Vector Dot Product Calculator

Vector A
i + j + k
Vector B
i + j + k
A . B  =  64

Vector Dot Product Calculator to find the resultant vector by multiplying two vectors. The concept of the vector dot product is used to describe the product of physical quantities which have both a magnitude and a direction associated with them.

Scalar or Dot Product

The Dot Product also known as Scalar Product, of two vectors is the sum of the component wise products. The dot product of two vectors in the same direction is equal to the product of their magnitudes. The scalar product of two perpendicular vectors is zero. The Scalar or Dot product of the vectors properties are
1. The commutative Law A . B = B . A
2. The Distributive Law A . (B + C) = A. B + A . C
3. A (B . C) = B . (AC)
4. A . A >= 0; and A. A = 0 if and only if A = 0

The scalar or dot products of vectors is used in many applications of mathematics, physics and other engineering operations. When it comes to calculate the dot product of two vectors, this vector dot product calculator can help you to find out the resulting vector.