Let , , and , where is the origin. If is the parallelogram with adjacent sides and , then the ratio of the area of the quadrilateral to the area of is equal to:
- A
- B
- C
- D
Let , , and , where is the origin. If is the parallelogram with adjacent sides and , then the ratio of the area of the quadrilateral to the area of is equal to:
Correct answer:D
Standard Method
Given: , , and .
Find: The ratio of the area of quadrilateral to the area of parallelogram .
The area of parallelogram with adjacent sides and is
Split quadrilateral into triangles and .
For ,
Now,
So,
For ,
Now,
because . Hence,
Therefore, the area of quadrilateral is
Hence, the required ratio is
Therefore, the correct option is D.
Direct Area Comparison
Given: , , and .
Find: .
Use the fact that every required area is a multiple of .
Since
and
we get
Thus,
Therefore, the correct option is D.
Students often use dot product instead of cross product for area. This is wrong because area of a parallelogram formed by two vectors is given by the magnitude of their cross product. Use , not .
A common mistake is to treat quadrilateral as a parallelogram directly. This is incorrect because the given vertices do not imply opposite sides are parallel. Split it into and and add the two areas.
Many students forget that and . Because of this, they incorrectly keep extra terms while expanding or . Remove the self-cross-product terms.
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