Let for a triangle ABC, If = and the area of triangle ABC is , then is equal to:
- A
- B
- C
- D
Let for a triangle ABC, If = and the area of triangle ABC is , then is equal to:
Correct answer:A
Standard Method
Given: , , and area of triangle ABC is .
Find: The required value asked in the options.
From the solution working, let the third component be and write
Then
So,
Using area of triangle,
Hence,
Therefore,
Squaring both sides,
So .
Then
Now,
Thus the working gives the value . However, the solution explicitly marks Option A as correct, while the answer key marks (2). Since the solution is the primary source, the correct option is taken as A.
Answer Discrepancy Note
The extracted question text appears corrupted: it states in the question, but the solution recomputes using an unknown third component and finally evaluates a dot product equal to .
So there is a mismatch between the displayed question, the option values, and the conclusion in the solution. The numerical result obtained from the worked solution is , which corresponds to Option B, but the solution says The Correct Option is A. Following the instruction that the solution is the primary source, the recorded answer is A, while preserving the discrepancy here.
Using the area formula with a dot product instead of a cross product is incorrect. The area of a triangle formed by two vectors is , not . First compute the cross product magnitude, then use the area condition.
Forgetting the factor for the triangle area leads to a wrong equation. The magnitude gives the area of the parallelogram, so the triangle area is half of that.
Making determinant sign errors while computing changes the quadratic in . Expand the determinant carefully and preserve the alternating signs of components.
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