Polynomials : sum of 2 roots = 0 (1 Viewer)

jxballistic · Jun 23, 2012

Hi all,

I'm having trouble with this polynomial question:

After I write out all the root-coefficient relationships I'm stuck.
Can someone please show me how to solve the question using only root-coefficient relationships (without doing long division or "inspection")

Thanks

RealiseNothing · Jun 23, 2012

Since two of it's roots add to 0, the odd powers of x in the polynomial must be equal. Hence:

$2x^3 = 6x$

$2x(3-x^2)=0$

$x^2 = 3~or~0$

Now x=0 is not a root, so it must be $x^2 = 3$

So the two roots are:

$x = \pm \sqrt3$

Now you have the value of two roots, you should be able to use products/sums of roots to find the other two by solving simultaneously. Then you will have your factorisation.

jxballistic · Jun 24, 2012

RealiseNothing said:
Since two of it's roots add to 0, the odd powers of x in the polynomial must be equal. Hence:

$2x^3 = 6x$

$2x(3-x^2)=0$

$x^2 = 3~or~0$

Now x=0 is not a root, so it must be $x^2 = 3$

So the two roots are:

$x = \pm \sqrt3$

Now you have the value of two roots, you should be able to use products/sums of roots to find the other two by solving simultaneously. Then you will have your factorisation.

Could you explain your first sentence? Sorry I don't understand

RealiseNothing · Jun 24, 2012

jxballistic said:
Could you explain your first sentence? Sorry I don't understand

Since we know the roots are $\alpha ~and~ -\alpha$

It follows that the sum of the odd powers is equal to 0, so in this question:

$-2x^3 + 6x = 0$

Hence:

$6x = 2x^3$

This is why it is so:

Let A = sum of even powers and B = sum of odd powers. Then for roots $\alpha~and~-\alpha$

A + B = 0

A - B = 0

So B = 0, and thus the sum of the odd powers is 0.

Sy123 · Jun 24, 2012

I was able to get it using the sum and products of roots rules. I will use roots a, b, c and d because writing alpha in latex is really annoying especially when you have to write ALOT of them. Well here we go.

$8x^4-2x^3-27x^2+6x+9=0 \ \ \ \text{Let a, b, c and d be roots to the equation. Where a+b=0} \\ \\ a+b+c+d=\frac{2}{8} \\ Since \ \ \ a+b=0 \ \ \therefore c+d=\frac{1}{4} \ ... \ \ \ \ [1] \\ \\ ab+ac+ad+bc+bd+cd=\frac{-27}{8} \\ ac+bc+ad+bd+ab+cd=\frac{-27}{8} \\ c(a+b)+d(a+b)+ab+cd=\frac{-27}{8} \\ \\ ab+cd=\frac{-27}{8} \\ abc+abd+acd+bcd=\frac{-6}{8} \\ ab(c+d)+cd(a+b)=\frac{-3}{4} \\ ab(c+d)=\frac{-3}{4} \\ ab(\frac{2}{8})=\frac{-3}{4} \ \ \ \ from \ [1] \\ \\ ab=-3 \\ \\ -3cd=\frac{9}{8} \ \ \ \ [2] \\ c+d=\frac{2}{8} \ \ \ \ [3] \\ [2]=[3] \\ \\ d(\frac{2}{8}-d)=\frac{-3}{8}$

$8d^2-2d-3=0 \\ \\ (4d-3)(2d+1)=0 \\ \\ \therefore d=\frac{3}{4} \ \ \ c=\frac{-1}{2} \\ \\ a=-b \ \ \ ab=-3 \\ \\ -b^2=-3 \\ b=\pm \sqrt{3} \\ \\ a=\sqrt{3} \\ b=-\sqrt{3} \\ \\ \\ \therefore \text{The solutions are a, b, c and d since they are the roots of the equation}$

Polynomials : sum of 2 roots = 0 (1 Viewer)

jxballistic

Member

RealiseNothing

what is that?It is Cowpea

jxballistic

Member

RealiseNothing

what is that?It is Cowpea

Sy123

This too shall pass

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