The [course_title] will enable you to gain a mathematics qualification while completing an undergraduate degree and will allow you use and develop your mathematical skills and complement your undergraduate studies. The high-level numerical and modeling skills you will gain can be applied to almost every area of employment and are always in demand. This course gives training in logical thought and expression and is a good preparation for many careers.
Assessment
This course does not involve any written exams. Students need to answer 5 assignment questions to complete the course, the answers will be in the form of written work in pdf or word. Students can write the answers in their own time. Each answer needs to be 200 words (1 Page). Once the answers are submitted, the tutor will check and assess the work.
Certification
Edukite courses are free to study. To successfully complete a course you must submit all the assignment of the course as part of the assessment. Upon successful completion of a course, you can choose to make your achievement formal by obtaining your Certificate at a cost of £49.
Having an Official Edukite Certification is a great way to celebrate and share your success. You can:
- Add the certificate to your CV or resume and brighten up your career
- Show it to prove your success
Course Credit: Open Culture
Course Curriculum
| Module: 01 | |||
| Lecture 1 – Real Number | 00:57:00 | ||
| Lecture 2 – Sequences I | 00:55:00 | ||
| Lecture 3 – Sequences II | 00:44:00 | ||
| Lecture 4 – Sequences III | 00:52:00 | ||
| Lecture 5 – Continuous Function | 00:55:00 | ||
| Lecture 6 – Properties of Continuous function | 01:01:00 | ||
| Lecture 7 – Uniform Continuity | 01:00:00 | ||
| Lecture 8 – Differentiable function | 00:55:00 | ||
| Module: 02 | |||
| Lecture 9 – Mean Value Theorems | 00:50:00 | ||
| Lecture 10 – Maxima – Minima | 00:55:00 | ||
| Lecture 11 -Taylor’s Theorem | 00:53:00 | ||
| Lecture 12 – Curve Sketching | 00:46:00 | ||
| Lecture 13 – Infinite Series I | 00:54:00 | ||
| Lecture 14 – Infinite Series II | 00:51:00 | ||
| Lecture 15 – Tests of Convergence | 00:56:00 | ||
| Lecture 16 – Power Series | 00:53:00 | ||
| Module: 03 | |||
| Lecture 17 – Riemann integral | 00:54:00 | ||
| Lecture 18 – Riemann Integrable functions | 01:00:00 | ||
| Lecture 19 – Applications of Riemann Integral | 00:52:00 | ||
| Lecture 20 – Length of a curve | 00:58:00 | ||
| Lecture 21 – Line integrals | 00:56:00 | ||
| Lecture 22 – Functions of several variables | 00:56:00 | ||
| Lecture 23 – Differentiation | 01:00:00 | ||
| Lecture 24 – Derivatives | 00:55:00 | ||
| Module: 04 | |||
| Lecture 25 – Mean Value Theorem | 00:52:00 | ||
| Lecture 26 – Maxima Minima | 00:57:00 | ||
| Lecture 27 – Method of Lagrange Multipliers | 00:50:00 | ||
| Lecture 28 – Multiple Integrals | 00:52:00 | ||
| Lecture 29 – Surface Integrals | 01:00:00 | ||
| Lecture 30 – Green’s Theorem | 00:52:00 | ||
| Lecture 31 – Stokes Theorem | 00:54:00 | ||
| Lecture 32 – Gauss Divergence Theorem | 00:37:00 | ||
| Assessment | |||
| Submit Your Assignment | 00:00:00 | ||
| Certification | 00:00:00 | ||
Course Reviews
No Reviews found for this course.
Related Courses
