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Section 12.2 Terminology and notation

directed line segment

a line segment between two points with an assigned direction from one of the points to the other

Remark 12.2.1.

We usually visualize a directed line segment as an arrow.

initial point (of a directed line segment)

the first point in a directed line segment (at the tail of the arrow)

terminal point (of a directed line segment)

the second point in a directed line segment (at the head of the arrow)

components (of a directed line segment)

the list of the changes in coordinates between initial point and terminal point

vector

the ordered collection of components of a directed line segment

Remark 12.2.2.
  • We won't make too much of a fuss about the technical definition of a vector, especially since we will vastly increase the number of things we allow ourselves to call vector in Chapter 16.
  • Notationally, we will typeset variables representing vectors in boldface, just as we did previously for column vectors in the context of matrices and systems of equations.
two-dimensional vector

a vector with two components \(\uvec{v} = (v_1,v_2)\text{,}\) corresponding to a directed line segment in the plane

three-dimensional vector

a vector with three components \(\uvec{v} = (v_1,v_2,v_3)\text{,}\) corresponding to a directed line segment in space

\(n\)-dimensional vector

a vector with \(n\) components \(\uvec{v} = (v_1,v_2,\dotsc,v_n)\)

two-dimensional space (\(\R^2\))

the collection of all two-dimensional vectors

three-dimensional space (\(\R^3\))

the collection of all three-dimensional vectors

\(n\)-dimensional space (\(\R^n\))

the collection of all \(n\)-dimensional vectors

zero vector

the vector \(\zerovec = (0,0,\dotsc,0)\)

Remark 12.2.3.

We refer to \(\R^2\) as two-dimensional space because, just like a map, the plane has two sets of directions — north/south and east/west. We refer to \(\R^3\) as three-dimensional space because we still have the north/south and east/west sets of directions in the \(xy\)-plane, but we add a third set of directions of up/down along the \(z\)-axis. In analogy with this, we refer to \(\R^4\) as four-dimensional space, \(\R^5\) as five-dimensional space, and so on.

vector addition (of vectors \(\uvec{u}\) and \(\uvec{v}\) of the same dimension)

given a directed line segment corresponding to \(\uvec{u}\text{,}\) create a directed line segment corresponding to \(\uvec{v}\) with initial point at the terminal point for the segment for \(\uvec{u}\text{,}\) and then the sum vector \(\uvec{u} + \uvec{v}\) corresponds to the directed line segment from the initial point for \(\uvec{u}\) to the terminal point for \(\uvec{v}\)

negative (of a vector \(\uvec{v}\))

given a directed line segment for \(\uvec{v}\text{,}\) the negative vector \(-\uvec{v}\) corresponds to the same segment but in the opposite direction

vector subtraction

the result of adding a vector \(\uvec{u}\) to the negative of another \(\uvec{v}\text{:}\) \(\uvec{u} - \uvec{v} = \uvec{u} + (-\uvec{v}) \)

scalar multiple (of a vector \(\uvec{v}\) by scalar \(k\))

given a directed line segment for \(\uvec{v}\text{,}\) the scalar multiple \(k\uvec{v}\) corresponds to the directed line segment that has the same initial point and changes position in the same direction, but whose length has been scaled so that the terminal point is \(\abs{k}\) times as far from the initial point as the terminal point for \(\uvec{u}\text{;}\) if \(k\) is negative then the terminal point is also moved to the “other side” of the initial point

parallel vectors

nonzero vectors that are scalar multiples of one another

linear combination of vectors \(\uvec{v}_1,\uvec{v}_2,\dotsc,\uvec{v}_m\)

a sum of scalar multiples of the vectors: \(k_1\uvec{v}_1 + k_2\uvec{v}_2 + \dotsc + k_m\uvec{v}_m\)

standard basis vectors (in \(\R^n\))

the vectors

\begin{align*} \uvec{e}_1 \amp= (1,0,0,\dotsc,0),\\ \uvec{e}_2 \amp= (0,1,0,\dotsc,0),\\ \amp\dotsc,\\ \uvec{e}_n \amp= (0,0,\dotsc,0,1) \end{align*}
Remark 12.2.4.

In physics, it is common to use \(\uvec{i}\) and \(\uvec{j}\) to mean \(\uvec{e}_1\) and \(\uvec{e}_2\) in the plane, and to use \(\uvec{i}\text{,}\) \(\uvec{j}\text{,}\) and \(\uvec{k}\) to mean \(\uvec{e}_1\text{,}\) \(\uvec{e}_2\text{,}\) and \(\uvec{e}_3\) in space. However, this alphabetic naming scheme would have to wrap back around to \(\uvec{a}\) in \(19\) dimensions, and in \(27\) dimensions there wouldn't be enough letters in the alphabet. So we will (mostly) stick with the \(\uvec{e}_1,\uvec{e}_2,\dotsc,\uvec{e}_n\) naming scheme.