Gail Price
New member
- Joined
- Feb 19, 2010
- Messages
- 22
I was pretty close, wasn't I. I knew it was somewhere around what I quoted. But thanks for the input that you gave me. Now since you are so smart answer this one for me. I tried to start it but I think that I confused myself.
The reason why polynomials are so important is that there is a theorem from Analysis that says that any continuous function defined on an interval of the real line can be approximated arbitrarily closely by a polynomial. So polynomials are useful to “model” any kind of function on a closed interval. However, polynomials “get wild” at infinity, so they don’t work well to try to extrapolate an arbitrary function past the closed interval in which it is being approximated by the polynomial.
A rational function is a function which is a ratio of two polynomials, one polynomial in the numerator and another one in the denominator. Rational functions are also used to model an arbitrary function, and for many purposes they have better behavior. If the rational function is a ratio of two polynomials of the form p(x)/q(x), and the order of the two polynomials is np and nq, try to give a qualitative description of the behavior of this rational function. What happens to the rational function in the cases np > nq, np = nq, and np < nq as x goes to plus or minus infinity (compare with the case of a polynomial)? If an arbitrary function f(x) goes to zero at plus and minus infinity, what kind of rational function would be best to model this function?
The reason why polynomials are so important is that there is a theorem from Analysis that says that any continuous function defined on an interval of the real line can be approximated arbitrarily closely by a polynomial. So polynomials are useful to “model” any kind of function on a closed interval. However, polynomials “get wild” at infinity, so they don’t work well to try to extrapolate an arbitrary function past the closed interval in which it is being approximated by the polynomial.
A rational function is a function which is a ratio of two polynomials, one polynomial in the numerator and another one in the denominator. Rational functions are also used to model an arbitrary function, and for many purposes they have better behavior. If the rational function is a ratio of two polynomials of the form p(x)/q(x), and the order of the two polynomials is np and nq, try to give a qualitative description of the behavior of this rational function. What happens to the rational function in the cases np > nq, np = nq, and np < nq as x goes to plus or minus infinity (compare with the case of a polynomial)? If an arbitrary function f(x) goes to zero at plus and minus infinity, what kind of rational function would be best to model this function?