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They keep digging that hole deeper (lemmy.world)

submitted 2 months ago by The_Picard_Maneuver@lemmy.world to c/memes@lemmy.world

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[–] SubArcticTundra@lemmy.ml 2 points 2 months ago (3 children)

I never got why they didn't just introduce tuples in maths

[–] MacNCheezus@lemmy.today 11 points 2 months ago

They did, linear algebra and vector calculus are a thing, but complex numbers have certain properties that you don’t get with vectors and that are quite useful and worth studying.

[–] kogasa@programming.dev 4 points 2 months ago (1 children)

One definition of the complex numbers is the set of tuples (x, y) in R^(2) with the operations of addition: (a,b) + (c,d) = (a+c, b+d) and multiplication: (a,b) * (c,d) = (ac - bd, ad + bc). Then defining i := (0,1) and identifying (x, 0) with the real number x, we can write (a,b) = a + bi.

[–] SubArcticTundra@lemmy.ml 1 points 2 months ago (1 children)

Ok, that's actually quite interesting

[–] kogasa@programming.dev 2 points 2 months ago* (last edited 2 months ago)

Yup, you'll notice the only thing distinguishing C from R^(2) is that multiplication. That one definition has extremely broad implications.

For fun, another definition is in terms of 2x2 matrices with real entries. The identity matrix

1 0
0 1

is identified with the real number 1, and the matrix

0 1
-1 0

is identified with i. Given this setup, the normal definitions of matrix addition and multiplication define the complex numbers.

[–] Arrkk@lemmy.world 2 points 2 months ago

For various math reasons you only get consistent systems with 2^n dimensions, so after complex you get quaternions with 4, then the next one that works is 8, then 16, etc. They become less useful because you lose various useful features, like you lose commutabiliy with quaternions (eg ab != ba), and every time you double you lose more things.