[Download] Partial Differential Equations (Poisson, Laplace, heat eq.) For Free
What you’ll learn
- How to use the Fourier Trasforms to tackle the problem of solving PDE’s
- Fourier Transforms in one and multiple dimensions
- Method of separation of variables to solve the Heat equation (with exercises)
- Method of separation of variables to solve the Laplace equation in cartesian and polar coordinates (with exercises)
- How to apply the Fourier Transform to solve 2nd order ODE’s as well
- concept of streamlines
- Mathematical tricks
- How to derive Heisenberg Uncertainty Principle using concepts of Probability Theory
Requirements
- Calculus (especially: derivatives, integrals)
- Multivariable Calculus (especially: the Jacobian, the Laplacian, etc.)
- Complex Calculus (basics of Fourier series and residues could help)
- Some notions of probability theory (distributions, mean, variance)
- Complex numbers
Who this course is for:
- Students who are interested in Physics and in mathematical derivations of concepts
You must be registered for see links
You must be registered for see links
RAR password: xdj@hacksnation.com