From Chapter 1 - 5, you already learnt the concept of vector and coordinate and its important to solve electrostatic problem. You also learnt about coulomb's law and gauss's law to find Electric field intensity, Electric flux density as well as electric potential. In Chapter 6, you will be introduced with another approach to find electric potential as well as other electrostatic components by using Laplace or Poisson equation. To satisfy the solution, we need to apply uniqueness theorem.
For Part 1, you will be introduced with the concept of Laplace & Poisson as well as Uniqueness Theorem to solve the problem related to the Capacitance for different coordinate system.
For Part 3, you will learn to solve the Laplace equation that satisfy the uniqueness theorem for Cartesian coordinate. The same method can be used to solve the Poisson's equation.
For Part 4, you will learn to solve the Laplace equation that satisfy the uniqueness theorem for Spherical coordinate. The same method can be used to solve the Poisson's equation.
For Part 5, you will learn to solve the Laplace equation that satisfy the uniqueness theorem for Cylindrical coordinate. The same method can be used to solve the Poisson's equation.
No comments:
Post a Comment