Vector u is a scalar multiple of vector v. What can be concluded about: a. The dot product of these vectors. (Hint: there is a formula that connects the dot product of Cartesian vectors to the dot product of geometric vectors) b. The cross product of these vectors. (Hint: there is a formula that connects the cross product of Cartesian vectors to the dot product of geometric vectors) Provide an example for a. and for b. that illustrate your conclusions
Vector u is a scalar multiple of vector v. What can be concluded about: a. The dot product of these vectors. (Hint: there is a formula that connects the dot product of Cartesian vectors to the dot product of geometric vectors) b. The cross product of these vectors. (Hint: there is a formula that connects the cross product of Cartesian vectors to the dot product of geometric vectors) Provide an example for a. and for b. that illustrate your conclusions
Algebra and Trigonometry (MindTap Course List)
4th Edition
ISBN:9781305071742
Author:James Stewart, Lothar Redlin, Saleem Watson
Publisher:James Stewart, Lothar Redlin, Saleem Watson
Chapter9: Vectors In Two And Three Dimensions
Section9.CR: Chapter Review
Problem 8CC
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Transcribed Image Text:4. Vector u is a scalar multiple of vector v. What can be concluded about:
a. The dot product of these vectors. (Hint: there is a formula that connects the dot product of
Cartesian vectors to the dot product of geometric vectors)
b. The cross product of these vectors. (Hint: there is a formula that connects the cross product
of Cartesian vectors to the dot product of geometric vectors)
C. Provide an example for a. and for b. that illustrate your conclusions
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