Posted by **Codster** on Sunday, January 22, 2012 at 7:10pm.

Suppose you have a rational function that its denominator is (X-c) and numerator can be any function. Suppose you need to find the limit of this rational function given as x goes to value c. Can you always say that for this problem the limit does not exist?

## Answer This Question

## Related Questions

- Calculus - Suppose you have a rational function that its denominator is (X-c) ...
- Math-precalc - Is it possible to find a rational function that has x-intercepts...
- Gr.11 - Rational functions graphing. - 1. Identify a rational function whose ...
- Math - For the given functions, write the rational function, r(x) = [f(x-h)-f(x...
- math - the limit of cuberoot((-3x^3+5x+2)/(x^2-1)) as x approaches 3 is the ...
- Calc - A rational function f(x) contains quadratic functions in both the ...
- calculus - A rational function f(x) contains quadratic functions in both the ...
- precal - Create a rational function that has a polynomial function that is ...
- precalcus - can someone explain how to evaluate limits? i only learned how to ...
- Math - Some rational numbers are integers. True or false The radius of a circle...

More Related Questions