Let and , . Let the projection of the vector on the diagonal of the parallelogram be of length one unit. If , where , be the roots of the equation , then is equal to
- A
- B
- C
- D
Let and , . Let the projection of the vector on the diagonal of the parallelogram be of length one unit. If , where , be the roots of the equation , then is equal to
Correct answer:C
Standard Method
Given: , , and .
Find: The value of , where are the roots of .
The diagonal of parallelogram is
So,
The magnitude of projection of on is
Given this length is , therefore
Now,
and
Hence,
Squaring both sides,
Expanding,
So,
Now the quadratic becomes
Using the quadratic formula,
Thus,
Therefore,
Therefore, the correct option is C.
Projection Formula Breakdown
Given: The projection of on diagonal has magnitude .
Find: First determine , then evaluate .
Since ,
For projection magnitude,
Compute the numerator:
Compute the denominator:
So,
After squaring,
This gives
Hence,
and so
Substitute into the given equation:
Solving,
Therefore the roots are
Since ,
Now evaluate
Therefore, the required value is .
Using instead of vector addition. In a parallelogram, the diagonal from to is the sum of the two adjacent side vectors. Use .
Forgetting that the question gives the length of projection, not the signed projection. That is why the formula uses modulus: .
Assigning and without checking the condition . After solving the quadratic, the larger root must be taken as and the smaller as before evaluating .
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