Covers matrices, systems of equations, eigenvalues and eigenvectors – foundational for structural and numerical methods.
Single and multivariable calculus including limits, derivatives, integrals, and vector calculus.
Probability distributions, random variables, and statistical measures.
Approximation techniques for equations, integration, and differentiation.
Solutions of first and higher order differential equations.
Analytical solutions for diffusion, wave, and Laplace equations.