In Exercises 42 - 43 , two sides of a parallelogram coincide with the position vectors for u and v . Find the area of the parallelogram. u = [ 4 − 1 2 ] , v = [ 0 1 2 ]
In Exercises 42 - 43 , two sides of a parallelogram coincide with the position vectors for u and v . Find the area of the parallelogram. u = [ 4 − 1 2 ] , v = [ 0 1 2 ]
Solution Summary: The author calculates the area of the parallelogram when 2 vectors u and v represent the two sides.
In Exercises
42
-
43
, two sides of a parallelogram coincide with the position vectors for
u
and
v
. Find the area of the parallelogram.
u
=
[
4
−
1
2
]
,
v
=
[
0
1
2
]
Quantities that have magnitude and direction but not position. Some examples of vectors are velocity, displacement, acceleration, and force. They are sometimes called Euclidean or spatial vectors.
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