09/29 - Analogy to Vector Spaces

Analogy to Vector Spaces

Let the vector ${\displaystyle {\vec {v}}}$ be defined as:

• ${\displaystyle {\vec {v}}=a_{1}\cdot {\hat {v}}_{1}+a_{2}\cdot {\hat {v}}_{2}+a_{3}\cdot {\hat {v}}_{3}=\sum _{j=1}^{3}v_{j}\cdot {\hat {a}}_{j}}$
  • ${\displaystyle a_{1},a_{2},a_{3}\,\!}$ are the coefficients
  • ${\displaystyle {\hat {v}}_{1},{\hat {v}}_{2},{\hat {v}}_{3}}$ are the basis vectors
  • A vector basis is a set of n linearly independent vectors capable of generating? an n-dimensional subspace? of ${\displaystyle \Re ^{n}}$

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.