Lesson 8 of 16 • 1 upvotes • 8:39mins
Geometrically, an eigenvector, corresponding to a real nonzero eigenvalue, points in a direction that is stretched by the transformation and the eigenvalue is the factor by which it is stretched. If the eigenvalue is negative, the direction is reversed
16 lessons • 2h 13m
Course Overview
1:49mins
Linear Algebra: Matrix and Transpose of Matrix
11:33mins
Linear Algebra: Basic Operation on Matrix
8:08mins
Linear Algebra: Determinant of Matrix
10:14mins
Linear Algebra: System of Linear Equations
5:33mins
Linear Algebra: Rank of Matrix
8:28mins
Linear Algebra: Idempotent, Involutory, invertible and Adjoint Matrix
9:11mins
Linear Algebra :Eigenvalues and Eigenvectors
8:39mins
Series: Test of Divergence and Convergence, Maxima and Minima
8:12mins
Series : Arithmetic and Geometric Progessions
8:00mins
Statistics
8:16mins
Laplace Transforms
8:27mins
Probability: Cards
8:01mins
Probability: Dice
10:01mins
Limits, Differentiation and Integration
10:04mins
Numerical Methods
8:35mins