Given two polynomials and , their
quotient is called a
rational expression or simply
rational fraction. A rational expression \frac{P(x)}{Q(x)} is called
proper if \deg P(x) , and
improper otherwise. For example, the fraction \tfrac{2x}{x^2-1} is proper, and the fractions \tfrac{x^3+x^2+1}{x^2-5x+6} and \tfrac{x^2-x+1}{5x^2+3} are improper. Any improper rational fraction can be expressed as the sum of a polynomial (possibly constant) and a proper rational fraction. In the first example of an improper fraction one has \frac{x^3+x^2+1}{x^2-5x+6} = (x+6) + \frac{24x-35}{x^2-5x+6}, where the second term is a proper rational fraction. The sum of two proper rational fractions is a proper rational fraction as well. The reverse process of expressing a proper rational fraction as the sum of two or more fractions is called resolving it into
partial fractions. For example, \frac{2x}{x^2-1} = \frac{1}{x-1} + \frac{1}{x+1}. Here, the two terms on the right are called partial fractions.
Irrational fraction An
irrational fraction is one that contains the variable under a fractional exponent. An example of an irrational fraction is \frac{x^{1/2} - \tfrac13 a}{x^{1/3} - x^{1/2}}. The process of transforming an irrational fraction to a rational fraction is known as
rationalization. Every irrational fraction in which the radicals are
monomials may be rationalized by finding the
least common multiple of the indices of the roots, and substituting the variable for another variable with the least common multiple as exponent. In the example given, the least common multiple is 6, hence we can substitute x = z^6 to obtain \frac{z^3 - \tfrac13 a}{z^2 - z^3}. ==Algebraic and other mathematical expressions==