zero has no value?

Talk to my banker. He can help.

Check out this site.. has a lot about the value of zero! http://everythingforever.com/st_math.htm

There are 10 kinds of people in the world; those who know binary and those who don't.

It is one less than the value of one.

Nothing, rien de tous, nulo. However it is an extremely powerful place holder. In the number 10,123,123 it turns 10 into 10 million.

The value of zero can be huge if at a casino you play roulette, bet on zero and are the only one who won.

In Scrabble the value of zero is 13. Z = 10 E = 1 R = 1 O = 1

The value of zero is (1/5). Nothing (2/5). Living Zero ( 0 ) = Being Zero (0_) = (0+) (3/5). Dead Zero ( 0 ) = Not-being Zero (_0) = (0-) (4/5). Positive Zero (+0) (5/5). Negative Zero (-0) 4 images are explanations.

The value of zero is (1/5). Nothing (2/5). Living Zero ( 0 ) = Being Zero (0_) = (0+) (3/5). Dead Zero ( 0 ) = Not-being Zero (_0) = (0-) (4/5). Positive Zero (+0) (5/5). Negative Zero (-0) 4 images are explanations.

What is the value of zero ? The value of zero is (1/5). Nothing (2/5). Living Zero ( 0 ) = Being Zero (0_) = (0+) (3/5). Dead Zero ( 0 ) = Not-being Zero (_0) = (0-) (4/5). Positive Zero (+0) (5/5). Negative Zero (-0) 4 images are explanations.

place

Zero makes an excellent placeholder. If you're not sure the value of a good placeholder, spend Thanksgiving night in front of BestBuy drinking WAY too much coffee.

Zero has the value of the place it occupies. In the number 100 it displaces the number 1 by two places, the ones and the tens columnes. In fractions it reduces this value.

LB246. Endless Circulation of [ Living Zero ( 0 ) ] and [ Dead Zero ( 0 ) ] in life. ---> Image ---> http://www.flickr.com/photos/trapassing/3488368076/ [ Definition of Zero ( 0 ) ] [ Zero ( 0 ) ] = [ We have no (Partial Fortune and Debt) ], on Economy [ Zero ( 0 ) ] = [ Extinguishment of Obligations ], on Law of Obligations [ Zero ( 0 ) ] = [ There is no Number ], on Arithmetic October 01 2009 -> [ Living Zero ( 0 ) ] = [ (0_) ] In pockets, [ (Money $1) + (Document of Debt in $1) ] October 02 2009 -> [ Dead Zero ( 0 ) ] = [ (_0) ] In pockets, [ Pay a Debt in $1 ] = [ We have no (Partial Fortune and Debt) ] October 03 2009 -> [ Living Zero ( 0 ) ] = [ (0_) ] If we borrow $1, have money $1 and Debt $1. In pockets, [ (Money $1) + (Document of Debt in $1) ] October 04 2009 -> [ Dead Zero ( 0 ) ] = [ (_0) ] In pockets, [ Pay a Debt in $1 ] = [ We have no (Partial Fortune and Debt) ] October 05 2009 -> [ Living Zero ( 0 ) ] = [ (0_) ] If we borrow $1, have money $1 and Debt $1. In pockets, [ (Money $1) + (Document of Debt in $1) ] [^^^] = Endless Circulation of [ Living Zero ( 0 ) ] and [ Dead Zero ( 0 ) ] in life. = Fortune(Money) and debt change hands.

The eventual valule of any monetary system's currency which fail's to protect it

More than -1 less than 1

Sunya(0_) and Kha(_0) of Brahmagupta http://coupdetat.net/Wushu_Sunya_Zero/Sunya_and_Kha_of_Brahmagupta.png http://coupdetat.net/Wushu_Sunya_Zero/Sunya_and_Kha_of_Brahmagupta.html

There is nothing as absolute zero. zero is an minimal value beyond which numerical value tends to negative. since we can't find the minimal value (when the system consider is universe) we assume that zero has no value for our comfortableness. But in our universe there is no absolute nothing. For example; since 1 is after zero dividing or decreasing the value 1 will lend to zero. But when u divide 1 with any number it only tends to zero but not zero.

nothing its just a place holder

No value. The value exactly between -1 and 1.

To allow greater than 9 peace

In mathematics, zero does not *have* a value. Zero *is* a value. It could be, for instance a value for a function or for a variable. "In mathematics, value commonly refers to the 'output' of a function. In the most basic case, that of unary, single-valued functions, there is one input (the argument) and one output (the value of the function). Example: If the function f is defined by prescribing that f(x) = 2x^2 − 3x + 1 for each real number x, then the input 3 will yield the function value 10 (since indeed 2 · 3^2 – 3 · 3 + 1 = 10). The function f of the example is real-valued, since each and every possible function value is real. On the other hand, it is not injective, since different inputs may yield the same value; e.g., f( − 1.5) = 10, too. In some contexts, for convenience, functions may be considered to have several arguments and/or several values; also cf. the discussion in the article function. However, strictly seen, this is not an extension, since such functions may be considered as having single families and/or sets as input or output. Value is also used in other senses, e.g., to specify a certain instance of a variable. Example: f(x) = 0 for two separate values of x, namely, for x = 0.5 and for x = 1." Source and further information: http://en.wikipedia.org/wiki/Value_(mathematics%29

As a concept, the value of zero is immeasurable. Now I'm not talking about what zero represents here, but the fact that we have a concept of zero itself. Nearly all technological advances we enjoy today are grounded in mathematics. Had no one ever conceived the zero as a placeholder, we could not have developed efficient and systematic numerical systems -- most especially, base 10. Without zero, mathematics would still be a primitive and highly inefficient practice. You can also bet our understanding of all things scientific would be dismal without modern mathematics.

value of zero varies form minus one plus one

it does not have any value