What is a Triangular Cupola?
A cupola is a polyhedron with two opposite polygons, of which one has twice as many vertices as the other and with alternating triangles and quadrangles as side faces. When all faces of the cupola are regular, then the cupola itself is regular and is a Johnson solid. There are three regular cupolae, the triangular, the square, and the pentagonal cupola. A Triangular Cupola has 8 faces, 15 edges, and 9 vertices. Its top surface is an equilateral triangle and its base surface is a regular hexagon.
How to Calculate Surface to Volume Ratio of Triangular Cupola given Height?
Surface to Volume Ratio of Triangular Cupola given Height calculator uses Surface to Volume Ratio of Triangular Cupola = (3+(5*sqrt(3))/2)/(5/(3*sqrt(2))*(Height of Triangular Cupola/sqrt(1-(1/4*cosec(pi/3)^(2))))) to calculate the Surface to Volume Ratio of Triangular Cupola, The Surface to Volume Ratio of Triangular Cupola given Height formula is defined as the numerical ratio of the total surface area of a Triangular Cupola to the volume of the Triangular Cupola and is calculated using the height of the Triangular Cupola. Surface to Volume Ratio of Triangular Cupola is denoted by RA/V symbol.
How to calculate Surface to Volume Ratio of Triangular Cupola given Height using this online calculator? To use this online calculator for Surface to Volume Ratio of Triangular Cupola given Height, enter Height of Triangular Cupola (h) and hit the calculate button. Here is how the Surface to Volume Ratio of Triangular Cupola given Height calculation can be explained with given input values -> 0.634808 = (3+(5*sqrt(3))/2)/(5/(3*sqrt(2))*(8/sqrt(1-(1/4*cosec(pi/3)^(2))))).