Inequality question (1 Viewer)

Chris100

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Given that (x+y)^2>=4xy,
Prove that 1/x^2 +1/y^2>=4/(x^2+y^2)
 

QZP

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I don't understand your step from 2/xy to >= 4/(x^2 + y^2) :S
 

QZP

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What is AM and GM?
Arithmetic mean of two numbers a,b: (a+b)/2
Geometric mean: root_ab

The AM-GM inequality says that (a+b)/2 >= root_ab

This is essentially what you are given :)
 

Chris100

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Oh right
How did realise nothing apply that to the question?
 

QZP

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Oh right
How did realise nothing apply that to the question?
It is quite easy to get to 2/xy with algebraic manipulation. Then he realised that:
(a+b)^2 /4 = ab
(a^2 + 2ab + b^2)/4 = ab
(a^2 + b^2)/4 + ab/2 = ab
(a^2 + b^2)/4 = ab/2
4/(a^2 + b^2) = 2/ab

Just apply that to the inequalities in the question (I'm lazy sorry)
 

Chris100

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Oh wow that's clever!
What year do students usually learn the AM-GM inequality thereom? Not sure if I was just not listening in class or yr 12 theory
 

panda15

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Oh wow that's clever!
What year do students usually learn the AM-GM inequality thereom? Not sure if I was just not listening in class or yr 12 theory
It comes up in 2U series and sequences, but I think it's pretty rare for the AM-GM inequality to appear outside of 4U.
 

Trebla

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The approach I'm thinking of is basically using the knowledge that



in general. Simply due to the fact that

Since this is true for any real numbers x and y, then it must hold true for real numbers x2 and y2 which means that



Rearrange this inequality and the result follows without having to worry about negativity problems.
 

anomalousdecay

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There is a flaw here. Note that the AM-GM inequality



does NOT necessarily imply that



unless xy > 0. If xy < 0 then the argument breaks down.
Well spotted trebla.

OP should check whether there are any conditions in the question.
 

Chris100

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I didn't use AM-GM for x2+y2>=2xy,
I used the given (x+y)2>=4xy and if you expand the LHS and minus 2xy from both sides, you get x2+y2>=2xy

Therefore, (x2+y2)/x2y2 >=2xy/x2y2
 
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