Re: [xmca] a minus times a plus

[Wolff-Michael Roth <mroth@uvic.ca>]

Can't you think like this---perhaps it is too much of a physicist's  
thinking. We can think of the following general function (operator in  
physics) that produces an image y of x operated upon by A.
y = Ax

if x is from the domain of positive integers, then A = -1 would  
produce an image that is opposite to the one when A = +1, the  
identity operation.

Conceptually you would then not think in terms of a positive times a  
negative number, but in terms of a positive number that is projected  
opposite of the origin on a number line, and, if the number is  
unequal to 1, like -2, then it is also stretched.

The - would then not be interpreted in the same way as the +

Cheers,
Michael




On 27-Apr-09, at 4:16 PM, Ed Wall wrote:

Mike

     It is simply (of course, it isn't simple by the way) because,  
the negative integers (and, if you wish, zero) were added to the  
natural numbers in a way that preserves (in a sense) their (the  
natural numbers) usual arithmetical regularities. It would be  
unfortunate if something that was true in the natural numbers was no  
longer true in the integers, which is a extension that includes  
them.  Perhaps the easiest way to the negative x positive business is  
as follows (and, of course, this can be made opaquely precise - smile):

3 x 1 = 3
2 x 1 = 2
1 x 1 = 1
0 x 1 = 0

so what, given regularity in the naturals + zero) do you think  
happens next? This thinking works for, of course, for negative times  
negative. The opaque proof is more or less as follows.

Negative numbers are solutions to natural number equations of the  
form (I'm simplifying all this a little)

                      x + a = 0    ('a' a natural number)

and likewise positive numbers  are solutions to natural number  
equations of the form

                     y = b          ('b' a natural number)


Multiplying these two equations in the usual fashion within the  
natural numbers gives


             xy + ay = 0

or substituting for y


       xy + ab = 0

so, by definition, xy is a negative number.

Notice how all this hinges on the structure of the natural numbers  
(which I've somewhat assumed in all this).

Ed



On Apr 27, 2009, at 6:47 PM, Mike Cole wrote:

> Since we have some mathematically literate folks on xmca, could  
> someone
> please post an explanation of why
>
> multiplying a negative number by a positive numbers yields a negative
> number? What I would really love is an explanation
> that is representable in a manner understandable to old college  
> professors
> and young high school students alike.
>
> mike
> _______________________________________________
> xmca mailing list
> xmca@weber.ucsd.edu
> http://dss.ucsd.edu/mailman/listinfo/xmca

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