Simplify the dot-product polynomial and equate to zero:

b^3 9*b = 0

Take the dot product of the two vectors:

v1 dot v2 = -12*b b*b^2 3*b

If the dot product

v1 dot v2 = 0,

then v1 and v2 are orthogonal. Orthogonal is a fancy word for perpendicular. Another synonym is Normal.

Simplify the dot-product polynomial and equate to zero:

b^3 9*b = 0

Simplify the dot-product polynomial and equate to zero:

b^3 9*b = 0

Take the vector dot product and set it to zero. Solve for b.

Therefore,

b=0

b= 3

b=-3

Take the vector dot product and set it to zero. Solve for b.

This post is last updated on hrtanswers.com at Date : 1st of September – 2022