What is the cross product of [-1,-1,2][1,1,2] and [1,-2,3] [1,2,3]?

1 Answer
Bio
Mar 13, 2016

[1,5,3][1,5,3]

Explanation:

We know that vecA xx vecB = ||vecA|| * ||vecB|| * sin(theta) hatnA×B=ABsin(θ)ˆn, where hatnˆn is a unit vector given by the right hand rule.

So for of the unit vectors hatiˆi, hatjˆj and hatkˆk in the direction of xx, yy and zz respectively, we can arrive at the following results.

color(white)( (color(black){hati xx hati = vec0}, color(black){qquad hati xx hatj = hatk}, color(black){qquad hati xx hatk = -hatj}), (color(black){hatj xx hati = -hatk}, color(black){qquad hatj xx hatj = vec0}, color(black){qquad hatj xx hatk = hati}), (color(black){hatk xx hati = hatj}, color(black){qquad hatk xx hatj = -hati}, color(black){qquad hatk xx hatk = vec0}))

Another thing that you should know is that cross product is distributive, which means

vecA xx (vecB + vecC) = vecA xx vecB + vecA xx vecC.

We are going to need all of these results for this question.

[-1,-1,2] xx [1,-2,3]

= (-hati - hatj + 2hatk) xx (hati - 2hatj + 3hatk)

= color(white)( (color(black){-hati xx hati - hati xx (-2hatj) - hati xx 3hatk}), (color(black){-hatj xx hati - hatj xx (-2hatj) - hatj xx 3hatk}), (color(black){+2hatk xx hati + 2hatk xx(-2hatj) + 2hatk xx 3hatk}) )

= color(white)( (color(black){- 1(vec0) + 2hatk qquad + 3hatj}), (color(black){+hatk qquad + 2(vec0) - 3hati}), (color(black){qquad +2hatj qquad + 4hati qquad + 6(vec0)}) )

= hati + 5hatj + 3hatk

= [1,5,3]

Related questions
See all questions in Vector Operations
Impact of this question
1465 views around the world
You can reuse this answer
Creative Commons License