64 STEP 4. Review the Knowledge You Need to Score High
5.3 Continuity of a Function
Main Concepts:Continuity of a Function at a Number, Continuity of a Function over an
Interval, Theorems on ContinuityContinuity of a Function at a Number
A function f is said to be continuous at a numberaif the following three conditions are
satisfied:- f(a) exists
- xlim→af(x) exists
- xlim→af(x)= f(a)
The functionf is said to be discontinuous ataif one or more of these three conditions are
not satisfied andais called the point of discontinuity.Continuity of a Function over an Interval
A function is continuous over an interval if it is continuous at every point in the interval.Theorems on Continuity- If the functions f andg are continuous ata, then the functions f+g, f−g, f ·g
and f/g,g(a)=/0, are also continuous ata. - A polynomial function is continuous everywhere.
- A rational function is continuous everywhere, except at points where the denominator
is zero. - Intermediate Value Theorem: If a function f is continuous on a closed interval [a,b]
andkis a number withf(a)≤k≤f(b), then there exists a numbercin [a,b] such
thatf(c)=k.
Example 1
Find the points of discontinuity of the functionf(x)=
x+ 5
x^2 −x− 2.
Since f(x) is a rational function, it is continuous everywhere, except at points where
the denominator is 0. Factor the denominator and set it equal to 0: (x−2)(x+1)=0.
Thusx=2orx=−1. The function f(x) is undefined atx=−1 and atx=2. There-
fore, f(x) is discontinuous at these points. Verify your result with a calculator. (See
Figure 5.3-1.)[–5,5] by [–10,10]
Figure 5.3-1