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Q. No.Vectors \(\vec {\mathrm{A}}, \vec{\mathrm{B}} \) and \(\vec{\mathrm{C}}\) are such that \(\vec{\mathrm{A}} \cdot \vec{\mathrm{B}}=0 \text { and } \vec{\mathrm{A}} \cdot \vec{\mathrm{C}}=0\). Then the vector parallel to \(\vec A\) is:
1. \(\vec{A} \times \vec{B} \)
2. \(\vec{B}+\vec{C} \)
3. \(\vec{B} \times \vec{C} \)
4. \(\vec{B}~\text{and} ~\vec{C}\)
1. \(\vec{A} \times \vec{B} \)
2. \(\vec{B}+\vec{C} \)
3. \(\vec{B} \times \vec{C} \)
4. \(\vec{B}~\text{and} ~\vec{C}\)
Subtopic: Â Vector Product |
 68%
From NCERT
NEET - 2013
Please attempt this question first.
Hints
Please attempt this question first.
\(\overrightarrow{A}\) and \(\overrightarrow B\) are two vectors and \(\theta\) is the angle between them. If \(\left|\overrightarrow A\times \overrightarrow B\right|= \sqrt{3}\left(\overrightarrow A\cdot \overrightarrow B\right),\) then the value of \(\theta\) will be:
| 1. | \(60^{\circ}\) | 2. | \(45^{\circ}\) |
| 3. | \(30^{\circ}\) | 4. | \(90^{\circ}\) |
Subtopic: Â Scalar Product |Â Vector Product |
 80%
From NCERT
AIPMT - 2007
To view explanation, please take trial in the course.
NEET 2025 - Target Batch
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NEET 2025 - Target Batch
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