is your point that not every set that is closed under linear combinations (and non empty) forms a vector space? i.e a set of 3x3 matrices? That seems to be what you're implying here and here , But then here you say that sets of matrices do form vector spaces
/fglt/ - Friendly GNU/Linux Thread
Mason Wilson
Adam Sanchez
Yeah I'm thinking might be because I enabled the backports and couple other repos. Oh yeah forgot I installed nvidia driver right from the nvidia website. Didnt come in a deb package or anything. Maybe that wiped out some the packages that are supposed to be there.
Anthony Johnson
So I have installed ubuntu on a usb with persistence. Now that I booted it up in live mode I wanted to check something from my computer's hdds. But they don't show for some reason. Even
sudo fdisk -l doesn't show them. The only thing I can see is the usb itself. Any ideas ?
Nolan Rivera
What shows for lsblk
Jacob Allen
How to install Linux in Android???
Christian Butler
Close your eyes and make a wish.
Benjamin Allen
>is your point that not every set that is closed under linear combinations (and non empty) forms a vector space?
Yes.
>But then here you say that sets of matrices do form vector spaces
Under addition. A vector space is formed by the combination of elements and operations.
If you add matrices together then they form a vector space. If you pick some other operation (such as matrix multiplication) then they might not.
Wyatt Wilson
>comes to gnu/linux thread
>posts gnu
might as well have bsd in here. make your own thread
Adrian Gonzalez
what is the most common desktops (not distributions) used in universities, in offices, at home, etc.
is there a "Best" desktop?
i mean xfce vs kde vs gnome etc
Gabriel Baker
my college just uses the dafault one that comes with ubuntu (yeah i know lol )
aint nobody got time to be installing custom DE's on 1000 computers