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Made in

English
Last updated at

Thu, 06-Mar-2025
Level
Beginner
Total lessons

36
Total duration

08:20:21 Hours
Number of reviews

0
Total enrolment

18
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Short description
This 8-week free online course on Differential Equations is designed for B.Sc. Mathematics major students. It covers fundamental concepts, solution techniques, and applications through video lectures, PPTs, course materials, and weekly quizzes. Complete the course and pass the final quiz in Week 8 to earn a Certificate of Completion.
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Requirements
  • Course Requirements – Differential Equations (B.Sc. Mathematics Major) This course is designed for B.Sc. Mathematics major students who want to build a strong foundation in Differential Equations. Below are the key requirements to enroll and successfully complete the course.
  • Prerequisites: ✔ Basic Knowledge of Calculus – Students should be familiar with differentiation and integration. ✔ Understanding of Algebra – Knowledge of algebraic manipulations and functions is essential. ✔ Logical and Analytical Thinking – Ability to approach mathematical problems systematically.
  • echnical Requirements: ✔ A Computer or Smartphone – To access video lectures, PPTs, and course materials. ✔ Stable Internet Connection – For streaming videos and taking quizzes online. ✔ PDF Reader & PowerPoint Viewer – To open course materials and presentations.
  • Course Completion Requirements: ✔ Watch All Video Lectures – Each module consists of 4 video lectures that must be viewed. ✔ Go Through Course Materials – Includes PPTs, notes, and reference documents for deeper understanding. ✔ Complete Weekly Quizzes – One quiz per week to assess your learning. ✔ Pass the Final Quiz in Week 8 – A cumulative assessment to evaluate your overall understanding.
  • Upon fulfilling these requirements, students will receive a Certificate of Completion! 📌 No registration fee, just your dedication and enthusiasm to learn Differential Equations! 🚀
Outcomes
  • Apply Techniques for Solving First-Order Differential Equations
  • Analyze Clairaut’s Equation and Orthogonal Trajectories
  • Evaluate Solutions of Homogeneous and Non-Homogeneous Linear Equations
  • Apply Particular Integrals in Non-Homogeneous Equations
  • Analyze Cauchy-Euler Equation and Method of Variation of Parameters