Graphing Rational Functions and Asymptotes

A function that is expressed as a quotient of polynomial functions.

A function that is expressed as a product of polynomial functions.

A function that is expressed as a sum of polynomial functions.

A function that is expressed as a difference of polynomial functions.

Because the function can be undefined.

Because the function can be infinite.

Because the denominator can be zero.

Because the numerator can be zero.

The function remains constant.

The function approaches zero.

The function approaches negative infinity.

The function approaches positive infinity.

X equals zero and Y equals zero.

X equals infinity and Y equals infinity.

X equals one and Y equals one.

X equals negative one and Y equals negative one.

By finding the leading coefficient.

By finding the highest degree term.

By finding the zeroes of the denominator.

By finding the zeroes of the numerator.

Three

One

Two

Zero

Y equals zero is the asymptote.

There is no horizontal asymptote.

Y equals one is the asymptote.

Y equals infinity is the asymptote.

A vertical stretch.

A horizontal shift.

A vertical shift.

A horizontal stretch.

It causes a vertical shift.

It causes a horizontal shift.

It causes a vertical stretch.

It causes a horizontal stretch.

Finding vertical asymptotes by identifying the zeroes of the numerator.

Finding horizontal asymptotes by identifying the zeroes of the denominator.

Finding vertical asymptotes by identifying the zeroes of the denominator.

Finding horizontal asymptotes by identifying the zeroes of the numerator.