Matrices and their operations., types of matrices. Elementary transformations. Determinants, elementary properties. Inverse of a matrix. Linear systems of equations. Vector spaces, linear independence, finite dimensional spaces, linear subspaces. Inner product spaces. Linear transformations, kernel and image of a liner transformation. Eigen values and Eigen vectors of a matrix and of a linear operator.
1. Anton, H.; Calculus with analytic geometry. 2nd Edition, John Wiley, New York.
2. Earl W. Swokowski; Calculus with analytic Geometry.PWS-Kent Publishing Company, 20 Park Plaza, Boston.
Note the ingredient of our assessment of students will be the following:
Tutorial…………………………………..10 marks.
First-Mid Term Exam…………………..25 marks.
Second Mid Term Exam……………….25 marks
Final Exam……………………………….40 marks
Note the ingredient of our assessment of students will be the following:
Tutorial…………………………… ……..10 marks.
First-Mid Term Exam…………… ……..25 marks.
Second Mid Term Exam………………….25 marks
Final Exam……………… ……………….40 marks
