Limits at discontinuities
Plot a rational function that is undefined at x=-1 but yet whose limit as x approaches -1 exists.
Suppose is a rational function of the form , where does not factor , and is a positive integer. If is even, what can you say about and ?
Plot a rational function below with the following properties:
- is defined everywhere except at , , and .
- does not exist.
- .
- .
Suppose is a function equal to if and equal to if . What value of makes continuous at ?