Showing that: (a/(b+c))^2+(b/(a+c))^2+(c/(a+b))^2+(10abc)/((a+b)(b+c)(c+a)) >= 2

vidamuhae

vidamuhae

Answered question

2022-11-18

Showing that: ( a b + c ) 2 + ( b a + c ) 2 + ( c a + b ) 2 + 10 a b c ( a + b ) ( b + c ) ( c + a ) 2

Answer & Explanation

Samsonitew7b

Samsonitew7b

Beginner2022-11-19Added 15 answers

Let x = a b + c , y = b c + a , z = c a + b
Then we have to show that
x 2 + y 2 + z 2 + 10 x y z 2
Fisrtly,we have the identity
x y + y z + z x + 2 x y z = 1
Secondly,we have the known inequality
a b + c + b c + a + c a + b 3 2
that implys
x + y + z 3 2
Now Using Schur of the third degree,we have
x 2 + y 2 + z 2 + 6 x y z + 4 x y z x 2 + y 2 + z 2 + 9 x y z x + y + z + 4 x y z 2 ( x y + y z + x z ) + 4 x y z = 2

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