• Best of luck to the class of 2024 for their HSC exams. You got this!
    Let us know your thoughts on the HSC exams here
  • YOU can help the next generation of students in the community!
    Share your trial papers and notes on our Notes & Resources page
MedVision ad

HSC 2013 MX2 Marathon (archive) (6 Viewers)

Status
Not open for further replies.

seanieg89

Well-Known Member
Joined
Aug 8, 2006
Messages
2,662
Gender
Male
HSC
2007
Re: HSC 2013 4U Marathon

If you do manage to properly prove the Taylor Series formula (for all R and C), then Euler's formula should follow immediately with no issues because the radius of convergence for sin(x) and cos(x) are infinity.

However, the issue is HOW you are going to properly prove the formula using methods within Extension 2?
Same issue though, you would be trying to prove that the infinite series converge to e,sin,cos respectively. But to talk about this happening on C we need to define e,sin and cos on C in the first place!
 

Carrotsticks

Retired
Joined
Jun 29, 2009
Messages
9,494
Gender
Undisclosed
HSC
N/A
Re: HSC 2013 4U Marathon

The only treatment of Taylor Series I have ever seen in the HSC has only been in R because it has been very well-defined in the course. So the infinite series for e = 1+1/1!+1/2! +... is fine, since it's in R.

Sy123, might want to stick within R when having problems to do with functions, though polynomial functions have been defined in C.
 

seanieg89

Well-Known Member
Joined
Aug 8, 2006
Messages
2,662
Gender
Male
HSC
2007
Re: HSC 2013 4U Marathon

The only treatment of Taylor Series I have ever seen in the HSC has only been in R because it has been very well-defined in the course. So the infinite series for e = 1+1/1!+1/2! +... is fine, since it's in R.

Sy123, might want to stick within R when having problems to do with functions, though polynomial functions have been defined in C.
Agreed.

You would need something like the mean value theorem to actually prove convergence of the taylor series though.
 

Shadowdude

Cult of Personality
Joined
Sep 19, 2009
Messages
12,145
Gender
Male
HSC
2010
Re: HSC 2013 4U Marathon

Plus no doubt you'll learn about them when you continue your mathematical study at tertiary level...

hint hint
 

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2013 4U Marathon

Heh don't worry I won't do anything that extravagant anymore, here is a neat question I just solved:



It isn't that difficult I guess but I reckon it was neat.
 

bleakarcher

Active Member
Joined
Jul 8, 2011
Messages
1,509
Gender
Male
HSC
2013
Re: HSC 2013 4U Marathon

Heh don't worry I won't do anything that extravagant anymore, here is a neat question I just solved:



It isn't that difficult I guess but I reckon it was neat.
Very nice question Sy.
 

RealiseNothing

what is that?It is Cowpea
Joined
Jul 10, 2011
Messages
4,591
Location
Sydney
Gender
Male
HSC
2013
Re: HSC 2013 4U Marathon

Heh don't worry I won't do anything that extravagant anymore, here is a neat question I just solved:



It isn't that difficult I guess but I reckon it was neat.
Let which denotes the j'th triangular number. Then the sum in the n'th bracket is just:



Now when we write this out we get:



Usin the sum of a series formula we get:









As required.
 

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2013 4U Marathon

Let which denotes the j'th triangular number. Then the sum in the n'th bracket is just:



Now when we write this out we get:



Usin the sum of a series formula we get:









As required.
Nice work guys, I will post another question soon. (unless someone else could contribute heh, instead of me just giving questions out)
 
Last edited:

GoldyOrNugget

Señor Member
Joined
Jul 14, 2012
Messages
583
Gender
Male
HSC
2012
Re: HSC 2013 4U Marathon







I can justify this, since I know the limit:

Hence the product (10000/9999)^ 9999 is always less than e < 9999
Sneaky... I haven't seen that approach before. What if I changed it to ? The method I have in mind can compare any pair of large exponents regardless of the values of the bases and exponents.
 

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2013 4U Marathon

Sneaky... I haven't seen that approach before. What if I changed it to ? The method I have in mind can compare any pair of large exponents regardless of the values of the bases and exponents.
Well we can define the actual definition of e^x to do something similar:



Now looking back at the new thing you gave us:









So I too can do it for any large exponents :D
 

GoldyOrNugget

Señor Member
Joined
Jul 14, 2012
Messages
583
Gender
Male
HSC
2012
Re: HSC 2013 4U Marathon

Hmph. Fine, I'll accept it :p the solution I have in mind uses logs.
 

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2013 4U Marathon

Hmph. Fine, I'll accept it :p the solution I have in mind uses logs.
I originally thought of using a^x > log_a x somehow but this came to me first.

Do you mind posting your method? I'm curious
 
Last edited:

cutemouse

Account Closed
Joined
Apr 23, 2007
Messages
2,250
Gender
Undisclosed
HSC
N/A
Re: HSC 2013 4U Marathon

1/n! = 1/[n(n-1)(n-2)...(3)(2)1] < 1/[2.2.2...2.2.1] (as n, n-1, ... , 3 > 2 for n >= 3) = 1/2^(n-1)

New question: Expand and simplify (x-a)(x-b)(x-c)...(x-z).
 
Last edited:

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2013 4U Marathon

1/n! = 1/[n(n-1)(n-2)...(3)(2)1] < 1/[2.2.2...2.2.1] (as n, n-1, ... , 3 > 2 for n >= 3) = 1/2^(n-1)

New question: Expand and simplify (x-a)(x-b)(x-c)...(x-z).


 

Carrotsticks

Retired
Joined
Jun 29, 2009
Messages
9,494
Gender
Undisclosed
HSC
N/A
Re: HSC 2013 4U Marathon

1/n! = 1/[n(n-1)(n-2)...(3)(2)1] < 1/[2.2.2...2.2.1] (as n, n-1, ... , 3 > 2 for n >= 3) = 1/2^(n-1)

New question: Expand and simplify (x-a)(x-b)(x-c)...(x-z).
0

You are thinking too hard.

EDIT: Just saw your x =/= x, but I think that was the intended result.
 
Last edited:
Status
Not open for further replies.

Users Who Are Viewing This Thread (Users: 0, Guests: 6)

Top