) Suppose u = (-3, –5,0), i = (0, -5, 1), and u = (1,5, 5). Compute the three triple scalar products (u x i) · w, (i x ủ) · ủ, and (u xũ) · ở. Then find the volume ofthe parallelepiped determined by ū, v, and w.(ũ x ỉ) · ũ =(i x ủ) · ủ =(w xũ) · i =Parallelepiped has volume

Given: u→=-3i^-5j^+0k^v→=0i^-5j^+1k^w→=1i^+5j^+5k^

) Suppose u = (–3, –5,0), i = (0, –5, 1), and w = (1,5, 5). Compute the three triple scalar products (u x v) · w, (i × w) · û, and (w x ü) · v. Then find the volume the parallelepiped determined by ủ, v, and w. (û x i) · w = (i x ũ) · ũ = (w x u) · i = Parallelepiped has volume

) Suppose u = (–3, –5,0), i = (0, –5, 1), and w = (1,5, 5). Compute the three triple scalar products (u x v) · w, (i × w) · û, and (w x ü) · v. Then find the volume the parallelepiped determined by ủ, v, and w. (û x i) · w = (i x ũ) · ũ = (w x u) · i = Parallelepiped has volume

Principles of Physics: A Calculus-Based Text

5th Edition

ISBN:9781133104261

Author:Raymond A. Serway, John W. Jewett

Publisher:Raymond A. Serway, John W. Jewett

Chapter1: Introduction And Vectors

Section: Chapter Questions

Problem 61P

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Question

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) Suppose u = (-3, –5,0), i = (0, -5, 1), and u = (1,5, 5). Compute the three triple scalar products (u x i) · w, (i x ủ) · ủ, and (u xũ) · ở. Then find the volume of
the parallelepiped determined by ū, v, and w.
(ũ x ỉ) · ũ =
(i x ủ) · ủ =
(w xũ) · i =
Parallelepiped has volume

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