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#1 2007-11-01 03:43:45
- deepz
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- Registered: 2007-03-20
- Posts: 10
linear algebra
Let u,v and w be vectors in a vector space. Prove that if u+v=w+v then u=w.
I think its something to do using the cancellation law along with the zero element and inverse axioms of vector spaces. Can someone help me clarify this, thanks!
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#2 2007-11-01 04:12:57
- JaneFairfax
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- Registered: 2007-02-23
- Posts: 6,868
Re: linear algebra
Add the vector −v to both sides, and then use the associative law. This is how you prove the cancellation law for groups in general. Remember that vectors in a vector space form an Abelian group under vector addition.
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#3 2007-11-01 04:40:08
- mikau
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- Registered: 2005-08-22
- Posts: 1,504
Re: linear algebra
one of the rules for a vector space is that for any element v of a vectorspace V there must be an ellement -v in V such that v + (-v) = 0 or the Zero element (we make a distinction between the zero element and the number zero)
so yeah, as jane said, if you have u+v = w + v, then clearly u+v + (-v) = v + w + (-v) so u + 0 = w + 0 so u = w.
A logarithm is just a misspelled algorithm.
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