Let and . Let be parallel to and be perpendicular to . If , then the value of is:
- A
- B
- C
- D
Let and . Let be parallel to and be perpendicular to . If , then the value of is:
Correct answer:C
Standard Method
Given: and .
Find: where is parallel to and is perpendicular to .
The component of parallel to is
Now,
and
Therefore,
Now,
So,
Hence,
Now take dot product with :
Therefore, the correct option is C.
Projection and orthogonal component
Given: with and .
Find: the required scalar value using vector decomposition.
Use projection of on to obtain the parallel part. Then subtract it from to get the perpendicular part.
The projection factor is
So the parallel component is
This gives
Subtract from :
Multiply by :
Now dot with by adding corresponding components:
Therefore, the required value is , so the correct option is C.
Using the formula for the parallel component incorrectly by dividing by instead of . This gives a wrong projection. Use .
Computing with sign errors. Since has negative components, subtracting it changes signs. Carefully evaluate each component.
Taking the dot product of directly and forgetting the factor outside. First compute or multiply the final dot product by .
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