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as long as the force is constant. Looking at this equation, you
notice that force, F, and displacement, 
,
are both vectors whose difference in direction is the angle
.
In other words, the right side of this equation expresses a product
of the two vectors F and ,
which produces a scalar - the work done by the force.
In vector algebra, this is called the dot (or inner) product of
the vectors. The dot product of two vectors is a scalar equal to the
product of the magnitudes of the vectors times the cosine of the
angle between them. Therefore, in vector language, we can write the
work done by a (constant) force F on an object experiencing a
displacement
as:
