Question

how do i determine whether the following vectors are linearly independent in R^2x2
[1101]
,
[0010]
..these two are adjacet btw like &
[1001],[0010],[2032]

Answer 1

correction
1 0 0 1
1 1, 0 0

Answer 2

and
1 0 , 0 1, 2 3
0 1, 0 0, 0 2

Answer 3

if you stack them and take the determinate; if its 0 they are ... well, i cant recall if its dependant or independant but it has somehting to do with that

Answer 4

somebody had said if i can write one of those matrices a a linear combination of the others they are not linearly index...but i have not the slightest clue what that means

Answer 5

if you can use simple vectors to create another vector, then the created vector depends on the simpler ones ...

Answer 6

what are the vectors the 1,0 0,1 vertically? is each matrix a vector by itself or the single colums in them?

Answer 7

rows and columns are vectors inside a matrix

Answer 8

so do i try creating other vectors from the scalars r one matrix verses another?

Answer 9

that i dont know, gonna take the linear algebra next semester tho ;)

Answer 10

have fun -_- sarcasm at its best lol

Answer 11

im still trying to get a handle on the whole linear dependant, independant stuff; and why it would be important to begin with.

Answer 12

im just trying to understand this worksheet i have for when i get finals in december

Answer 13

i wish you luck ;)