Complex no. question help (1 Viewer)

cssftw

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If p is real and -2 (<) p (<) 2, show that the roots of the equation x^2 + px + 1 = 0 are non-real complex numbers with modulus 1.

Ok so here's what I did:

Using quadraticformula:

x= [-p +/- sqrt(p^2 - 4)]/2

But p^2-4 (<) 0 due the -2 < p < 2
So, x= [-p +/- i*sqrt(4-p^2)]/2

x = -p/2p +/- [i*sqrt(4-p^2)]/2p
So I tried to find the modulus

|z| = SQRT[(p^2 / 4p^2) + (4-p^2)/4p^2]
= SQRT[4/4p^2]
= SQRT[1/p^2]
= 1/p

Why did I not get a modulus of 1? What am I supposed to do?

Thanks guys, appreciate the help.

 
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Since all coefficients are real, the roots are complex conjugates, i.e.



But,



So,



By comparing coefficients we can see that,

 
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deterministic

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Also note that since |p|< 2, the discrimminant < 0 and hence roots must be complex and hence conjugates
 

cssftw

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Pretty sure he meant = x^2 + xRe(z) + |z|^2
Comes from conjugate roots theorem.
Which textbook is that quadratic equation from? I don't think I've seen it in Cambridge or Terry Lee...
 

hscishard

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You magically introduced p in the denominator. Lol

You're meant to think of that up really...I don't think any textbook has that labelled as a formula to remember
 

cssftw

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Since all coefficients are real, the roots are complex conjugates, i.e.



But,



So,



By comparing coefficients we can see that,

By the way, that is a ridiculously ninja solution, braah, you really are a BEAST at maths
 
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