Three vectors are coplanar if they sum to zero. V1 + V2 + V3 = o means the three vectors are coplanar.
Coplanar :The vectors are in the same plane.Non coplanar :The vectors are not in the same plane.
yes
zero
Easy, the fourth vector (D) be opposite the sum of the other three non-coplanar vectors (A , B, C). 0=A + B + C + D where D = -(A + B + C).
The orientation of the three vectors that sum to zero must be coplanar, contained in the same common plane, including being contained in a common line in a plane.
Vectors that sum to zero are coplanar and coplanar vectors sum to zero.
Coplanar :The vectors are in the same plane.Non coplanar :The vectors are not in the same plane.
Coplanar :The vectors are in the same plane.Non coplanar :The vectors are not in the same plane.
yes
Coplanar :The vectors are in the same plane.Non coplanar :The vectors are not in the same plane.
The term collinear is used to describe vectors which are scalar multiples of one another (they are parallel; can have different magnitudes in the same or opposite direction). The term coplanar is used to describe vectors in at least 3-space. Coplanar vectors are three or more vectors that lie in the same plane (any 2-D flat surface).
zero
Coplanar vectors are vectors lying in the same plane.
Easy, the fourth vector (D) be opposite the sum of the other three non-coplanar vectors (A , B, C). 0=A + B + C + D where D = -(A + B + C).
The orientation of the three vectors that sum to zero must be coplanar, contained in the same common plane, including being contained in a common line in a plane.
They are a pair of vectors which are not parallel but whose lines of action cannot meet.
Not sure what you mean by "missed" but the answer is 0.