polynomial proof question (1 Viewer)

with-chu

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None of the roots α, β, γ of the equation x^3 + 3px + q = 0 is zero.

Form a monic equation with roots βγ/α, αγ/β and αβ/γ, expressing coefficients in terms of p and q.


I did that, and got x^3 + (p^2)(x^2) - 6px + q = 0
but the answer is different? the coefficient of x^2 is (9p^2)/q instead of p^2.

i subbed x=√(-q/y) into polynomial. What went wrong?


Second part:
Deduce that αβ=γ if and only if (3p - q)^2 + q = 0.

no idea where to begin... sum/product of roots???? I can't make it work out...


Help much appreciated!
 

adomad

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for the second part, its aksing to find the relation between the co-efficients...

product of roots is alpha X beta X gamma = gamma^2 = -q

hence gamma = sqrt(-q)... then sub it in
 

with-chu

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for the second part, its aksing to find the relation between the co-efficients...

product of roots is alpha X beta X gamma = gamma^2 = -q

hence gamma = sqrt(-q)... then sub it in
I don't get it... why is alpha x beta x gamma = gamma^2?
 

with-chu

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can you show me the working please? I still can't get it... the subbing in part :(
 

with-chu

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Another question:

f(x) = x^3 - 3px^2 + 4q

p and q are positive real constants.

show that f(x)=0 has three distinct real roots if and only if p^3 > q


can someone show me the full working please?
________________________________________

I got this now. Nevermind ;P
 
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with-chu

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well if y is a root then p(y)=0
Yeah I understand that. What I can't get is the algebraic simplification when you sub x=√(-q) into the polynomial...;

The actual problem is that I didn't get the first part right; the polynomial is apparently wrong. But I looked over my working a couple of times and couldn't find an error anywhere so I just went with it. Still wrong :(;
 

adomad

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ok the first part...
you sub in x= sqrt(-q/y)













then change the y into x so that it looks nicer :D
note to self: latex is a biatch
 
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with-chu

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ok the first part...
you sub in x= sqrt(-q/y)













then change the y into x so that it looks nicer :D


ahhh thank you thank you

I realised I made the classic mistake of thinkng my q was a 9 somewhere in my working.

I'll try the 2nd part now :)
 

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