HSC 2015 MX2 Marathon ADVANCED (archive) (1 Viewer)

[Kaido]

Re: HSC 2015 4U Marathon - Advanced Level

^ Yeah the inequality shifts as well...

pretty sure there's some kind of 'inequality result' concerning this problem set.
any other hints?

 

[Chlee1998]

Re: HSC 2015 4U Marathon - Advanced Level

yes indeed i forgot to mention that A,B,C,D >0.

The method I used was AM -Gm, although the problem is still very difficult...

 

[dan964]

Re: HSC 2015 4U Marathon - Advanced Level

you just have to prove that A^2*C*D + A*B^2*D + A*B*C^2 + B*C*D^2 <= A+ B+C+D

 

[dan964]

Re: HSC 2015 4U Marathon - Advanced Level

not really that hard...

(A+B) ≥2√AB
a+b≥2√ab
c+d≥2√cd
(a+b+c+d)≥2√ab+2√cd
Substitute RHS into LINE 1
2(√ab+2√cd)≥4×√(√ab×√cd)
(a+b+c+d)/4≥∜abcd, a,b,c,d≥0
∴∜ABCD≤1
∴ABCD≤1


Let a=A^2 CD, b=AB^2 D, c=ABC^2, d= BCD^2
A^2 CD+AB^2 D+ABC^2+BCD^2
≥4∜(A^4 B^4 C^4 D^4 )
≥ 4ABCD
A^2 CD+AB^2 D+ABC^2+BCD^2 ≤4
using 0< ABCD≤1
Divide both sides by ABCD gives the required result

 

[Chlee1998]

Re: HSC 2015 4U Marathon - Advanced Level

not really that hard...

(A+B) ≥2√AB
a+b≥2√ab
c+d≥2√cd
(a+b+c+d)≥2√ab+2√cd
Substitute RHS into LINE 1
2(√ab+2√cd)≥4×√(√ab×√cd)
(a+b+c+d)/4≥∜abcd, a,b,c,d≥0
∴∜ABCD≤1
∴ABCD≤1


Let a=A^2 CD, b=AB^2 D, c=ABC^2, d= BCD^2
A^2 CD+AB^2 D+ABC^2+BCD^2
≥4∜(A^4 B^4 C^4 D^4 )
≥ 4ABCD
A^2 CD+AB^2 D+ABC^2+BCD^2 ≤4
using 0< ABCD≤1
Divide both sides by ABCD gives the required result

Not that hard? Oh please, your solution has logical flaws.
Let's look at one. Look at the bolded bit. You can't just switch the inequality sign like that, division by a factor whcih is less than 1 does not mean that.
Think again, when u give up I'll give time for someone else to have a go. if no one answers in like a week or so, I will post my solution.

 

[Chlee1998]

Re: HSC 2015 4U Marathon - Advanced Level

Just to clarify in case you don't understand, ur previous line said
'Let a=A^2 CD, b=AB^2 D, c=ABC^2, d= BCD^2
A^2 CD+AB^2 D+ABC^2+BCD^2
≥4∜(A^4 B^4 C^4 D^4 )
≥ 4ABCD'

But in the line which follows, u swapped the inequality sign, which u cannot do. Hence you have not acquired the desired result.

 

[FrankXie]

Re: HSC 2015 4U Marathon - Advanced Level

not really that hard...

(A+B) ≥2√AB
a+b≥2√ab
c+d≥2√cd
(a+b+c+d)≥2√ab+2√cd
Substitute RHS into LINE 1
2(√ab+2√cd)≥4×√(√ab×√cd)
(a+b+c+d)/4≥∜abcd, a,b,c,d≥0
∴∜ABCD≤1
∴ABCD≤1


Let a=A^2 CD, b=AB^2 D, c=ABC^2, d= BCD^2
A^2 CD+AB^2 D+ABC^2+BCD^2
≥4∜(A^4 B^4 C^4 D^4 )
≥ 4ABCD
A^2 CD+AB^2 D+ABC^2+BCD^2 ≤4
using 0< ABCD≤1
Divide both sides by ABCD gives the required result

This solution is invalid.

 

[FrankXie]

Re: HSC 2015 4U Marathon - Advanced Level

Since no one has psoted a new question, here's one:

given A+B+C+D = 4, prove that 4/(ABCD) >= A/B +B/C + C/D + D/A

Q.E.D.

 

[dan964]

Re: HSC 2015 4U Marathon - Advanced Level

This solution is invalid.

thought it might have been
I was thinking that
but not sure why.

 

[dan964]

Re: HSC 2015 4U Marathon - Advanced Level

Not that hard? Oh please, your solution has logical flaws.
Let's look at one. Look at the bolded bit. You can't just switch the inequality sign like that, division by a factor whcih is less than 1 does not mean that.
Think again, when u give up I'll give time for someone else to have a go. if no one answers in like a week or so, I will post my solution.

correction: multiplication but anyway same problem I guess.

it is invalid not because of division (which I didn't do) but because assuming that 4*(a number less than 1) would account for the difference between the LHS and RHS, and result in the LHS <4 , and hence invalid. Yes I shouldn't have swapped the inequality.

It is also invalid, because I didn't prove anything useful, ended up proving it with the inequality reversed, if my working had been correct. It is actually the 5th line in my working that makes that incorrect assumption.

 

[Drsoccerball]

Re: HSC 2015 4U Marathon - Advanced Level

A question from 2014 maths marathon was posted. z^13=w and w^11=z The imaginary part of z is sin (Mpi/n) where m,n are positive integers with no common factors. Find n. Is the answer 143 ? Thanks

 

[dan964]

Re: HSC 2015 4U Marathon - Advanced Level

Raise the first one to the power of 11.
z^143-z=0
z=0
or z^142 = 1
The general solution form is cos (M*2pi/n)+isin(M*2*pi/n)
So it would be n=71

 

[Drsoccerball]

Re: HSC 2015 4U Marathon - Advanced Level

Z^1/11 =z^13
Z=z^143
Cistheta=cis143theta
Therefore n must= 143
Because of the rule how if z^5=1 or whatever

 

[FrankXie]

Re: HSC 2015 4U Marathon - Advanced Level

Z^1/11 =z^13
Z=z^143
Cistheta=cis143theta
Therefore n must= 143
Because of the rule how if z^5=1 or whatever

whatsoever, z=z^5 is totally different from z^5=1, coz z=z^5 is kind of z^4=1

 

[Ekman]

Re: HSC 2015 4U Marathon - Advanced Level

A question from 2014 maths marathon was posted. z^13=w and w^11=z The imaginary part of z is sin (Mpi/n) where m,n are positive integers with no common factors. Find n. Is the answer 143 ? Thanks

x=Mpi/N
z^143 = z
z(z^142 - 1) = 0
z=0 has no argument that satisfies this
z^142 = 1
cis142x = cis0
142x = 0 + 2*pi*k
x = (2*pi*k) / 142
x = pi*k/71
thus Mpi/N = pi*k/71
N = 71

 

[seanieg89]

Re: HSC 2015 4U Marathon - Advanced Level

For positive real x,y,z, show that:

 

[seanieg89]

Re: HSC 2015 4U Marathon - Advanced Level

And an easier one:

Prove that



for increasing sequences and an arbitrary permutation of the first n positive integers.)

 

[Drsoccerball]

Re: HSC 2015 4U Marathon - Advanced Level

take out xyz and make the denominator such that we are able to do x^3 +y^3 +z^3 therfore bottom becomes x^3 +y^3 +z^3 +xyz - extra value. Then make an equation ax^3 + bx^2 +cx + d where x+y+z=-B/a where -B/a is a negative number. xy +yz +xz= c/a positive and -d/a = xyz negative number. sub in x into equation to find sum of roots cubed. Therfore at you get a^3/ -(b^3 +2a^2d +3abc -x^3a^3) for all the rest aswell but then you're going to have to find a common denominator at this point i gave up ahaha what did i do wrong

 

[Sy123]

Re: HSC 2015 4U Marathon - Advanced Level

For positive real x,y,z, show that:

 

[Sy123]

Re: HSC 2015 4U Marathon - Advanced Level

And an easier one:

Prove that



for increasing sequences and an arbitrary permutation of the first n positive integers.)

I found this harder than the first inequality, probably because the answer doesn't require much algebra!





I don't exactly know how to symbolize the reasoning but it should be clear