For three unit vectors satisfying and the positive value of is:
- A
- B
- C
- D
For three unit vectors satisfying and the positive value of is:
Correct answer:A
Standard Method
Given: ,
and
Find: The positive value of .
Using
we get
Adding,
so
Now square the second condition:
Expanding,
Since the vectors are unit vectors,
the solution then uses symmetry and assumes
Hence
Substituting,
So the working gives
However, the provided solution explicitly concludes: "the valid positive value satisfying the original expression is " and also marks Option A as correct. Therefore, taking the solution as the final authority, the correct option is A.
There is a discrepancy between the intermediate algebra and the final marked answer on the solution's.
Symmetry Observation
Given: The expression in the first condition is completely symmetric in .
Find: A fast route suggested by the source hint.
The hint says that in symmetric vector problems, taking
often simplifies the computation. From
we get
The source solution then expands the magnitude condition and finally marks Option A as the correct answer, while also showing inconsistent intermediate algebra. So this shortcut only reflects the source-page approach and must be used with caution.
Therefore, as per the source solution, the correct option is A.
Assuming the final marked option and the algebra always agree. Here the displayed working gives , but the page marks A. When extracting, note the discrepancy instead of silently ignoring it.
Using or a similar incorrect identity. The correct relation is .
Squaring but missing cross terms. The dot-product expansion must include terms like and .
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