… That’s enough real analysis for me today. Or ever, really.
… That’s enough real analysis for me today. Or ever, really.
You mean like when divorced parents agree not to fight around their child? I don’t see what could go wrong.
Sure, why not.
dons bib
Better the tester than a user.
Construct more pylons
“Orange juice, purple stuff… Sunny D Vodka! Thanks, mom!”
He was the son of Godzilla, after all.
“Dear God, he’s doing H.M.S. Pintafore. We have to leave. Now!”
I don’t see the contradiction.
╭∩╮/ᐠ。ꞈ。ᐟ\╭∩╮
Edit: He hopes you can see it, because he’s doing it as hard as he can.
Cool, but to make room for the cats I had to flush all my snakes down the toilet. Am I doing this right?
So he’s the reason we are in a drought.
https://lemmy.world/pictrs/image/80d060a0-9f1b-4779-b458-0d28ae8a5473.jpeg
(Do it even harder.jpg)
Basically this
Edit: un-embedded the image cause it was tacky
There are only 2 kinds of people I can’t stand. Those intolerant of other’s cultures, and the Dutch.
Is this something I can do? Yes.
Will I find a way mess it up? Also yes.
Shiiit, man. That honky mofo messin’ mah old lady–got to be runnin’ cold upside down his head, you know?
How do you devil it?
For how long
I’ll give it a shot.
We can use vector spaces for thinking about things that aren’t primarily concerned with physical space like we are in Blender. Let’s imagine something practical, if a bit absurd. Pretend we have unlimited access to three kinds of dough. Each has flour, water, and yeast in different ratios. What we don’t have is access to the individual ingredients.
Suppose we want a fourth kind of dough which is a different ratio of the ingredients from the doughs we have. If the ratios of the ingredients of the three doughs we already have are unique, then we are in luck! We can make that dough we want by combining some amount of the three we have. In fact, we can make any kind of dough that is a combination of those three ingredients. In linear algebra, this is called linear independence.
Each dough is a vector, and each ingredient is a component. We have three equations (doughs) in three variables (ingredients).
This is a three dimensional vector space, which is easy to visualize. But there is no limit to how many dimensions you can have, or what they can represent. Some economic models use vectors with thousands of dimensions representing inputs and outputs of resources. Hopefully my explanation helps us see how vectors can sometimes be more difficult to imagine as directions and magnitudes.