Continuity
The main objective is to define continuity at a point, and understand
the concept of continuity. Two thereoms, namely the Internediate value Theorem and
Extreme Theorem about functions defined and continuous on a closed and bounded interval
[a,b] will be stated.
Syllabus
- Definition of continuity at a point.
- Properties of continuity. (for examples: Continuity is preserved under addition, product
and composition of functions.)
- Continuity on interval.
- Intermediate Value Theorem.
- Extreme Value Theorem.
- Some consequences or applications of IVT and EVT.
Learning Objectives
- Students should be able to verify continuity at a point via definition.
- Students should know that x^n, trigonometric functions are continuous.
- Students should be able to verify continuity of some functions using properties of
continuity.
- Students should understand the Intermediate Value Theorem. They should know how to read
the statement, and apply the Intermediate Value theorem.
Reference: NG TB, Calculus, Chapter 4.