Chuck Norris talks about his fact site

Guest · Post by **Guest** » Tue Mar 14, 2006 2:08 pm

duffman91 wrote:
ToxicBug wrote:
andyman wrote: Because Chuck Norris counted to infinity. Twice.
LOL

too bad infinity is not a number

Infinity is not a real number but may be considered part of the extended real number line, in which arithmetic operations involving infinity may be performed.
You're right, infinity is not a number. But use INFINITY in Calculus to find ABSOLUTES!

The point is that you can't count to infinity, because no matter how fast you count, you will be counting forever and ever

In calculus you don't "use" infinity, when you find a limit for example you define some number that approaches infinity, but isn't "infinity".

Post by **andyman** » Tue Mar 14, 2006 2:20 pm

ToxicBug wrote:
duffman91 wrote:
ToxicBug wrote: LOL

too bad infinity is not a number

Infinity is not a real number but may be considered part of the extended real number line, in which arithmetic operations involving infinity may be performed.
You're right, infinity is not a number. But use INFINITY in Calculus to find ABSOLUTES!
The point is that you can't count to infinity, because no matter how fast you count, you will be counting forever and ever

In calculus you don't "use" infinity, when you find a limit for example you define some number that approaches infinity, but isn't "infinity".

Well Chuck Norris did. And then did it again.

Post by **MKJ** » Tue Mar 14, 2006 2:23 pm

and thats kindof the joke, innit?

Guest · Post by **Guest** » Tue Mar 14, 2006 2:30 pm

andyman wrote:
ToxicBug wrote:
duffman91 wrote: You're right, infinity is not a number. But use INFINITY in Calculus to find ABSOLUTES!
The point is that you can't count to infinity, because no matter how fast you count, you will be counting forever and ever

In calculus you don't "use" infinity, when you find a limit for example you define some number that approaches infinity, but isn't "infinity".
Well Chuck Norris did. And then did it again.

He must be counting to infinity infinitely fast. Then this is interesting

Post by **MKJ** » Tue Mar 14, 2006 2:51 pm

toxic, a question for you

0 x infinity = what ?

Post by **Fender** » Tue Mar 14, 2006 3:01 pm

TB's IQ: 0 + 99i

Post by **R00k** » Tue Mar 14, 2006 3:25 pm

Infinity's new definition from this point forward: The number of times ToxicBug would post a retarded statement if he were to live forever.

No value in the physical universe can ever reach this limit, only approach it.

Post by **R00k** » Tue Mar 14, 2006 4:14 pm

I've got a calculus problem for you, TB.

Try solving for 'm' on the curve of knowledge you've gained since you started University, at points [1,0] [2,0] [3,0] and [4,0].

Notice anything amiss?

Guest · Post by **Guest** » Tue Mar 14, 2006 4:29 pm

R00k wrote:I've got a calculus problem for you, TB.

Try solving for 'm' on the curve of knowledge you've gained since you started University, at points [1,0] [2,0] [3,0] and [4,0].

Notice anything amiss?

oh good one :icon29:

Post by **Canis** » Tue Mar 14, 2006 4:30 pm

1 + 2 = 5

Guest · Post by **Guest** » Tue Mar 14, 2006 4:31 pm

MKJ wrote:toxic, a question for you

0 x infinity = what ?

its an indeterminant form. just like 1^infinity, 0/0 and infinity/infinity. If you take a limit as x

infinity then it will depend on the example. A good example of 0/0 (ie 0*inf depending how you write it) would be the limit of sin(x)/x as x

0.

Post by **l0g1c** » Tue Mar 14, 2006 6:53 pm

ToxicBug wrote:
MKJ wrote:toxic, a question for you

0 x infinity = what ?
its an indeterminant form. just like 1^infinity, 0/0 and infinity/infinity. If you take a limit as x infinity then it will depend on the example. A good example of 0/0 (ie 0*inf depending how you write it) would be the limit of sin(x)/x as x 0.

Indeterminate :icon26:

Post by **duffman91** » Tue Mar 14, 2006 8:12 pm

ToxicBug wrote:
The point is that you can't count to infinity, because no matter how fast you count, you will be counting forever and ever

In calculus you don't "use" infinity, when you find a limit for example you define some number that approaches infinity, but isn't "infinity".

Trust me, you don't have to tell me that. I'm obviously refering to limits, euler sums, and integrals.

Guest · Post by **Guest** » Tue Mar 14, 2006 8:20 pm

duffman91 wrote:
ToxicBug wrote:
The point is that you can't count to infinity, because no matter how fast you count, you will be counting forever and ever

In calculus you don't "use" infinity, when you find a limit for example you define some number that approaches infinity, but isn't "infinity".
Trust me, you don't have to tell me that. I'm obviously refering to limits, euler sums, and integrals.

I know that you're an engineer :icon14:

Post by **MKJ** » Tue Mar 14, 2006 9:22 pm

ToxicBug wrote:
MKJ wrote:toxic, a question for you

0 x infinity = what ?
its an indeterminant form. just like 1^infinity, 0/0 and infinity/infinity. If you take a limit as x infinity then it will depend on the example. A good example of 0/0 (ie 0*inf depending how you write it) would be the limit of sin(x)/x as x 0.

gg

+1 smarts

Guest · Post by **Guest** » Tue Mar 14, 2006 9:38 pm

MKJ wrote:
ToxicBug wrote:
MKJ wrote:toxic, a question for you

0 x infinity = what ?
its an indeterminant form. just like 1^infinity, 0/0 and infinity/infinity. If you take a limit as x infinity then it will depend on the example. A good example of 0/0 (ie 0*inf depending how you write it) would be the limit of sin(x)/x as x 0.
gg
+1 smarts

By the way, if you would like to know the limit of sin(x)/x as x

0, you can find it by using L'Hopital's rule, ie when the limit f(x)/g(x) is in a 0/0 or inf/inf form, it equals to f'(x)/g'(x).

f'(x) = d/dx sin(x) = cos(x)
g'(x) = d/dx x = 1

Therefore the limit of sin(x)/x as x

0
= lim x->0 cos(x)/1
= cos(0)/1
= 1/1
= 1

So the limit of sin(x)/x as x

0 is 1.