You are not logged in.
Pages: 1
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"
Offline
The theorem that we need here is this:
If W is a set of one or more vectors from a vector space V, then W is a subspace of V iff:
Here we need to show that:
and:
For the first one:
Using the definitions of V and W:
(where s, t, x, y, are real numbers)
This addition simplifies to merely:
Now to show:
We let
(By the properties of real numbers)
Therefore:
So the first part is complete.
Now must show that:
which is pretty much the same process, except the truth of that depends on the fact that k(x, y) = (kx, ky) and by the properties of real numbers, (kx, ky) is an element of (V + W).
I hope I'm going about this the right way, this is sort of simple yet confusing.
Offline
o yaa it kind of make sense now....thanks much!!!
Offline
Pages: 1