Linear Transformation Linear Algebra MATHEMATICS

Description

Linear Algebra is a fundamental branch of mathematics that explores vector spaces and the linear mappings between them. This course covers the essential concepts of matrices, vectors, systems of linear equations, determinants, eigenvalues and eigenvectors, and linear transformations.

Students will learn how to perform matrix operations, analyze the properties of vector spaces and subspaces, and solve systems of equations using techniques such as Gaussian elimination and matrix inversion. The course also emphasizes the geometric interpretations of linear algebraic concepts, helping students visualize transformations in two and three dimensions.

Linear Algebra serves as a foundational tool in various disciplines, including physics, engineering, computer science, economics, and data science. It is especially crucial in areas such as machine learning, computer graphics, optimization, and quantum mechanics.

By the end of the course, students will be equipped with the mathematical framework necessary to understand and solve real-world problems involving multidimensional data and systems.

1. Introduction to Linear Algebra

2. Vectors and Vector Operations

3. Matrices and Matrix Algebra

4. Systems of Linear Equations

5. Row Reduction and Echelon Forms

6. Vector Spaces and Subspaces

7. Linear Independence and Basis

8. Dimension and Rank

9. Determinants and Their Properties

10. Eigenvalues and Eigenvectors

11. Diagonalization of Matrices

12. Inner Product Spaces

13. Orthogonality and Least Squares

14. Linear Transformations

15. Applications of Linear Algebra