   Chapter 11, Problem 34RE

Chapter
Section
Textbook Problem

# Finding Cross Products In exercises 33-36, find (a) u × v v × u v × v . u = 6 i − 5 j + 2 k v = − 4 i + 2 j + 3 k

(a)

To determine

To calculate: The cross product, u×v, where u=6i5j+2k and v=4i+2j+3k.

Explanation

Given:

The vectors are u=6i5j+2k and v=4i+2j+3k.

Formula used:

The cross product of two vectors u=a1i+b1j+c1k and v=a2i+b2j+c2k is given by,

u×v=|ijka1b1c1a2b2c2|

Calculation:

Consider the provided vectors,

u=6i5

(b)

To determine

To calculate: The cross product, v×u, where u=6i5j+2k and v=4i+2j+3k.

(c)

To determine

To calculate: The cross product, v×v, where v=4i+2j+3k.

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