- #1
Lord Anoobis
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Hello there. I'm currently trying to come to terms with the aforementioned topics. As I am self studying, a full understanding of these concepts escapes me. There's something I'm not grasping here and I would like to discuss these to clear away the clouds.
As I understand it, a basis for some vector space ##R^n## can be taken to be any set of ##n## linearly independent vectors, in other words an alternate set of axes as opposed to the usual ##(1,0,...,n),(0,1,0,...,n)## , etc. Correct?
So, in a sense it can be thought of as analogous to a Galilean transformation for relative motion?
As I understand it, a basis for some vector space ##R^n## can be taken to be any set of ##n## linearly independent vectors, in other words an alternate set of axes as opposed to the usual ##(1,0,...,n),(0,1,0,...,n)## , etc. Correct?
So, in a sense it can be thought of as analogous to a Galilean transformation for relative motion?
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