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#1 2007-01-20 05:32:39
- freddogtgj
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- Registered: 2006-12-02
- Posts: 54
Factorising Polynomials
Hey could someone help me in this question?
Factorise the polynomial x^4 + 4 into two quadratics with real coefficients.
I have the answer from a Maths software package but i'm not too sure how the answer has come about.
(x^2-2*x+2)*(x^2+2*x+2)
Last edited by freddogtgj (2007-01-20 05:33:09)
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#2 2007-01-20 10:47:25
- Ricky
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Re: Factorising Polynomials
If you asked me to just to factor this, I would look at you and laugh. The first thing to do is to look for the real roots... there are none. Then the next thing to do is to group like terms... there are none.
However, the way the question is posed, you aren't asked just to factor it. You're given that:
a. It does factor, and
b. It factors into two quadratics.
So it must be that:
So we know that:
ad = 1
ae + bd = 0
af + cd + be = 0
bf + ce = 0
cf = 4
Now unfortunately, we're told that the coefficients must be real. But lets, for the time being, assume that they are integers.
ad = 1, so it must be that a = 1 and d = 1. Thus:
e + b = 0 or rather e = -b.
Now here is where you have to guess. cf = 4. So either:
c = 4 and f = 1
c = 1 and f = 4
c = 2 and f = 2
And you continue through each of the equations till you reach a solution.
"In the real world, this would be a problem. But in mathematics, we can just define a place where this problem doesn't exist. So we'll go ahead and do that now..."
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#3 2007-01-20 10:49:03
- Stanley_Marsh
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- Registered: 2006-12-13
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Re: Factorising Polynomials
x^4+4=x^4+(4x^2)+4-(4x^2) = (x^2+2)^2-(4x^2) = (x^2-2*x+2)*(x^2+2*x+2)
you can use 0=-x+x ,this kind of idea to do it
Last edited by Stanley_Marsh (2007-01-20 10:49:21)
Numbers are the essence of the Universe
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#4 2007-01-23 09:11:13
- freddogtgj
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Re: Factorising Polynomials
i assumed you would use complex numbers...am i right?
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#5 2007-01-23 09:22:56
- Ricky
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Re: Factorising Polynomials
Duh! Why didn't I think of that?
The complex roots are:
1 + i
1 - i
-1 + i
-1 - i
So:
((x + 1 + i)(x + 1 - i)) ((x - 1 + i)(x - 1 + i))
Multiplying these out will give two real quadratics.
"In the real world, this would be a problem. But in mathematics, we can just define a place where this problem doesn't exist. So we'll go ahead and do that now..."
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#6 2007-01-25 23:48:24
- freddogtgj
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Re: Factorising Polynomials
Ricky could you explain to me how I get those complex roots please?
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#7 2007-01-26 03:56:26
- Ricky
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Re: Factorising Polynomials
Simply take the square root of both sides:
And then let x = a+bi, so:
So:
And solve those equations.
"In the real world, this would be a problem. But in mathematics, we can just define a place where this problem doesn't exist. So we'll go ahead and do that now..."
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#8 2007-01-28 01:14:50
- freddogtgj
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- Registered: 2006-12-02
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Re: Factorising Polynomials
Thanks appreciate it!
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