Lecture

Quadratic Approximation: Example

Related lectures (29)

Introduces orthogonal bases, projection onto subspaces, and the Gram-Schmidt process in linear algebra.

Explores the generalization of projection in vector spaces and its unique properties, emphasizing its role in finding the closest vector in a subspace.

Gram-Schmidt Process

Introduces the Gram-Schmidt orthogonalization process to find orthogonal bases for vector subspaces.

Orthogonal/Orthonormal Bases and Polynomials

Explores orthogonal and orthonormal bases, Gram-Schmidt process, and orthogonal polynomials in physics.

Orthogonal Bases in Vector Spaces

Covers the concept of orthogonal bases in vector spaces and Pythagorean theorem applications.

Orthogonalization of Vectors

Covers the Gram-Schmidt orthogonalization process and vector projections in a vector space.

Orthogonal Vectors and Projections

Covers scalar products, orthogonal vectors, norms, and projections in vector spaces, emphasizing orthonormal families of vectors.

Orthogonal Complement and Projection

Covers the concept of orthogonal complement and projection in vector spaces.

Development Limit: Order 1 and 2

Covers limited order 1 and 2 development, focusing on linearity and polynomial approximation.

Orthogonal Projection: Example and Additional Remarks

Explains orthogonal projection onto a subspace and finding orthogonal bases using Gram-Schmidt procedure.

Projection Orthogonal: Importance of Orthogonal Bases

Emphasizes the importance of using orthogonal bases in linear algebra for representing linear transformations.

Finding Orthogonal/Orthonormal Base: First Step

Introduces the first step in finding an orthogonal/orthonormal base in a vector space.

Local Homeomorphisms and Coverings

Covers the concepts of local homeomorphisms and coverings in manifolds, emphasizing the conditions under which a map is considered a local homeomorphism or a covering.

Approximating Functions with Polynomials

Explores approximating functions with polynomials in inner product spaces, focusing on degree 2 and cosine functions.

Orthogonal Projection Theorems

Covers the theorems related to orthogonal projection and orthonormal bases.

Signal Representations

Covers signal representations using Fourier transforms and projection theorems in the time-frequency plane.

Taylor Polynomials: Correction Term

Explores the correction term in Taylor polynomials, showcasing its role in refining function approximations.

Orthogonality and Projection

Covers orthogonality, scalar products, orthogonal bases, and vector projection in detail.

Orthogonal Bases in Vector Spaces

Explores orthogonal bases in vector spaces, explaining unique vector representations and spectral decomposition.

QR Factorization: Orthogonal Bases and Matrices

Explores QR factorization, orthogonal bases, and matrices for numerical computations and solving systems of equations.