Develop essential mathematics skills with expert instruction and practical examples.
This course is focused on engineering mathematics. After completing the tutorial, you will be able to understand the basic advantageous knowledge of numerical analysis techniques. Certain bonus lectures are also included.
This course introduces students to a range of powerful numerical methods and approximation techniques that are essential for solving complex engineering problems. Through a combination of theoretical understanding and practical application, students will gain the necessary skills to analyze, model, and solve mathematical problems encountered in various engineering disciplines. The course focuses on four key numerical methods: Newton-Raphson method, Secant method, Bisection method, and numerical integration techniques such as Trapezoidal rule and Simpson's rule.
Course Topics:Introduction to Numerical Methods: Importance and applications in engineering. Newton-Raphson Method: Derivation, convergence analysis, and implementation. Secant Method: Advantages, convergence, and application in solving nonlinear equations.
Bisection Method: Algorithm, convergence, and root-finding applications. Numerical Integration Techniques: Trapezoidal rule and Simpson's rule, error analysis, and practical implementation. Applications in Engineering: Solving engineering problems involving nonlinear equations and definite integrals.
View pricing and check out the reviews. See what other learners had to say about the course.
Not sure if this is right for you?
Browse More Mathematics CoursesExplore more Mathematics courses to deepen your skills and advance your expertise.
