Level 7 Level 9
Level 8

Axioms (Rules) for Vector Space as a Nonempty Set


6 words 0 ignored

Ready to learn       Ready to review

Ignore words

Check the boxes below to ignore/unignore words, then click save at the bottom. Ignored words will never appear in any learning session.

All None

Ignore?
Closure Properties
if u is in V and v is in V, then u+v is in V
Existence Properties
There is such a zero vector in V such that u+0=u.
Distributive Properties
c(u+v)= cu+cv
Commutative
u+v=v+u
Associative Properties
(u+v)+w= u+(v+w)
1u= u
Multiplication scalar 1