The edges of a parallelopiped are of unit length and a parallel to non-coplanar unit vectors `hata, hatb, hatc` such that `hata.hatb=hatb.hatc=hatc.veca=1//2`. Then the volume of the parallelopiped in cubic units is

The edges of a parallelopiped are of unit length and are parallel to non-coplanar unit vectors hata, hatb, hatc such that hata.hatb=hatb.hatc=hatc.hata=1//2. Then the volume of the parallelopiped is :

The edges of a parallelopiped are of unit length and are parallel to non coplanar unit vectors hata,hatb,hatc such that hata.hatb=hatb.hatc=hatc.hata=1/2 Then the volume of the parallelopiped is (A) 1/sqrt(2) (B) 1/(2sqrt(2)) (C) sqrt(3)/2 (D) 1/sqrt(3)

The edges of a parallelopiped are of unit length and are parallel to non-coplanar unit vectors vec a, vec b, vec c such that hat a.hatb=hatb .hatc=hatc.hata=1/2. Then, the volume of parallelopiped is

The edges of a parallelopiped are of unit length and are parallel to non-coplanar unit vectors vec a, vec b, vec c such that hat a.hatb=hatb .hatc=hatc.hata=1/2 . Then, the volume of parallelopiped is

If vectors hata, hatb, hatc are in space such that hata.hatb=hatb.hatc=hatc.hata=1/2 , then (hataxxhatb).(hataxx(hatbxxhatc)) is equal to

Two non-collinear unit vectors hata and hatb are such that | hata + hatb | = sqrt3 . Find the angle between the two unit vectors.

Two non-collinear unit vectors hata and hatb are such that |hata + hatb| =sqrt3 . Find the angle between the two unit vectors.

Two non-collinear unit vector hata and hatb are such that |hata+hatb|=sqrt(3) . Find the angle between the two unit vectors.

If hata, hatb, hatc are unit vectors such that hata+hatb+hatc=0 then find the value of hata.hatb+hatb.hatc+hatc.hata

What is the value of hata*hatb+hatb*hatc+hatc*hata if hata+hatb+hatc=vec0 ?