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| − | = | + | = Statement: I am going to show that if V is a subspace of R<sup>n</sup>. then dim(V)+dim(V<sup>orth</sup>)=n<br> = |
| + | Because of the lack of the orthagonal symbol in the wikipedia formatting page, I will be type 'orth' in a superscript to symbolize that. | ||
| − | |||
| + | Analysis: | ||
| + | First, let us say we have the following: | ||
| + | V which is a subspace of R<sup>n</sup>, and {v<sub>1</sub>,v<sub>2</sub>,v<sub>3</sub>,..,v<sub>k</sub>} are a basis for V. (The entries in the braces are vectors) | ||
| − | + | To refresh, a basis means those entries span V, AND are also linearly independent. | |
| + | |||
| + | |||
| + | |||
| + | So, therefore, then dim(V)=k (k is the number of vectors in our basis, which obviously is a non-finite amount, so I use k to denote that fact.) | ||
| + | |||
| + | |||
| + | |||
| + | Now that we have those assumptions and definitions out of the way, let me construct a matrix for you. | ||
| + | |||
| + | |||
| + | |||
| + | We will call this matrix A (seems to the most common letter in the linear algebra world...but i digress) | ||
| + | |||
| + | |||
| + | |||
| + | A= | ||
Revision as of 13:22, 8 December 2010
Statement: I am going to show that if V is a subspace of Rn. then dim(V)+dim(Vorth)=n
Because of the lack of the orthagonal symbol in the wikipedia formatting page, I will be type 'orth' in a superscript to symbolize that.
Analysis:
First, let us say we have the following:
V which is a subspace of Rn, and {v1,v2,v3,..,vk} are a basis for V. (The entries in the braces are vectors)
To refresh, a basis means those entries span V, AND are also linearly independent.
So, therefore, then dim(V)=k (k is the number of vectors in our basis, which obviously is a non-finite amount, so I use k to denote that fact.)
Now that we have those assumptions and definitions out of the way, let me construct a matrix for you.
We will call this matrix A (seems to the most common letter in the linear algebra world...but i digress)
A=
