Asymptotes in Rational Functions

A function that can be simplified to a whole number

A function that has no fractions

A function that involves a fraction with a variable in the denominator

A function that is always linear

It shows where the graph approaches infinity

It indicates where the graph crosses the x-axis

It is a line that the graph never touches

It is a point where the function is undefined due to division by zero

By checking if the numerator equals zero

By checking if the denominator equals zero

By finding the highest degree of the numerator

By finding the highest degree of the denominator

The points where the graph intersects the y-axis

The behavior of the graph at infinity

The behavior of the graph at the origin

The points where the graph intersects the x-axis

By checking if the denominator is zero

By finding the roots of the numerator

By checking if the numerator is zero

By comparing the degrees of the numerator and denominator

The function has no asymptotes

The function has a vertical asymptote

The function has a horizontal asymptote at y=0

The function has an oblique asymptote

The function has a horizontal asymptote determined by the leading coefficients

The function has an oblique asymptote

The function has no asymptotes

The function has a horizontal asymptote at y=0