If the vectors `vec a` and `vec b`are linearly independent and satisfying `(sqrt3tantheta-1)vec a + (sqrt3sectheta-2)vec b=vec 0`,then the most general values of `theta` are:

If the vectors vec a and vec b are linearly independent and satisfying (sqrt(3)tan theta-1)vec a+(sqrt(3)sec theta-2)vec b=vec 0 then the most general values of theta are:

Angle between vectors vec a and vec b where vec a,vec b and vec c are unit vectors satisfying vec a+vec b+sqrt(3)vec c=0

Angle between the vectors vec a and vec b , where vec a, vec b and vec c are unit vectors satisfying vec a + vec b + sqrt3 vec c = vec 0 is

If vec a and vec b are non-collinear unit vectors and |vec a+vec b|=sqrt(3) then (2vec a+5vec b)*(3vec a-vec b)=

The angle between two vectors vec a and vec b with Magnitudes sqrt3 and 4 respectively and vec a*vec b= 2 sqrt3 is

The angle between two vectors vec a and vec b with magnitudes sqrt3 and 4, respectively and vec a . vec b = 2 sqrt3 is

If vec a and vec b are two non-collinear unit vectors such that |vec a+vec b|=sqrt(3), find (2vec a-5vec b)*(3vec a+vec b)

If vec a , vec b and vec c are non-coplanar (independent) vectors, prove that the vectors vec a- 2 vec b+ 3 vec c , -2 vec a + 3 vec b- 4 vec c and vec a -vec b+ 2 vec c are also linearly independent.

Let the vectors vec a and vec b be such that | vec a|=3 and | vec b|=(sqrt(2))/3, then ,vec axx vec b is a unit vector, if the angel between vec a and vec b is?

Let the vectors vec a and vec b be such that | vec a|=3 and | vec b|=(sqrt(2))/3, then ,vec axx vec b is a unit vector, if the angel between vec a and vec b is?