A vector `vec(A)` of length `10` units makes an angle of `60^(@)` with a vector `vec(B)` of length `6` units. Find the magnitude of the vector difference `vec(A)-vec(B)` & the angles with vector `vec(A)`.

If the angle between the vectors vec(a) and vec(b) is an acute angle, then the diffrence vec(a)-vec(b) is

a, b are the magnitudes of vectors vec(a) & vec(b) . If vec(a)xx vec(b)=0 the value of vec(a).vec(b) is

Let vec a= hat i be a vector which makes an angle of 120^@ with a unit vector vec b in XY plane. then the unit vector (vec a+ vec b) is

The magnitude of the x-component of vector vec(A) is 3 and the magnitude of vector vec(A) is 5. What is the magnitude of the y-component of vector vec(A) ?

Which of the following is the unit vector perpendicular to vec(A) and vec(B) ?

The unit vector bisecting vec(OY) and vec(OZ) is

The resultant of two vectors vec(A) and vec(B) is perpendicular to the vector vec(A) and its magnitudes is equal to half of the magnitudes of vector vec(B) (figure). The angle between vec(A) and vec(B) is

vec(A) and vec(B) are two vectors having the same magnitude . What is the condition that (i) the vector sum vec(A)+vec(B) and (ii) the vector differece vec(A) + vec(B) have the same magnitude as vec(A) and vec(B) ?

vec(A) is a vector with magnitude A, then the unit vector hat(A) in the direction vec(A) is

The angle between the vector vec(A) and vec(B) is theta . Find the value of triple product vec(A).(vec(B)xxvec(A)) .