 
THE SMARANDACHE CLASS OF PARADOXES, Vol. 1
edited by Charles T. Le
Let <A> be an attribute, and <NonA> its negation.
Then:
Paradox 1. ALL IS <A>, THE <NonA> TOO.
Examples:
E11: All is possible, the impossible too.
E12: All are present, the absents too.
E13: All is finite, the infinite too.
Paradox 2. ALL IS <NonA>, THE <A> TOO.
Examples:
E21: All is impossible, the possible too.
E22: All are absent, the presents too.
E23: All is infinite, the finite too.
Paradox 3. NOTHING IS <A>, NOT EVEN <A>.
Examples:
E31: Nothing is perfect, not even the perfect.
E32: Nothing is absolute, not even the absolute.
E33: Nothing is finite, not even the finite.
Remark: The three kinds of paradoxes are equivalent. They are
called: The Smarandache Class of Paradoxes.
More generally:
Paradox: ALL (Verb) <A>, THE <NonA> TOO
(<The Generalized Smarandache Class of Paradoxes>)
Replacing <A> by an attribute, we find a paradox.
Let's analyse the first one (E11):
<All is possible, the impossible too.>
If this sentence is true, then we get that <the impossible is
possible too>, which is a contradiction; therefore the
sentence is false. (Object Language).
But the sentence may be true, because <All is possible>
involves that <the impossible is possible>, i.e.< it's
possible to have impossible things>, which is correct.
(MetaLanguage).
Of course, from these ones, there are unsuccessful paradoxes, but
the proposed method obtains beautiful others. Look at pun which
remembers you Einstein:
All is relative, the (theory of) relativity too!
So:
1. The shortest way between two points is the meandering way!
2. The unexplainable is, however, explained by the word:
"unexplainable"!
Other Smarandache
Paradoxes, Vol. II
Smarandache Sorites Paradoxes
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