Salinon

Let A, D, E, and B be four points on a line in the plane, in that order, with AD = EB. Let O be the bisector of segment AB (and of DE). Draw semicircles above line AB with diameters AB, AD, and EB, and another semicircle below with diameter DE. A salinon is the figure bounded by these four semicircles.{{cite journal

| last = Nelsen | first = Roger B.

| date = April 2002

| doi = 10.2307/3219147

| issue = 2

| journal = Mathematics Magazine

| jstor = 3219147

| page = 130

| title = Proof without words: The area of a salinon

| volume = 75}}

Archimedes introduced the salinon in his Book of Lemmas by applying Book II, Proposition 10 of Euclid's Elements. Archimedes noted that "the area of the figure bounded by the circumferences of all the semicircles [is] equal to the area of the circle on CF as diameter."

{{cite web

|url=http://www.cut-the-knot.org/proofs/Lemma.shtml

|title=Salinon: From Archimedes' Book of Lemmas

|work=Cut-the-knot

|accessdate=2008-04-15

|last=Bogomolny | first = Alexander

|author-link=Alexander Bogomolny

}}

Namely, if $r\_1$ is the radius of large enclosing semicircle, and $r\_2$ is the radius of the small central semicircle, then the area of the salinon is:{{mathworld|title=Salinon|urlname=Salinon}}

$$A=\backslash frac\{1\}\{4\}\backslash pi\backslash left(r\_1+r\_2\backslash right)^2.$$

Should points D and E converge with O, it would form an arbelos, another one of Archimedes' creations, with symmetry along the y-axis.

• Lune of Hippocrates

{{Reflist}}

• [http://images.math.cnrs.fr/L-arbelos-Partie-II.html L’arbelos. Partie II] by Hamza Khelif at [http://images.math.cnrs.fr/ www.images.math.cnrs.fr] of CNRS

Category:Piecewise-circular curves

Category:Archimedes