The magnitude of the vector product of two vectors | →A | and | →B | may be
(a) greater than AB
(b) equal to AB
(c) less than AB
(d) equal to zero.
Answers
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Equal to zero option d
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2
The magnitude of the vector product of two vectors | →A | and | →B | may be greater than AB.
Explanation:
- The magnitude of the two vectors’ product | →A | and | →B | may be fewer than AB, equal to zero and equal to AB, but they cannot be more than AB. So, the right answer is option A.
- There are two defined types of vector multiplications, which are vector product and the scalar product. The two vectors A and B have the scalar product, which is equal to the product of the smallest angle’s cosine and the vectors’ magnitudes. So, it might be zero or smaller or zero.
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