# Figure 6.19 - Sphere to Cube - Relations and Proportions

Thickness (Volume, Cubic)Volume decreases with increased potential.

Volume increases with decreased potential.

Cube Root of the Volume = SqRt of the Area = Length

"Cubing the Sphere"

(Sphere contiguous with and enclosed by a Cube)

Sphere Volume = 2 X 3

Cube Volume = 6561

Ratio: 282,429,536,481:147,879,835,542::19,683:10,306 = Diminished Octave (Seventh)

Sphere to Cube = Minor Seventh = 5:9::(2 X 3

Volume increases with decreased potential.

Cube Root of the Volume = SqRt of the Area = Length

"Cubing the Sphere"

(Sphere contiguous with and enclosed by a Cube)

Sphere Volume = 2 X 3

^{15}X 5153 = 147,879,835,542Cube Volume = 6561

^{3}= 282,429,536,481Ratio: 282,429,536,481:147,879,835,542::19,683:10,306 = Diminished Octave (Seventh)

Sphere to Cube = Minor Seventh = 5:9::(2 X 3

^{15}X 5153):(6561^{3})(NOTE: Compute music ratios for 3 inner cubes and spheres)

See Also

**Cube**

**Cube Sphere**

**Cube-Sphere**

**Cubing the Sphere**

**Figure 6.17 - Areas and Volumes - Relations and Proportions**

**Figure 6.19 - Sphere to Cube - Relations and Proportions**

**Figure 12.09 - Dimensions and Relationships**

**Quadrature of the Circle**

**Reciprocating Proportionality**

**Table 12.02 - Length Area and Volume Math**

**The Universal One**, page 163

**Volumetric Resonator**

Page last modified on Sunday 07 of April, 2013 07:27:21 MDT