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2006-09-23 19:21:51 · 14 answers · asked by Mohamed Jalil 1 in Science & Mathematics Mathematics

14 answers

You carve it on a really old and ugly tree......it is a dirty-tree (33)...see, it's that easy!

2006-09-23 19:24:35 · answer #1 · answered by daddydoggie 5 · 0 0

0 to the power of 0 is not equal to 33

2006-09-24 03:04:31 · answer #2 · answered by Aditi 2 · 0 0

x^0= 1 so no

2006-10-01 22:39:16 · answer #3 · answered by Luigi 3 · 0 0

0 to the 0 power should be undefined. Where did the 33 come from?

2006-09-24 02:37:19 · answer #4 · answered by PatsyBee 4 · 0 0

0 to the power 0 is what is called an indeterminite form, because as it stands in that form, it can attain any value from -infinity to +infinity. It is meaningless alone, but it can attain a value as a limit. The standard way to evaluate such a thing is using L'Hospital's rule.

An example would be limit(x -> 0) of x^x.
x^x = e^(ln(x^x)) = e^(xln(x)) and e^x is a continuous function, so we can pass the limit through the function.
lim(x->0) of xlnx = lim of (ln(x) / (1/x))
=lim of ((1/x) / (-1/(x^2))) by L'hospital
= lim of (-(x^2)/x) =lim of (-x) = 0
so lim of x^x = e^(lim of xln(x)) = e^0 = 1

2006-09-24 02:34:48 · answer #5 · answered by vinzklorthos 2 · 0 0

It does not equal 33.

2006-09-24 02:24:55 · answer #6 · answered by bruinfan 7 · 1 0

0^0 can be equal to anything between 0 and infinitely large numbers +ve or -ve.

In fact, 0^0 falls into a class of six so called "Indeterminate Types of Numbers":

0^0
0/0,
0 X Infinity,
[Infinity - Infinity],
[Infinity]/[Infinity],
[Infinity]^[Infinity].

Each of which could be equal to anything between 0 and infinitely large numbers +ve or -ve.

You should consult chapter on limits in some good book on Calculus.

2006-09-24 02:40:14 · answer #7 · answered by quidwai 4 · 0 1

Impossible.

2006-09-24 02:30:08 · answer #8 · answered by Anonymous · 0 0

it is a discontinuity point of the function
x^0
we can say that the trend is to 1

2006-09-24 02:30:27 · answer #9 · answered by fbianchi70 3 · 0 0

Put down the crack pipe.

2006-09-24 02:31:52 · answer #10 · answered by Joe C 3 · 0 0

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