Algebraic Inequalities

pineapple12 · 2016-07-21 03:18:40

Hi,

Prove that

sqrt((2x^2 - 2x + 1) / 2) >=1/(x + 1/x)

for $0 < x < 1.$

This is the original problem. I'm trying to prove an intermediate inequality sqrt((2x^2 - 2x + 1) / 2) >= 1/2 >= 1/(x+1/x) .

I used AM-GM on x + 1/x, and I ended up with 1/(x + 1/x) <= 1/2.
Now, I'm kind of having trouble finding a way to prove that sqrt((2x^2 - 2x + 1) / 2) >= 1/2. I don't know if I should use a mean inequality or what to do. I'm so close to solving this problem, so any strong hints would be appreciated.

Thank you so much!!!

thickhead · 2016-07-21 04:07:29

bobbym · 2016-07-21 04:16:13

When stuck try calculus:

Easy to minimize that to see that the minimium occurs at x = 1 / 2 and is equal to - 1 / 4

thickhead · 2016-07-21 05:02:53

pineapple12 · 2016-07-21 07:24:03

Wow! Oh my gosh thank you thank you thank you thank you so much!!! You guys did more than I expected, thank you guys!

bobbym · 2016-07-21 07:36:24

Okay, good luck.

Math Is Fun Forum

#1 2016-07-21 03:18:40

Algebraic Inequalities

#2 2016-07-21 04:07:29

Re: Algebraic Inequalities

#3 2016-07-21 04:16:13

Re: Algebraic Inequalities

#4 2016-07-21 05:02:53

Re: Algebraic Inequalities

#5 2016-07-21 07:24:03

Re: Algebraic Inequalities

#6 2016-07-21 07:36:24

Re: Algebraic Inequalities

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