Examples of using Complex numbers in English and their translations into Danish
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Bombelli, himself, did not find working with complex numbers easy at first, writing in see also.
Bombelli, ham selv, ikke fandt arbejder med komplekse numre let ved første-, skrive i se også.real and complex numbers, allows vectors manipulations.
reelle og komplekse tal, giver vektorer manipulationer.He worked on the theory of complex numbers, the theory of functions
Han arbejdede på teorien om komplekse numre, teori om funktionerAfter giving this description of multiplication of complex numbers, Bombelli went on to give rules for adding
Efter at have givet denne beskrivelse af multiplikation af komplekse numre, Bombelli gik på at give regler for at tilføjeBefore looking at his remarkable contribution to complex numbers we should remark that Bombelli first wrote down how to calculate with negative numbers. .
Inden vi ser på hans bemærkelsesværdige bidrag til komplekse numre vi bør bemærke, at Bombelli første skrev ned, hvordan man beregner med negative tal.Let K be a field of algebraic functions of two variables over the field of complex numbers.
Lad K være et felt af algebraiske funktioner i to variabler over marken af komplekse numre.integral calculus, and complex numbers long before he met these topics in his formal education.
integrerende kalkyle, og komplekse numre længe før han mødte disse emner i sin formelle uddannelse.Frobenius was able to construct a complete set of representations by complex numbers.
Frobenius var i stand til at konstruere et komplet sæt af repræsentationer af komplekse numre.Study was one of the leading pioneers in the geometry of complex numbers.
Study var en af de førende pionerer inden for geometri af komplekse numre.It seems to be quite fair to describe Bombelli as the inventor of complex numbers.
Det synes at være helt fair at beskrive Bombelli som opfinderen af komplekse numre.it is therefore not quite justified to call him the"first discoverer" of complex numbers.
længe før Bombelli bog, og det er derfor ikke helt berettiget til at kalde ham"først opdaget" af komplekse numre.double algebra in which he gave a geometric interpretation of complex numbers.
hvor han gav en geometrisk fortolkning af komplekse numre.In his 1863 lectures he proved that the complex numbers are the only commutative algebraic extension of the real numbers. .
I sin 1863 foredrag han bevist, at de komplekse tal er The complex numbers are often thought of as an extension of the reals created by adjoining the imaginary element i, where i2=-1.
De komplekse tal er ofte opfattes som en forlængelse af reals oprettet af tilstødende he had overlooked the lack of unique factorisation in certain subrings of the complex numbers.
han havde overset Jordan was led to study the finite subgroups of the general linear group of n n matrices over the complex numbers.
Jordan blev ledet at studere finite undergrupper af not over the complex numbers but over a finite field.
ikke over den komplekse numre, men over en afgrænset område.making practical use of complex numbers perhaps because they gave him useful results,
hvilket gør den praktiske anvendelse af komplekse numre måske fordi de gav ham nyttige resultater,making practical use of complex numbers perhaps because they gave him useful results,
hvilket gør den praktiske anvendelse af komplekse numre måske fordi de gav ham nyttige resultater,In his 1863 lectures he proved that the complex numbers are the only commutative algebraic extension of the real numbers. Gauss had promised a
I sin 1863 foredrag han bevist, at de komplekse tal er 
