abdooooo!!!
Banned
ah yes hsc science... the pinnacle of all logical thoughts. 
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HSC Tips - Polynomials (1 Viewer)
- Thread starter McLake
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Yes, they possibly could.Originally posted by abdooooo!!!
syllabus??? who the hell reads that?
are they gonna give you a question like "explain qualitatively the difference between roots and zeros?"
I have seen questions that ask you to state de Moivre's, or why a complex poly has conjugate roots (assuming real coefficents), so why not ask that?
freaking_out
Saddam's new life
yeah, i've seen a few "explain" answer as well in 3u trials.
KeypadSDM
B4nn3d
Thank God I'm out of there.
If the maths course derides into that ... Ugh, I can only hope for the future mathematicians this state produces.
freaking_out
Saddam's new life
but those questions are not as bad as the questions u get in hsc science.
KeypadSDM
B4nn3d
It'd be so much easier if the question asked QUANTITATIVELY. Then you could just say 0. Easy.
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freaking_out
Saddam's new life
what do u mean?
Umm.. I think in the syllabus it states somewhere that we need to prove the fundamental theorem of algebra. I think it is the embodiment of this statement
" The fundamental theorem of algebra asserts that every polynomial of degree n over the complex field has at leastone root. Using this result, the factor theorem should now be used to prove (by induction on the degree) that a polynomial of degree n>0 with real (or complex) coeffeicients has exactly n complex roots (each counted according to its multiplicity) and is expressible as a product of exactly n complex linear factors.
So theoretically they can ask a question which states prove the fundamental theorem of algebra, in a 4 unit exam yeah?
" The fundamental theorem of algebra asserts that every polynomial of degree n over the complex field has at leastone root. Using this result, the factor theorem should now be used to prove (by induction on the degree) that a polynomial of degree n>0 with real (or complex) coeffeicients has exactly n complex roots (each counted according to its multiplicity) and is expressible as a product of exactly n complex linear factors.
So theoretically they can ask a question which states prove the fundamental theorem of algebra, in a 4 unit exam yeah?
Here's a couple to start with, I'll type up c) and d) if I feel game but long expansions with lots of powers are hell.zergcave said:
2. ax<sup>4</sup> + bx<sup>3</sup> + cx<sup>2</sup> + dx +e =0
where α + β +γ + δ = -b/a
αβγδ=e/a
a) P(x/m) = am<sup>-4</sup>x<sup>4</sup> + bm<sup>-3</sup>x<sup>3</sup> + cm<sup>-2</sup>x<sup>2</sup> + dmx +e
where α + β +γ + δ = -(b/m<sup>3</sup>)/(a/m<sup>4</sup>) = -(b/a).m (hence P(x/m)=0 has roots m times those of P(x)=0)
b) P(1/x) = ex<sup>4</sup> + dx<sup>3</sup> + cx<sup>2</sup> + bx +a
αβγδ=a/e = (e/a)<sup>-1</sup> (hence the roots of P(1/x)=0 are the reciprocals of those of P(x)=0)
3.
(cosθ + isinθ )<sup>4</sup> = cos4θ + isin4θ
or
(cosθ + isinθ )<sup>4</sup> = cos<sup>4</sup>θ +4icos<su>3</sup>θ sinθ -6cos<eup>2</sup>θ sin<sup>2</sup>θ -4icosθ sin<sup>3</sup>θ +sin<sup>4</sup>θ
Then, equating real parts.
cos4θ = cos<sup>4</sup>θ -6cos<eup>2</sup>θ sin<sup>2</sup>θ +sin<sup>4</sup>θ
= cos<sup>4</sup>θ -6cos<eup>2</sup>θ (1- cos<sup>2</sup>θ ) + (1 - cos<sup>2</sup>θ )<sup>2</sup>
= 8cos<sup>4</sup>θ - 8cos<sup>2</sup>θ +1
So if you substitute x=cosθ into:
8x<sup>4</sup> -8x<sup>2</sup> +1 = 0 then it shares solutions with cos4θ = 0
==> 4θ = π/2, 3π/2, 5π/2, 7π/2 ===> θ = π/8, 3π/8, 5π/8, 7π/8
roots of the equation are cosπ/8, cos3π/8, cos5π/8, cos7π/8
a) summing roots one at a time you find that
cosπ/8 + cos3π/8 + cos5π/8 + cos7π/8 = 0
b)summing roots 4 at a time you find that:
cosπ/8cos3π/8cos5π/8cos7π/8 = 1/8
(cosθ + isinθ )<sup>4</sup> = cos4θ + isin4θ
or
(cosθ + isinθ )<sup>4</sup> = cos<sup>4</sup>θ +4icos<su>3</sup>θ sinθ -6cos<eup>2</sup>θ sin<sup>2</sup>θ -4icosθ sin<sup>3</sup>θ +sin<sup>4</sup>θ
Then, equating real parts.
cos4θ = cos<sup>4</sup>θ -6cos<eup>2</sup>θ sin<sup>2</sup>θ +sin<sup>4</sup>θ
= cos<sup>4</sup>θ -6cos<eup>2</sup>θ (1- cos<sup>2</sup>θ ) + (1 - cos<sup>2</sup>θ )<sup>2</sup>
= 8cos<sup>4</sup>θ - 8cos<sup>2</sup>θ +1
So if you substitute x=cosθ into:
8x<sup>4</sup> -8x<sup>2</sup> +1 = 0 then it shares solutions with cos4θ = 0
==> 4θ = π/2, 3π/2, 5π/2, 7π/2 ===> θ = π/8, 3π/8, 5π/8, 7π/8
roots of the equation are cosπ/8, cos3π/8, cos5π/8, cos7π/8
a) summing roots one at a time you find that
cosπ/8 + cos3π/8 + cos5π/8 + cos7π/8 = 0
b)summing roots 4 at a time you find that:
cosπ/8cos3π/8cos5π/8cos7π/8 = 1/8
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Find the roots of x^2 + x = 4fashionista said:
is the same as
Find the zeroes of x^2 + x - 4
Find the zeros of x^2 + x
is the same as
Find the roots of x^2 + x = 0
I'm pretty sure this is the difference, although could be more to it.
wogblogger
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hmmmmmm
not sure
but by definition a root of a polynomial is the point(s) it crosses the x-axis
soo by applying bs to this
it can be assumed a zero of a polynomial is when the "function" has a zero value
farout can 4unit stop trying to be adv.english
mmmmm.......
(year 3 maths) + (modern history 2unit) = Physics 2unit
(year 3 maths) + (modern history 2unit) + (adv.english essay skills)
=
1st in state Physics 2unit
......lol sorry about my outburst
not sure
but by definition a root of a polynomial is the point(s) it crosses the x-axis
soo by applying bs to this
it can be assumed a zero of a polynomial is when the "function" has a zero value
farout can 4unit stop trying to be adv.english
mmmmm.......
(year 3 maths) + (modern history 2unit) = Physics 2unit
(year 3 maths) + (modern history 2unit) + (adv.english essay skills)
=
1st in state Physics 2unit
......lol sorry about my outburst
Synthetic Division would be MUCH FASTER, EASIER and TAKE LESS SPACEMcLake said:
I reckon that's one of the key to finish the whole paper without missing any questions!
I actually wrote lots on this question... not just stating that fact but I also went on with it has to be conjugate otherwise it will result in a complex coefficient and stuffs like that... I don't know if that was extra thing and wasting time....McLake said:
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