[Date Prev][Date Next][Thread Prev][Thread Next][Date Index][Thread Index]

Re: [obm-l] flw:Complexos

To: <obm-l@xxxxxxxxxxxxxx>
Subject: Re: [obm-l] flw:Complexos
From: "David Ricardo" <davidrvp@xxxxxxxxxxxx>
Date: Sat, 7 Jun 2003 23:27:39 -0300
References: <74.2ef84a45.2c13a2db@aol.com>
Reply-To: obm-l@xxxxxxxxxxxxxx
Sender: owner-obm-l@xxxxxxxxxxxxxxxxxxxxx

Veja que:
e^x = 1 + x + x^2/2! + x^3/3! ...

Então:
e^jx = 1 + jx - x^2/2! - jx^3/3! ...
e^jx = 1 - x^2/2! + x^4/4! + ... + jx -jx^3/3 + jx^5/5 + ...

Mas:
sin(x) = x - x^3/3! + x^5/5! + ...
cos(x) = 1 - x^2/2! + x^4/4! + ...

Então temos:
e^jx = cos(x) + jsin(x)

Podemos fazer agora:
e^jx = cos(x) + jsin(x)
e^-jx = cos(x) - jsin(x)  // Observar que cos(x) = cos(-x) e sin(x)
= -sin(-x)

Somando as duas expressões acima:
e^jx + e^-jx = 2*cos(x)
cos(x) = (e^jx + e^-jx)/2

Por fim,
e^jx = cos(x) + jsin(x)
e^-jx = cos(x) - jsin(x)

Fazendo (e^jx) - (e^-jx), temos:

e^jx - e^-jx = 2jsin(x)
sin(x) = (e^jx - e^-jx)/2j

[]s
David

----- Original Message -----
From: Faelccmm@aol.com
To: obm-l@mat.puc-rio.br
Sent: Saturday, June 07, 2003 5:19 PM
Subject: [obm-l] flw:Complexos


Ola pessoal,

Como provar que:

cos x = (e^ix + e^-ix)/2
e
sin x = (e^ix - e^-ix)/2i

=========================================================================
Instruções para entrar na lista, sair da lista e usar a lista em
http://www.mat.puc-rio.br/~nicolau/olimp/obm-l.html
=========================================================================

References:
- [obm-l] flw:Complexos
  - From: Faelccmm

Prev by Date: [obm-l] Re: [obm-l] Matemática
Next by Date: Re: [[obm-l] ICQ]
Prev by thread: [obm-l] flw:Complexos
Next by thread: Re: [obm-l] flw:Complexos
Index(es):
- Date
- Thread