Find the angle between two vectors `veca and vecb` with magnitudes `sqrt(3)` nd 2 respectively such that `veca.vecb=sqrt(6)`

The angle between two vectors veca and vecb with magnitudes sqrt(3) and 4, respectively and veca.vecb = 2sqrt(3) is:

Find the angle between two vectors veca and vecb with magnitudes 1 and 2 respectively and satisfying veca.vecb.=1

The angle between two vectros vecaandvecb with magnitudes sqrt3 and 4, respectively and veca.vecb=2sqrt3 is

Find the angle between unit vector veca and vecb so that sqrt(3) veca - vecb is also a unit vector.

Find the angle between the vectors veca and vecb if |veca|=2|vecb|=3" and " veca.vecb=1 if veca=hati+hatj+hatk and vecb=hati-hatj-hatk .

If veca=2hati+3hatj+6hatk and vecb=6hati+3hatj-2hatk , find the angle, between vectors veca and vecb . Also find unit vector perpendicular to both veca and vecb

Find the angle between the vectors veca+vecb and veca-vecb if veca=2hati-hatj+3hatk and vecb=3hati+hatj-2hatk .

Three vectors veca,vecb , vecc with magnitude sqrt2,1,2 respectively follows the relation veca=vecbxx(vecbxxvecc) the acute angle between the vectors vecb and vecc is theta . then find the value of 1+tantheta is

If veca and vecb are any two vectors of magnitude 2 and 3 respectively such that |2(vecaxxvecb)|+|3(veca.vecb)|=k then the maximum value of k is

If veca and vecb are any two vectors of magnitude 2 and 3 respectively such that |2(vecaxxvecb)|+|3(veca.vecb)|=k then the maximum value of k is