If the four points, whose position vectors are , , , and are coplanar, then is equal to:
- A
- B
- C
- D
If the four points, whose position vectors are , , , and are coplanar, then is equal to:
Correct answer:B
Standard Method
Given: The position vectors of four points are , , , and .
Find: The value of for which the four points are coplanar.
For four points to be coplanar, the volume of the tetrahedron formed by them must be zero. This is equivalent to the scalar triple product of vectors , , and being zero.
1. Find Vectors:
2. Compute the Scalar Triple Product:
First, find :
Now, compute the dot product with :
Setting the scalar triple product to zero:
Thus, .
The solution working gives , but the solution labels the correct option as B, which does not match the listed options. The defensible correct option by value is A.
Determinant Form
Given: Points , , , and .
Find: The value of using the coplanarity determinant.
Since the four points are coplanar,
That is,
This is the same scalar triple product condition used in the standard method. Evaluating it gives
Hence,
Therefore, the correct option by value is A.
Using the position vectors directly in a determinant without first forming relative vectors from one common point is incorrect. Coplanarity of four points is checked using vectors like , not the four position vectors as unrelated rows.
Making a sign error while computing is common. From minus , the component becomes , not .
Expanding the cross product or determinant with the wrong sign for the middle term leads to an incorrect linear equation in . In a determinant expansion, the coefficient of carries a minus sign.
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