Exploring Rational Functions: Addition and Subtraction

A polynomial function as the numerator and an exponential function as the denominator

Two exponential functions

A single polynomial function

Two polynomial functions where the denominator is not zero

To simplify the function's graph

To ensure the function is defined for all real numbers

To avoid division by zero, which is undefined

To make the function linear

By finding the derivative of the function

By finding values that make the numerator zero

By excluding values that make the denominator zero

By setting the function equal to zero

Interval notation

Fractional notation

Exponential notation

Logarithmic notation

It indicates the slope of the function

It specifies the maximum value of the function

It identifies all possible x-values for the function

It determines the range of the function

A constant value of the function

A value that the function cannot reach

The function's minimum value

The function's maximum value

By finding where the function is undefined

By finding where the function's derivative is zero

By finding where the function approaches a finite value

By finding where the function approaches positive or negative infinity

They calculate the exact value of the function at a point

They help identify discontinuities in the function

They determine the overall shape of the graph

They simplify the function for easier analysis

The function is undefined at y=0

The function has no vertical asymptotes

The function approaches zero as x approaches infinity

The function crosses the y-axis at zero

By plotting the function on a graph

By setting the numerator equal to zero

By evaluating the limits as x approaches positive and negative infinity

By finding the function's derivatives