Analytical Geometry \& Linear Algebra -- II

• Course name: Analytical Geometry \& Linear Algebra -- II
• Course number: XYZ

Course Characteristics

Key concepts of the class

• fundamental principles of linear algebra,
• concepts of linear algebra objects and their representation in vector-matrix form

What is the purpose of this course?

Course objectives based on Bloom’s taxonomy

- What should a student remember at the end of the course?

By the end of the course, the students should be able to

• List basic notions of linear algebra
• Understand key principles involved in solution of linear equation systems and the properties of matrices
• Linear regression analysis
• Fast Fourier Transform
• How to find eigenvalues and eigenvectors for matrix diagonalization and single value decomposition

- What should a student be able to understand at the end of the course?

By the end of the course, the students should be able to

• Key principles involved in solution of linear equation systems and the properties of matrices
• Become familiar with the four fundamental subspaces
• Linear regression analysis
• Fast Fourier Transform
• How to find eigenvalues and eigenvectors for matrix diagonalization and single value decomposition

- What should a student be able to apply at the end of the course?

By the end of the course, the students should be able to

• Linear equation system solving by using the vector-matrix approach
• Make linear regression analysis
• Fast Fourier Transform
• To find eigenvalues and eigenvectors for matrix diagonalization and single value decomposition

Course evaluation

Grades range

Resources and reference material

• Gilbert Strang. Linear Algebra and Its Applications, 4th Edition, Brooks Cole, 2006. ISBN: 9780030105678
• Gilbert Strang. Introduction to Linear Algebra, 4th Edition, Wellesley, MA: Wellesley-Cambridge Press, 2009. ISBN: 9780980232714

Course Sections

The main sections of the course and approximate hour distribution between them is as follows:

Section 1

Section title

Linear equation system solving by using the vector-matrix approach

Topics covered in this section

• The geometry of linear equations. Elimination with matrices.
• Matrix operations, including inverses. ${\displaystyle LU}$ and ${\displaystyle LDU}$ factorization.
• Transposes and permutations. Vector spaces and subspaces.
• The null space: Solving ${\displaystyle Ax=0}$ and ${\displaystyle Ax=b}$. Row reduced echelon form. Matrix rank.

What forms of evaluation were used to test students’ performance in this section?

Typical questions for ongoing performance evaluation within this section

1. How to perform Gauss elimination?
2. How to perform matrices multiplication?
3. How to perform LU factorization?
4. How to find complete solution for any linear equation system Ax=b?

Typical questions for seminar classes (labs) within this section

1. Find the solution for the given linear equation system ${\displaystyle Ax=b}$ by using Gauss elimination.
2. Perform ${\displaystyle A=LU}$ factorization for the given matrix ${\displaystyle A}$.
3. Factor the given symmetric matrix ${\displaystyle A}$ into ${\displaystyle A=LDL^{T}}$ with the diagonal pivot matrix ${\displaystyle D}$.
4. Find inverse matrix ${\displaystyle A^{-}1}$ for the given matrix ${\displaystyle A}$.

Tasks for midterm assessment within this section

Test questions for final assessment in this section

1. Find linear independent vectors (exclude dependent): ${\displaystyle {\overrightarrow {a}}=[4,0,3,2]^{T}}$, ${\displaystyle {\overrightarrow {b}}=[1,-7,4,5]^{T}}$, ${\displaystyle {\overrightarrow {c}}=[7,1,5,3]^{T}}$, ${\displaystyle {\overrightarrow {d}}=[-5,-3,-3,-1]^{T}}$, ${\displaystyle {\overrightarrow {e}}=[1,-5,2,3]^{T}}$. Find ${\displaystyle rank(A)}$ if ${\displaystyle A}$ is a composition of this vectors. Find ${\displaystyle rank(A^{T})}$.
2. Find ${\displaystyle E}$: ${\displaystyle EA=U}$ (${\displaystyle U}$ – upper-triangular matrix). Find ${\displaystyle L=E^{-}1}$, if ${\displaystyle A=\left({\begin{array}{ccc}2&5&7\\6&4&9\\4&1&8\\\end{array}}\right)}$.
3. Find complete solution for the system ${\displaystyle Ax=b}$, if ${\displaystyle b=[7,18,5]^{T}}$ and ${\displaystyle A=\left({\begin{array}{cccc}6&-2&1&-4\\4&2&14&-31\\2&-1&3&-7\\\end{array}}\right)}$. Provide an example of vector b that makes this system unsolvable.

Section 2

Section title

Linear regression analysis and decomposition ${\displaystyle A=QR}$.

Topics covered in this section

• Independence, basis and dimension. The four fundamental subspaces.
• Orthogonal vectors and subspaces. Projections onto subspaces
• Projection matrices. Least squares approximations. Gram-Schmidt and A = QR.

What forms of evaluation were used to test students’ performance in this section?

Typical questions for ongoing performance evaluation within this section

1. What is linear independence of vectors?
2. Define the four fundamental subspaces of a matrix?
3. How to define orthogonal vectors and subspaces?
4. How to define orthogonal complements of the space?
5. How to find vector projection on a subspace?
6. How to perform linear regression for the given measurements?
7. How to find an orthonormal basis for the subspace spanned by the given vectors?

Typical questions for seminar classes (labs) within this section

1. Check out linear independence of the given vectors
2. Find four fundamental subspaces of the given matrix.
3. Check out orthogonality of the given subspaces.
4. Find orthogonal complement for the given subspace.
5. Find vector projection on the given subspace.
6. Perform linear regression for the given measurements.
7. Find an orthonormal basis for the subspace spanned by the given vectors.

Tasks for midterm assessment within this section

Test questions for final assessment in this section

1. Find the dimensions of the four fundamental subspaces associated with ${\displaystyle A}$, depending on the parameters ${\displaystyle a}$ and ${\displaystyle b}$: ${\displaystyle A=\left({\begin{array}{cccc}7&8&5&3\\4&a&3&2\\6&8&4&b\\3&4&2&1\\\end{array}}\right)}$.
2. Find a vector ${\displaystyle x}$ orthogonal to the Row space of matrix ${\displaystyle A}$, and a vector ${\displaystyle y}$ orthogonal to the ${\displaystyle C(A)}$, and a vector ${\displaystyle z}$ orthogonal to the ${\displaystyle N(A)}$: ${\displaystyle A=\left({\begin{array}{ccc}1&2&2\\3&4&2\\4&6&4\\\end{array}}\right)}$.
3. Find the best straight-line ${\displaystyle y(x)}$ fit to the measurements: ${\displaystyle y(-2)=4}$, ${\displaystyle y(-1)=3}$, ${\displaystyle y(0)=2}$, ${\displaystyle y(1)-0}$.
4. Find the projection matrix ${\displaystyle P}$ of vector ${\displaystyle [4,3,2,0]^{T}}$ onto the ${\displaystyle C(A)}$: ${\displaystyle A=\left({\begin{array}{cc}1&-2\\1&-1\\1&0\\1&1\\\end{array}}\right)}$.
5. Find an orthonormal basis for the subspace spanned by the vectors: ${\displaystyle {\overrightarrow {a}}=[-2,2,0,0]^{T}}$, ${\displaystyle {\overrightarrow {b}}=[0,1,-1,0]^{T}}$, ${\displaystyle {\overrightarrow {c}}=[0,1,0,-1]^{T}}$. Then express ${\displaystyle A=[a,b,c]}$ in the form of ${\displaystyle A=QR}$

Section 3

Section title

Fast Fourier Transform. Matrix Diagonalization.

Topics covered in this section

• Complex Numbers. Hermitian and Unitary Matrices.
• Fourier Series. The Fast Fourier Transform
• Eigenvalues and eigenvectors. Matrix diagonalization.

What forms of evaluation were used to test students’ performance in this section?

Typical questions for ongoing performance evaluation within this section

1. Make the definition of Hermitian Matrix.
2. Make the definition of Unitary Matrix.
3. How to find matrix for the Fourier transform?
4. When we can make fast Fourier transform?
5. How to find eigenvalues and eigenvectors of a matrix?
6. How to diagonalize a square matrix?

Typical questions for seminar classes (labs) within this section

1. Check out is the given matrix Hermitian.
2. Check out is the given matrix Unitary.
3. Find the matrix for the given Fourier transform.
4. Find eigenvalues and eigenvectors for the given matrix.
5. Find diagonalize form for the given matrix.

Tasks for midterm assessment within this section

Test questions for final assessment in this section

1. Find eigenvector of the circulant matrix ${\displaystyle C}$ for the eigenvalue = ${\displaystyle {c}_{1}}$+${\displaystyle {c}_{2}}$+${\displaystyle {c}_{3}}$+${\displaystyle {c}_{4}}$: ${\displaystyle C=\left({\begin{array}{cccc}{c}_{1}&{c}_{2}&{c}_{3}&{c}_{4}\\{c}_{4}&{c}_{1}&{c}_{2}&{c}_{3}\\{c}_{3}&{c}_{4}&{c}_{1}&{c}_{2}\\{c}_{2}&{c}_{3}&{c}_{4}&{c}_{1}\\\end{array}}\right)}$.
2. Diagonalize this matrix: ${\displaystyle A=\left({\begin{array}{cc}2&1-i\\1+i&3\\\end{array}}\right)}$.
3. ${\displaystyle A}$ is the matrix with full set of orthonormal eigenvectors. Prove that ${\displaystyle AA=A^{H}A^{H}}$.
4. Find all eigenvalues and eigenvectors of the cyclic permutation matrix ${\displaystyle P=\left({\begin{array}{cccc}0&1&0&0\\0&0&1&0\\0&0&0&1\\1&0&0&0\\\end{array}}\right)}$.