Calculadora de Producto Vectorial (Producto Cruz)

Calcula el producto cruz de dos vectores en 3D. Obtén el vector resultante perpendicular con magnitud y dirección al instante.

Cx

-3.0000

Magnitude7.3485
Ver fórmula

Fórmula

Cross Product

Formula

A × B = (a₂b₃ - a₃b₂, a₃b₁ - a₁b₃, a₁b₂ - a₂b₁)

Properties

  • The result is perpendicular to both input vectors
  • A × B=A×B × sin(theta) (area of parallelogram)
  • A × B = -(B × A) (anticommutative)
  • If A × B = (0,0,0), the vectors are parallel

    • Ejemplo Resuelto

    Cross product of (2,3,4) and (5,6,7).

    1. 01x: 3×7 - 4×6 = 21 - 24 = -3
    2. 02y: 4×5 - 2×7 = 20 - 14 = 6
    3. 03z: 2×6 - 3×5 = 12 - 15 = -3
    4. 04A × B = (-3, 6, -3)
    5. 05|A × B| = √(9+36+9) = √54 ≈ 7.3485

    Preguntas Frecuentes

    What is the cross product?

    The cross product of two 3D vectors produces a vector perpendicular to both inputs. Its magnitude equals the area of the parallelogram formed by the two vectors.

    Does the cross product work in 2D?

    The cross product is only defined for 3D vectors. In 2D, you can treat vectors as 3D with z=0, and the result will point entirely in the z direction.

    What does the magnitude represent?

    The magnitude of A × B equals |A|×|B|×sin(theta), which is the area of the parallelogram spanned by the two vectors.

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