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#1 2006-10-03 15:56:03
- basmah
- Member
- Registered: 2006-10-02
- Posts: 18
Proof help needed!!!
There are two proofs that i need help in:
Q#1) Prove that in a given vector space V, the zero vector is unique
and
Q#2) Let V and W be two subspaces of a vector space U. Prove that the set
V + W = {u : u = v + w, where v V and w W}
is a subspace of U.
V = {(x,0) : x is a real number} and W = {(0,y) : y is a real number}.
** Bold = Vector and "" = "such that"
Last edited by basmah (2006-10-03 16:06:27)
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#2 2006-10-03 16:28:48
- George,Y
- Member
- Registered: 2006-03-12
- Posts: 1,379
Re: Proof help needed!!!
Suppose a zero vector is defined as such:
0+x=x
And suppose a=0 and b=0 at the same time.
then
a+b=a
a+b=b
thus a=b
For the second one, I forgot what makes a subspace. Maybe someone else could answer you.
X'(y-Xβ)=0
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