Beschreibung:
He is a Ph.D and a Professor of Mathematics in Temple University
1. Vectors in R and C, Spatial Vectors2. Algebra of Matrices3. Systems of Linear Equations4. Vector Spaces5. Linear Mappings6. Linear Mappings and Matrices7. Inner Product Spaces, Orthogonality8. Determinants9. Diagonalization: Eigenvalues and Eigenvectors10. Canonical Forms11. Linear Functionals and the Dual Space12. Bilinear, Quadratic, and Hermitian Forms13. Linear Operators on Inner Product Spaces
Tough Test Questions? Missed Lectures? Not Enough Time? Textbook too pricey?