Euclid's Elements, Subject Index

acute angle. See angle, acute.
algorithm, Euclidean See Euclidean algorithm.
alternate angles I.27
alternate proportions and ratios
definition V.Def.12
for magnitudes V.16
for numbers VII.13
amicable numbers VII.Def.22
angle (plane)
See also solid angle.
obtuse angle I.Def.12
alternate angles I.27
bisection I.9
construction I.23
definition I.Def.8, I.Def.9
exterior angle I.16, I.32
horn angle I.Def.8, III.16, V.Def.4
angles as magnitudes I.Def.9
proportional to arc VI.33
in a segment III.Def.8
obtuse angle I.Def.11
of a segment III.Def.7
on a circumference III.Def.9, III.26, III.27
rectilinear angle I.Def.9
right angle I.Def.10
right angles are equal Post.4
angles about a transversal I.27, I.28, I.29,
trisection Post.2
two right angles are straight I.13, I.14
vertical angles I.15
antecedents in proportions V.Def.11
antenaresis See Euclidean algorithm.
application of areas
in an angle I.42, I.44, I.45
exceeding by a parallelogram VI.29
exceeding by a square II.6
falling short by a parallelogram VI.27 VI.28
falling short by a square II.5
approximation of circles by polygons XII.2,
Apollonius of Perge (ca. 250–175 B.C.E.)
terms for conic sections XI.Def.18
arc proportional to angle VI.33
Archimedes of Syracuse (ca. 287–212 B.C.E.)
angle trisection Post.2
neusis Post.2
property of magnitudes X.1
area
Heron’s formula for a triangle IV.4
medial X.21
arithmetic, fundamental theorem of VII.31
arithmetic mean or average V.25
associativity of addition
for magnitudes C.N.
associativity of multiplication
for magnitudes V.3
average, arithmetic and geometric V.25
authenticity of the Elements I.Def.1
of I.40
of V.19
of X.10
axiom
axiom of comparability V.Def.4
for magnitudes C.N.
axis
of a cone XI.Def.19
of a cylinder XI.Def.22
of a sphere XI.Def.15

base
of a cone XI.Def.19
of a cylinder XI.Def.23
of a triangle I.4
bisect
an angle I.9
a circumference (arc) III.30
a line I.10
boundary I.Def.13
Brouwer, L.E.J. (1881–1966)
nonconstructive fixed point theorem I.6

cancellation
for addition C.N.
in proportions V.9
carpenter’s square II.Def.2
center of a circle
characterization III.9
construction III.1
definition I.Def.16
intersecting circles have distinct centers III.5
tangent circles have distinct centers III.6
Chrysippus (280 207)
1 as a number VII.Def.1-2
circumference
a circumference (arc) III.30
circle
area of XII.2,
central angle double angle at circumference III.20
chord inside circle III.2
center of. See center of a circle.
construct circle from segment III.25
construction Post.3
definition I.Def.15
diameter of. See diameter.
equal angles in segments III.21
equal chords at equal distances III.14
equal circles III.Def.1
intersection of circles III.10
product of secants III.37
product of secants equals tangent² III.36
products of chord sections III.35
proportional to diameter² XII.2,
radius of. See radius of a circle.
right angle in semicircle III.31
sector of. See sector of a circle.
segment of. See segment of a circle.
tangent to. See tangent.
circumcenter of a triangle IV.5
circumcircle of a triangle IV.5
circumference
proportional to angle VI.33
circumscribed figures
circle circumscribed about a pentagon IV.14
circle circumscribed about a rectilinear figure IV.Def.6
circle circumscribed about a square IV.9
circle circumscribed about a triangle IV.5
pentagon circumscribed about a circle IV.12
rectilinear figure circumscribed about a circle IV.Def.4
rectilinear figure circumscribed about a rectilinear figure IV.Def.2
square circumscribed about a circle IV.7
triangle circumscribed about a circle IV.3
commensurable
definition X.Def.1
and numerical ratios V.Def.5
in square X.Def.2
magnitudes and numerical ratios X.5,, X.6, X.7, X.8
common notions C.N.
commutativity
for addition of magnitudes C.N.
of multiplication VII.15 VII.18
compass construction Post.3
componendo V.Def.14
composite numbers
definition VII.Def.13
divisible by a prime VII.31
cone
axis XI.Def.18
base XI.Def.19
cone one third of cylinder XII.10
definition XI.Def.20
proportional to base XII.11
proportional to height XII.14
reciprocally proportional XII.15
right-angled, acute-angled, obtuse angled XI.Def.18
similar cones XI.Def.24, XII.12
congruent
figures I.4
solids XI.Def.10
congruence propositions for triangles. See triangle.
connected figure I.Def.14
consequents in proportions V.Def.11
constructions, 2- and 3-dimensional XI.20
continued proportion V.Def.8, VIII.1
in lowest terms VIII.1, VIII.2, VIII.3, VIII.4
sum of a IX.35
contradiction, proof by I.5
contrapositive proposition I.27
converse of a proposition I.5, I.27
conversion of a proportion or ratio
definition V.Def.16
proposition for magnitudes V.19
convertendo V.Def.16
convex figure I.Def.14
cosines, law of II.12, II.13
cross multiplication of proportions
for lines VI.16
for numbers VII.19
cube
construction XIII.15
definition XI.Def.25
relation to dodecahedron XIII.17
relation to tetrahedron XIII.15
cubic numbers VII.Def.19, IX.3, IX.4, IX.5, IX.6
cut into extreme and mean ratio. See extreme and mean ratio.
cylinder
axis of XI.Def.22
bases of XI.Def.23
cone one third of cylinder XII.10
definition XI.Def.21
proportional to base XII.11
proportional to height XII.13, XII.14
reciprocally proportional XII.15
similar cylinders XI.Def.24, XII.12

decagon, regular (10-gon)
side of hexagon to side of decagon XIII.9
sides of pentagon, hexagon, & decagon XIII.10
Descartes (1591–1661)
geometric algebra VI.12
diameter of a circle
bisecting chord III.3
definition I.Def.17
diameter is greatest chord III.15
distance, line to point III.Def.4
distributivity
of division over addition VII.5
of division over subtraction VII.7
of multiplication over addition
for lines II.1, II.2
for magnitudes V.1, V.2
for numbers VII.6, VII.8
of multiplication over subtraction
for magnitudes V.5, V.6
divisor of a number VII.Def.3
dodecahedron
construction XIII.17
definition XI.Def.28
relation to cube XIII.17
dual of a polyhedron XIII.14
duplicate ratio V.Def.9

elegance in mathematics I.30
ellipse XI.Def.18
elliptic geometry I.16
equal
circles III.Def.11
equal and similar solids XI.Def.10
equilateral triangle (60°-60°-60° triangle)
construction I.1
definition I.Def.20
side of XIII.12
equivalence relation V.Def.3
equality as an equivalence relation C.N.
proportion as an equivalence relation V.Def.5
Euclid (fl. ca. 300 B.C.E.).
Euclidean algorithm VII.2, VII.3, X.3
characterization of incommensurability of magnitudes X.2
test for relatively prime numbers VII.1
Eudoxus (ca. 408–355 B.C.E)
definition or proportion V.Def.6
principle of exhaustion XII.2
property of magnitudes X.1
even
even number VII.Def.6, IX.21, IX.24, IX.27, IX.28, IX.30
even-times even number VII.Def.8, IX.32, IX.34
even-times odd number VII.Def.9, IX.33, IX.34
ex aequali ratios and proportions
definition V.Def.17
for magnitudes V.22
for numbers VII.14
excircle of a triangle IV.4
exhaustion, principle of XII.2
exterior angle
greater than opposite interior angle of triangle I.16
sum of opposite interior angles of triangle I.32
extreme and mean ratio
algebra on segments XIII.1, XIII.2, XIII.3, XIII.4, XIII.5
construction II.11, VI.30
definition VI.Def.3
is irrational called apotome XIII.6,
in a 36°-72°-72° triangle IV.10
in a pentagram IV.11, XIII.8
side of hexagon to side of decagon XIII.9

face of a solid XI.Def.2
figure I.Def.14
connected I.Def.14
convex I.Def.14
rectilinear I.Def.19
simply connected I.Def.14
fit a straight line
into a circle, construction IV.1
into a circle, definition IV.Def.7
into a diagram Post.2
Fermat, Pierre de (1601–1665).
Fermat primes IV.16
Mersenne primes and perfect numbers IX.36
fourth proportionals V.18
friendly numbers VII.Def.22
fundamental theorem of arithmetic VII.31

Gauss, Carl Friedrich (1777–1855).
regular polygons IV.16
GCD. See greatest common divisor.
geometric mean or average V.25, VI.13
geometric progression or sequence. See continued proportion.
geometry
elliptic I.16
hyperbolic I.29
nonEuclidean Post.5
gnomon II.Def.2
golden ratio. See extreme and mean ratio.
greatest common divisor
Euclidean algorithm for VII.3, VII.2
for several numbers VII.4
greatest common measure
of several commensurable magnitudes X.4
of two commensurable magnitudes X.3
group C.N.

Heath, Thomas Little (1861–1940)
edition of the Elements About the Text References on the web
height of a figure VI.Def.4
Heiberg, Johan Ludvig (1854–1928)
edition of the Elements About the Text References on the web I.Def.1
Heron of Alexandria (ca. 1st century C.E.)
definition of equal and similar solids XI.Def.10
Heron’s formula for area of a triangle IV.4
minimum distance problem I.20
hexagon, regular
inscribed in a circle IV.15
side of hexagon to side of decagon XIII.9
sides of pentagon, hexagon, & decagon XIII.10
hexahedron, regular. See cube.
Hilbert, David (1862–1943)
Foundations of Geometry I.4
Hippocrates of Chios (fl. ca. 430 B.C.E.).
his Elements I.3
quadrature of lunes VI.31
horn angle. See angle, horn.
hyperbola XI.Def.18
hyperbolic geometry I.29

icosahedron
construction XIII.16
definition XI.Def.27
incenter of a triangle IV.4
incircle of a triangle IV.4
inclination
line to a line. See angle.
line to a plane XI.Def.5
plane to a plane XI.Def.6
similar XI.Def.7
incommensurable. See commensurable.
infinitude of prime numbers IX.20
inscribed figures
15-gon inscribed in a circle IV.16
circle in a pentagon IV.13
circle in a rectilinear figure IV.Def.5
circle inscribed in a square IV.8
circle inscribed in a triangle IV.4
hexagon inscribed in a circle IV.15
pentagon inscribed in a circle IV.11
rectilinear figure in a circle IV.Def.3
rectilinear figure in a rectilinear figure IV.Def.1
square inscribed in a circle IV.6
triangle inscribed in a circle IV.2
inverse proportions and ratios
definition V.Def.13
proposition V.7
inverse proposition I.27
irrational. See rational.
irrationality of surds VIII.8
isosceles triangle
definition I.Def.20
has equal base angles I.5, I.5
larger vertex angle & larger base I.24, I.24

jointly
ratios and magnitudes taken jointly V.Def.14, V.17, V.18
law of cosines II.12, II.13
law of sines I.19
law of trichotomy. See trichotomy.
LCM. See least common multiple.
least common multiple VII.33, VII.34, VII.35
of several numbers VII.36
Lindemann, Ferdinand (1852–1939)
transcendence of π II.14
line
See also straight line.
definition I.Def.2
ends of a line I.Def.3
medial X.21
lowest terms VII.20
are are relatively prime VII.21, VII.22, VIII.1
reduce to VII.33
lunes, quadrature VI.31

magnitude V.Def.1
commensurable. See commensurable
infinite and infinitesimal magnitudes V.Def.4
multiple of a magnitude V.Def.2
part of a magnitude V.Def.1
proportional magnitudes V.Def.5
ratio of magnitudes V.Def.3, V.Def.4
magnitudes in the same ratio V.Def.5
marginal references I.1
mean and extreme ratio. See extreme and mean ratio.
mean, arithmetic and geometric V.25
medial
line X.21
rectangle X.21
Mersenne, Marin (1588–1648).
Mersenne primes IX.36
monad, definition VII.Def.1
modern analysis, method of VI.1
multilateral figure I.Def.19. See polygon.
multiple
a magnitude V.Def.2
of a number VII.Def.5
multiplication
of numbers VII.Def.15

neusis Post.2
nonEuclidean geometry Post.5
number
amicable numbers VII.Def.22
composite number VII.Def.13
cubic number VII.Def.19
definition VII.Def.2
divisible by a prime VII.32
divisor of a number VII.Def.3
even. See even number.
even-times even. See even number.
even-times odd. See even number.
friendly numbers VII.Def.22
multiple of a number VII.Def.5
odd. See odd number.
odd-times odd. See odd number.
part of a number VII.Def.3
parts of a number VII.Def.4
perfect number VII.Def.22
plane number VII.Def.16
prime number VII.Def.11
relatively composite numbers VII.Def.14
relatively prime numbers VII.Def.12
sides of a plane number VII.Def.16
sides of a solid number VII.Def.17
similar plane and solid numbers VII.Def.21
solid number VII.Def.17
square number VII.Def.18
triangular number VII.Def.16
1 as a number V.Def.5
number theory
foundations of VII.1
Peano's axioms VII.Def.1

oblong I.Def.22
obtuse angle. See angle, obtuse.
octahedron, regular
construction XIII.14
definition XI.Def.26
odd
odd number VII.Def.7, IX.22, IX.23, IX.25, IX.26, IX.27, IX.29, IX.30, IX.31
odd-times odd number VII.Def.10

Pappus of Alexandria (fl. ca. 320 C.E.)
proof of I.5
parabola XI.Def.18
parallel
lines I.Def.23, I.31
planes XI.Def.8
postulate Post.5
transitivity of parallelism I.30, XI.9
parallelogram
area of I.35, I.36
basic properties I.34
definition I.34
about the diameter I.43
equiangular parallelograms
proportional to sides VI.23
proportional to base VI.1
reciprocally proportional parallelograms VI.14
similar parallelograms about the diameter VI.24 VI.26
parallelepiped (parallelepipedal solid)
bisected by diagonal XI.28
construct similar one XI.27
definition XI.24
equal XI.29, XI.30, XI.31
proportional to base XI.25, XI.32
proportional to sides XI.33, XI.36, XI.37
reciprocally proportional parallelepipeds XI.34
part of a magnitude
definition V.Def.1
problem of parts V.5
part of a number
definition VII.Def.3
parts of a number
definition VII.Def.4
Peano, Giuseppe (1858–1932).
Peano's axioms for number theory VII.Def.1
pentagon, regular
circumscribed about a circle IV.12
criterion of regularity XIII.7
diagonals cut in extreme and mean ratio XIII.8
inscribed in a circle IV.11
Richmond’s construction IV.11
sides of pentagon, hexagon, & decagon XIII.10
side of pentagon is irrational called minor XIII.11
perfect number
definition VII.Def.22
construction IX.36
perpendicular, line to a line
construction given a point I.11, I.12
definition I.Def.10,
perpendicular, line to a plane
definition XI.Def.3
propositions XI.4, XI.6, XI.8, XI.11, XI.12, XI.13
perturbed proportion
definition V.Def.18
proposition V.22
plane
definition I.Def.7
determined by intersecting lines XI.2
determined by triangle XI.2
inclination to a line XI.Def.5
inclination to a plane XI.Def.6
intersection of two planes XI.3
parallel planes XI.Def.8, XI.14, XI.15, XI.16, XI.17
perpendicular to a line XI.Def.3, XI.14
perpendicular to a plane XI.Def.4, XI.18, XI.19
plane angle. See angle.
plane number
definition VII.Def.16
similar plane numbers VII.Def.21, VIII.26, IX.1, IX.2
proportional to sides VIII.5
Playfair
axiom of parallels I.30,
point
definition I.Def.1
polygons
approximating circles XII.2,
areas of similar polygons VI.20, XII.1
constructible regular polygons IV.16
polyhedra, regular
See tetrahedron, cube, octahedron, icosahedron, and dodecahedron.
classification XIII.18
duals of XIII.14
Pons Asinorum I.5
postulates Post.1-5
powers of 2 IX.32
prime numbers
definition VII.Def.11
dividing products VII.30
Fermat primes IV.16
infinitude of IX.20
Mersenne primes IX.36
powers of IX.13
products of IX.14
relatively prime VII.Def.12
principle of exhaustion XII.2,
prism
See also parallelepiped.
definition XI.Def.13
equal prisms XI.39
triangular prism partitioned into three equal pyramids XII.5,
Proclus (410–485 C.E.)
Commentary on Book I I.3
proof
by contradiction I.5
nonconstructive I.5
progression, geometric. See continued proportion.
proportion
alternate proportions V.Def.12, V.16 VII.13
antecedents in proportions V.Def.11
consequents in proportions V.Def.11
continued. See continued proportion.
conversion of a proportion V.Def.16, VII.19
cross multiplication VII.19
definition V.Def.6
proportions as equivalence relations V.Def.5
proportions ex aequali V.Def.17, V.22 VII.14
inverse proportions V.Def.13 V.7
magnitudes V.Def.6
numbers VII.Def.20
proportions taken jointly V.Def.14, V.17, V.18
perturbed proportion V.Def.18, V.22
proportions taken separately V.Def.15, V.17, V.18
operations on proportions V.Def.3
proportion in three terms V.Def.8
reciprocal. See reciprocal proportion
transitivity V.11
proportional
construct third proportional VI.11
construct fourth proportional VI.12
construct mean proportional VI.13
fourth proportionals V.18
fourth proportional of numbers IX.19
magnitudes V.Def.6
mean proportionals between cubic numbers VIII.12
mean proportional between similar plane numbers VIII.18, VIII.20
mean proportionals between similar solid numbers VIII.19, VIII.21
mean proportional between square numbers VIII.11
numbers VII.Def.20
third proportional of numbers IX.18
proposition
contrapositive I.27
converse of I.5
inverse of I.27
pyramid
See also tetrahedron, regular
definition XI.Def.12
pyramids proportional to their sides XII.8
pyramids proportional to their bases XII.5, XII.6
pyramid third of prism with same base XII.5
reciprocally proportional pyramids XII.9
Pythagorean theorem I.47
converse I.48
generalized to similar figures VI.31
Pythagorean triples X.29.Lemma1

Q.E.D. and Q.E.F. I.1
quadratic equation, solution by application of areas II.5, II.6, VI.28, VI.29
quadrilateral figure I.Def.19
quadrature
of circles II.14, XII.2,
of lunes VI.31
of rectilinear figures II.14
quadrilateral
Varignon parallelogram of a XI.9

radius of a circle
definition I.Def.15
perpendicular to tangent III.18, III.19
ratio
alternate ratio V.Def.12, V.16, VII.13
compounded ratio V.Def.3, VIII.5
conversion of a ratio V.Def.16 VII.19
definition V.Def.3
duplicate ratio V.Def.9
extreme and mean. See extreme and mean ratio.
ratios ex aequali V.Def.17, V.22 VII.14
greater ratio V.Def.7
inverse ratio V.Def.13
ratios taken jointly V.Def.14, V.17, V.18
in lowest terms VII.20
ratios of magnitudes V.Def.4
magnitudes in the same ratio V.Def.5
mixed ratio V.Def.3
nature of ratios V.Def.3
numerical ratio VII.Def.20, V.Def.5
operations on ratios V.Def.3
ratios taken separately V.Def.15, V.17, V.18
ratios of more than two terms V.Def.3
ratios of various kinds V.Def.3
triplicate ratio V.Def.9
rational
line X.Def.3
number V.Def.3
numbers and commensurable magnitudes X.5, X.6, X.7, X.8
squares and areas X.Def.4
reciprocally proportional figures
definition VI.Def.2
parallelograms VI.14
pyramids XII.9
triangles VI.15
rectangle (rectangular parallelogram)
contained by sides II.Def.1
medial X.21
rectilinear figure
definition I.Def.19
reflexive relation. See equivalence relation.
regular polygons, constructible IV.16
relation
equivalence relation V.Def.3
reflexive relation V.Def.3
symmetric relation V.Def.3
transitive relation V.Def.3
relatively composite numbers VII.Def.14
relatively prime numbers
definition VII.Def.12
are in lowest terms VII.21, VII.22
numbers dividing them are VII.23
primes are VII.29
products of VII.24, VII.25, VII.26, VII.27
sums of VII.28
revolution, solid of XI.Def.14
rhombus & rhomboid I.Def.22
right triangles. See triangles, right.

scalene triangle
definition I.Def.20
section into extreme and mean ratio. See extreme and mean ratio.
sector of a circle
definition III.Def.10
segment of a circle
definition III.Def.6
angle in III.Def.8, III.31
angle of III.Def.7
construct circle from segment III.25
equal angles in segments III.21
equal segments III.24
similar segments III.Def.11
separately
ratios taken separately V.Def.15, V.17, V.18 VII.11
separando V.Def.15
sequence, geometric. See continued proportion.
series (sum), geometric, IX.35
sides
of a plane number VII.Def.16
of a solid number VII.Def.17
semicircle
definition I.Def.18
semigroup C.N.
similar
areas of similar polygons VI.20
figures on proportional lines VI.22
equal and similar solids XI.Def.10
plane and solid numbers VII.Def.21
rectilinear figures
construction VI.18
similar cylinders and cones XI.Def.24
definition VI.Def.1
construction of given area VI.25
segments of circles III.Def.11
solids XI.Def.9
transitivity of similarity VI.21
triangles, See triangles, similar.
sines, law of I.19
simply connected figure I.Def.14
solid
congruent solids XI.Def.10
definition XI.Def.1
equal and similar solids XI.Def.10
face of XI.Def.1
of revolution XI.Def.14
similar solids XI.Def.9
solid angle
definition XI.Def.11,
propositions XI.20, XI.21, XI.23, XI.26
solid number
definition VII.Def.17
proposition IX.7
similar solid numbers VII.Def.21 VIII.27
sphere
axis of XI.Def.15
center of XI.Def.16
definition XI.Def.14
diameter of XI.Def.17
proportional to diameter³ XII.18
volume XII.18
square
construction I.46,
definition I.Def.22
of the hypotenuse I.47
square number VII.Def.18
squaring (finding areas). See quadrature.
straight line
bisection I.10
construct third proportional VI.11
construct fourth proportional VI.12
construct mean proportional VI.13
cut off line I.3
cut off a part VI.9
cut proportionally VI.10
definition I.Def.4
distance to a point III.Def.4
draw between two points Post.1
equidistant lines I.Def.23
extend a line Post.2
fit in a circle IV.Def.7, IV.1
inclination to a plane XI.Def.5
parallel lines I.Def.23, I.31
planarity of XI.1, XI.5
perpendicular lines. See perpendicular, line to a line.
perpendicular to a plane. See perpendicular, line to a plane.
place a line I.2
tangent. See tangent.
substitution of equals C.N.
superposition, method of I.4
surface
See also plane.
definition I.Def.5
edges of a surface I.Def.6
surds, irrationality of VIII.8
symmetric relation. See equivalence relation.

tangent circles
definition III.Def.3
have distinct centers III.6
meet at common diameter III.11, III.12
meet at one point III.13
tangent line to a circle
definition III.Def.2
construction III.17
perpendicular to radius III.18, III.19
tetrahedron, regular
called a pyramid XI.Def.25
construction XIII.13
relation to cube XIII.15
Thales of Miletus (ca. 624–547 B.C.E.)
right angle in semicircle III.31
Theon of Alexandria (ca. 335–ca. 405)
editor of the Elements I.Def.1
topology I.Def.13
touch. See tangent.
transitivity
See also equivalence relation.
of equality of ratios V.11
of less than I.7
of parallel lines I.30, XI.9
of similarity VI.21
transversal, angles about a I.27, I.28, I.29,
trapezium I.Def.22
triangle
36°-72°-72° triangle IV.10
acute triangle I.Def.21
angle bisector cuts base proportionally VI.3
area of a triangle I.37, I.38
proportional to base VI.1
similar triangles VI.19
circumcenter of a triangle IV.5
circumcircle of a triangle IV.5
congruence proposition
angle-angle-side I.26
angle-side-angle I.26
side-angle-side I.4
side-side-angle I.26
side-side-side I.8
construction given 3 sides I.22
equilateral I.Def.20. See equilateral triangle.
excircle of a triangle IV.4
exterior angle sum of opposite interior angles I.32
greater side opposite greater angle I.18, I.19
Heron’s formula for area IV.4
incenter of a triangle IV.4
incircle of a triangle IV.4
inscribed in a circle IV.2
isosceles triangle I.Def.20
obtuse triangle I.Def.21
parallel cuts sides proportionally VI.2
reciprocally proportional triangles VI.15
right triangle I.Def.21
perpendicular creates similar right triangles VI.8
scalene triangle I.Def.20
similar
areas in duplicate ratio VI.19
equiangular triangles are VI.4
proportional triangles are VI.5
side-angle-side proposition VI.6
side-side-angle proposition VI.7
triangle inequality I.20
triangular number VII.Def.16
trichotomy, law of
for magnitudes C.N., V.Def.5
in practice I.5
for ratios V.Def.7
trilateral figure I.Def.19. See triangle.
triplicate ratio V.Def.9
trisection of an angle Post.2, I.9

unit, definition VII.Def.1
Varignon (1654–1722)
Varignon parallelogram of a quadrilateral XI.9
vertical angles I.15
word order I.18
Zeno of Sidon (1st century B.C.E)
criticism of proposition I.1
Zhou bi suan jing
Pythagorean theorem I.47

1 as a number V.Def.5
36°-72°-72° triangle IV.10
>=< V.Def.5

Subject index

A B C D E F G H I J K L M N O P Q R S T U V W Y Z Numbers & symbols

A

B

C

D

E

F

G

H

I

J K L

M

N

O

P

Q

R

S

T

U V W X Y Z

Numbers and Symbols