Courses
- Differential and Integral Calculus1 (90901) תקציר הקורס:
- Linear Algebra (90905) תקציר הקורס:
- Ordinary Differential Equations (90914) תקציר הקורס:
- Discrete Mathematics (90926) תקציר הקורס:
Abstract:
Real numbers. Sequences. Limit of a sequence. Limits and continuity of f?unctions. Intermediate value theorem. Weierstrass's theorem. The derivative. Techniques of differentiation. Fermat, Rolle and Lagrange theorems. L'H?pital's rule. Taylor polynomial approximations. The derivative in graphing and applications. The definite and indefinite integral. Principles on integral evaluation: integration by parts and by substitution. The fundamental theorem of calculus (Newton-Leibniz). Improper integral.Abstract:
The first part of the course is dedicated to study of techniques for
solving systems of linear equations. Several basic methods are presented:
Gauss elimination, matrix solution, Cramer rule.
The last two methods involve matrix arithmetic, which is also presented in this part. The second part discusses vector spaces and linear transformations. Most attention is given to the matrix approach. Matrix diagonalization issues summarize this part.
The last part of the course study inner product spaces and their basic properties.Abstract:
Sorting differential equations.
First-order differential equations.
Linear differential equations of order n:
homogeneous and non-homogeneous equation, Wronskian homogeneous equations with constant
coefficients. Separation into homogeneous and non-homogeneous problem,
method of unknown coefficients and method of variation of parameters.
Language Problems - Sturm Liouville Theory: Defining a close-knit operator,
finding the operator's self-values and self-func tions and proving their properties.
System of Linear Differential Equations Order 1: Solving the homogeneous
system using eigenvalues and eigenvectors of the matrix.
The Wronskian of the system. The non-homogeneous system.