Equivalent Statements: An Example

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The discussion centers on the concept of logical equivalence, specifically the statement "A if and only if B," which indicates that A holds true precisely when B does. It is clarified that this does not imply A and B are identical, as they can be distinct statements despite their equivalence. A concrete example provided is that an integer n is even if and only if n^2 is even, illustrating that while both statements are true simultaneously, they are not the same statement. The conversation emphasizes the importance of understanding the distinction between logical equivalence and equality in statements. Overall, the example serves to clarify the concept of equivalence in logical terms.
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Suppose we have a statement A that holds if and only if statement B holds.

"A if and only if B"

I'm fairly sure I read before that this does not necessarily mean that A and B are identical: in general, A <--> B does not imply A = B.

I'm having difficulty determining how A and B could be distinguished from each other - besides, of course, their names.

I think that a simple, concrete example would clear this up for me; if someone could provide one I'd greatly appreciate it. My sanity's been really wearing thin, lately (just have a look at my other thread; actually, don't)... maybe I should lay off the Red Bulls.
 
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_Equality_ of logical statements doesn't really make sense. But if you still want an example:

Let n be an integer, then n is even if and only if n^2 is even.

It doesn't make sense to say (n is even) equals (n^2 is even), unless you wish to define what you mean by 'equal'. The two statements are equivalent, in the obvious sense.
 

Thread 'Area of Overlapping Squares'

Here is a little puzzle from the book 100 Geometric Games by Pierre Berloquin. The side of a small square is one meter long and the side of a larger square one and a half meters long. One vertex of the large square is at the center of the small square. The side of the large square cuts two sides of the small square into one- third parts and two-thirds parts. What is the area where the squares overlap?
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