If the volume of the parallelopiped with a, b and c as coterminous edges is 40 cu units, then the volume of the parallelopiped having `b+c, c+a and a+b` as coterminous edges in cubic units is

If the volume of the parallelopiped with a, b and c as coterminous edges is 40 cubic units, then the volume of the parallelopiped having b+c, c+a and a+b as coterminous edges in cubic units is

If the volume of the parallelopiped formed by the vectors veca, vecb, vecc as three coterminous edges is 27 units, then the volume of the parallelopiped having vec(alpha)=veca+2vecb-vecc, vec(beta)=veca-vecb and vec(gamma)=veca-vecb-vecc as three coterminous edges, is

If V is the volume of the parallelopiped having three coterminous edges as veca,vecb and vecc , then the volume of the parallelopiped having three coterminous edges as vec(alpha)=(veca.veca)veca+(veca.vecb)vecb+(veca.vecc)vecc vec(beta)=(veca.vecb)veca+(vecb.vecb)vecb+(vecb.vecc)vecc vec(gamma)=(veca.vecc)veca+(vecb.vecc)vecb+(vecc.vecc)vecc is

If V is the volume of parallelopiped formed by the vectors vec a,vec b,vec c as three co-terminous edges is 27 cubic units,then the volume of the parallelopiped having vec alpha=vec a+2vec b-vec c,vec beta=vec a-vec b and vec gamma=vec a-vec b-vec c as three coterminous edges is

Statement 1: Let V_(1) be the volume of a parallelopiped ABCDEF having veca, vecb, vecc as three coterminous edges and V_(2) be the volume of the parallelopiped PQRSTU having three coterminous edges as vectors whose magnitudes are equal to the areas of three adjacent faces of the parallelopiped ABCDEF . Then V_(2)=2V_(1)^(2) Statement 2: For any three vectors vec(alpha), vec(beta), vec(gamma) [vec(alpha)xxvec(beta),vec(beta)xxvec(gamma),vec(gamma)xxvec(alpha)]=[(vec(alpha),vec(beta),vec(gamma))]^(2)

Statement 1: If V is the volume of a parallelopiped having three coterminous edges as veca, vecb , and vecc , then the volume of the parallelopiped having three coterminous edges as vec(alpha)=(veca.veca)veca+(veca.vecb)vecb+(veca.vecc)vecc vec(beta)=(veca.vecb)veca+(vecb.vecb)vecb+(vecb.vecc)vecc vec(gamma)=(veca.vecc)veca+(vecb.vecc)vecb+(vecc.vecc)vecc is V^(3) Statement 2: For any three vectors veca, vecb, vecc |(veca.veca, veca.vecb, veca.vecc),(vecb.veca,vecb.vecb,vecb.vecc),(vecc.veca,vecc.vecb,vecc.vecc)|=[(veca,vecb, vecc)]^(3)

The volume of the parallelopiped, if a=3hati,b=5hatj and c=4hatk are coterminous edges of the parallelopiped is