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Dividing by zero
#41
RE: Dividing by zero
Is zero even really a number?
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#42
RE: Dividing by zero
It's not the absence of a number . . .


Thinking
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#43
RE: Dividing by zero
(August 10, 2013 at 10:43 am)Stimbo Wrote: Ow, my brain...
Believe me Stimbo I know the feeling.
[Image: Stare_130bf5_580776.jpg]
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#44
RE: Dividing by zero
(August 10, 2013 at 2:57 am)Tea Earl Grey Hot Wrote: I'm not a math wiz. Why is it you can multiply by zero and get zero but you can't divide by zero?

Why doesn't 1/0 equal 0 but 1*0 does? Is there a reason or is it arbitrary?

One minus one divided by one minus one.

Did it! :-)
He who loves God cannot endeavour that God should love him in return - Baruch Spinoza
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#45
RE: Dividing by zero
[Image: fBHw5Se.jpg]
Luke: You don't believe in the Force, do you?

Han Solo: Kid, I've flown from one side of this galaxy to the other, and I've seen a lot of strange stuff, but I've never seen *anything* to make me believe that there's one all-powerful Force controlling everything. 'Cause no mystical energy field controls *my* destiny. It's all a lot of simple tricks and nonsense.
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#46
RE: Dividing by zero
Can't we simply say that dividing by zero is an abomination unto God, and leave it at that???

...damn, wrong forum.

One comment though (I hope noone made it yet):

What one can and cannot do is always a question of definitions.
One can for example extend the field of real numbers with "+" and "*" as operations by a quantity called infinity,

http://en.wikipedia.org/wiki/Alexandroff_extension

and then declare that by definition to be the value of x/0 (though what is 0/0 then...). The problem is that no matter how one defines x/0 in one's extension of the real numbers, one invariably loses cherished properties of the field of real numbers which one would like to preserve in order to do calculations with it - such as every number having a unique inverse with respect to "+" and "*".

So I'd rephrase the question slightly from

"why can't I divide by zero"

to

"Can't I consistently define the division by zero in some generalization of the field of real numbers without losing certain properties?".

The latter is a well-defined question which can be proven, and the answer is: no, you can't.


(October 1, 2013 at 12:20 pm)little_monkey Wrote: Taking limits is a concept invented in the 17th century. By now, it's really kindergarten stuff compared to complex integration and Residue theory.

Residue theory was invented in the 19th century. It's also kindergarten stuff compared to the things invented in the 20th century. Algebraic topology anyone? Big Grin
The fool hath said in his heart, There is a God. They are corrupt, they have done abominable works, there is none that doeth good.
Psalm 14, KJV revised edition

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#47
RE: Dividing by zero
Alex K returns! Welcome back! :-)
He who loves God cannot endeavour that God should love him in return - Baruch Spinoza
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#48
RE: Dividing by zero
(September 7, 2014 at 12:42 pm)Pickup_shonuff Wrote: Alex K returns! Welcome back! :-)

Thanks, I appreciate it. Personal matters kept me away for a while...

Hmmm, why do I suddenly crave a nice cohiba?
The fool hath said in his heart, There is a God. They are corrupt, they have done abominable works, there is none that doeth good.
Psalm 14, KJV revised edition

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#49
RE: Dividing by zero
Here's a little trick I like to play on people, many of you have probably seen it before.

Given

a = b

Multiply both sides by a

a^2 = ab

Subtract b^2 from both sides

a^2 - b^2 = ab - b^2

Factorize both sides, LHS is difference of two squares.

(a+b)(a-b) = b(a-b)

Cancel out the (a-b) on both sides

(a+b) = b

But since a=b

b+b = b

2b = b

Cancel out the b on both sides

2 = 1
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#50
RE: Dividing by zero
(September 8, 2014 at 3:37 am)robvalue Wrote: Here's a little trick I like to play on people, many of you have probably seen it before.

Given

a = b

Multiply both sides by a

a^2 = ab

Subtract b^2 from both sides

a^2 - b^2 = ab - b^2

Factorize both sides, LHS is difference of two squares.

(a+b)(a-b) = b(a-b)

Cancel out the (a-b) on both sides

(a+b) = b

But since a=b

b+b = b

2b = b

Cancel out the b on both sides

2 = 1

[Image: 1.jpg]
Luke: You don't believe in the Force, do you?

Han Solo: Kid, I've flown from one side of this galaxy to the other, and I've seen a lot of strange stuff, but I've never seen *anything* to make me believe that there's one all-powerful Force controlling everything. 'Cause no mystical energy field controls *my* destiny. It's all a lot of simple tricks and nonsense.
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