fucking math course taught me about integrals, shell washer methods etc. fuckin blah blah partials. so what can i do now ? how do i develop a theory, how can i use it on image processing, various algorithms etc. why the fuck did i just learn it, i want to use it !
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Anonymous2013-01-21 10:26
look at convex hulls and knuth and shit like that bro
I don't care about its usage, but I want to learn it. It's embarrassing how my shitty pocket calculator can integrate and derive, but I can't program a program that can.
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42013-01-21 14:02
Also Riemann zeta function, or gamma function over the entire complex plane. How?
intergrals are part of set theory, they go together with infinitesimals.
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Anonymous2013-01-21 14:10
>>7
I want to be able to make a program some day that can fuck around with abstract functions like sin/cos in a way that it can find limits using infinitesimals.
Please take a course on multivariate calculus. The applications will be much more obvious.
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42013-01-21 15:11
OK, so I just read some Wikipedia. Quick question, since real*infinitesimal=infinitesimal, does it mean infinitesimal^2 moves down its "cardinality" from "infinitesimal", and does the same work with infinities? Or is infinitesimal^2 just infinitesimal? If the former, it means I just need to assign a "cardinality value" to my numbers and then perform the calculations normally, increasing or decreasing the cardinality when multiplying and dividing?
Am I starting to get it, or was what I just typed complete bullshit?
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Anonymous2013-01-21 15:42
>>11,12
Sure, you people are fucking boring, but are you Abelson boring?
>>15
When will you high school fagshits stop thinking concepts are numbers? No, infinity is not a number.
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Anonymous2013-01-21 15:54
>>17
Shut your whore mouth and burn in a fire if you don't even understand what is being talked about.
I presume you don't know jack shit about calculus, dear retard? Thought so.
In non-standard analysis, a hyperinteger N is a hyperreal number equal to its own integer part. A hyperinteger may be either finite or infinite. A finite hyperinteger is an ordinary integer. An example of an infinite hyperinteger is given by the class of the sequence (1,2,3,...) in the ultrapower construction of the hyperreals.
i don't follow
mathematical Revelation #0 0 / 0 = infinity
therefore infinity is not even scalar..? it's an unbounded vector // an infinite set
0 * x = 0 (for all logical x)
...and there probably are an infinite number of infinite sets (fractions of infinity are still infinite? but not equal to infinty!), ie all even/odd numbers? In order to compare sizes of infinite sets, (illogical!) make them finite? eg base infinite set > even infinite set in range (0-100)... =)
>>30
the computer you are using would have been impossible without the numerous essential contributions of jews to mathematics, physics and computer science.
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Anonymous2013-01-22 16:04
jewish mathematics aren't necessary to build computers.