Thread is closed but answer has error

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AI Thread Summary
To correct an error in a closed forum thread, users can report the post and request moderators to reopen it. A participant identified a typo in a previous answer and suggested a further clarification regarding the multiplication of irrational and rational numbers. After making the necessary edits for clarity, they shared their solution to demonstrate the irrationality of the sum of cubic and square roots of 2. The discussion concluded with participants confirming the changes and expressing gratitude for the corrections made. This exchange highlights the collaborative effort to maintain accuracy in forum discussions.
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phinds said:
Go to the thread and click "report" on the post you want to correct and type in a request to the mods to re-open the thread for you to do so.
Thanks, I followed your suggestion.
 
You want to correct an error that was made seven years ago?
 
BobG said:
You want to correct an error that was made seven years ago?
Why not?
 
Try to find the error.

;)
 
mfb said:
Try to find the error.

;)
What do you mean? I've already found it.
 
Try to find it in the old thread. I found one and fixed it - was just a typo I guess.
 
mfb said:
Try to find it in the old thread. I found one and fixed it - was just a typo I guess.
Thanks, it's mostly fixed. The phrase 'irrational multiplied by a rational' should also be changed to 'irrational multiplied by a non-zero rational'. Would you please make that change too?
 
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  • #10
rickhev said:
Thanks, it's mostly fixed. The phrase 'irrational multiplied by a rational' should also be changed to 'irrational multiplied by a non-zero rational'. Would you please make that change too?

I made the change, and added some whitespace to make it more readable. Does this look right now?

ehj said:
I figured it out. Posting solution in case sombody might run into the same problem in the future :P

I assume 2^(1/3) + 2^(1/2) = a , where a is rational

=> 2=(a-2^(1/2))^3 <=> 2 = (a^3 + 6a) + sqrt(2)(-3a^2 -2)

Which is a contradiction since sqrt(2)(-3a^2 -2) is an irrational multiplied by a non-zero rational, which can be proved to always be irrational, and the sum of a rational (a^3 + 6a) and an irrational can be proved to always be irrational, and above cannot equal 2 since 2 is rational.
 
  • #11
berkeman said:
I made the change, and added some whitespace to make it more readable. Does this look right now?
Looks good to me. Thanks very much.
 
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