Let and be two vectors. Let and . If , then the value of is
- A
- B
- C
- D
Let and be two vectors. Let and . If , then the value of is
Correct answer:B
Standard Method
Given: , .
Find: .
Using the given expression,
Expanding the dot product,
Now because is perpendicular to . Also,
Therefore,
Thus, the value of is . The correct option is B.
Orthogonality Trick
Given: .
Find: .
Notice that the term is automatically perpendicular to both and . So when dotted with , that entire part vanishes.
Since ,
Therefore, the correct option is B.
Using as a non-zero quantity is incorrect because is perpendicular to . Always use the fact that the dot product of perpendicular vectors is zero.
Taking is wrong. The correct identity is , so the magnitude must be squared.
Forgetting to distribute the dot product over subtraction can lead to an incomplete expression. First write , then simplify each term carefully.
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