Understanding Rational Functions

To determine the function's range

To identify zeros, vertical asymptotes, and removable discontinuities

To calculate the derivative of the function

To find the maximum value of the function

Calculating the integral

Graphing the function

Factoring the numerator and denominator

Finding the derivative

x = -4

x = 6

x = -6

x = 4

It has no effect

It leads to a removable discontinuity

It results in a zero

It creates a vertical asymptote

A point where the function is undefined but can be simplified

A point where the function has a vertical asymptote

A point where the function has a zero

A point where the function is continuous

The function has a vertical asymptote

The function is continuous

The function is undefined

The function has a zero

The function approaches zero

The function remains constant

The function becomes undefined

The function approaches infinity

x = 8

x = -4

x = -8

x = 4

x = -8

x = 8

x = -4

x = 4

Because it is a zero

Because it is a vertical asymptote

Because it is a point of continuity

Because it is a maximum point