  Learn about linear transformation and its corresponding matrix.

               THEORY (45 Hours)

                                               
               UNIT – I: Euclidean Space     and Matrices                                         (18 Hours)
                                                                           
               Fundamental operations with vectors in Euclidean space    , Linear combinations of vectors, Dot
               product and their properties, Cauchy-Schwarz inequality, Triangle inequality, Solving system of
               linear  equations  using  Gaussian  elimination,  Application:  Curve  Fitting,  Gauss-Jordan  row
               reduction,  Reduced  row  echelon  form,  Application:  Solving  several  systems  simultaneously,
               Equivalent  systems,  Rank  and  row  space  of  a  matrix,  Eigenvalues,  Eigenvectors,  Eigenspace,
               Diagonalization, Characteristic polynomial of a matrix.

               UNIT – II: Introduction to Vector Spaces                                           (12 Hours)
               Definition, Examples and some elementary properties of vector spaces, Subspaces, Span, Linear
               independence and linear dependence of vectors, Basis and dimension of a vector space, Maximal
               linearly independent sets, Minimal spanning sets.
               UNIT – II: Linear Transformations                                                  (15 Hours)
               Linear transformations: Definition, Examples and elementary properties, The matrix of a linear
               transformation, Kernel and range of a linear transformation, The dimension theorem, one-to-one
               and onto linear transformations, Invertible linear transformations, Isomorphic vector spaces.

               *TUTORIAL (15 Hours (1 Hour per week))

               SUGGUESTED READINGS:


                   1.  Andrilli, S., & Hecker, D. (2016). Elementary Linear Algebra (5th ed.). Elsevier India.
                   2.  Lay,  David  C.,  Lay,  Steven  R.,  &  McDonald,  Judi  J.  (2016).  Linear  Algebra  and  its
                       Applications (5th ed.). Pearson Education.
                   3.  Kolman, Bernard, & Hill, David R. (2001). Introductory Linear Algebra with Applications
                       (7th ed.). Pearson Education, Delhi. First Indian Reprint 2003.
                   4.  Spectrum- Linear Algebra, Sharma Publications, Jalandhar
                   5.  A Text Book of Linear Algebra, S. Dinesh & Co, Jalandhar

               Maths.321                  Numerical Analysis                                            3+1*

               LEARNING OBJECTIVES:


               The learning objectives of this course are as follows:

                     To acquaint students with the techniques that uses algorithms for approximation problems.
                     Develop the students‘ ability to use various numerical method techniques
                     To  make  the  students  formulate  and  apply  appropriate  strategy  to  solve  real  world
                       problems.


               Learning outcomes

               On successful completion of the course, students will be able to:
                     Know the basic elements of numerical methods and error analysis
                     Learn Iterative methods for finding the roots of the algebraic and transcendental equations
                     Apply  the  numerical  methods  to  solve  system  of  linear  equations  and  understand  the
                       methods
                       convergence analysis.


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