Let , and . Then is equal to:
- A
- B
- C
- D
Let , and . Then is equal to:
Correct answer:D
Standard Method
Given: , and .
Find: .
The solution states the correct option is D and uses the vector identity by taking cross product with .
Using
we get
Since and for ,
so
Multiplying by in the displayed working:
Using , the solution concludes
Therefore,
The correct option is D.
Note: the computed value matches the text of option B, but the solution explicitly marks option D as correct. the answer is recorded as D.
Identity-Based Shortcut
Given: , , .
Find: .
A quick route is to avoid solving completely for first. Use the triple product identity directly:
Since and ,
because .
From the displayed solution, this leads to
So the expression matches option text , while the solution labels the correct option as D.
Using the wrong vector triple product identity is a common mistake. is not the same as . Use .
Students often compute incorrectly. For , it is , not or . Square the components before adding.
A sign error while evaluating can change the final vector. Expand the cross product carefully using basis-vector rules and track the negative signs in .
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