In cylindrical coordinates, the conchospiral is described by the parametric equations:

${\displaystyle r=\mu ^{t}a}$ 

${\displaystyle \theta =t}$ 

${\displaystyle z=\mu ^{t}c.}$ 

The projection of a conchospiral on the ${\displaystyle (r,\theta )}$  plane is a logarithmic spiral. The parameter ${\displaystyle \mu }$  controls the opening angle of the projected spiral, while the parameter ${\displaystyle c}$  controls the slope of the cone on which the curve lies.

The name "conchospiral" was given to these curves by 19th-century German mineralogist Georg Amadeus Carl Friedrich Naumann, in his study of the shapes of sea shells.^[5]

The conchospiral has been used in the design for radio antennas. In this application, it has the advantage of producing a radio beam in a single direction, towards the apex of the cone.^[6][7]

• Weisstein, Eric W. "Concho-Spiral". MathWorld.