If \(\vec{A},\vec{B}\) and \(\vec{C}\) are coplanar, then the value of \(\vec{A}\cdot \left ( \vec{B} \times \vec{C}\right )\) will be
If \(\vec{A},\vec{B}\) and \(\vec{C}\) are coplanar, then the value of \(\vec{A}\cdot \left ( \vec{B} \times \vec{C}\right )\) will be Correct Answer 0
Correct option-2Concept:
The vectors lying in the same plane are called coplanar vectors.
The vectors A and B are coplanar vectors. The vectors A and B as shown in the figure below are concurrent coplanar vectors.
Scalar or Dot Product
The scalar or dot product of two vectors A and B is denoted by A•B and is read as A dot B.
It is defined as the product of the magnitudes of the two vectors A and B and
the cosine of their included angle θ.
Thus, A•B = AB cosθ (a scalar quantity)
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Feb 20, 2025