Their magnitudes are exactly equal and their directions are exactly opposite.
The result is a zero vector. If the sum of the vectors forms a closed figure, the vectors sum to zero.
No.
Three vectors sum to zero under the condition that they are coplanar (lie in a common plane) and form a triangle. If the vectors are not coplanar, they will not sum to zero. Another way of looking at it is that the sum is zero if any vector is exactly equal in magnitude and opposite in direction to the vector sum (so-called resultant) of the remaining two.
Yes. A vector has magnitude and direction. If the vectors have equal magnitude and directly opposite directions their sum will be zero.
Only if one of them has a magnitude of zero, so, effectively, no.
The magnitudes are the same; the directions are opposite
Vectors that sum to zero are coplanar and coplanar vectors sum to zero.
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.
If their sum (resultant) is 0, then the magnitude of the resultant must be 0.
No two vectors of unequal magnitude cannot give the sum 0 because for 0 sum the 2 vectors must be equal and in opposite direction
If none of the individual vectors has a magnitude of zero, thenthe minimum number that can combined to make zero is two.
Their magnitudes are exactly equal, and their directions are exactly opposite.
No, they cannot sum to zero.
Two is the minimum number of vectors that will sum to zero.
The result is a zero vector. If the sum of the vectors forms a closed figure, the vectors sum to zero.
When the angle between two vectors is zero ... i.e. the vectors are parallel ... their sum is a vector in thesame direction, and with magnitude equal to the sum of the magnitudes of the two original vectors.
If three vectors form a triangle , their vector sum is zero.