Inequality question (1 Viewer)

Chris100 · Dec 22, 2013

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

RealiseNothing · Dec 22, 2013

$\frac{1}{x^2} + \frac{1}{y^2} = \frac{x^2+y^2}{x^2y^2} \geq \frac{2xy}{x^2y^2} = \frac{2}{xy} \geq \frac{4}{x^2+y^2}$

Using the AM-GM inequality.

QZP · Dec 22, 2013

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

RealiseNothing · Dec 22, 2013

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

Flip the AM-GM.

QZP · Dec 22, 2013

RealiseNothing said:
Flip the AM-GM.

Ah right, thanks.

Chris100 · Dec 22, 2013

What is AM and GM?

QZP · Dec 22, 2013

Chris100 said:
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 · Dec 22, 2013

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

QZP · Dec 22, 2013

Chris100 said:
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 · Dec 22, 2013

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

asianese · Dec 22, 2013

This is a 4U Question not a 3U one.

panda15 · Dec 22, 2013

Chris100 said:
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 · Dec 22, 2013

RealiseNothing said:
$\frac{1}{x^2} + \frac{1}{y^2} = \frac{x^2+y^2}{x^2y^2} \geq \frac{2xy}{x^2y^2} = \frac{2}{xy} \geq \frac{4}{x^2+y^2}$

Using the AM-GM inequality.

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

$x^2+y^2\geq 2xy$

does NOT necessarily imply that

$\dfrac{x^2+y^2}{xy}\geq 2$

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

Trebla · Dec 22, 2013

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

$(x+y)^2\geq 4xy$

in general. Simply due to the fact that $(x - y)^2 \geq 0$

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

$(x^2+y^2)^2\geq 4x^2y^2$

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

anomalousdecay · Dec 23, 2013

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

$x^2+y^2\geq 2xy$

does NOT necessarily imply that

$\dfrac{x^2+y^2}{xy}\geq 2$

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 · Dec 23, 2013

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

Inequality question (1 Viewer)

Chris100

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RealiseNothing

what is that?It is Cowpea

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what is that?It is Cowpea

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