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it prevents vectors from breeding
They need equal magnitudes and opposite directions.
Their DIFFERENCE will be zero if and only if they have the SAME direction.
No it is not. It's possible to have to have a set of vectors that are linearly dependent but still Span R^3. Same holds true for reverse. Linear Independence does not guarantee Span R^3. IF both conditions are met then that set of vectors is called the Basis for R^3. So, for a set of vectors, S, to be a Basis it must be:(1) Linearly Independent(2) Span S = R^3.This means that both conditions are independent.
Their sum can be zero only if their magnitudes are equal and their directions are exactly opposite.
Coplanar :The vectors are in the same plane.Non coplanar :The vectors are not in the same plane.
Vectors of the arthropod.
there are two types of vectors cloning vector and expression vectors.
Two vectors: no. Three vectors: yes.
No
Vectors that sum to zero are coplanar and coplanar vectors sum to zero.
Two vectors: no. Three vectors: yes.