elseany
Member
Show that (1 + cosθ + isinθ)n = 2n.cosnθ.[cos(nθ/2) + isin(nθ/2)] where n is a positive integer.
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Complex No. Question (1 Viewer)
- Thread starter elseany
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haque
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- 2006
there should be a cos@/2 outside not @ i think-
let z=1+cos@+isin@
=1+2cos^2@/2-1+2isin@/2cos@/2
=2cos@/2(cos@/2+isin@/2) and z^n=(1+cos@+isin@)^n
this=2^ncos^n@/2(cosn@/2 +isinn@/2)
let z=1+cos@+isin@
=1+2cos^2@/2-1+2isin@/2cos@/2
=2cos@/2(cos@/2+isin@/2) and z^n=(1+cos@+isin@)^n
this=2^ncos^n@/2(cosn@/2 +isinn@/2)
elseany
Member
yep your right, thanks for that but umm i don't understand your working .. :<
is it possible to make it simpler?
is it possible to make it simpler?
haque
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Jyu's method is correct-so whichever one u feel comfortable with-but what i did was expressed 1+cos@+isin@ in modulus argument for-in which i used the double angle formula for cos and sin.
elseany
Member
i dont understand either :<
is there some polynomial in this or is it just simply complex numbers?
edit: just read your above post haque, i get it now, thanks
lol
quite a blonde moment there >_<
(i still dont understand jyu's method though)
is there some polynomial in this or is it just simply complex numbers?
edit: just read your above post haque, i get it now, thanks
lolquite a blonde moment there >_<
(i still dont understand jyu's method though)
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