of+fractions
21Partial fractions in integration — In integral calculus, the use of partial fractions is required to integrate the general rational function. Any rational function of a real variable can be written as the sum of a polynomial function and a finite number of partial fractions. Each… …
22Ramanujan's continued fractions — are a series of interesting closed form expressions for non simple continued fractions developed by Indian mathematician Srinivasa Ramanujan.ExamplesAmong the expressions developed by Ramanujan are two which are nearly equal to one:Nearly… …
23Astronomical fractions — Astronomical As tro*nom ic*al ( [i^]*kal), a. [L. astronomicus, Gr. astronomiko s: cf. F. astronomique.] Of or pertaining to astronomy; in accordance with the methods or principles of astronomy. {As tro*nom ic*al*ly}, adv. [1913 Webster]… …
24Partial fractions in complex analysis — In complex analysis, a partial fraction expansion is a way of writing a meromorphic function f(z) as an infinite sum of rational functions and polynomials. When f(z) is a rational function, this reduces to the usual method of partial… …
25Les fractions — Fraction Cette page d’homonymie répertorie les différents sujets et articles partageant un même nom. Le mot fraction a la même origine que fracture. Il s agit de « casser » un objet et d en prendre un petit morceau. Le terme possède… …
26Corps des fractions de l'anneau Z — ● Corps des fractions de l anneau Z corps Q des rationnels. (→ Q.) …
27conversion of fractions — changing the form of fractions while maintaining the original values …
28reduce fractions to a common denominator — find the denominator that is shared by a given group of fractions …
29reducing of fractions — expressing of fractions in their simplest forms …
30reduction of fractions — expression of fractions in their simplest forms (Mathematics) …