The OABC is a tetrahedron such that `OA^2+BC^2=OB^2+CA^2=OC^2+AB^2`,then

If OABC is a tetrahedron such that OA^(2)+BC^(2)=OB^(2)+CA^(2)=OC^(2)+AB^(2) then

If OABC is a tetrahedron such that OA^(2)+BC^(2)=OB^(2)+CA^(2)=OC^(2)+AB^(2) then

OABC is a tetrahedron such that OA=OB=OC=k and each of the edges OA,OB and OC is inclined at an angle theta with the other two the range of theta is

If G be the centroid of the DeltaABC and O be any other point in theplane of the triangle ABC , then prove that: OA^2 +OB^2 +OC^2=GA^2 +GB^2 +GB^2 + GC^2 + 3GO^2

OABC is a tetrahedron D and E are the mid points of the edges vec OA and vec BC. Then the vector vec DE in terms of vec OA,vec OB and vec OC

O is any point inside a rectangle ABCD.Prove that OB^(2)+OD^(2)=OA^(2)+OC^(2)

If OAB is a tetrahedron with edges and hatp, hatq, hatr are unit vectors along bisectors of vec(OA), vec(OB):vec(OB), vec(OC):vec(OC), vec(OA) respectively and hata=(vec(OA))/(|vec(OA)|), vecb=(vec(OB))/(|vec(OB)|), vec c= (vec(OC))/(|vec(OC)|) , then :