Question

prove that cross product of 2 parallel vectors is 0

Answer 1

cross product of two non zero vectors a and b is equal to zero only if the vectors are collinear the vector C which is equal to the cross product of non zero vector a b is perpendicular of these vectors

Answer 2

Let A and B be the two parallel vectors.

As they are parallel, angle between them will be zero (0°).

A x B = |A| |B| sin(angle between them)

A x B = |A| |B| sin(0)

A x B = |A| |B| (0)

A x B = 0

//Proved...

"Thanks"