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#26 2012-07-22 13:23:47

noelevans
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Re: 0^0 equals 1 or undefined?

Yes.  I see nothing wrong with that equality even if x=0.  It's the step
x^(1-1) = x^1 * x^(-1) that I have trouble with when x=0.  It appears to be applying the law of exponents x^(a+b) = x^a * x^b.  When x=0 and b=-1 the second factor is 0^(-1) which is what I have trouble with.  To me this is indicating the reciprocal of 0 (equivalent notationally to 1/0) which the multiplicative inverse axiom precludes.

Writing "pretty" math (two dimensional) is easier to read and grasp than LaTex (one dimensional).
LaTex is like painting on many strips of paper and then stacking them to see what picture they make.

#27 2012-07-22 13:49:09

anonimnystefy
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Re: 0^0 equals 1 or undefined?

Yes, it is applying that identity, which should be true for all x,a and b. But because this leads to division by zero, we rather leave 0^0 as undefined.

The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“A secret's worth depends on the people from whom it must be kept.” ― Carlos Ruiz Zafón

#28 2012-07-22 14:38:22

noelevans
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Re: 0^0 equals 1 or undefined?

Yes.  I agree that x^0 = x^(1-1) even if x=0.  It's the x^(1-1) = x^1 * x^(-1)  I have trouble with.
It appears to me that this is an application of the exponent rule x^(n+m) = x^n * x^m.  But when x=0 the right hand side has the factor 0^(-1) which to me indicates the reciprocal of zero which does not exist.  So it seems a law of exponents is being applied to an expression that has in it an undefined quantity.  That appears to me to be an invalid step.

Oops!  I thought post #26 got lost in hyperspace, so I redid it as #28.

Last edited by noelevans (2012-07-23 10:08:43)

Writing "pretty" math (two dimensional) is easier to read and grasp than LaTex (one dimensional).
LaTex is like painting on many strips of paper and then stacking them to see what picture they make.

#29 2012-07-22 14:45:27

anonimnystefy
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Re: 0^0 equals 1 or undefined?

It leads to an undetermined expression for x=0 so that means the starting expression is also undetermined for x=0.

The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“A secret's worth depends on the people from whom it must be kept.” ― Carlos Ruiz Zafón

#30 2012-07-23 09:10:51

cmowla
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Re: 0^0 equals 1 or undefined?

anonimnystefy wrote:

[...], so x^0=x^(1-1)=x/x. Now, when you want to see what 0^0 is, yo would get that it is the same as 0/0, which is indeterminate i.e. undefined.

JaneFairfax wrote:

Not that one. Here is the flawed step:

bossk171 wrote:

Compare that with this:

Also, http://mathworld.wolfram.com/ExponentLaws.html

anonimnystefy wrote:

Yes, it is applying that identity, which should be true for all x,a and b. But because this leads to division by zero, we rather leave 0^0 as undefined.

But by my argument (post #21), 0^0 can be defined to be either 0 or 1.  If it was undefined, then we couldn't add integers!

And I don't know about the argument

Since

is discontinuous at the origin,
is undefined

, which never goes through the origin.  And if you graph
, it has strange behavior not just at the origin.

#31 2012-07-23 10:47:13

noelevans
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Re: 0^0 equals 1 or undefined?

0/0 is symbolism in calculus for an indeterminate form, not for a number in the Reals.
Since 0 has no multiplicative inverse 0/0 which would come from the definition of division and the product of 0 with its reciprocal is NOT an ALLOWABLE construct in the field; that is, we shouldn't even be writing it and viewing it as if it might be a real number.

Also when defining fractions starting with the whole numbers W={0,1,2,3,...} they are typically defined by the set F = { p/q | p and q are whole numbers and q is not zero }.  There is no member of this set F that has a zero in the denominator.  To write 2/0 for example is to write something that is not a fraction.

But 0^0 as argued earlier is not equivalent to 0/0.  We are not then constrained to leave it out of our definition.  We can leave it out of our definition of exponentiation or make our defininition of
exponentiation include it.  If left out of the definition it remains undefined.  If we include it in our definition then one would hope that it would make sense.  Defining ... x^3=1*x*x*x,  x^2=1*x*x , x^1=1*x and following this "pattern" sensibly produces x^0 = 1 (multiplied by no x's).

I like 0^0 = 1 because as stated several times already it sure is CONVENIENT.  One convenience not mentioned before is that for expressions in algebra like (2x-1)^0, this equals 1 when x=1/2.  So we don't have to make an exception and say that (2x-1)^0 =1 EXCEPT when x=1/2.

Writing "pretty" math (two dimensional) is easier to read and grasp than LaTex (one dimensional).
LaTex is like painting on many strips of paper and then stacking them to see what picture they make.

#32 2012-07-23 21:53:29

anonimnystefy
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Re: 0^0 equals 1 or undefined?

My argument from the other topic, Don Blazys', applies here, too. If we remove the removable singularity, we won't get the same function.

The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“A secret's worth depends on the people from whom it must be kept.” ― Carlos Ruiz Zafón

#33 2012-12-15 16:12:38

julianthemath
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Re: 0^0 equals 1 or undefined?

Buy 1 for \$1, for \$0.50, for \$3, for \$2.50, for \$1.25, for \$0.25, and for \$5.

#34 2012-12-15 21:58:52

anonimnystefy
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Re: 0^0 equals 1 or undefined?

There is no reason to put that into hide tags...

The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“A secret's worth depends on the people from whom it must be kept.” ― Carlos Ruiz Zafón

#35 2013-01-27 03:53:42

n872yt3r
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Re: 0^0 equals 1 or undefined?

I consider -0 infinity, because it is beyond definition and 0^0 is the same.

- n872yt3r
Math Is Fun Rocks!
By the power of the exponent, I square and cube you!

#36 2013-01-27 14:01:46

bobbym

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Re: 0^0 equals 1 or undefined?

The best exaplnation is right here

0^0 = 1

In mathematics, you don't understand things. You just get used to them.
Probability is the most important concept in modern science, especially as nobody has the slightest notion what it means.
90% of mathematicians do not understand 90% of currently published mathematics.

#37 2013-02-07 20:23:13

anonimnystefy
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Re: 0^0 equals 1 or undefined?

The "cleverest" student is also erring, because, just because the limit is 1 at that point, doesn't mean that the value of that function at that point is 1.

Here is a great explanation of why 0^0 is undefined... Problems with zero by numberphile.

The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“A secret's worth depends on the people from whom it must be kept.” ― Carlos Ruiz Zafón

#38 2013-02-07 20:26:10

bobbym

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Re: 0^0 equals 1 or undefined?

I have to disagree, it is not undefined. It is defined as 1 for convenience.

In mathematics, you don't understand things. You just get used to them.
Probability is the most important concept in modern science, especially as nobody has the slightest notion what it means.
90% of mathematicians do not understand 90% of currently published mathematics.

#39 2013-02-07 20:32:03

anonimnystefy
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Re: 0^0 equals 1 or undefined?

Who says so?

Did you watch that video I just posted?

The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“A secret's worth depends on the people from whom it must be kept.” ― Carlos Ruiz Zafón

#40 2013-02-07 20:35:42

bobbym

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Re: 0^0 equals 1 or undefined?

Hi;

The mathematician said so, you obviously did not read the link I gave. Now why would I go and confuse myself by hearing what some amateur does not like about the definition?

In mathematics, you don't understand things. You just get used to them.
Probability is the most important concept in modern science, especially as nobody has the slightest notion what it means.
90% of mathematicians do not understand 90% of currently published mathematics.

#41 2013-02-07 20:38:03

bob bundy
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Re: 0^0 equals 1 or undefined?

Hi Stefy

I say so.

http://www.mathisfunforum.com/viewtopic … 62#p252062

Post 29.

I wrote:

It is occasionally useful to define an expression as having a certain value because the formulas work better that way.

Bob

You cannot teach a man anything;  you can only help him find it within himself..........Galileo Galilei

#42 2013-02-07 20:51:04

anonimnystefy
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Re: 0^0 equals 1 or undefined?

Hm, okay then. But what are the privileges of defining 0.999... to "exist" as a mathematical concept and be equal to 1?

The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“A secret's worth depends on the people from whom it must be kept.” ― Carlos Ruiz Zafón

#43 2013-02-07 20:54:34

bobbym

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Re: 0^0 equals 1 or undefined?

For one thing we would have to replace the geometric sum with some other answer. Pretty messy!

In mathematics, you don't understand things. You just get used to them.
Probability is the most important concept in modern science, especially as nobody has the slightest notion what it means.
90% of mathematicians do not understand 90% of currently published mathematics.

#44 2013-02-07 20:58:22

anonimnystefy
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Re: 0^0 equals 1 or undefined?

Like what?

The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“A secret's worth depends on the people from whom it must be kept.” ― Carlos Ruiz Zafón

#45 2013-02-07 21:04:39

bobbym

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Re: 0^0 equals 1 or undefined?

Hi;

Please evealuate this sum using the rule for geometric sums.

Hint

In mathematics, you don't understand things. You just get used to them.
Probability is the most important concept in modern science, especially as nobody has the slightest notion what it means.
90% of mathematicians do not understand 90% of currently published mathematics.

#46 2013-02-07 21:12:59

anonimnystefy
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Re: 0^0 equals 1 or undefined?

Last edited by anonimnystefy (2013-02-07 21:14:13)

The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“A secret's worth depends on the people from whom it must be kept.” ― Carlos Ruiz Zafón

#47 2013-02-07 21:16:45

bobbym

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Re: 0^0 equals 1 or undefined?

Yes, so we would have do away with this:

Want to see a reason why we need 0^0 = 1?

In mathematics, you don't understand things. You just get used to them.
Probability is the most important concept in modern science, especially as nobody has the slightest notion what it means.
90% of mathematicians do not understand 90% of currently published mathematics.

#48 2013-02-07 21:20:13

anonimnystefy
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Re: 0^0 equals 1 or undefined?

No, the 0^0 is okay.

0.999... isn't. Making 0.999... barred from mathematics makes as much sense as making it equal to 1

The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“A secret's worth depends on the people from whom it must be kept.” ― Carlos Ruiz Zafón

#49 2013-02-07 21:22:11

bobbym

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Re: 0^0 equals 1 or undefined?

You did not understand.

Which you have already said was 1 because of the sum of a geometric series.

In mathematics, you don't understand things. You just get used to them.
Probability is the most important concept in modern science, especially as nobody has the slightest notion what it means.
90% of mathematicians do not understand 90% of currently published mathematics.

#50 2013-02-07 21:25:05

anonimnystefy
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Re: 0^0 equals 1 or undefined?

No, that sum is 1.

The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“A secret's worth depends on the people from whom it must be kept.” ― Carlos Ruiz Zafón