Let = , = , = , where and are integers and . Let the values of the ordered pair for which the area of the parallelogram of diagonals and is , be and . Then is equal to:
- A
- B
- C
- D
Let = , = , = , where and are integers and . Let the values of the ordered pair for which the area of the parallelogram of diagonals and is , be and . Then is equal to:
Correct answer:D
Standard Method
Given: , , and .
Find: The value asked in the question, using the condition that the area of the parallelogram having diagonals and is .
First form the diagonals:
For a parallelogram, area in terms of diagonals is
Now compute the cross product:
Hence,
Given area is , so
Thus,
Using ,
Now test integer pairs satisfying : . From the working, the valid pairs are and . Then the final evaluation shown in the solution is
Therefore, the correct option is D, i.e. .
Note: The source solution concludes with and uses the expression in its final substitution, whereas the question text displays . The extracted answer follows the solution, which explicitly marks option D as correct.
Alternative Working Noted on Source
Given: The same vectors and area condition.
Find: The correct option from the source solution set.
A second approach on the solution's writes a different form of and proceeds with a similar cross-product method. It again concludes that the correct option is .
Because both solution blocks on the solution's contain internal inconsistencies in the statement being evaluated, the reliable extracted conclusion is the one common to both: the marked answer is Option D.
Using the area formula as instead of . The diagonals of a parallelogram do not themselves form its sides. Always divide by when area is given in terms of diagonals.
Making an error while forming the diagonals. Here and . A sign mistake in the or components changes the entire cross product.
Substituting incorrectly. The term becomes , not . Preserve the sign carefully before simplifying the quadratic condition.
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