Rational function

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Rational function is a quotient of two polynomial functions. It distinguishes from irrational function which cannot be written as a ratio of two polynomials.

Definition

A rational function is a function of the form

${\displaystyle f(x)={\frac {s(x)}{t(x)}}}$

where s and t are polynomial function in x and t is not the zero polynomial. The domain of f is the set of all points x for which the denominator t(x) is not zero.

On the graph restricted values of an axis form a straight line, called asymptote, which cannot be crossed by the function. If zeros of numerator and denominator are equal, then the function is a horizontal line with the hole on a restricted value of x.

Examples

Let's see an example of ${\displaystyle f(x)={\frac {x^{2}-x-6x}{x^{2}+x-20}}}$ in a factored form: ${\displaystyle f(x)={\frac {(x+2)(x-3)}{(x+5)(x-4)}}}$. Obviously, roots of denominator is -5 and 4. That is, if x takes one of these two values, the denominator becomes equal to zero. Since the division by zero is impossible, the function is not defined or discontinuous at x = -5 and x = 4.

The function is continuous at all other values for x. The domain (area of acceptable values) for the function, as expressed in interval notation, is: ${\displaystyle (-\infty ;-5)\cup (-5;4)\cup (4;\infty )}$