polynomials q (1 Viewer)

bleakarcher · Apr 9, 2012

This is random, but can someone help me wif this question?

(a) Consider the following statements about a polynomial Q(x) .
(i) If Q(x) is even, then Q'(x) is odd.
(ii) If Q'(x) is even, then Q(x)is odd.
Indicate whether each of these statements is true or false. Give reasons for your
answers.

How would you answer this sort of a question since its telling you to give a proof in general?

Shadowdude · Apr 9, 2012

Re: BoS group study session? (Easter Edition)

bleakarcher said:
This is random, but can someone help me wif this question?

(a) Consider the following statements about a polynomial Q(x) .
(i) If Q(x) is even, then Q'(x) is odd.
(ii) If Q'(x) is even, then Q(x)is odd.
Indicate whether each of these statements is true or false. Give reasons for your
answers.

How would you answer this sort of a question since its telling you to give a proof in general?

You mean of even degree? So just set up an example in general, I'd think.

bleakarcher · Apr 9, 2012

Re: BoS group study session? (Easter Edition)

Shadowdude said:
You mean of even degree? So just set up an example in general, I'd think.

yeh degree

and yes thats what I did..not sure about it though

EDIT:
polynomial

Carrotsticks · Apr 9, 2012

Re: BoS group study session? (Easter Edition)

So even polynomial or even degree? There's a difference...

RealiseNothing · Apr 9, 2012

Re: BoS group study session? (Easter Edition)

Carrotsticks said:
So even polynomial or even degree? There's a difference...

Yer this, I was under the impression it was an even polynomial, and had no idea.

Carrotsticks · Apr 9, 2012

Re: BoS group study session? (Easter Edition)

I suppose you could say even polynomials must be even in degree...

RealiseNothing · Apr 9, 2012

Re: BoS group study session? (Easter Edition)

Carrotsticks said:
I suppose you could say even polynomials must be even in degree...

If it's of degree, say 3, it can still be even though.

$x^3 + x^2 + x + 3$

This is even when x=1 for example.

Edit: Or did I misinterpret what you said.

Carrotsticks · Apr 9, 2012

Re: BoS group study session? (Easter Edition)

RealiseNothing said:
If it's of degree, say 3, it can still be even though.

$x^3 + x^2 + x + 3$

This is even when x=1 for example.

Edit: Or did I misinterpret what you said.

I meant even/odd in terms of the definition

Q(x) = Q(-x) if even and -Q(x) = Q(-x) if odd etc.

RealiseNothing · Apr 9, 2012

Re: BoS group study session? (Easter Edition)

Carrotsticks said:
I meant even/odd in terms of the definition

Q(x) = Q(-x) if even and -Q(x) = Q(-x) if odd etc.

lols my bad.

bleakarcher · Apr 9, 2012

Re: BoS group study session? (Easter Edition)

This question was actually from the 1998 hsc paper but they didnt specify. It should be polynomial not degree*.

AAEldar · Apr 9, 2012

Re: BoS group study session? (Easter Edition)

Carrotsticks said:
I meant even/odd in terms of the definition

Q(x) = Q(-x) if even and -Q(x) = Q(-x) if odd etc.

Well if Q(x) = Q(-x) then all the powers must be even? So then just set up an equation like $Q(x)=x^n+x^{n+2}+...+x^{n+k}$ where n, k are even. Then likewise for an odd function and differentiate?

Haven't done that in ages D: Am I right? hahaha.

Also, good luck/have fun at the meet guys!

Carrotsticks · Apr 9, 2012

Re: BoS group study session? (Easter Edition)

AAEldar said:
Well if Q(x) = Q(-x) then all the powers must be even? So then just set up an equation like $Q(x)=x^n+x^{n+2}+...+x^{n+k}$ where n, k are even. Then likewise for an odd function and differentiate?

Haven't done that in ages D: Am I right? hahaha.

Also, good luck/have fun at the meet guys!

That is exactly what I am typing out right now, but all the sigmas are killing me.

Trebla · Apr 10, 2012

bleakarcher said:
This is random, but can someone help me wif this question?

(a) Consider the following statements about a polynomial Q(x) .
(i) If Q(x) is even, then Q'(x) is odd.
(ii) If Q'(x) is even, then Q(x)is odd.
Indicate whether each of these statements is true or false. Give reasons for your
answers.

How would you answer this sort of a question since its telling you to give a proof in general?

If Q(x) is even then Q(-x) = Q(x)
Differentiate both sides wrt x, we have
- Q'(-x) = Q'(x)
=> Q'(-x) = -Q'(x)
Hence statement (i) is true.

If Q'(x) is even then Q'(-x) = Q'(x)
Now integrate both sides wrt x, we have
=> - Q(-x) = Q(x) + c
=> Q(-x) = - Q(x) - c
If c is non-zero then Q(-x) =/= - Q(x), hence statement (ii) is false

Note: I think this was in an Extension 2 paper as a harder Extension 1 type question.

Drongoski · Apr 10, 2012

Trebla - a masterly solution to a very good question.

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