Inequality

mp3qz · 2009-09-08 18:06:17

1./ SOlve for min & max of:
$gif.latex?\;y=\sqrt{sinx+tanx}+\sqrt{cosx+cotx}$

[2./ img]http://latex.codecogs.com/gif.latex?x\neq&space;y\neq&space;z[/img]
Demonstrate
$gif.latex?\left&space;(\frac{x-y}{y-z}&space;\right&space;)^2+\left&space;(\frac{y-z}{z-x}&space;\right&space;)^2+\left&space;(\frac{z-x}{x-y}&space;\right&space;)^2\geq&space;5$

Last edited by mp3qz (2009-09-08 18:07:48)

bobbym · 2009-09-09 04:18:43

Hi mp3qz;

I think you also meant to say:

By the AM-GM

After much cancelling on the RHS.

Looking at each term we can see that they have a minimum when the numerator = 0 and that they are unbounded.
Undoing the substitutions:

Because each term is unbounded.

Last edited by bobbym (2009-09-10 04:33:25)

mp3qz · 2009-09-09 21:20:15

but my teacher said : "=" has appear.

mathsyperson · 2009-09-09 22:28:15

bobbym wrote:

Could you explain this bit more?

bobbym · 2009-09-10 04:31:32

H mathsyperson;

All three of the terms on the lhs have the same property. I chose this one for the explanation.

It is unbounded, intuitively meaning we can make it as large as we want. All three are like that. So if something is proven to be > 3 and it is unbounded it implies it is also >=5.

Last edited by bobbym (2009-09-10 05:01:32)

bobbym · 2009-09-10 04:32:37

Hi mp3qz;

It does appear in the >=.

Ricky · 2009-09-10 08:05:45

Just because a term is unbounded (for each M there exists a choice of x, y, and z such that...) does not mean that it holds for every choice of x, y, and z.

bobbym · 2009-09-10 08:29:50

Hi Ricky;

I am not asking it to hold for every choice of x,y, and z, what I am asking is that if it is already known to be greater than 3 and it is unbounded it also is greater than 5 , 11, 219, any number.

Last edited by bobbym (2009-09-10 09:31:47)

bobbym · 2009-09-11 05:39:17

Concerning proofs, you have to convince the other people that you are right. - Rene Thom

Two heads are better than one - Ghidrah

Since it is apparent that the last step:

Has not convinced either Ricky or mathsyperson, I am forced to withdraw it. I will retreat to this much:

Prove:

By the AM-GM

After some cancelling on the RHS.

Undoing the substitutions:

This is as far as I am sure of. Can anybody go any further towards answering the question?

Last edited by bobbym (2009-09-11 09:15:34)

mathsyperson · 2009-09-11 09:08:45

Maybe it's significant that c = a+b?

Math Is Fun Forum

#1 2009-09-08 18:06:17

Inequality

#2 2009-09-09 04:18:43

Re: Inequality

#3 2009-09-09 21:20:15

Re: Inequality

#4 2009-09-09 22:28:15

Re: Inequality

#5 2009-09-10 04:31:32

Re: Inequality

#6 2009-09-10 04:32:37

Re: Inequality

#7 2009-09-10 08:05:45

Re: Inequality

#8 2009-09-10 08:29:50

Re: Inequality

#9 2009-09-11 05:39:17

Re: Inequality

#10 2009-09-11 09:08:45

Re: Inequality

Board footer