Assertion: The angle between the two vectors `(hati+hatj)` and `(hatj+hatk)` is `(pi)/(3)` radian.
Reason: Angle between two vectors `vecA` and `vecB` is given by `theta=cos^(-1)((vecA.vecB)/(AB))`

If the angle between two vectors vecA and vecB " is " 90^(@) then

The angle between the two vectors vecA=hati+2hatj-hatk and vecB=-hati+hatj-2hatk

The angle between vecA = hati + hatj and vecB = hati - hatj is

The angle between vecA = hati + hatj and vecB = hati - hatj is

The angle between the two vectors veca + vecb and veca-vecb is

The angles between the two vectors vecA=3hati+4hatj+5hatk and vecB=3hati+4hatj-5hatk will be

The angle between the two vectors vecA=2hati+3hatj+4hatk and vecB=1hati+2hatj-3hatk will be :

STATEMENT-1 : The vector hati bisects the angle between the vectors hati-2hatj-2hatk and hati+2hatj+2hatk . And STATEMENT-2 : The vector along the angle bisector of the vector veca and vecb is given by +-((veca)/(|veca|)+-(vecb)/(|vecb|)) where |veca|.|vecb|ne 0

Find the angle 'theta' between the vector veca=2hati+3hatj-4hatk and vecb=3hati-2hatj+4hatk .

Find the angle between the vectors veca = 6 hati + 2 hatj + 3 hatk, vecb = 2 hati - 9 hatj + 6 hatk