cronodragon

01-04-2008, 09:19 PM

I know the division of a/(+-inf) = 0, and the division of a/0 = undefined, but what's the remainder? :S Can't find it anywhere!

Thanks for your help!

Thanks for your help!

View Full Version : remainder of division by zero and infinity??

cronodragon

01-04-2008, 09:19 PM

I know the division of a/(+-inf) = 0, and the division of a/0 = undefined, but what's the remainder? :S Can't find it anywhere!

Thanks for your help!

Thanks for your help!

arthurprs

01-04-2008, 09:54 PM

a/inf is = 0 (at least my professor says that)

cronodragon

01-04-2008, 10:32 PM

That's what I understand :D But what about the remainder?

Ñuño Martínez

02-04-2008, 08:38 AM

Undefined?

Rahakasvi

02-04-2008, 04:39 PM

I wondered whether I would say this, but I just can't be silent since i'm studying mathematics x)

In real number area there are no such numbers as "+inf" or "-inf", so therefore you can't divide a (let a be any real number) by "infinity"

What you are referring is, if you take function f(x)=a/x and take limit what happens, when you increase "x towards infinity" to the value of function, and you say:

a/x -> 0 when x -> oo.

Which is to be read a/x convergences towards zero, when x grows limitlessly.

And a/0 is not defined and it doesn't have a remainder..

btw if you take what happens when you have the same function f(x)=a/x and let x go towards zero from left side and you get

a/x -> oo, when x-> 0-

so when x go towards zero from left f(x) grows limitlessly.

Hope this helps.

In real number area there are no such numbers as "+inf" or "-inf", so therefore you can't divide a (let a be any real number) by "infinity"

What you are referring is, if you take function f(x)=a/x and take limit what happens, when you increase "x towards infinity" to the value of function, and you say:

a/x -> 0 when x -> oo.

Which is to be read a/x convergences towards zero, when x grows limitlessly.

And a/0 is not defined and it doesn't have a remainder..

btw if you take what happens when you have the same function f(x)=a/x and let x go towards zero from left side and you get

a/x -> oo, when x-> 0-

so when x go towards zero from left f(x) grows limitlessly.

Hope this helps.

cronodragon

02-04-2008, 05:09 PM

Thanks Rahakasvi. So it seems the remainder is equal to the quotient in both cases, that would confirm my suspects. :D

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