Let `G_(1), G(2) and G_(3)` be the centroid of the triangular faces OBC, OCA and OAB of a tetrahedron OABC. If `V_(1)` denotes the volume of tetrahedron OABC and `V_(2)` that of the parallelepiped with `OG_(1), OG_(2) and OG_(3)` as three concurrent edges, then the value of `(4V_(1))/(V_2)` is (where O is the origin

Let G_(1),G_(2),G_(3) be the centroids of the triangular faces OBC, OCA, OAB of a tetrahedron OABC . If V_(1) denote the volume of the tetrahedron OABC and V_(2) that of the parallelopiped with OG_(1),OG_(2),OG_(3) as three concurrent edges, then

Let G_(1),G_(2) and G_(3) be the centroids of the trianglular faces OBC,OCA and OAB, respectively, of a tetrahedron OABC. If V_(1) denotes the volume of the tetrahedron OABC and V_(2) that of the parallelepiped with OG_(1),OG_(2) and OG_(3) as three concurrent edges, then prove that 4V_(1)=9V_(2) .

Let G_(1),G_(2) and G_(3) be the centroids of the trianglular faces OBC,OCA and OAB, respectively, of a tetrahedron OABC. If V_(1) denotes the volume of the tetrahedron OABC and V_(2) that of the parallelepiped with OG_(1),OG_(2) and OG_(3) as three concurrent edges, then prove that 4V_(1)=9V_(1) .

Let G_1, G_2a n dG_3 be the centroids of the triangular faces O B C ,O C Aa n dO A B , respectively, of a tetrahedron O A B Cdot If V_1 denotes the volumes of the tetrahedron O A B Ca n dV_2 that of the parallelepiped with O G_1,O G_2a n dO G_3 as three concurrent edges, then prove that 4V_1=9V_1dot

Statement If G_(1),G_(2),G_(3) are the centroids of the triangular faces OBC, OCA, OAB of a tetrahedron OABC , then the ratio of the volume of the tetrahedron to that of the parallelopiped with OG_(1),OG_(2),OG_(3) as coterminous edges is 9:4 . Statement 2: For any three vctors, veca, vecb,vecc [(veca+vecb, vecb+vecc, vecc+veca)]=2[(veca, vecb, vecc)]

Q.if (2,-1,2) is the centroid of tetrahedron (OABC)/(|bar(O)G_(1)|=)=

If OABC is regular tetrahedron of unit edge length with volume V cubic units, then 12sqrt(2)V

A(1,-2,3),B(2,1,3),C(4,2,1) and G(-1,3,5) is the centroid of the tetrahedron ABCD if P=D_(y) and q=D_(z) then 13p-11q=

Let A_(1), A_(2), A_(3), A_(4) be the areas of the triangular faces of a tetrahedron, and h_(1), h_(2), h_(3), h_(4) be the corresponding altitudes of the tetrahedron. If the volume of tetrahedron is 1/6 cubic units, then find the minimum value of (A_(1) +A_(2) + A_(3) + A_(4))(h_(1)+ h_(2)+h_(3)+h_(4)) (in cubic units).

Let A _(1), A_(2), A_(3), A_(4) be the areas of the triangular faces of a tetrahedron, and be the corresponding altitudes of the tetrahedron. If volume of tetrahedron is 1//6 cubic units, then find the minimum value of (A_(1) + A_(2) + A+_(3)+A_(4)) (h_(1) + h _(2)h _(3) +h_(4)) (in cubic units).