Vectors drawn the origin `O` to the points `A , B and C` are respectively ` vec a , vec b and vec4a- vec3bdot` find ` vec (AC) and vec (BC)`

[vec a + vec b vec b + vec c vec c + vec a] =

If two vectors vec a and vec b such that |vec a|=2, |vec b|= 3 and vec a.vec b = 4 , find |vec a - vec b|

The non-zero vectors vec b and vec c are related by vec a = 8 vec b and vec c = -7 vec b . Then the angle between vec a and vec c is

The three points whose position vectors are vec a - vec 2b + 3 vec c, vec 2a + vec 3b - 4 vec c and - 7 vec b + 10 vec c

If vec a and vec b are unit vectors such that |vec a xx vec b| = vec a . vec b , then |vec a + vec b|^(2) =

If vec a and vec b are unit vectors |vec a xx vec b| =1 then the angle between vec a and vec b is

Let A and B be points with position vectors veca and vecb with respect to origin O . If the point C on OA is such that 2vec(AC)=vec(CO), vec(CD) is parallel to vec(OB) and |vec(CD)|=3|vec(OB)| then vec(AD) is

Let vec a, vec b and vec c of magnitudes 3,4 and 5 repectively. If vec a is perpendicular to (vec b + vec c), vec b is perpendicular to (vec c + vec a) and vec c is perpendicular to (vec a + vec b) , then the magnitude of vec a + vec b + vec c is