Let be a unit vector perpendicular to the vectors and makes an angle of with the vector . If makes an angle with the vector , then the value of is:
- A
- B
- C
- D
Let be a unit vector perpendicular to the vectors and makes an angle of with the vector . If makes an angle with the vector , then the value of is:
Correct answer:C
Standard Method
Given: is a unit vector perpendicular to and .
Find: The value of .
Since is perpendicular to both vectors, it must be parallel to their cross product.
So a unit vector perpendicular to both is
Now let . Using the angle condition from the solution, the correct option is C. The same the solution concludes the value of is , which does not match the listed option text. Hence there is a discrepancy between the worked conclusion and the option list.
Taking
and substituting the unit vector above gives
Since
we get
The provided solution concludes . Therefore, the defensible marked answer is option C even though the option text itself is inconsistent.
Therefore, the correct option is C.
Cross Product Construction
Because a vector perpendicular to both and lies along , the direction is determined first.
Hence the corresponding unit vectors are
Dotting this with gives
so the normalized cosine expression becomes
The provided the solution explicitly states The Correct Option is C and concludes . Since these two extracted pieces conflict with the duplicated option values, the answer is recorded by solution-page option label as C.
Assuming perpendicular to two vectors means taking separate arbitrary dot-product equations without first recognizing that must be along . This makes the setup longer and error-prone. Instead, construct the perpendicular direction using the cross product.
Forgetting that is a unit vector. Using directly in the angle formula without normalization changes the cosine relation. Always divide by the magnitude to obtain the unit vector.
Ignoring the discrepancy in the provided the solution. The page states option C but also writes , while the options are duplicated and inconsistent. In such cases, rely on the solution as primary source and note the mismatch explicitly.
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