If `veca = 4hati + 6hatj and vecb = 3hatj+4hatk`, then the vector form of component of `veca` along `vecb` is

If veca=4hati+6hatj and vecb=3hati+4hatk find the vector component of veca alond vecb .

vecA and vecB are two vectors gives by vecA = 2 hati + 3hatj and vecB = hati +hatj . The magnetiude of the component of vecA along vecB is :

If vecA=4hati+6hatj and vecB=2hati+3hatj . Then

If veca = 2hati -3hatk and vecb =hati + 4hatj -2hatk " then " veca xx vecb is

There are two vectors vecA=3hati+hatj and vecB=hatj+2hatk . For these two vectors- (a) Find the component of vecA along vecB in vector form. (b) If vecA & vecB are the adjacent sides of a parallalogram then find the magnitude of its area. (c) Find a unit vector which is perpendicular to both vecA & vecB .

vecA and vecB and vectors expressed as vecA = 2hati + hatj and vecB = hati - hatj Unit vector perpendicular to vecA and vecB is:

If vecA = 3hati + 4hatj and vecB = hati + hatj + 2hatk then find out unit vector along vecA + vecB .

If veca =hati + hatj-hatk, vecb = - hati + 2hatj + 2hatk and vecc = - hati +2hatj -hatk , then a unit vector normal to the vectors veca + vecb and vecb -vecc , is

If vecA= 3hati+2hatj and vecB= 2hati+ 3hatj-hatk , then find a unit vector along (vecA-vecB) .

The vectors are given below veca = hatj + 2hatj + 3hatk vecb = 2hatj + 4hatj + 6hatk and vecc = 3hati + 6hatj + 9 hatk find the components of the vector veca + vecb -vecc