Exploring Rational Functions and Their Operations

A function that cannot have any asymptotes.

A function that always crosses the x-axis.

A function that can only be expressed using rational numbers.

A function represented by a polynomial in both numerator and denominator.

Any number that can be expressed as a fraction.

A number that cannot be expressed as a fraction.

A number that includes pi and e.

A number that can be expressed as an integer over another integer.

Values that make the numerator zero.

Values that make the denominator zero.

Values where the function intersects the y-axis.

Values that result in undefined horizontal asymptotes.

Only positive real numbers.

All real numbers except where the denominator equals zero.

All real numbers except where the function intersects the y-axis.

All real numbers.

The graph approaches the asymptote but never touches or crosses it.

The graph touches the asymptote but does not cross it.

The graph becomes undefined.

The graph crosses the asymptote.

By subtracting the leading coefficient of the denominator from the numerator.

By adding the degrees of the numerator and denominator.

By dividing the leading coefficients of the numerator by the denominator.

Horizontal asymptotes do not exist in this case.

Non-existent

y = 0

Dependent on the leading coefficients

y = 1

They have no significance in determining asymptotes.

They are divided to find the horizontal asymptote when degrees of numerator and denominator are equal.

They are used to calculate the y-intercept of the asymptote.

They determine the slope of the asymptote.

Slant asymptotes occur regardless of the degrees of the numerator and denominator.

When the degree of the numerator is less than the degree of the denominator.

When the degree of the numerator is greater than the degree of the denominator by more than one.

When the degree of the numerator is exactly one more than the degree of the denominator.

They are always horizontal lines.

They occur when the numerator's degree is less than the denominator's degree.

They can occur when the numerator's degree is one more than the denominator's degree.

They are determined by setting the numerator equal to zero.