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Complex Polynomials (1 Viewer)

Lukybear

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In this question
Deduce
cos4a = 8(cosa)^4 - 8(cosa)^2 + 1
hence solve
8x^4 - 8x^2 +1 = 0

Ive done all except this part:
Deduce exact values of cos(pi/8) and cos (5pi/8)

Im using sum and product of roots and im getting

cos^2(5pi/8)cos^2(pi/8) = 1 and cos^2(5pi/8) + cos^2(pi/8) = 1

But i cannot solve simultaneously as quadratic resulting will give me imaginary.. Why cant i do that?
 

shaon0

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In this question
Deduce
cos4a = 8(cosa)^4 - 8(cosa)^2 + 1
hence solve
8x^4 - 8x^2 +1 = 0

Ive done all except this part:
Deduce exact values of cos(pi/8) and cos (5pi/8)

Im using sum and product of roots and im getting

cos^2(5pi/8)cos^2(pi/8) = 1 and cos^2(5pi/8) + cos^2(pi/8) = 1

But i cannot solve simultaneously as quadratic resulting will give me imaginary.. Why cant i do that?
Let x=cos@:
8x^4-8x^2+1=0
8(x^2-1/2)^2-1=0
x^2=(1/2)sqrt(2-sqrt(2)) [As cos(5pi/8,pi/8)<1]
Since, cos(5pi/8)<0 and cos(pi/8)>0:
cos(5pi/8)=-(1/2)sqrt(2-sqrt(2)), cos(pi/8)=(1/2)sqrt(2-sqrt(2))
Your equations were wrong, unless i'm wrong.
 

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