Rational Functions
Definition Of Rational Functions
The functions of the form 
where P(x) and Q (x) are the polynomial function in x and Q (x) ≠ 0, are called as Rational Functions.
More About Rational Functions
The degree of a rational function is the maximum of the degrees of its constituent functions.
Examples of Rational Functions
, etc are the examples of rational functions.
Video Examples: Rational Functions
Solved Example on Rational Functions
Ques: Which of the following is a rational function?
Choices:
A. f(x) = 
B. f(x) = 
C. f(x) = 
D. f(x) = 
Correct Answer: C
Solution:
Step 1: A function of the form 
, where P(x) and Q(x) are polynomials and Q(x) ? 0 is known as a rational function.
Step 2: f(x) = is not a rational function, since is not a polynomial.
Step 3: f(x) = is not a rational function, since 
is not a polynomial.
Step 4: f(x) = is not a polynomial, so f(x) is not a rational function.
Step 5: f(x) = is a rational function. [Both numerator and denominator expressions are polynomials.]