what is the vector product of two vectors?
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- The vector product of two vectors is also a vector that is perpendicular to both of the vectors.
- The magnitude of this vector is obtained by multiplying the two vectors by the sine of the angle between them like ABsinΘ
What is a vector product?
- The vector product of two vectors is equal to the magnitude of the two vectors multiplied by the sine of the angle between them
- AxB = ABsinΘ
- The vector product is maximum at 90 degrees and minimum (0) at O degrees.
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Answer:
Cross product of two vectors is the method of multiplication of two vectors. A cross product is denoted by the multiplication sign(x) between two vectors.
Cross Product Definition
If A and B are two independent vectors, then the result of the cross product of these two vectors (Ax B) is perpendicular to both the vectors and normal to the plane that contains both the vectors. It is represented by:
A x B= |A| |B| sin θ
Cross Product of Two Vectors Meaning
Use the image shown below and observe the angles between the vectors
→
a
and
→
c
and the angles between the vectors
→
b
and
→
c
.
a × b =|a| |b| sin θ.
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