You were still wrong either way.
You continue to force things that are not there, in this case.
Your misunderstanding of 'interpolation' and your confused belief numbers are inseparable from their representation are just more of your failings.
0.25 and 1/4 continue to represent the same number.
If only the final location along the real line is considered, then, yes, 0.25[base 10] and 1/4 is the same number.
If not only the final location along the real line is considered, then, no, for example:
0.25[base 10],
0.01[base 2] and
1/4 are not the same number, as can be seen by using verbal_sequential
AND visual_spatial reasoning:
For that matter, 1, 1.0, 1.00, and 1.000... all represent the same number, too.
In this case all locations are indeed the same number, no matter what base is used (please see above).
Ok, then. Are you now amending your previous statement to something less wrong?
What previous statement?
jsfisher said:
...except it isn't. Care to amend this statement, or would you like to defend this insanity for a bit?
This insanity is shown in
http://en.wikipedia.org/wiki/Cardinality
the cardinality of a set is a measure of the "number of elements of the set"
jsfisher said:
Is 2 an element of {2} or not? Simple question. You should not need to evade it as you have done.
If {2} is written, then what is written between between "{""}" is defined as a member of some set. If only 2 is written it is not necessarily a member of some set.
Again you do not distinguish between "x" expression and "{x}" expression.
jsfisher said:
And what about sets: Are they the union of their members or not?
Sets are union of members, for example:
A={1,2,3}
B={1,2,4}
C=AUB={1,2,3,4}
Sets can also be the union of their members ( Idempotent law in
http://en.wikipedia.org/wiki/Algebra_of_sets ), for example:
AUA={1,2,3}U{1,2,3}={1,2,3}
BUB={1,2,4}U{1,2,4}={1,2,4}
CUC={1,2,3,4}U{1,2,3,4}={1,2,3,4}
