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inequality (1 Viewer)

Monsterman

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I proved x^2+y^2 >= 2xy
how would i use my result to deduce that (a+b)(b+c)(c+a)>=8abc?
 

Diaz

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So multiplying these together gives:



As required.
 
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nonsenseTM

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I expanded the LHS and got a^2b+ab^2+a^2c+ac^2+b^2c+bc^2+2abc, so -2abc on both sides, so we need to prove a^2b+ab^2+a^2c+ac^2+b^2c+bc^2 is greater than or equal to 6abc.

using the a^2+b^2 >= 2ab, a^2c+b^2c >= 2abc
similarly the other two groups are >= 2abc
so the six terms are >= 6abc
 

Diaz

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Erp. Tripped up. Thanks.
Just realised - my way does assume positive a,b,c, so your way's probably more rigorous. :p
 

Monsterman

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^
Thanks alot.. and the question said the numbers are non-negative.. so yea..

Another question which continues from the continued question.......
(b+c)(c+a)(a+b)>8abc
let x,y,z be unequal positive numbers such that x+y>z, y+z>x, z+x>y..
Use the (b+c)(c+a)(a+b)>8abc result to prove that (x+y-z)(y+z-x)(z+x-y)< xyz
 

untouchablecuz

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^
Thanks alot.. and the question said the numbers are non-negative.. so yea..

Another question which continues from the continued question.......
(b+c)(c+a)(a+b)>8abc
let x,y,z be unequal positive numbers such that x+y>z, y+z>x, z+x>y..
Use the (b+c)(c+a)(a+b)>8abc result to prove that (x+y-z)(y+z-x)(z+x-y)< xyz
 

shaon0

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Bad luck, there was no inequality questions for us today.
 

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