Calculatrice de Produit Scalaire Gratuite

Calculez le produit scalaire de deux vecteurs. Trouvez le produit point et l'angle entre les vecteurs.

Dot

32.0000

Mag A3.7417
Mag B8.7750
Angle12.9332 deg
Voir la formule

Formule

Dot Product

Formula

A · B = a₁b₁ + a₂b₂ + a₃b₃

Geometric Interpretation

A · B = A×B× cos(theta)

So: theta = arccos(A · B / (A×B))

Properties

  • If A · B = 0, the vectors are perpendicular
  • If A · B > 0, the angle is acute (less than 90°)
  • If A · B < 0, the angle is obtuse (greater than 90°)

    • Exemple Résolu

    Dot product of (1,2,3) and (4,5,6).

    1. 01A · B = 1×4 + 2×5 + 3×6 = 4 + 10 + 18 = 32
    2. 02|A| = √(1+4+9) = √14 ≈ 3.742
    3. 03|B| = √(16+25+36) = √77 ≈ 8.775
    4. 04cos(theta) = 32/(3.742 × 8.775) ≈ 0.9746
    5. 05theta ≈ 12.93°

    Questions Fréquentes

    What is the dot product?

    The dot product is a way to multiply two vectors to get a scalar (single number). It measures how much two vectors point in the same direction.

    When is the dot product zero?

    The dot product is zero when the vectors are perpendicular (orthogonal). This is a common test for perpendicularity.

    What is the difference between dot product and cross product?

    The dot product gives a scalar and measures alignment. The cross product gives a vector perpendicular to both inputs and measures the area of the parallelogram they span.

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