LIST OF EXTANT WORKS
23
at the area of any
e. a parabola) is
he same base and
ds theorem in the
rom that in the
ument is clinched
ion.
it.
der in which they
g the order of the
ses are concerned,
Books.
somposition ; and,
3 own prefaces to
n certain treatises
;e out an approxi
mated in the above
)n Floating Bodies
station by William
now been in great
tinople manuscript
i fragment of the
on of propositions
1 us through the
lation by Thâbit b.
Qurra the book is attributed to Archimedes, the propositions
cannot be his in their present form, since his name is several
times mentioned in them; but it is quite likely that some
of them are of Archimedean origin, notably those about the
geometrical figures called ap/377X09 (‘shoemaker’s knife’) and
ad\Lvou (probably ‘ salt-cellar ’) respectively and Prop. 8 bear
ing on the trisection of an angle.
There is also the Cattle-Problem in epigrammatic form,
which purports by its heading to have been communicated by
Archimedes to the mathematicians at Alexandria in a letter
to Eratosthenes. Whether the epigrammatic form is due to
Archimedes himself or not, there is no sufficient reason for
doubting the possibility that the substance of it was set as a
problem by Archimedes.
Traces of lost works.
Of works which are lost we have the following traces.
1. Investigations relating to polyhedra are referred to by
Pappus who, after alluding to the five regular polyhedra,
describes thirteen others discovered by Archimedes which are
semi-regular, being contained by polygons equilateral and
equiangular but not all similar. 1
2. There was a book of arithmetical content dedicated to
Zeuxippus. We learn from Archimedes himself that it dealt
with the naming of numbers [xarovoya^Ls ran> dpi.dp.cop) 2 and
expounded the system, which we find in the Band-reckoner, of
expressing numbers higher than those which^ould be written
in the ordinary Greek notation, numbers in fact (as we have
said) up to the enormous figure represented by 1 followed by
80,000 million million ciphers.
3. One or more works on mechanics are alluded to contain
ing propositions not included in the extant treatise On Plane
Equilibriums. Pappus mentions a work On Balances or Levers
{nepl £vya>v) in which it was proved (as it also was in Pinion’s
and Heron’s Mechanics) ,that ‘ greater circles overpower lesser
circles when they revolve about the same centre ’. 3 Heron, too,
speaks of writings of Archimedes ‘which bear the title of
1 Pappus, v, pp. 352-8.
2 Archimedes, vol. ii, pp. 216. 18, 236. 17-22 ; cf. p. 220. 4.
3 Pappus, viii, p. 1068.