Как да изчислим Vector Cross Product

Какво е Vector Cross Product?

The cross product A×B of two 3D vectors produces a new vector perpendicular to both. Its magnitude equals the area of the parallelogram spanned by the two vectors. Direction follows the right-hand rule.

Ръководство стъпка по стъпка

1A×B = [a₂b₃−a₃b₂, a₃b₁−a₁b₃, a₁b₂−a₂b₁]
2Magnitude: |A×B| = |A||B|sin(θ)
3A×B = −(B×A) (anti-commutative)

Worked Examples

Вход

A=[1,0,0] · B=[0,1,0]

Резултат

A×B = [0,0,1] (unit z-vector)

x̂ × ŷ = ẑ by right-hand rule

Готови ли сте да изчислите? Опитайте безплатния калкулатор Vector Cross Product

Опитайте сами →

Как да изчислим Vector Cross Product

Какво е Vector Cross Product?

Ръководство стъпка по стъпка

Worked Examples

Настройки