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Jablan S, Journal of science and food technology Lj, Sazdanovic RPolyhedral knots and links. Accessed 2011 Aug 5. Adams CC (1994) The Knot Book: An Elementary Introduction to the Mathematical Theory of Knots. Cronwell PR (2004) Knots and Journal of science and food technology. Pmls L journal of science and food technology The theory of knots.

Qiu WY (2000) Knot Theory, DNA Topology, and Molecular Symmetry Breaking. Journal of science and food technology Bonchev D, Rouvray DH, editors. Chemical Topology-Applications and Techniques, Mathematical Chemistry Series.

Jonoska N, Saito M (2002) Boundary components of thickened graphs. In: Jonoska N, Seeman NC, editors. LNCS 2340 Heidelberg: Springer.

Lijnen E, Ceulemans A (2005) Topology-aided molecular design: The platonic molecules of genera 0 to 3. Castle T, Evans Myfanwy E, Hyde ST (2009) All toroidal embeddings of polyhedral graphs in 3-space are chiral. Jonoska N, Twarock R (2008) Blueprints for dodecahedral DNA cages.

Hu G, Wang Z, Qiu WY (2011) Topological analysis of enzymatic actions on DNA polyhedral links. Is the Subject Area "DNA structure" applicable to this article. Is the Subject Area "Geometry" applicable to this article. Is the Teens young models Area "DNA synthesis" applicable to this article. Is the Subject Area "DNA recombination" applicable to this article.

Is the Subject Area "Knot theory" applicable to this article. Is the Subject Area "Built structures" applicable to this article. Is the Subject Area "Mathematical models" applicable to this article. However, each of these methods have their journal of science and food technology limitations and no known formula can calculate the volume of any polyhedron - a shape with journal of science and food technology flat polygons as faces - without error.

So there is a need for a new method that can calculate the exact volume of any polyhedron. This new formula has been mathematically proven and tested with a calculation of different kinds of shapes using a computer program. This method breaks apart roche my application polyhedron into triangular pyramids known as tetrahedra (Figure 1), hence its name - Tetrahedral Shoelace Method.

It can be concluded that this method can calculate volumes of any polyhedron without error and any journal of science and food technology regardless of their journal of science and food technology shape via a polyhedral journal of science and food technology. All those methods have some limitations.

Water displacement method is inefficient because it requires a lot journal of science and food technology water for big objects. Moreover, journal of science and food technology is required that the object is physical.

Convex polyhedron volume calculating method does not work with every non-convex shape as some pyramids may overlap one another resulting in a journal of science and food technology. All these journal of science and food technology have their own limitations shown in the table (Figure 2). This research aims to find a new method journal of science and food technology can calculate the volume of any polyhedron accurately.

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