derivatives : Inverse functions; the log function ln; the exponential function exp and ax; the inverse trigonometric functions sin-1, cos-1, tan-1; the hyperbolic functions sinh, cosh, tanh and their inverses sinh-1, cosh-1, tanh-1; complex exponentials | | | 14 | Applications of Calculus | |
|
|
| 5- Teaching and learning methods :- |
| | S | Method |
|---|
| lecturing | | tutorials | | Lectures supported by problem sheets and weekly small-group tutorials. |
|
|
| 6- Teaching and learning methods of disables :- |
| - Lectures (4H/W)
- Tutorial (3H/w)
|
|
| 7- Student assessment :- |
| A. Timing |
| | No | Method | Week |
|---|
| 1 | sheet exam | 10 | | 2 | oral exam | 12 | | 3 | final exam | 14 |
|
| B. Degree |
| | No | Method | Degree |
|---|
| 1 | Mid_term examination | 0 | | 2 | Final_term examination | 90 | | 3 | Oral examination | 10 | | 4 | Practical examination | 0 | | 5 | Semester work | 0 | | 6 | Other types of asessment | 0 | | Total | 100% |
|
|
| 8- List of books and references |
| | S | Item | Type |
|---|
| 1 | Algebra - geometry | | | 2 | Calculus with analytic geometry | | | 3 | Howard Anton, Calculus, John Wily & Sons, INC 1999 | | | 4 | Jordan, D.W. & Smith, P. Mathematical Techniques: An introduction for the engineering, physical, and mathematical sciences (3rd edition), Oxford University Press, Oxford, 2002 | |
|
|
| 9- Matrix of knowledge and skills of the course |
| | S | Content | Study week |
|---|
| sets - determinants | | | matrices | | | complex numbers | | | the solution of the equations of the third and fourth degree | | | partial fractions | | | mathematical inductions | | | translation and rotation of axes | | | pairs of straight lines | | | conic sections | | | Functions ~ Inequalities; domain and co-domain of a function; types of function; graph of a function; continuity; curve sketching; the function sin, cos, tan | | | Differentiation ~ Basic ideas; tangent to a curve; the product and quotient rule; the chain rule for differentiating f(g(x)); the idea of implicit functions, implicit differentiation; use of derivatives in curve sketching; higher derivatives; maxima and minima of functions; conic sections, Leibniz rule. | | | Mean value theorem and Leibniz rule | | | Further functions and its derivatives : Inverse functions; the log function ln; the exponential function exp and ax; the inverse trigonometric functions sin-1, cos-1, tan-1; the hyperbolic functions sinh, cosh, tanh and their inverses sinh-1, cosh-1, tanh-1; complex exponentials | | | Applications of Calculus | |
|
|
| Course Coordinator(s): - |
| - Soad Abd Elmohsen Abd Elazeez Elsawah
|
| Head of department: - |
| Ahmed Habeb Mohamed Nageb Elbassiony |
