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Re: Formally Unknowability, or absolute Undecidability, of certainarithmeticformulas.
Posted:
Jan 28, 2013 12:36 AM
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On 27/01/2013 10:16 PM, Jesse F. Hughes wrote:
> Nam Nguyen <namducnguyen@shaw.ca> writes:
>
>> On 27/01/2013 9:33 PM, Jesse F. Hughes wrote:
>>> Nam Nguyen <namducnguyen@shaw.ca> writes:
>>>
>>>> Ok. So you seem to be saying that (unlike the lone Nam Nguyen)
>>>> everyone should not think that it's impossible to know the truth
>>>> value of cGC since "its truth value might be discovered tomorrow",
>>>> according to your knowledge about mathematical logic.
>>>
>>>> But, A) what's the technical definition of "might be discovered
>>>> tomorrow"? "Tomorrow" relative to which side of the International
>>>> Date line? The Australia side? or the US side? And B) what happens
>>>> if before "tomorrow" has arrived, "today" somebody would discover
>>>> the truth value of cGC, rendering "might be discovered tomorrow"
>>>> _meaningless_ ?
>>>
>>> Congratulations on two of the dumbest points ever made on sci.math.
>>> Man, that's something.
>>
>> You missed the point; and that was a _right response_ to someone
>> else's comment on the issue of the possible impossibility
>> to know the truth value of cGC.
>
> Yeah, I'm sure that's absolutely right.
>
> I miss a *lot* of your points, actually.
>
> Funny, that.
The sad truth is for years you've missed only 1 or 2 points.
Not a lot as you've imagined!
--
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There is no remainder in the mathematics of infinity.
NYOGEN SENZAKI
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