Analyzing Asymptotes in Rational Functions

A function that can be written as a polynomial added to another polynomial.

A function that can be written as a polynomial subtracted from another polynomial.

A function that can be written as a polynomial multiplied by another polynomial.

A function that can be written as a polynomial divided by another polynomial.

A point where the graph intersects the y-axis.

A point where the graph intersects the x-axis.

A line that the graph approaches but never touches, running left to right.

A line that the graph approaches but never touches, running up and down.

As equations in the form x = a number.

As curves on the graph.

As equations in the form y = a number.

As points on the graph.

By setting the denominator equal to zero.

By finding the intersection points with the x-axis.

By finding the intersection points with the y-axis.

By setting the numerator equal to zero.

The horizontal asymptote is y = 0.

There is no horizontal asymptote.

The vertical asymptote is x = 0.

The horizontal asymptote is the ratio of the leading coefficients.

y = 1

y = the ratio of the leading coefficients

y = 0

There is no horizontal asymptote

y = the ratio of the leading coefficients

There is no horizontal asymptote

y = 1

y = 0

By finding the intersection points with the y-axis.

By finding the intersection points with the x-axis.

By setting the denominator equal to zero and solving.

By setting the numerator equal to zero and solving.

There are no vertical asymptotes.

The vertical asymptotes are imaginary.

The vertical asymptotes are at y = 0.

The vertical asymptotes are at x = 0.

There is no horizontal asymptote

y = 3

y = 2

y = 0