Understanding Rational Functions and Asymptotes

Polynomial functions can have asymptotes.

Rational functions are expressed as quotients of polynomials.

Polynomial functions are always linear.

Rational functions have a domain of all real numbers.

Because it makes the numerator zero.

Because it results in a negative number.

Because it results in a positive number.

Because it makes the denominator zero.

It remains constant.

It approaches positive infinity.

It approaches zero.

It approaches negative infinity.

By finding the zeroes of the numerator.

By finding the zeroes of the denominator.

By setting the function equal to zero.

By finding the highest degree term.

None

Three

Two

One

By the sum of the leading coefficients.

By the difference of the leading coefficients.

By the product of the leading coefficients.

By the ratio of the leading coefficients.

Reflection

Vertical shift

Stretch

Horizontal shift

Vertical shift

Reflection

Horizontal shift

Stretch

Using only the y-intercepts

Ignoring the asymptotes

Finding asymptotes and intercepts

Using only the x-intercepts

Identifying horizontal asymptotes

Identifying vertical asymptotes

Finding the y-intercepts

Finding the x-intercepts