Understanding Rational Functions and Asymptotes

To multiply both sides by a square

To leave the expression as a rational function

To solve the inequality by factoring

To eliminate the denominator

Factorize

Function

Fraction

Formula

Diagonal asymptote

Vertical asymptote

Oblique asymptote

Horizontal asymptote

They determine where the function cannot exist

They are only found in polynomial functions

They affect the function at its extremities

They are always parallel to the x-axis

It approaches infinity

It approaches zero

It becomes undefined

It remains constant

It approaches zero from below

It approaches zero from above

It becomes undefined

It approaches infinity

To show the asymptotes

To simplify the graph

To indicate positive and negative regions

To highlight the intercepts

By calculating the derivative

By setting the numerator equal to zero

By setting the denominator equal to zero

By finding the asymptotes

They define the asymptotes

They determine the slope of the graph

They indicate where the graph crosses the axes

They show the maximum and minimum points

To simplify the equation

To identify the correct asymptotes

To determine the function's domain

To visualize the solution regions