If `|vec(A)+vec(B)|=|vec(A)|+|vec(B)|,` then angle between `vec(A)and vec(B)` will be

When vec(A)*vec(B)=-|vec(A)||vec(B)|, then

If vec(A)xxvec(B)=vec(B)xxvec(A) , then the angle between vec(A) and vec(B) is-

The magnitudes of vectors vec(A),vec(B) and vec(C) are 3,4 and 5 unit respectively. If vec(A)+vec(B)=vec(C), the angle between vec(A) and vec(B) is

Given vec(p)*(vec(P)+vec(Q))=P^(2) then the angle between vec(P)andvec(Q) is

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

Assertion : vec(A)xxvec(B) is perpendicular to both vec(A)+vec(B) as well as vec(A)-vec(B) . Reason: vec(A)+vec(B) as well as vec(A)-vec(B) lie in the plane contanining vec(A)and vec(B) , but vec(A)xxvec(B) lies perpendicular to the plane containing A and B.

vec(A)and vec(B) are the two vectors such that ratio their dot product to magnitude of their cross product is (1)/(sqrt3) . Then the angle between vec(A)and vec(B) is

Choose the incorrect option. The two vectors vec(P) and (Q) are drawn from a common point and vec( R ) = (P) + (Q), then angle between (P) and (Q) is

Assertion : If dot product and cross product of vec(A)andvec(B) are zero, it implies that one of the vector vec(A)andvec(B) must be a null vector. Reason: Null vector is a vector with zero mangnitude.