|1| is a quantitative property common to both +1 and -1. Only the property of positivity or negativity qualifies those values as NOT being the same.Hurkyl said:Then I'm greatly surprised that you consider qualitative analysis outside the realm of mathematics. Here's a short list of qualitative concepts that are firmly entrenched in mathematics, and I'm only drawing from analysis: continuity, compactness, connectedness, orientation, denseness, sparseness.
Incidentally, how would you classify doing arithmetic in the complexes, quaternions? Or worse, arithmetic in an abstract group or ring? Or arithmetic on ideals? What about doing anything in graph theory?
This is curious, because I would say that -1 and +1 are both values, (in particular, they're both real numbers) and I'm sure anyone with whom I work would agree.
Sorry haste makes for misunderstanding (and one-sided equations which are illogical) -And this just boggles me for several reasons:
(1) It's not an equation.
positivity and negativity are qualitative values, not quantitative. What is the sqrt of '+' or '-'? These are actually FUNCTIONS, but functions which QUALify quantitative values. I didn't say there was no interrelation between quality and quantity - I was illustrating the limit of that relationship.(2) How is it trying to get a quality to perform like a quantity?
OK, then solve for x(3) Why do you think this expression is a problem?
Has anyone considered the possibility that (sqrt -1) may indicate an error condition?turbo-1 said:Actually, mathemeticians have found interesting uses for imaginary numbers (square root of a negative number). Consider the Mandelbrot set, which is defined in both real and imaginary-number coordinates.
The field of complex numbers (numbers that chart in both real and imaginary numbers) gives rise to some pretty useful stuff. Sir Roger Penrose gives a little layman-level insight on complex numbers here:Thor said:Has anyone considered the possibility that (sqrt -1) may indicate an error condition?
positivity and negativity are qualitative values, not quantitative. What is the sqrt of '+' or '-'?
Hurkyl said:I will agree that √+ and √- don't make sense.
But √(+1) does make sense, and so does √(-1) in the complex numbers.
"Negative" is a quality. "-1" is not a quality; it is an integer (or a rational number, or a real number, depending on the context -- the same symbol is used for each). "-" is neither a quality nor a quantity.
Just like "blue" is a quality, but "the blue pencil" is not a quality.
Incidentally, "-" does not "quality" a quantative value -- for any number x, there is no guarantee that -x is negative. (Though that is a common mistake)
Thor said:Math also breaches the domain of qualitative values when it uses ft and sec. . . ie 32ft/sec^2.
HOWEVER, if you isolate and analyze each term in an equation, the properties of "+" and "-" are, indeed qualifiers. Math also breaches the domain of qualitative values when it uses ft and sec. . . ie 32ft/sec^2. "|1|" is a number "Distance" is not - "Time" is not. Those terms QUALify the numeric value. Numeric values are fungible - you can just as well use two 1's in place of 2. No matter how you term "ft" you will never get "sec's" - they are QUALitaively different.
I agree with what you are saying regarding the lliguisticcharacter of math and its limitations. All conceptual or systematic systems are limited by their axioms. Once the axioms are set certain results or emergent properties of these axioms are determined. [I am starting a post on this idea in particular and am looking forward to others' insights]wildmandrake said:It is interesting that mathematicians are so evangelical about the universality of math, it is a symbolic language of description like any language. i admit is is special because it uses physical systems as its basis or at least the numerical relationships, but numbers and logic are limited and those limitations are important to the kind of things that system can handle. I am ignorant of modern algebra I'm just an average joe interested in understanding how the world works and I'm effected by the things people using math come up with. I'm not ignorant but my expertise, if i have any, is in the realm people not the technical sciences or theory associated with them. If mathematicians aren't looking at its limitations then they will be limited by them. As for other examples well I'll get back to you. I'm specifically interested in the possible connection between the big bang theory and math, because it seems to be where maths, physical laws break down.