If the vectors , , and are coplanar, and the projection of on vector is units, then the sum of all possible values of is equal to:
- A
- B
- C
- D
If the vectors , , and are coplanar, and the projection of on vector is units, then the sum of all possible values of is equal to:
Correct answer:A
Standard Method
Given:
Find: The sum of all possible values of .
From the solution, coplanarity gives
and the projection formula gives
The dot product shown is
so
Also,
Substituting into the projection relation,
the solution then simplifies this using
and states
Using the coplanarity condition together with this equation, the solution concludes that
Therefore, the source solution concludes that the required value corresponds to option A.
However, the solution's is internally inconsistent: the question block marks , while the solution says A, and the worked conclusion states . Since the worked conclusion gives the numerical result , the defensible option from the listed choices is C.
Consistency Check from the Worked Conclusion
Given: The source solution explicitly concludes .
Find: Which option matches that value.
Comparing with the options:
So the numerical conclusion in the working matches option C.
This shows the header statement "The Correct Option is A" is inconsistent with the actual worked result. Therefore, using the worked conclusion as the authority, the correct option should be C.
Using only the projection condition and ignoring coplanarity. That leaves two variables with insufficient valid information. Use both the projection relation and the scalar triple product condition together.
Confusing projection with dot product. The projection of on is , not merely .
Making an error in the magnitude of . Since , its magnitude is , not or .
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