12-240/Classnotes for Tuesday October 2: Difference between revisions

From Drorbn
Jump to navigationJump to search
Line 14: Line 14:
First direction:
First direction:


if a non-empty subset W ⊂ V is a subspace , then W is a vector space over the operations of V .
if a non-empty subset W ⊂ V is a subspace , then W is a vector space over the operations of V .


=> + W is closed under the operations of V.
=> + W is closed under the operations of V.


+ W has a unique identity of addition: <math>\forall\!\,</math> a <math>\in\!\,</math> W: 0 + a = a
+ W has a unique identity of addition: <math>\forall\!\,</math> a <math>\in\!\,</math> W: 0 + a = a

Moreover, a a <math>\in\!\,</math> V. Hence 0 is also identity of addtition of V



Second direction
Second direction

Revision as of 11:58, 4 October 2012

The "vitamins" slide we viewed today is here.

Today, the professor introduces more about subspace, linear combination, and related subjects.


Subspace

Remind about the theorem of subspace: a non-empty subset W ⊂ V is a subspace iff is is closed under the operations of V and contain 0 of V

Proof:

First direction:

if a non-empty subset W ⊂ V is a subspace , then W is a vector space over the operations of V .

=> + W is closed under the operations of V.

+ W has a unique identity of addition:  a  W: 0 + a = a

Moreover, a a V. Hence 0 is also identity of addtition of V


Second direction

if a non-empty subset W ⊂ V is closed under the operations of V

we need to prove that

Class Notes