numbers can be n-dimensional, using the same cheap hack technique used to produce imaginary numbers. if i is the square root of -1, then you could call j the arc tangent of -i. -i is outside the domain of the (complex) arc tangent, just as -1 is outside the domain of the square root function, so just like with i, you can just pretend that it isn’t outside the domain and just “defer” the calculation of j indefinitely. now you have three dimensions! imaginary imaginary numbers!
let k(x) = 1 if x is positive, and undefined if x is negative ⇒ 3 + 2i + 4j + 7 * k(-1)
let k2(x) = 1 if x is exactly 49.75, and otherwise undefined ⇒ 3 + 2i + 4j + 7 * k(-1) + 5 * k2(23)
etc…
or you could just it that you’re talking about vectors of numbers, and then show how those vectors can themselves be treated like numbers. ⇒ [3,2,4,7,5]
Imaginary numbers were given an unfortunate name, because mathematicians of the past thought they were impossible or simply a hack job way of solving real problems. These days we understand that numbers are actually 2-dimensional and that imaginary numbers are relevant to practical applications.
your current filter.Edited
numbers can be n-dimensional, using the same
cheap hacktechnique used to produce imaginary numbers. ifiis the square root of-1, then you could calljthe arc tangent of-i.-iis outside the domain of the (complex) arc tangent, just as-1is outside the domain of the square root function, so just like with i, you can just pretend that it isn’t outside the domain and just “defer” the calculation of j indefinitely. now you have three dimensions! imaginary imaginary numbers!let k(x) = 1 if x is positive, and undefined if x is negative⇒ 3 + 2i + 4j + 7 * k(-1)let k2(x) = 1 if x is exactly 49.75, and otherwise undefined⇒ 3 + 2i + 4j + 7 * k(-1) + 5 * k2(23)etc…
or you could just it that you’re talking about vectors of numbers, and then show how those vectors can themselves be treated like numbers.
⇒ [3,2,4,7,5]You can’t I’m not
Really here!
See me!”
You get a quite different meaning if you read it like this…
Buzzkillington mode activated-Imaginary numbers were given an unfortunate name, because mathematicians of the past thought they were impossible or simply a hack job way of solving real problems. These days we understand that numbers are actually 2-dimensional and that imaginary numbers are relevant to practical applications.
If anyone is interested in the topic, I’d suggest checking out the video series ““Imaginary Numbers are Real[](https://www.youtube.com/watch?v=T647CGsuOVU) by Welch Labs.
but i cant dream of something that dosent exists because laws of mathematics
||Dreams aren’t real either… ||
THEN WHY THE HELL DO I STILL SEE YOU IN MY NIGHTMARES?
I geddit
Edited
more imaginary number pone pls