[000027]. Exercice 6. 1. Calculer les racines carrées de 1+i Soient z1 z2
Déterminer les n ? 1 racines du polynôme complexe 1 + z + z2 + + zn?1. Correction exercice 5-13. 1. Les racines 6-ièmes de 1 sont les eki?.
Exercice 10 **I. On note U l'ensemble des nombres complexes de module 1. Montrer que : Vz ? C (z ? U < 1-1l?9x ? R/ z = 1+ix.
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L'écriture : z = rei? est appelée forme exponentielle de z. 1.1.2 Exercices d'application du cours. EXERCICE 1. 10 minutes. Ecrire les expressions suivantes
1) Module. Définition : Soit un nombre complexe z = a + ib. On appelle module de z le nombre réel positif
Résoudre dans l'ensemble des nombres complexes l'équation f(x)=1. 3. Soit M un point d'affixe z du cercle c de centre O et de rayon 1. 3.a. Justifier
8 sept. 2008 z = 1 + cos(?) + isin(?) = 2 cos2(?/2) + 2isin(?/2) cos(?/2) = 2 cos(?/2)ei?/2 . ... montre que les solutions de l'équation sont z1 = ?b+?.
4. Conjugué complexe de z = x + iy : c'est le nombre complexe z := x ? iy. • z1 + z2 = z1 +
+ 1f(z) =z3(z2+ 1)has isolated singularities atz= 0; i and a zero atz=1 We will show thatz= 0 is apole of order 3z= iare poles of order 1 andz=1 is a zero of order 1 The style ofargument is the same in each case Atz= 0: z+ 1 f(z) = :z3 z2+ 1Call the second factorg(z) Sinceg(z) is analytic atz= 0 andg(0) = 1 it has a Taylorseries + 1
?(z+ 1) = z?(z) we see that ?(z) is also di?erentiable at these points and (7) still holds It is clear that the series in (9) converges: denote its sum (temporarily) by ?(z) Clearly ?(z+1) = ?(z)+1/z With (7) this shows that ?(x) = ?(x) also for negative non-integer x
1z+a0(2 2) are complex linearcombinations (meaning thatthe coe?cients akareallowed tobe complex numbers) of the basic monomial functions zk= (x+ iy)k Complex exponentials ez= ex+iy= excosy+ iexsiny are based on Euler’s formula and are of immense importance for solving di?erential equa- tions and in Fourier analysis
= 0andz= 1. answer: It's easiest to write this as a sum. The term e1=zhas an essential singularty atz= 0. Since the other two terms are analyticatz= 1,fhas an essential singurity atz= 0. The singularities at 1 and 1 +i can be analyzed in the same manner.
The term e1=zhas an essential singularty atz= 0. Since the other two terms are analyticatz= 1,fhas an essential singurity atz= 0. The singularities at 1 and 1 +i can be analyzed in the same manner. (b)Find a functionfthat has a removable singularity atz= 0, a pole of order 6 atz= 1and an essential singularity atz=i.
An interesting property of the mapping [Math Processing Error] w = 1 / z is that it transforms circles and lines into circles and lines. You can observe this intuitively in the following applet. Things to try: Select between a Line or Circle. Drag points around on the left-side window.
Thus the points exterior to the circle [Math Processing Error] | z | = 1 are mapped onto the nonzero points interior to it, and conversely. Any point on the circle is mapped onto itself. The second transformation [Math Processing Error] f ( z) = g ( z) ¯ is simply a reflection in the real axis.