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#1 2008-11-22 03:47:21
- Daniel123
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- Registered: 2007-05-23
- Posts: 663
Complex numbers
Last edited by Daniel123 (2008-11-22 03:49:43)
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#2 2008-11-23 11:03:22
- Daniel123
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- Registered: 2007-05-23
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Re: Complex numbers
Actually, it's true for all real n.
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#3 2008-11-23 11:26:28
- mathsyperson
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- Registered: 2005-06-22
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Re: Complex numbers
Fairly simple if you convert to modulus-argument form.
Why did the vector cross the road?
It wanted to be normal.
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#4 2008-11-23 11:29:49
- Daniel123
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Re: Complex numbers
Indeed
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#5 2009-09-03 09:21:29
- rzaidan
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- Registered: 2009-08-13
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Re: Complex numbers
Hi Daniel123
this is the proof for natural n:
√3+i=2(√3/2 + (1/2)i)=2(cos 30° +i sin(30° )) r=2 , theta=30° then by demoivers theorem
(√3+i)^n=2^n(cos n(30°) +i sin( n (30° )) and similarly
√3-i=2(√3/2 - (1/2)i)=2(cos 330° +i sin(330° )) r=2 , theta=30° then by demoivers theorem
(√3-i)^n=2^n(cos n(330°) +i sin( n (330° )) therefore
(√3+i)^n+(√3-i)^n=2^n(cos n(30°) +i sin( n (30° ))+ 2^n(cos n(330°)+i sin( n (330° )) but
sin( n (30°))=- sin( n (330° )) therefore the imaginary part cancells and the result is in R or
(√3+i)^n+(√3-i)^n=2^n(cos n(30°)+2^n(cos n(330°) but cos n(30°)=(cos n(330°) i.e
(√3+i)^n+(√3-i)^n=2(2^n(cos n(30°))=2^(n+1) (cos n(30°) ∈R
Best Regards
Riad Zaidan
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