freaking_out
Saddam's new life
the equation x^4-x^3+2x^2-2x+1 has roots a,b,c,d
i) show that none of a,b,c,d is an integer.
i) show that none of a,b,c,d is an integer.
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polynomial question (1 Viewer)
- Thread starter freaking_out
- Start date
Constip8edSkunk
Joga Bonito
as +/- 1 are the only possible integer roots(as both the leading coefficient and the constant term are 1)sub them in and neither will get you 0, .'. there are no integer roots
freaking_out
Saddam's new life
Re: Re: polynomial question
...i still don't understand, i mean, how do u know by looking at the leading coefficient and the constant term, that 1 is the only possible integer root?
...i still don't understand, i mean, how do u know by looking at the leading coefficient and the constant term, that 1 is the only possible integer root?
Constip8edSkunk
Joga Bonito
try proving that if p/q is a root then q must be a factor of the leading coefficient and p a factor of the constant. i think it came up in the HSC b4
thats the basic theory behind it...
thats the basic theory behind it...
Proof (for p/q thingo):
Let P(x) = ax^3 + bx^2 + cx + d
Let k be a root of P(x),
therefore, P(k) = 0
ie
ak^3 + bk^2 + ck + d = 0
d = -(ak^3 + bk^2 + ck)
d = -k(ak^2 + bk + c)
And since a,b,c,d are all integers (even if they're not, just multiply them out...u get the idea), d is divisible by k
Then u would do the same, but 1/k, then ull get
a + bk + ck^2 + dk^3 = 0 (by multipying by k^3)
a = -k(dk^2 + ck + b)
Thats one way atleast
Let P(x) = ax^3 + bx^2 + cx + d
Let k be a root of P(x),
therefore, P(k) = 0
ie
ak^3 + bk^2 + ck + d = 0
d = -(ak^3 + bk^2 + ck)
d = -k(ak^2 + bk + c)
And since a,b,c,d are all integers (even if they're not, just multiply them out...u get the idea), d is divisible by k
Then u would do the same, but 1/k, then ull get
a + bk + ck^2 + dk^3 = 0 (by multipying by k^3)
a = -k(dk^2 + ck + b)
Thats one way atleast
spice girl
magic mirror
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they call it the rational root theorem
if x = p/q is a rational root, then p divides the constant term, and q divides the leading coefficient.
if x = p/q is a rational root, then p divides the constant term, and q divides the leading coefficient.
underthesun
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is that quoteable in the HSC?
freaking_out
Saddam's new life
this question is from a catholic trial paper (which hardly reflects the hsc)....
N
ND
Guest
The '01 paper had a q7 with the first part similar to that.
freaking_out
Saddam's new life
yeah i saw it now, but i wanna know how r we meant to know that...like is it a standard proof that we meant to know...if so can someone tell me where in any textbook can i find this theorem explained?
N
ND
Guest
You're supposed to be able to prove anything asked in a 4u paper. You shouldn't be prepareing for 4u exams by memorising proofs and stuff, that is pointless, you should learn to prove stuff. I'll try and explain this theorem to you:
p/q is a roots of P(x), where p and q are integers with no common factor.
P(x) = ax^3+bx^2+cx+d
P(p/q)= a(p/q)^3 + b(p/q)^2 + c(p/q) + d = 0
ap^3 + bp^2q + cpq^2 + dq^3 = 0
ap^3/q = -(bp^2+cpq+dq^2)
Now the RHS is an integer, so the LHS must also be an integer, and because p/q isn't an integer (from the definition), then a/q must be.
.'. q divides a.
To prove p divides d do the same thing only with dq^3/p.
N
ND
Guest
Yeh but usually they'll give you the polynomial anyway, so you just do it with that.
freaking_out
Saddam's new life
yeah i know, but spice girl was saying that it was a theorem, so thats why i asked since i've never seen anythin' like this, and also it was assumed that i knew it to do the question above
....thanx for the explanation though, now i understand