MedVision ad

AWESOME ===>de moivre's thorem and polynomials<==== AweSOME! (1 Viewer)

243_robbo

Member
Joined
Dec 17, 2005
Messages
75
Gender
Male
HSC
2006
use de movre's theorem to express cos 4θ in terms of cos θ and use your results to solve the equation 8x^4 - 8x^2 + 1 = 0.

hence show that:

cos π/8 + cos5π/8 + cos 7π/8 = 0

cos π/8 . cos 3π/8 . cos 5π/8 . cos 7π/8 = 1/8

(π is supposed to be pi)
 

243_robbo

Member
Joined
Dec 17, 2005
Messages
75
Gender
Male
HSC
2006
actually i dont get it i can only get as far as the first step via binomial expansion, but where do the angles come in?
..... riviet?
 

shsshs

Member
Joined
Mar 31, 2006
Messages
94
Gender
Male
HSC
2006
...........................................4
easy. expand (cosθ + isinθ) using de movire's and binomial


then equate real parts
......................2......................2
turn all the sin θ's into 1 - cos θ
.......................................4..........2
then solve cos4θ = 8cos θ - 8cos θ + 1 = 0

your roots should be cosπ, cos cos cos
.....................................8.........8.........8.........8

using sum of roots you shld get ur answers..

btw i think it shld be hence show that:

cos π/8 + cos3π/8 + cos5π/8 + cos 7π/8 = 0
 
Last edited:
P

pLuvia

Guest
And this should be the product of the roots you get

cos π/8 . cos 3π/8 . cos 5π/8 . cos 7π/8 = 1/8
 
P

pLuvia

Guest
I remember doing this in the cambridge 4u book :confused: but I guess it could be the same
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top