The volume of a tetrahedron determined b...

The volume of a tetrahedron determined by the vectors `veca, vecb, vecc` is `(3)/(4)` cubic units. The volume (in cubic units) of a tetrahedron determined by the vectors `3(veca xx vecb), 4(vecbxxc) and 5(vecc xx veca)` will be

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If the volume of the parallelepiped formed by the vectors veca xx vecb, vecb xx vecc and vecc xx veca is 36 cubic units, then the volume (in cubic units) of the tetrahedron formed by the vectors veca+vecb, vecb+vecc and vecc + veca is equal to

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The volume of a tetrahedron determined by the vectors `veca, vecb, vecc` is `(3)/(4)` cubic units. The volume (in cubic units) of a tetrahedron determined by the vectors `3(veca xx vecb), 4(vecbxxc) and 5(vecc xx veca)` will be

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