The resultant of `vec(A)` and `vec(B)` makes an angle `alpha` with `vec(A)` and `beta` with `vec(B)`, then :

The resultant of vec(A) and vec(B) makes an angle alpha with vec(A) and omega with vec(B) , then:-

The resultant of vec(a) and vec(b) makes alpha with vec(a) and beta with vec(b) , then (a,b represent magnitudes of respective vectors) :

Two vectors vec(A) and vec(B) inclined at an angle theta have a resultant vec(R ) which makes an angle alpha with vec(A) . If the directions of vec(A) and vec(B) are interchanged, the resultant will have the same

Two vectors vec(A) and vec(B) inclined at an angle theta have a resultant vec(R ) which makes an angle alpha with vec(A) . If the directions of vec(A) and vec(B) are interchanged, the resultant will have the same

Vectors vec(A) and vec(B) include an angle theta between them If (vec(A)+vec(B)) and (vec(A)-vec(B)) respectively subtend angles apha and beta with A, then (tan alpha+tan beta) is

Let vec a ,\ vec b ,\ vec c be three unit vectors such that | vec a+ vec b+ vec c|=1\ a n d\ vec a is perpendicular to vec bdot If vec c makes angle alpha and beta with vec a\ a n d\ vec b respectively, then cosalpha+cosbeta= -3/2 b. 3/2 c. 1 d. -1

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

The angle between vectors vec(A) and vec(B) is 60^@ What is the ratio vec(A) .vec(B) and |vec(A) xxvec(B)|

Two vectors vec(A) and vec(B) have equal magnitudes . If magnitude of vec(A) + vec(B) is equal to n times the magnitude of vec(A) - vec(B) , then the angle between vec(A) and vec(B) is

Let vec a , vec b , vec c be three unit vectors such that | vec a+ vec b+ vec c| = 1 and vec a_|_ vec bdot If vec c makes angles alpha,beta with vec a , vec b respectively then cosalpha+cosbeta is equal to (a) 3/2 (b) 1 (c) -1 (d) None of these