How can be say that all negative vectors are antiparallel but are antiparallel vectors and not negative proof?
Answers
Yes, Let we understand the reason separately.
Anti- Parallel Vectors-
=> Vectors Which are in opposite direction are anti-parallel vectors.
=> Angle between two anti parallel vectors is 180°.
=> Direction must be opposite for anti parallel vectors.
In the attachment No.1
=> Vector C is anti parallel to Vector D
=> We can clearly see that the direction is opposite in the both given vectors.
Negative Vectors-
=> Vectors which are having same magnitude but opposite direction are negative Vectors.
=> They are also known as opposite vectors.
In the attachment No.2
=> Vector B and Vector are Opposite Vector.
=> We can easily conclude that direction of both Vectors is opposite but magnitude(length) is a same.
Conclusion- So now we can understand that in both anti-parallel and negative Vectors direction is opposite but the magnitude of negative Vector must be same so we can say it also an anti parallel Vector.
