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Chapter 10: Q. 18 (page 777)
Let $$\int_b^a 567 x$$
be a vector function whose graph is a space curve
containing distinct points $$P$$ and $$Q$$. Prove that if the accel-
eration is always 0, then the graph of r is a straight line.
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In Exercises 36–41 use the given sets of points to find:
(a) A nonzero vector N perpendicular to the plane determined by the points.
(b) Two unit vectors perpendicular to the plane determined by the points.
(c) The area of the triangle determined by the points.
Find and find the unit vector in the direction of .
In Exercises 24-27, find compuv, projuv, and the component of v orthogonal tou.
Consider the function f shown in the graph next at the right. Use the graph to make a rough estimate of the average value of f on [−4, 4], and illustrate this average value as a height on the graph.
What is the definition of the cross product?
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