real analysis problem!!

integral · 2010-02-27 01:34:51

if a+b=1, where a,b∈ R, prove that (a+1/a)² +(b+1/b)² ≥ 25/2....plz help me solving this problem...thank you all.

JaneFairfax · 2010-02-27 03:29:23

You made a slight typo here:

integral wrote:

where a,b∈ R[sup]+[/sup]

If one of a and b is negative, the result breaks down. E.g. try a = 1.5, b = −0.5.

To prove the result for positive real a and b, observe that the function

is convex for x ∈ ℝ[sup]+[/sup]. Hence, by Jensens inequality,

QED.

Last edited by JaneFairfax (2010-02-27 03:47:11)

integral · 2010-02-27 03:39:18

thnx jane

JaneFairfax · 2010-02-27 03:51:47

Youre welcome. I just realized however that you posted this as a real-analysis problem, so it may be that you have to use calculus here. While Jensens inequality gives a quick solution without using calculus, it may not be what your teacher wants. Do check with your teacher on what is required for this problem.

Last edited by JaneFairfax (2010-02-27 03:52:15)

bobbym · 2010-02-27 13:38:47

Hi Jane and integral;

It's overkill because you can just use the substitution a = 1 - b and then maximize a single variable function but the method of Lagrangian multipliers can be used. This is a little rough and needs fleshing out, it's from memory.

We form the vector equations:

We get the simultaneous set of equations to solve:

From equations 1 and 2 we see that a = b. From the third equation we see that a,b = 1 / 2. When a,b = 1/2 it is a minimum. At = a, b = 1/2 the original equation = 12.5 so we are done.

Math Is Fun Forum

#1 2010-02-27 01:34:51

real analysis problem!!

#2 2010-02-27 03:29:23

Re: real analysis problem!!

#3 2010-02-27 03:39:18

Re: real analysis problem!!

#4 2010-02-27 03:51:47

Re: real analysis problem!!

#5 2010-02-27 13:38:47

Re: real analysis problem!!

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