Gyroid sculpture
Triply-periodic Minimal surface driven by mathematical equation carved from Spalted Maple. Family of these surfaces was first described in 1866 by H.A. Schwarz, Gyroid was developed by Alan H. Schoen in 1970. Intricate curved surface without straight lines and any symmetry and without intersection gives you endless enjoinment of tactile and mental surveying of this sculpture. Described by formula: cos(x)*sin(y)+cos(y)*sin(z)+cos(z)*sin(x)=0
Size: 63 mm (2.5”) x 63 mm (2.5”). Weight: 28 gr (1 oz).Triply-periodic Minimal surface driven by mathematical equation carved from Spalted Maple. Family of these surfaces was first described in 1866 by H.A. Schwarz, Gyroid was developed by Alan H. Schoen in 1970. Intricate curved surface without straight lines and any symmetry and without intersection gives you endless enjoinment of tactile and mental surveying of this sculpture. Described by formula: cos(x)*sin(y)+cos(y)*sin(z)+cos(z)*sin(x)=0
Size: 63 mm (2.5”) x 63 mm (2.5”). Weight: 28 gr (1 oz).Triply-periodic Minimal surface driven by mathematical equation carved from Spalted Maple. Family of these surfaces was first described in 1866 by H.A. Schwarz, Gyroid was developed by Alan H. Schoen in 1970. Intricate curved surface without straight lines and any symmetry and without intersection gives you endless enjoinment of tactile and mental surveying of this sculpture. Described by formula: cos(x)*sin(y)+cos(y)*sin(z)+cos(z)*sin(x)=0
Size: 63 mm (2.5”) x 63 mm (2.5”). Weight: 28 gr (1 oz).