The sum of all values of , for which the points whose position vectors are , , and are coplanar, is equal to:
- A
- B
- C
- D
The sum of all values of , for which the points whose position vectors are , , and are coplanar, is equal to:
Correct answer:B
Standard Method
Given: Four points have position vectors , , and .
Find: The sum of all values of for which these four points are coplanar.
For four points to be coplanar, the volume of the tetrahedron they form must be zero. This is determined using the scalar triple product of the vectors formed by three of these points.
Vectors formed:
The determinant of the matrix formed by these vectors must be zero:
Expanding along the first row:
Computing determinants:
Since the sum of all values of is , the final answer is:
Therefore, the correct option is B.
Coplanarity via Scalar Triple Product
Given: The four position vectors define points in three dimensions.
Find: The condition on such that the four points are coplanar.
Use the coplanarity test:
That is, the scalar triple product must vanish. Form the three vectors from one common point and evaluate the determinant. Solving the resulting linear equation in gives the required value, and the correct option is B.
Using the position vectors directly in the determinant instead of first forming vectors like , and is incorrect. Coplanarity of four points is tested using three vectors from a common point. Always subtract coordinates to form these vectors first.
Making a sign error while expanding the determinant along the first row leads to a wrong linear equation in . The cofactor signs alternate as . Track the middle term carefully.
Confusing the value of with the sum of all values of gives a wrong final response. After solving for all admissible values, add them as asked in the question.
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