Difference Quotient

What is the difference quotient in calculus ?
We start with the definition and then we calculate the difference quotient for different functions as examples with detailed explanations.
Note that a difference quotient calculator is included and may be used to check results and generate further practice.

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Definition of Difference Quotient

Let \( f \) be a function whose graph is shown below.
graphs of function f with secant line

A and B are points on the graph of \( f\). A
line passing trough the two points \( A ( x , f(x)) \) and \( B(x+h , f(x+h)) \) is called a secant line. The slope \( m \) of the secant line may be calculated as follows:
\[ m = \dfrac{f (x + h) - f(x)}{(x + h) - x} \]
Simplify the denominator to obtain
\[ m = \dfrac{f (x + h) - f(x)}{h} \]
The slope \( m \) is called the
difference quotient . It is a very important concept in calculus where it is used to define the derivative of function \( f \) which in fact defines the local variation of a function in mathematics.



Examples with Solutions

In the examples below, we calculate and simplify the difference quotients of different functions.


Example 1

Find the difference quotient of function \( f \) defined by \[f(x) = 2x + 5\]

Solution to Example 1

  • We first need to calculate \( f(x + h) \).
    \( f(x + h) = 2(x + h) + 5 \)
  • We now substitute \( f(x + h) \) and \( f(x) \) in the definition of the difference quotient by their expressions
    \( \dfrac{f (x + h) - f(x)}{h} = \dfrac{2(x + h) + 5 - (2 x + 5) }{h} \)
  • We simplify the above expression.
    \( = \dfrac{2h}{2} = 2 \)
  • The answer is 2 which also the slope of the line defined by function \( f \), why?


Example 2

Find the difference quotient of the following function
\[ f(x) = 2x^2 + x - 2 \]

Solution to Example 2

  • We first calculate \( f(x + h) \).
    \( f(x + h) = 2(x + h)^2 + (x + h) - 2 \)
  • We now substitute \( f(x + h) \) and \( f(x) \) in the difference quotient
    \( \dfrac{f (x + h) - f(x)}{h} = \dfrac{ 2(x + h)^2 + (x + h) - 2 - ( 2 x^2 + x - 2 )}{h} \)
  • We expand the expressions in the numerator and group like terms.
    \( = \dfrac{ 4 x h + 2 h^2 + h}{h} = 4 x + 2 h +1 \)


Example 3

Find the difference quotient of function \( f \) given by \[ f(x) = \sin x \] and write the result as a product.

Solution to Example 3


  • We first calculate \( f(x + h) \).
    \( f(x + h) = \sin (x + h) \)
  • We now substitute \( f(x + h) \) and \( f(x) \) in the difference quotient
    \( \dfrac{f (x + h) - f(x)}{h} = \dfrac{ \sin (x + h) - \sin x}{h} \)
  • We use the trigonometric formula that transform a difference \( \quad \sin (x + h) - \sin x \quad \) into a product.
    \( \sin (x + h) - \sin x = 2 \cos [ (2 x + h)/2 ] \sin (h/2) \)
  • We substitute the above expression for \( sin (x + h) - sin x \) in the difference quotient above to obtain.
    \( \dfrac{f (x + h) - f(x)}{h} = \dfrac{ 2 \cos [ (2 x + h)/2 ] \sin (h/2)}{h} \)


More References and links

Difference Quotient Calculator
differentiation and derivatives
Difference quotient

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