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To ask a new question, add a line and type in your question. You can use LaTeX to type math. Here is a link to a short
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[[ HomeworkDiscussionsMA341Spring2010 | go back to the Discussion Page ]]
 
[[ HomeworkDiscussionsMA341Spring2010 | go back to the Discussion Page ]]
 
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I am having trouble with exercise 2.4.10. I don't understand how I can prove what is being asked without using a specific range or function. Can anyone help with this?
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''' Prof. Alekseenko: ''' Perhaps one could start from looking at
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functions <math> f(x)\,</math> and <math> g(y)\,</math> closely.
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Here is a hint: consider any point <math> (x_0,y_0) \,</math>.
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(1) What can be said about <math> f(x_{0})\,</math> and <math> h(x_0,y_0) \,</math>?
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(2) Similarly, what can be said about <math> g(y_{0})\,</math> and <math> h(x_0,y_0)\,</math>?
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(3) Finally, what can be said about <math> f(x_0)\,</math>
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and <math> g(y_0)\, </math> for any <math>x_0\in X </math> and <math>y_0 \in Y</math>?
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(4) How can this help to establish the desired inequality?
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Can anybody fill in the detail?
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'''Reply from a Student:''' So Here's my rough draft of it. I think this is enough but I could be missing something. Could not figure out how to get this looking good for the wiki so I used an image upload site. here's the link. http://imgur.com/Ae0sJ.jpg
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'''Prof. Alekseenko:''' Thanks very much! The solution seems ok. A few minor detail can be corrected, but overall I do not see any problems with the proof. The last step, however, needs to be justified using the appropriate theorem in this section.

Latest revision as of 08:39, 10 February 2010

To ask a new question, add a line and type in your question. You can use LaTeX to type math. Here is a link to a short LaTeX tutorial.


To answer a question, open the page for editing and start typing below the question...

go back to the Discussion Page


I am having trouble with exercise 2.4.10. I don't understand how I can prove what is being asked without using a specific range or function. Can anyone help with this?

Prof. Alekseenko: Perhaps one could start from looking at functions $ f(x)\, $ and $ g(y)\, $ closely.

Here is a hint: consider any point $ (x_0,y_0) \, $.

(1) What can be said about $ f(x_{0})\, $ and $ h(x_0,y_0) \, $?


(2) Similarly, what can be said about $ g(y_{0})\, $ and $ h(x_0,y_0)\, $?


(3) Finally, what can be said about $ f(x_0)\, $

and $  g(y_0)\,  $ for any $ x_0\in X  $ and $ y_0 \in Y $?


(4) How can this help to establish the desired inequality?


Can anybody fill in the detail?


Reply from a Student: So Here's my rough draft of it. I think this is enough but I could be missing something. Could not figure out how to get this looking good for the wiki so I used an image upload site. here's the link. Ae0sJ.jpg


Prof. Alekseenko: Thanks very much! The solution seems ok. A few minor detail can be corrected, but overall I do not see any problems with the proof. The last step, however, needs to be justified using the appropriate theorem in this section.

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