MedVision ad

HSC 2014 MX2 Marathon ADVANCED (archive) (2 Viewers)

Status
Not open for further replies.

VBN2470

Well-Known Member
Joined
Mar 13, 2012
Messages
440
Location
Sydney
Gender
Male
HSC
2013
Uni Grad
2017
Re: HSC 2014 4U Marathon



Also if you're question if Q16 difficulty or beyond, please post it in the Advanced Level marathon. This marathon is for easy questions
Nice work :). Did you also manage to work out the answer for the other question posted above (finding )?
 

Davo_01

Active Member
Joined
Apr 8, 2014
Messages
116
Gender
Male
HSC
N/A
Re: HSC 2014 4U Marathon

This is what i thought of:
We know that m+n and mn is an integer and hence (m+n)^2-mn (the denominator) is an integer
So the expression can be written in the form p/q where p and q are integers.
Now p/q=4/49=8/98=12/147=16/196... (multiplying top and bottom by 1,2,3,4...)
Suppose p=m+n= 4 or 8, then mn would be negative (which it isnt),
if m+n=12 then mn=3 which do not have integer solutions
if p=m+n = 16 then mn=60 which has integer solutions m=10 and n=6 (or other way around), hence m+n=16
 

Davo_01

Active Member
Joined
Apr 8, 2014
Messages
116
Gender
Male
HSC
N/A
Re: HSC 2014 4U Marathon

a bit trial and error but all i could think of
 

braintic

Well-Known Member
Joined
Jan 20, 2011
Messages
2,137
Gender
Undisclosed
HSC
N/A
Re: HSC 2014 4U Marathon

If and are positive integers such that find the value of .
Could there be a neat way of doing this by multiplying the numerator and denominator each by (m-n) to get
(m^2 - n^2) / (m^3 - n^3) ?
 

Davo_01

Active Member
Joined
Apr 8, 2014
Messages
116
Gender
Male
HSC
N/A
Re: HSC 2014 4U Marathon - Advanced Level

Find lim n-> -infinity (x^2+4x+7)^0.5+x
 
Last edited:

RealiseNothing

what is that?It is Cowpea
Joined
Jul 10, 2011
Messages
4,591
Location
Sydney
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon - Advanced Level



So for some integer

Flipping the equation gives:



Adding and subtracting from the numerator allows us to decompose the fraction into:



Since we can deduce that:



And hence:



Thus:



Call this the lower bound of

Now we will find an upper bound:







But we know that which implies that

So we can deduce that:



Now recalling the QM-AM inequality:



Using what we just found:





Squaring both sides gives:





Using the quadratic formula we get:



or

I've just used decimal answers as we are looking for a upper bound, not an exact answer.

Testing gives . So we deduce that:



But incorporating our lower bound from earlier:



However we know from earlier that for some integer .

Hence is the only solution that satisfies the given inequality.
 
Last edited:

RealiseNothing

what is that?It is Cowpea
Joined
Jul 10, 2011
Messages
4,591
Location
Sydney
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon - Advanced Level

That's the only method I could come up with that completely gets rid of any trial and error.
 

hit patel

New Member
Joined
Mar 14, 2012
Messages
568
Gender
Male
HSC
2014
Uni Grad
2018
Re: HSC 2014 4U Marathon - Advanced Level

Yea i did but i cant get those value with solving 16x^5-20x^3+5x-1=0 especially bcuz of -1 at the end
Hmm... Why do I have the feeling that you are talking sum of roots as 20/16 and not 0? This may justify the negative one possibly?
 

Davo_01

Active Member
Joined
Apr 8, 2014
Messages
116
Gender
Male
HSC
N/A
Re: HSC 2014 4U Marathon - Advanced Level

Managed to get rid of trial and error to:
Since m and n are integers m+n=4k (1) and (m+n)^2-mn=49k (2) (k>0)
Subbing (1) into (2):
16k^2-m(4k-m)=49k
M^2-4mk+16k^2-49k=0
M=2k+(49k-12k^2)^0.5
N=2k-(49k-12k^2)^0.5
Discriminant must be positive (and perfect square):
K<49/12
Also n>0
So 2k>(49k-12k^2)^0.5
K>49/16
Hence k=4
Which gives discriminat=4 (perfect square) and m=10 n=6
M+n=16
 

seanieg89

Well-Known Member
Joined
Aug 8, 2006
Messages
2,662
Gender
Male
HSC
2007
Re: HSC 2014 4U Marathon - Advanced Level

 

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon - Advanced Level



Someone else post a question please
 

seanieg89

Well-Known Member
Joined
Aug 8, 2006
Messages
2,662
Gender
Male
HSC
2007
Re: HSC 2014 4U Marathon - Advanced Level

View attachment 30255

Here is my attempt, its a bit long, im sure you have a quicker method.
Mine involved the cube roots of unity but is roughly the same length.

Note that it is important that the degrees of P(x^3),xQ(x^3) and x^2R(x^3) are distinct mod 3 in order to conclude deg(T)=n, otherwise good solution.
 

Davo_01

Active Member
Joined
Apr 8, 2014
Messages
116
Gender
Male
HSC
N/A
Re: HSC 2014 4U Marathon - Advanced Level



Someone else post a question please
Limits 1214124.jpg

Here is my attempt

edit: damn just realized there is an error on like 3rd last line, how do i prove l is the positive case?
 
Last edited:

Davo_01

Active Member
Joined
Apr 8, 2014
Messages
116
Gender
Male
HSC
N/A
Re: HSC 2014 4U Marathon - Advanced Level

Mine involved the cube roots of unity but is roughly the same length.

Note that it is important that the degrees of P(x^3),xQ(x^3) and x^2R(x^3) are distinct mod 3 in order to conclude deg(T)=n, otherwise good solution.
Hmm what do you mean by "distinct mod 3"? and do you mind showing me your method, sounds interesting :)
 

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon - Advanced Level

 
Status
Not open for further replies.

Users Who Are Viewing This Thread (Users: 0, Guests: 2)

Top