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This question actually had two parts. In the first part I had to prove that a + 1/a >=2. I proved it by rearranging it to (a-1)^2 >= 0, which is always true.

So, I thought the second problem would require a similar method.

(x+y)/z + (y+z)/x + (x+z)/y >=6, where x,y,z>0

But I cant figure it out. I've tried simplifying it and factoring it for ideas but I've got nothing.

  • Maybe try Mathematics. – Johnny Mopp Feb 25 at 14:30
  • @Welbog The title specifies x,y,z > 0 – kutschkem Feb 25 at 14:35
  • 1
    Ah, titles. The last place one looks for detail. – Welbog Feb 25 at 14:35
  • I'm voting to close this question as off-topic because is not programming question – eyllanesc Feb 25 at 20:23
  • I'm voting to close this question as off-topic because it is about mathematics instead of directly about programming / coding / programming tools / software algorithms. – Pang Feb 28 at 2:09
0

Once you know that a + 1/a >= 2, the second part is easy. Define:

a := x/z,  b := y/z,  c := y/x

and now

(x+y)/z + (y+z)/x + (x+z)/y = x/z + y/z + y/x + z/x + x/y + z/y
                            = a + b + c + 1/a + 1/c + 1/b
                           >= 2 + 2 + 2
                            = 6

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