The volume of a tetrahedron formed by the coterminous edges ` vec a , vec b ,a n d vec c` is 3. Then the volume of the parallelepiped formed by the coterminous edges ` vec a+ vec b , vec b+ vec ca n d vec c+ vec a` is `6` b. `18` c. `36` d. 9

The volume of a tetrahedron formed by the coterminous edges vec a , vec b ,a n d vec c is 3. Then the volume of the parallelepiped formed by the coterminous edges vec a+ vec b , vec b+ vec ca n d vec c+ vec a is a. 6 b. 18 c. 36 d. 9

The volume of a tetrahedron formed by the coterminous edges vec a,vec b, and vec c is 3. Then the volume of the parallelepiped formed by the coterminous edges vec a+vec b,vec b+vec c and vec c+vec a is 6 b.18 c.36 d.9

Volume of parallelepiped determined by vectors vec a,vec b and vec c is 5. Then the volume of the parallelepiped determined by vectors 3(vec a+vec b),(vec b+vec c) and 2(vec c+vec a) is

Volume of parallelepiped formed by vectors vec a timesvec b,vec b timesvec c and vec c timesvec a is 36 then find the volume of parallelepiped formed by the vectors vec a,vec b and vec c

Volume of parallelepiped formed by vectors vec axx vec b , vec bxx vec ca n d vec cxx vec ai s36s qdot units. Column I|Column II Volume of parallelepiped formed by vectors vec a , vec b ,a n d vec c is|p. 0sq.units Volume of tetrahedron formed by vectors vec a , vec b ,a n d vec c is|q. 12 sq. units Volume of parallelepiped formed by vectors vec a+ vec b , vec b+ vec ca n d vec c+ vec a is|r. 6 sq. units Volume of parallelepiped formed by vectors vec a- vec b , vec b- vec ca n d vec c- vec a is|s. 1 sq. units

If [vec a, vec b, vec c] = 3 then the volume (in cubic units) of the parallelopiped with 2 vec a + vec b, 2 vec b + vec c and 2 vec c + vec a as coterminal edges is

[vec a, vec b + vec c, vec d] = [vec a, vec b, vec d] + [vec a, vec c, vec d]