Help with polynomials question (1 Viewer)

Bob_man · Feb 9, 2022

I'm having some trouble getting the answer for question 7b.

jks22 · Feb 9, 2022

Bob_man said:
I'm having some trouble getting the answer for question 7b. View attachment 34901 View attachment 34902

I'd just use long division to find the solutions

x^4-10x^3+34x^2-42x+9 divided by x-3 = x^3-7x^2+13x-3

x^4-10x^3+34x^2-42x+9 = (x-3)(x^3-7x^2+13x-3) = 0

Let P(x) = x^3-7x^2+13x-3

P(3) = 0, thus x-3 is a factor

x^3-7x^2+13x-3 divided by x-3 = x^2-4x+1

x^3-7x^2+13x-3 = (x-3)(x^2-4x+1)

Thus x^4-10x^3+34x^2-42x+9 = (x-3)(x-3)(x^2-4x+1) = 0

So x = 3 and then solve for x^2-4x+1 = 0

5uckerberg · Feb 9, 2022

Bob_man said:
I'm having some trouble getting the answer for question 7b. View attachment 34901 View attachment 34902

Let me ask you a question, what do you know if $x=3$ is a double root of the equation?
If that is the case then you can have $\left(x-3\right)^{2}$ is a root of the equation.
Now you have this in the net we can now have
$x^{4}-10x^{3}+34x^{2}-42x+9=\left(x^{2}-6x+9\right)\left(...\right)$
What do we have here?
We want $x^{4}$ as the leading pronumeral so now we will have
$\left(x^{2}-6x+9\right)\left(x^{2}\pm{...}\right)$
Next, you have to take into account that you have $-10x^{3}$
We already have from the previous step $-6x^{3}$ so how do we get $-10x^{3}$ . Take away $4x^{3}$ .
As such we have $\left(x^{2}-6x+9\right)\left(x^{2}-4x\pm{...}\right)$
To make your life easier instead of going for the x squared term or the x term we are finding the constant.
So in this case 9 times what gives 9. The answer is simply 1.
There we have $x^{4}-10x^{3}+34x^{2}-42x+9=\left(x^{2}-6x+9\right)\left(x^{2}-4x+1\right)$
Now you can do whatever you want with $\left(x^{2}-4x+1\right)$ to find the factors and as such it will give you the answer that you have shown us.

5uckerberg · Feb 10, 2022

From this question you can also have
$6+\alpha+\beta=10$
$9\alpha\beta=9$

Simplifying gives
$\alpha+\beta=4$
$\alpha\beta=1$

To find the roots instead of focusing on the product of roots let's have a look at the sum of roots. You see how the sum of roots is 4 right.
Well note that $x^{2}-4x+1$ is a parabola and parabolas are symmetric.

In this case differentiate $x^{2}-4x+1$ twice to determine the minimum turning point which if the hard work is done will give you 2. Now remember how I said the parabola has a symmetric property well in this case now we focus on the product of roots which will then give us
$\left(2-u\right)\left(2+u\right)=1$
$4-u^{2}=1$
$u^{2}=3$
$u=\pm{3}$
There your roots are $2+\sqrt{3}, 2-\sqrt{3}$

Help with polynomials question (1 Viewer)

Bob_man

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5uckerberg

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