Explanation Given information: The vectors v = 2 i − 3 j & w = 2 j − 3 k Concept and Formula Used: v = a i + b j + c k , a 2 + b 2 + c 2 = | v | = Magnitude of vector Scalar projection of vector a onto vector b is given by ( a . b ‖ b ‖ ) Vector projection of vector a onto vector b is given by ( a . b ‖ b ‖ ) ( b ‖ b ‖ ) Dot product of two vectors. Calculation: It is given that v = 2 i − 3 j & w = 2 j − 3 k Dot product of vectors ‘ v’ and ‘ w’ is v ⋅ w = ( 2 i − 3 j + 0 k ) ( 0 i + 2 j − 3 k ) v ⋅ w = 2 ⋅ 0 − 3 ⋅ 2 + 0 ⋅ ( − 3 ) v ⋅ w = − 6 Magnitude of vector ‘ w’ is ‖ w ‖ = a 2 + b 2 + c 2 where a = 0 , b = 2 & c = − 3 ‖ w ‖ = 0 2 + ( 2 ) 2 + ( − 3 ) 2 ‖ w ‖ = 4 + 9 ‖ w ‖ = 13 To find the scalar projection of vector ‘ v’ onto vector ‘ w’ formula to be used is ( a

6th Edition

ISBN: 9781465208880

Author: SMITH KARL J, STRAUSS MONTY J, TODA MAGDALENA DANIELE

Publisher: Kendall Hunt Publishing

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Chapter 9.3, Problem 28PS

To determine

To Calculate: The scalar and vector projection of vector ‘v’ onto vector ‘w’ where v=2i−3j&w=2j−3k .

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Chapter 9.3, Problem 27PS

Chapter 9.3, Problem 29PS

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Chapter 9 Solutions

Calculus

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The scalar and vector projection of vector ‘ v’ onto vector ‘ w’ where v = 2 i − 3 j & w = 2 j − 3 k .

Solution Summary: The author calculates the scalar and vector projection of vectors ‘ v’, onto and ‘w’.

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To Calculate: The scalar and vector projection of vector ‘v’ onto vector ‘w’ where v=2i−3j&w=2j−3k .

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Chapter 9 Solutions

The scalar and vector projection of vector ‘ v’ onto vector ‘ w’ where v = 2 i − 3 j &amp; w = 2 j − 3 k .

Solution Summary: The author calculates the scalar and vector projection of vectors ‘ v’, onto and ‘w’.

Videos

To Calculate: The scalar and vector projection of vector ‘v’ onto vector ‘w’ where v=2i−3j&w=2j−3k .

Want to see the full answer?

Chapter 9 Solutions

The scalar and vector projection of vector ‘ v’ onto vector ‘ w’ where v = 2 i − 3 j & w = 2 j − 3 k .