Note that the equation
is just the Pythagorean theorem relating the legs of a right triangle to the length of the hypotenuse. For example, if
and
are 9 and 5 blocks, respectively, then
blocks, again consistent with the example of the person walking in a city. Finally, the direction is
, as before.
Determining vectors and vector components with analytical methods
Equations
and
are used to find the perpendicular components of a vector—that is, to go from
and
to
and
. Equations
and
are used to find a vector from its perpendicular components—that is, to go from
and
to
and
. Both processes are crucial to analytical methods of vector addition and subtraction.
Adding vectors using analytical methods
To see how to add vectors using perpendicular components, consider
[link] , in which the vectors
and
are added to produce the resultant
.
If
and
represent two legs of a walk (two displacements), then
is the total displacement. The person taking the walk ends up at the tip of
There are many ways to arrive at the same point. In particular, the person could have walked first in the
x -direction and then in the
y -direction. Those paths are the
x - and
y -components of the resultant,
and
. If we know
and
, we can find
and
using the equations
and
. When you use the analytical method of vector addition, you can determine the components or the magnitude and direction of a vector.
Step 1.Identify the x- and y-axes that will be used in the problem. Then, find the components of each vector to be added along the chosen perpendicular axes . Use the equations
and
to find the components. In
[link] , these components are
,
,
, and
. The angles that vectors
and
make with the
x -axis are
and
, respectively.
Step 2.Find the components of the resultant along each axis by adding the components of the individual vectors along that axis . That is, as shown in
[link] ,
and
Components along the same axis, say the
x -axis, are vectors along the same line and, thus, can be added to one another like ordinary numbers. The same is true for components along the
y -axis. (For example, a 9-block eastward walk could be taken in two legs, the first 3 blocks east and the second 6 blocks east, for a total of 9, because they are along the same direction.) So resolving vectors into components along common axes makes it easier to add them. Now that the components of
are known, its magnitude and direction can be found.