Nicomedes is famous for his treatise On conchoid lines which contain his discovery of the curve known as the conchoid of Nicomedes. How did Nicomedes define the curve. Consider the diagram. We are given a line XY and a point A not on the line. ABC is drawn perpendicular to XY cutting it at B and having the length BC some fixed value, say b. Then rotate ABC about A so that, in an arbitrary position ADE then DE = b. So if a point P on the conchoid is joined to A then PA cuts the line XY in a point at distance b from P.
Nicomedes recognised three distinct forms in this family but the sources do not go into detail on this point. It is believed that they must be the three branches of the curve. The conchoid can be used in solving both the problems of trisection of an angle and of the duplication of a cube. Both these problems were solved by Nicomedes using the conchoid, in fact as Toomer writes in :-
As far as is known, all applications of the conchoid made in antiquity were developed by Nicomedes himself. It was not until the late sixteenth century, when the works of Pappus and Eutocius describing the curve became generally known, that interest in it revived...As indicated in this quote Pappus also wrote about Nicomedes, in particular he wrote about his solution to the problem of trisecting an angle (see for example ):-
Nicomedes trisected any rectilinear angle by means of the conchoidal curves, the construction, order and properties of which he handed down, being himself the discoverer of their peculiar character.Nicomedes also used the quadratrix, discovered by Hippias, to solve the problem of squaring the circle. Pappus tells us (see for example ):-
For the squaring of the circle there was used by Dinostratus, Nicomedes and certain other later persons a certain curve which took its name from this property, for it is called by them square-formingin other words the quadratrix.
Eutocius tells us that Nicomedes :-
... prided himself inordinately on his discovery of this curve, contrasting it with Eratosthenes's mechanism for finding any number of mean proportionals, to which he objected formally and at length on the ground that it was impracticable and entirely outside the spirit of geometry.
Article by: J J O'Connor and E F Robertson
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