MedVision ad

Binomial Theorem (1 Viewer)

Joined
May 18, 2012
Messages
193
Gender
Undisclosed
HSC
N/A
EDIT: you compare coeffiecents of t^(2r). Can't be bothered, it's midnight.

Also, this is from the 2007 Catholic Trial HSC. If you have this question , you would already have the solution.
 
Last edited:
Joined
May 18, 2012
Messages
193
Gender
Undisclosed
HSC
N/A
LHS = (nC0-nC1 t + nC2 t^2 -nC3 t^3 +nC4 t^4 - ...... +nCn (-t)^n) (nC0+nC1 t +nC2 t^2 + ....+ nCn t^n)

Coefficent of t^2 = nC0 nCn -nC1 nCn-1 +nC2 nCn-2 - .....
 
Last edited:

goobi

Member
Joined
Oct 6, 2010
Messages
196
Gender
Male
HSC
2012
Thanks Carrotsticks :)
This probably sounds very stupid but I wonder how you multiply the two summations in the first line (as I haven't learnt it yet). Shouldn't the term be squared also?
 

Carrotsticks

Retired
Joined
Jun 29, 2009
Messages
9,494
Gender
Undisclosed
HSC
N/A
Thanks Carrotsticks :)
This probably sounds very stupid but I wonder how you multiply the two summations in the first line (as I haven't learnt it yet). Shouldn't the term be squared also?
That does not sound stupid at all.

I didn't actually multiply the two summations explicitly, that would have been FAR too tedious and long. Which C(n,k) did you think should be squared? I ask this because I have a couple up there. Were you referring to the C(n,k) from the expansion of (1-t^2)^n?

All I did in the first line was write both of the series out in Sigma notation because I personally prefer Sigma notation over expanded notation (although occasionally expanded form has its advantages) and I wanted to express both series in a more 'compact' form (not to be confused with 'closed form').

All I did was pick out the necessary terms that yield t^2r.

ie: t^0 x t^2r = t^2r etc

And by doing so, we of course multiply the coefficients, which is exactly what I did after the ===> symbol.
 

goobi

Member
Joined
Oct 6, 2010
Messages
196
Gender
Male
HSC
2012
That does not sound stupid at all.

I didn't actually multiply the two summations explicitly, that would have been FAR too tedious and long. Which C(n,k) did you think should be squared? I ask this because I have a couple up there. Were you referring to the C(n,k) from the expansion of (1-t^2)^n?

All I did in the first line was write both of the series out in Sigma notation because I personally prefer Sigma notation over expanded notation (although occasionally expanded form has its advantages) and I wanted to express both series in a more 'compact' form (not to be confused with 'closed form').

All I did was pick out the necessary terms that yield t^2r.

ie: t^0 x t^2r = t^2r etc

And by doing so, we of course multiply the coefficients, which is exactly what I did after the ===> symbol.
I was referring to the C(n,k) from the expansion of L.H.S.
 

Carrotsticks

Retired
Joined
Jun 29, 2009
Messages
9,494
Gender
Undisclosed
HSC
N/A
No, it should not be squared.

I didn't actually multiply the two terms, hence it is not squared.

Even if I did multiply the two terms, it would be incorrect to say [C(n,k)]^2 because k is the 'bound variable'.

That's like me saying:



Which is most certainly incorrect.
 

goobi

Member
Joined
Oct 6, 2010
Messages
196
Gender
Male
HSC
2012
No, it should not be squared.

I didn't actually multiply the two terms, hence it is not squared.

Even if I did multiply the two terms, it would be incorrect to say [C(n,k)]^2 because k is the 'bound variable'.

That's like me saying:



Which is most certainly incorrect.
So how did you get t^2k in the first line then if you "didn't actually multiply the two terms"? That's what confuses me :(
 

Fus Ro Dah

Member
Joined
Dec 16, 2011
Messages
248
Gender
Male
HSC
2013
EDIT: you compare coeffiecents of t^(2r). Can't be bothered, it's midnight.

Also, this is from the 2007 Catholic Trial HSC. If you have this question , you would already have the solution.
Not necessarily. What if OP was given the question from his/her teacher in a revision booklet or something as such?
 

Bored_of_HSC

Active Member
Joined
Jul 9, 2011
Messages
1,498
Gender
Female
HSC
2012
Thanks Carrotsticks :)
This probably sounds very stupid but I wonder how you multiply the two summations in the first line (as I haven't learnt it yet). Shouldn't the term be squared also?
Goobi pls
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,391
Gender
Male
HSC
2006
Um...looking at the first line of Carrotstick's solutions, the expansion should look like this:



then you examine every combination of i + j = 2r...

The reason for that you can multiply the terms together is because you are effectively multiplying two general terms together when you expand the thing manually and finding every variation of i + j where i = {0, 1, .... , n} and j = {0, 1, .... , n}. Another way to see this is to note that in general, the double sigma means that



Note that the term in the brackets do not vary with each j so it can be factored out of the sum so we get



Now we can look at the sum outside as we vary i. Notice that the other summation term with j's in the square brackets does not change as we vary i, so we can factorise it outside the sum.



Now it should be clear that this leads to

 
Last edited:

Fus Ro Dah

Member
Joined
Dec 16, 2011
Messages
248
Gender
Male
HSC
2013
I am confused Trebla. Is the above relevant to the question, or is it just to demonstrate to goobi what happens when you multiply two summations?
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,391
Gender
Male
HSC
2006
I am confused Trebla. Is the above relevant to the question, or is it just to demonstrate to goobi what happens when you multiply two summations?
The latter...
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top