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harder 3u question (1 Viewer)

cutemouse

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Suppose that (1+x)(1+y)(1+z)=8. Prove that xyz<= 1

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cutemouse

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Yep... x>0, y>0, and z>0 -- Sorry should've said it before.
 

lolokay

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expand, you get 1 + x + y + z + xy + yz + zx + xyz = 8
using the fact (for numbers >= 0) a + b >= 2sqrt(ab) for each pair of eg. x and yz we get:
6sqrt(xyz) + xyz =< 7
let sqrt(xyz) = a, then we have
a2 + 6a - 7 <= 0
(a+7)(a-1) <= 0
as a is positive, a =< 1 for this to be true
so sqrt(xyz) =< 1
xyz =< 1
 

lolokay

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^ ah yes, i missed the 1+xyz pair
 

cutemouse

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Does the fact that the previous question (or part) said that x+y+z >= 3(xyz)^(1/3) help?
 

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