Let vector `vec(V)=(2,3)` and vector `vec(U)=(6,-4)`.
(i) What is the resultant of `vecU and vecV`?

Let vector vec(V)=(2,3) and vector vec(U)=(6,-4) . (ii) What is norm of vecU ?

Let vector vec(V)=(2,3) and vector vec(U)=(6,-4) . (iii) Express vecV in terms of veci and vecj .

Let vector vec(V)=(2,3) and vector vec(U)=(6,-4) . Are vecU and vecV perpendicular?

If vecU=(-1,4) and the resultant of vecU and vecV is (4, 5), find vecV .

If vector vecv=(1,sqrt(3)) and vector vecu=(3,-2) find the value of |3vecv-vecu|

A vector vec(A) When added to the vector vec(B)=3hat(i)+4hat(j) yields a resultant vector that is in the positive y-direction and has a magnitude equal to that of vec(B) . Find the magnitude of vec(A) .

The resultant of two vectors vec(P) and vec(Q) is vec(R) . If vec(Q) is doubled then the new resultant vector is perpendicular to vec(P) . Then magnitude of vec(R) is :-

If a vector vec(A) is parallel to another vector vec(B) then the resultant of the vector vec(A)xxvec(B) will be equal to

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) ?

Keeping one vector constant, if direction of other to be added in the first vector is changed continuously, tip of the resultant vector describes a circles, In the following figure vector vec(a) is kept constant. When vector vec(b) addede to vec(a) changes its direction, the tip of the resultant vector vec(r)=vec(a)+vec(b) describes circles of radius b with its centre at the tip of vector vec(a) . Maximum angle between vector vec(a) and the resultant vec(r)=vec(a)+vec(b) is