Fórmula de Euler

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• Fórmula de Euler — La fórmula o relación de Euler, atribuida a Leonhard Euler, establece que: para todo número real x. Aquí, e es la base del logaritmo natural, i es la unidad imaginaria, sin x y cos x son funciones trigonométricas. O bien: siendo z la… …   Wikipedia Español

• Fórmula de Euler-Maclaurin — En matemáticas, la fórmula de Euler Maclaurin relaciona a integrales con series. Esta fórmula puede ser usada para aproximar integrales por sumas finitas o, de forma inversa, para evaluar series (finitas o infnitas) resolviendo integrales. La… …   Wikipedia Español

• Euler–Mascheroni constant — Euler s constant redirects here. For the base of the natural logarithm, e ≈ 2.718..., see e (mathematical constant). The area of the blue region is equal to the Euler–Mascheroni constant. List of numbers – Irrational and suspected irrational… …   Wikipedia

• Fórmula de De Moivre — La fórmula de De Moivre nombrada así por Abraham de Moivre afirma que para cualquier número complejo (y en particular, para cualquier número real) x y para cualquier entero n se verifica que: Esta fórmula es importante porque conecta a los… …   Wikipedia Español

• Euler-Mascheroni-Konstante — γ Die Euler Mascheroni Konstante (nach den Mathematikern Leonhard Euler und Lorenzo Mascheroni), auch Eulersche Konstante, ist eine wichtige mathematische Konstante, die mit dem griechischen Buchstaben γ (Gamma) bezeichnet wird …   Deutsch Wikipedia

• Euler's formula — This article is about Euler s formula in complex analysis. For Euler s formula in algebraic topology and polyhedral combinatorics see Euler characteristic.   Part of a series of articles on The mathematical constant e …   Wikipedia

• Euler–Maclaurin formula — In mathematics, the Euler–Maclaurin formula provides a powerful connection between integrals (see calculus) and sums. It can be used to approximate integrals by finite sums, or conversely to evaluate finite sums and infinite series using… …   Wikipedia

• Euler's identity — [ 300px|thumb|right|The exponential function e z can be defined as the limit of nowrap|(1 + z / N ) N , as N approaches infinity, and thus e iπ is the limit of nowrap|(1 + iπ/N ) N . In this animation N takes various increasing values from 1 to… …   Wikipedia

• Euler's totient function — For other functions named after Euler, see List of topics named after Leonhard Euler. The first thousand values of φ(n) In number theory, the totient φ(n) of a positive integer n is defined to be the number of positive integers less than or equal …   Wikipedia

• Euler's continued fraction formula — In the analytic theory of continued fractions, Euler s continued fraction formula is an identity connecting a certain very general infinite series with an infinite continued fraction. First published in 1748, it was at first regarded as a simple… …   Wikipedia