09/29 - Analogy to Vector Spaces: Difference between revisions

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**<math> a_1, a_2, a_3 \,\!</math> are the coefficients
**<math> a_1, a_2, a_3 \,\!</math> are the coefficients
**<math> \hat v_1, \hat v_2, \hat v_3 </math> are the basis vectors
**<math> \hat v_1, \hat v_2, \hat v_3 </math> are the basis vectors
**A vector basis is a set of n linearly independent vectors capable of generating? an n-dimensional subspace? of <math>\real^n</math>
**A vector basis is a set of n linearly independent vectors capable of generating an n-dimensional subspace of <math>\real^n</math>
***Generating: using a linear combination of n vectors to be able to uniquely identify any part of the n-dimensional space

==Dot Product & Inner Product==
==Dot Product & Inner Product==
[[Image:300px-Dot_Product.svg.png|right|thumb|100px|Dot Product]]
[[Image:300px-Dot_Product.svg.png|right|thumb|100px|Dot Product]]
The dot (scalar) product takes two vectors over the real numbers and returns a real-valued scalar quantity. Geometrically, it will show the projection of one vector ?set? onto another ?set?.
The dot (scalar) product takes two vectors over the real numbers and returns a real-valued scalar quantity. Geometrically, it will show the projection of one vector onto another.


Mathematically the dot product of two vectors <math> \mathbf{a} = {a_1, a_2, ... a_n} \,\!</math> and <math> \mathbf{b} = {b_1, b_2, ... b_n} \,\! </math> is defined as <math>\mathbf{a}\cdot \mathbf{b} = \sum_{i=1}^n a_ib_i = a_1b_1 + a_2b_2 + \cdots + a_nb_n </math>
The dot product of two vectors <math> \vec a = {a_1, a_2, ..., a_n} \,\!</math> and <math> \vec b = {b_1, b_2, ..., b_n} \,\! </math> is defined as <math>\vec a \cdot \vec b = \sum_{i=1}^n a_i \cdot b_i = a_1b_1 + a_2b_2 + \cdots + a_nb_n </math>


[[Image:783px-Inner-product-angle.png|right|thumb|100px|Inner Product]]
[[Image:783px-Inner-product-angle.png|right|thumb|100px|Inner Product]]
Since we will be dealing with complex numbers, we need to use the inner product instead of the dot product
Since we will be dealing with complex numbers, we need to use the inner product instead of the dot product

The inner product of two vectors <math> \vec a = {a_1 + b_1 j, a_2 + b_2 j, ... ,a_n + b_n j } </math> and <math> \vec b = {c_1 + d_1 j, c_2 + d_2 j, ... ,c_n + d_n j } </math> is defined as <math> \vec a \cdot \vec b = \sum_{i=1}^n a_i \cdot b_i^* </math>

*Where <math> \vec b_i^* = {c_1 - d_1 j, c_2 - d_2 j, ... ,c_n - d_n j } </math>
*Where is this info on Wikipedia? http://en.wikipedia.org/wiki/Inner_product_space

Latest revision as of 18:14, 11 November 2008

Analogy to Vector Spaces

Let the vector be defined as:

    • are the coefficients
    • are the basis vectors
    • A vector basis is a set of n linearly independent vectors capable of generating an n-dimensional subspace of
      • Generating: using a linear combination of n vectors to be able to uniquely identify any part of the n-dimensional space

Dot Product & Inner Product

Dot Product

The dot (scalar) product takes two vectors over the real numbers and returns a real-valued scalar quantity. Geometrically, it will show the projection of one vector onto another.

The dot product of two vectors and is defined as

Inner Product

Since we will be dealing with complex numbers, we need to use the inner product instead of the dot product

The inner product of two vectors and is defined as