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Odd or Even only for integers?

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Source: — Data Sufficiency |
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by vineeshp » Fri Apr 29, 2011 12:04 am
Yes!

An odd number divided by 2 must leave a remainder 1.
An even number should be divisible by 2.

No other real number outside this view can be called odd or even.
Vineesh,
Just telling you what I know and think. I am not the expert. :)
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by fskilnik@GMATH » Fri Apr 29, 2011 9:30 am
shebinjs wrote:Hi,
Just a quick question.

Do we tell odd or even only for integers? Say for e.g. I got 0.5 as the value for a variable. Is it odd or even?
vineeshp´s answer is correct. Let me say a bit more on this matter:

"Divisibility is an integer business" in the sense that if (say) one of the statements of a data sufficiency problem tells you that "A is divisible by B", you can (AND SHOULD) admit that A and B are integers.

Corollary (that is, a consequence of above): when a number is said/given as:

> "odd" that means that it is an INTEGER that leaves 1 as the remainder when it is divided by 2 ;
> "even" that means that it is an INTEGER that leaves 0 as the remainder(*) when it is divided by 2 ;

(*) Many prep companies/books/teachers usually say "there is no remainder" when they should say "the remainder is zero", by the way.

> any given integer is necessarily odd or even, and it cannot be both.

Important: zero is even, because when 0 is divided by 2 we have (quotient 0 and) remainder 0.

In summary:

(1) All integers are divided into 2 groups -- ODDs and EVENs -- and no integer is at both groups ;
(2) All ODD numbers are necessarily integers and the same can be said about the EVEN numbers.

Curiosity: people (and the GMAT) say "Let n be an even integer" when they could simply say "Let n be an even number" or, more succint, "Let n be even."

Important: if you know a certain (real) number A is not even, it does NOT need to be odd, because it could be non-integer! In other words:

(1) Integers that are NOT even are NECESSARILY odd (and vice-versa) ;
(2) Any given (real) number is EXACTLY one of three possibilities: odd, even, non-integer.

Regards,
Fabio.
Fabio Skilnik :: GMATH method creator ( Math for the GMAT)
English-speakers :: https://www.gmath.net
Portuguese-speakers :: https://www.gmath.com.br
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