Let `hata and hatb` be unit vectors at an angle `(pi)/(3)` with each other. If `(hatatimes(hatbtimeshatc))*(hatatimeshatc)=5` then
Statement-I `[hata hatb hatc]=10`
Statement-II [x y z]=0, if x=y or y=z or z=x

If hata,hatb and hatc are three unit vectors inclined to each other at an angle theta . The maximum value of theta is

Let hata,hatb and hatc be unit vectors and alpha, beta , and gamma the angles between the vectors hata,hatb,hatb,hatc and hatc, hata respectively . If hata + hatb+hatc is also a unit vectors, then cosalpha + cosbeta +cosgamma is equal to -

Let hata and hatc are unit vectors and |vecb|=4 . If the angle between hata and hatc is cos^(-1)((1)/(4)) , and hatb-2hatc=lambda hata , then the value of lambda can be :

Let hata and hatb be two unit vectors. If the vectors vecc=hata+2hatb and vecd=5hata-4hatb are perpendicular to each other then the angle between hata and hatb is (A) pi/2 (B) pi/3 (C) pi/4 (D) pi/6