Doubling the cube, also known as the Delian problem, is an ancient

geometric Geometry (; ) is a branch of mathematics concerned with properties of space such as the distance, shape, size, and relative position of figures. Geometry is, along with arithmetic, one of the oldest branches of mathematics. A mathematician w ...

problem. Given the

edge Edge or EDGE may refer to: Technology Computing * Edge computing, a network load-balancing system * Edge device, an entry point to a computer network * Adobe Edge, a graphical development application * Microsoft Edge, a web browser developed by ...

of a

cube A cube or regular hexahedron is a three-dimensional space, three-dimensional solid object in geometry, which is bounded by six congruent square (geometry), square faces, a type of polyhedron. It has twelve congruent edges and eight vertices. It i ...

, the problem requires the construction of the edge of a second cube whose

volume Volume is a measure of regions in three-dimensional space. It is often quantified numerically using SI derived units (such as the cubic metre and litre) or by various imperial or US customary units (such as the gallon, quart, cubic inch) ...

is double that of the first. As with the related problems of

squaring the circle Squaring the circle is a problem in geometry first proposed in Greek mathematics. It is the challenge of constructing a square (geometry), square with the area of a circle, area of a given circle by using only a finite number of steps with a ...

and trisecting the angle, doubling the cube is now known to be impossible to construct by using only a

compass and straightedge In geometry, straightedge-and-compass construction – also known as ruler-and-compass construction, Euclidean construction, or classical construction – is the construction of lengths, angles, and other geometric figures using only an Idealiz ...

, but even in ancient times solutions were known that employed other methods. According to Eutocius, Archytas was the first to solve the problem of doubling the cube (the so-called Delian problem) with an ingenious geometric construction. The nonexistence of a compass-and-straightedge solution was finally proven by

Pierre Wantzel Pierre Laurent Wantzel (5 June 1814 in Paris – 21 May 1848 in Paris) was a French mathematician who proved that several ancient geometric problems were impossible to solve using only compass and straightedge. In a paper from 1837, Wantzel pro ...

in 1837. In algebraic terms, doubling a

unit cube A unit cube, more formally a cube of side 1, is a cube whose sides are 1 unit long.. See in particulap. 671. The volume of a 3-dimensional unit cube is 1 cubic unit, and its total surface area is 6 square units.. Unit hypercube The term '' ...

requires the construction of a

line segment In geometry, a line segment is a part of a line (mathematics), straight line that is bounded by two distinct endpoints (its extreme points), and contains every Point (geometry), point on the line that is between its endpoints. It is a special c ...

of length , where ; in other words, , the cube root of two. This is because a cube of side length 1 has a volume of , and a cube of twice that volume (a volume of 2) has a side length of the

cube root In mathematics, a cube root of a number is a number that has the given number as its third power; that is y^3=x. The number of cube roots of a number depends on the number system that is considered. Every real number has exactly one real cub ...

of 2. The impossibility of doubling the cube is therefore

equivalent Equivalence or Equivalent may refer to: Arts and entertainment *Album-equivalent unit, a measurement unit in the music industry *Equivalence class (music) *'' Equivalent VIII'', or ''The Bricks'', a minimalist sculpture by Carl Andre *'' Equiva ...

to the statement that

\sqrt /math> is not a constructible number . This is a consequence of the fact that the coordinates of a new point constructed by a compass and straightedge are roots of

polynomial In mathematics, a polynomial is a Expression (mathematics), mathematical expression consisting of indeterminate (variable), indeterminates (also called variable (mathematics), variables) and coefficients, that involves only the operations of addit ...

s over the field generated by the coordinates of previous points, of no greater degree than a quadratic. This implies that the degree of the

field extension In mathematics, particularly in algebra, a field extension is a pair of fields K \subseteq L, such that the operations of ''K'' are those of ''L'' restricted to ''K''. In this case, ''L'' is an extension field of ''K'' and ''K'' is a subfield of ...

generated by a constructible point must be a power of 2. The field extension generated by

\sqrt /math>, however, is of degree 3.

Proof of impossibility

We begin with the unit line segment defined by

points A point is a small dot or the sharp tip of something. Point or points may refer to: Mathematics * Point (geometry), an entity that has a location in space or on a plane, but has no extent; more generally, an element of some abstract topologica ...

(0,0) and (1,0) in the plane. We are required to construct a line segment defined by two points separated by a distance of

\sqrt /math>. It is easily shown that compass and straightedge constructions would allow such a line segment to be freely moved to touch the

origin Origin(s) or The Origin may refer to: Arts, entertainment, and media Comics and manga * ''Origin'' (comics), a Wolverine comic book mini-series published by Marvel Comics in 2002 * ''The Origin'' (Buffy comic), a 1999 ''Buffy the Vampire Sl ...

, parallel with the unit line segment - so equivalently we may consider the task of constructing a line segment from (0,0) to (

\sqrt /math>, 0), which entails constructing the point (\sqrt /math>, 0).

Respectively, the tools of a compass and straightedge allow us to create

circles A circle is a shape consisting of all points in a plane that are at a given distance from a given point, the centre. The distance between any point of the circle and the centre is called the radius. The length of a line segment connecting t ...

centred on one previously defined point and passing through another, and to create lines passing through two previously defined points. Any newly defined point either arises as the result of the

intersection In mathematics, the intersection of two or more objects is another object consisting of everything that is contained in all of the objects simultaneously. For example, in Euclidean geometry, when two lines in a plane are not parallel, their ...

of two such circles, as the intersection of a circle and a line, or as the intersection of two lines. An exercise of elementary

analytic geometry In mathematics, analytic geometry, also known as coordinate geometry or Cartesian geometry, is the study of geometry using a coordinate system. This contrasts with synthetic geometry. Analytic geometry is used in physics and engineering, and als ...

shows that in all three cases, both the - and -coordinates of the newly defined point satisfy a polynomial of degree no higher than a quadratic, with

coefficients In mathematics, a coefficient is a multiplicative factor involved in some term of a polynomial, a series, or any other type of expression. It may be a number without units, in which case it is known as a numerical factor. It may also be a ...

that are additions, subtractions, multiplications, and divisions involving the coordinates of the previously defined points (and rational numbers). Restated in more abstract terminology, the new - and -coordinates have minimal polynomials of degree at most 2 over the subfield of generated by the previous coordinates. Therefore, the degree of the

corresponding to each new coordinate is 2 or 1. So, given a coordinate of any constructed point, we may proceed inductively backwards through the - and -coordinates of the points in the order that they were defined until we reach the original pair of points (0,0) and (1,0). As every field extension has degree 2 or 1, and as the field extension over

\mathbb

of the coordinates of the original pair of points is clearly of degree 1, it follows from the tower rule that the degree of the field extension over

\mathbb

of any coordinate of a constructed point is a power of 2. Now, is easily seen to be irreducible over

\mathbb

– any

factorisation In mathematics, factorization (or factorisation, see American and British English spelling differences#-ise, -ize (-isation, -ization), English spelling differences) or factoring consists of writing a number or another mathematical object as a p ...

would involve a linear factor for some , and so must be a

root In vascular plants, the roots are the plant organ, organs of a plant that are modified to provide anchorage for the plant and take in water and nutrients into the plant body, which allows plants to grow taller and faster. They are most often bel ...

of ; but also must divide 2 (by the

rational root theorem In algebra, the rational root theorem (or rational root test, rational zero theorem, rational zero test or theorem) states a constraint on rational solutions of a polynomial equation a_nx^n+a_x^+\cdots+a_0 = 0 with integer coefficients a_i\in\math ...

); that is, or , and none of these are roots of . By Gauss's Lemma, is also irreducible over

\mathbb

, and is thus a minimal polynomial over

\mathbb

for

\sqrt /math>. The field extension \mathbb (\sqrt :\mathbb is therefore of degree 3. But this is not a power of 2, so by the above:
* \sqrt /math> is not the coordinate of a constructible point, so
*a line segment of \sqrt /math> cannot be constructed with ruler and compass, and
*the cube cannot be doubled using only a ruler and a compass.

History

The problem owes its name to a story concerning the citizens of

Delos Delos (; ; ''Dêlos'', ''Dâlos''), is a small Greek island near Mykonos, close to the centre of the Cyclades archipelago. Though only in area, it is one of the most important mythological, historical, and archaeological sites in Greece. ...

, who consulted the oracle at

Delphi Delphi (; ), in legend previously called Pytho (Πυθώ), was an ancient sacred precinct and the seat of Pythia, the major oracle who was consulted about important decisions throughout the ancient Classical antiquity, classical world. The A ...

in order to learn how to defeat a plague sent by

Apollo Apollo is one of the Twelve Olympians, Olympian deities in Ancient Greek religion, ancient Greek and Ancient Roman religion, Roman religion and Greek mythology, Greek and Roman mythology. Apollo has been recognized as a god of archery, mu ...

. According to

Plutarch Plutarch (; , ''Ploútarchos'', ; – 120s) was a Greek Middle Platonist philosopher, historian, biographer, essayist, and priest at the Temple of Apollo (Delphi), Temple of Apollo in Delphi. He is known primarily for his ''Parallel Lives'', ...

, however, the citizens of

consulted the

oracle An oracle is a person or thing considered to provide insight, wise counsel or prophetic predictions, most notably including precognition of the future, inspired by deities. If done through occultic means, it is a form of divination. Descript ...

to find a solution for their internal political problems at the time, which had intensified relationships among the citizens. The oracle responded that they must double the size of the altar to Apollo, which was a regular cube. The answer seemed strange to the Delians, and they consulted

Plato Plato ( ; Greek language, Greek: , ; born BC, died 348/347 BC) was an ancient Greek philosopher of the Classical Greece, Classical period who is considered a foundational thinker in Western philosophy and an innovator of the writte ...

, who was able to interpret the oracle as the mathematical problem of doubling the volume of a given cube, thus explaining the oracle as the advice of Apollo for the citizens of

to occupy themselves with the study of geometry and mathematics in order to calm down their passions. According to

, Plato gave the problem to Eudoxus and

Archytas Archytas (; ; 435/410–360/350 BC) was an Ancient Greek mathematician, music theorist, statesman, and strategist from the ancient city of Taras (Tarentum) in Southern Italy. He was a scientist and philosopher affiliated with the Pythagorean ...

and

Menaechmus Menaechmus (, c. 380 – c. 320 BC) was an ancient Greek mathematician, list of geometers, geometer and philosopher born in Alopeconnesus or Prokonnesos in the Thracian Chersonese, who was known for his friendship with the renowned philosopher P ...

, who solved the problem using mechanical means, earning a rebuke from Plato for not solving the problem using pure geometry. This may be why the problem is referred to in the 350s BC by the author of the pseudo-Platonic ''

Sisyphus In Greek mythology, Sisyphus or Sisyphos (; Ancient Greek: Σίσυφος ''Sísyphos'') was the founder and king of Ancient Corinth, Ephyra (now known as Corinth). He reveals Zeus's abduction of Aegina (mythology), Aegina to the river god As ...

'' (388e) as still unsolved. However another version of the story (attributed to

Eratosthenes Eratosthenes of Cyrene (; ; – ) was an Ancient Greek polymath: a Greek mathematics, mathematician, geographer, poet, astronomer, and music theory, music theorist. He was a man of learning, becoming the chief librarian at the Library of A ...

Eutocius of Ascalon Eutocius of Ascalon (; ; 480s – 520s) was a Greek mathematician who wrote commentaries on several Archimedean treatises and on the Apollonian ''Conics''. Life and work Little is known about the life of Eutocius. He was born in Ascalon, ...

) says that all three found solutions but they were too abstract to be of practical value. A significant development in finding a solution to the problem was the discovery by

Hippocrates of Chios Hippocrates of Chios (; c. 470 – c. 421 BC) was an ancient Greek mathematician, geometer, and astronomer. He was born on the isle of Chios, where he was originally a merchant. After some misadventures (he was robbed by either pirates or ...

that it is equivalent to finding two

geometric mean In mathematics, the geometric mean is a mean or average which indicates a central tendency of a finite collection of positive real numbers by using the product of their values (as opposed to the arithmetic mean which uses their sum). The geometri ...

proportionals between a line segment and another with twice the length.T.L. Heath '' A History of Greek Mathematics'', Vol. 1 In modern notation, this means that given segments of lengths and , the duplication of the cube is equivalent to finding segments of lengths and so that :

\frac = \frac = \frac .

In turn, this means that :

r=a\cdot\sqrt

But

proved in 1837 that the

of 2 is not constructible; that is, it cannot be constructed with

straightedge and compass In geometry, straightedge-and-compass construction – also known as ruler-and-compass construction, Euclidean construction, or classical construction – is the construction of lengths, angles, and other geometric figures using only an ideali ...

Solutions via means other than compass and straightedge

Menaechmus' original solution involves the intersection of two

conic A conic section, conic or a quadratic curve is a curve obtained from a cone's surface intersecting a plane. The three types of conic section are the hyperbola, the parabola, and the ellipse; the circle is a special case of the ellipse, thou ...

curves. Other more complicated methods of doubling the cube involve

neusis In geometry, the neusis (; ; plural: ) is a geometric construction method that was used in antiquity by Greek mathematics, Greek mathematicians. Geometric construction The neusis construction consists of fitting a line element of given length ...

, the

cissoid of Diocles In geometry, the cissoid of Diocles (; named for Diocles (mathematician), Diocles) is a cubic plane curve notable for the property that it can be used to construct two Geometric mean, mean proportionals to a given ratio. In particular, it can b ...

, the conchoid of Nicomedes, or the Philo line. Pandrosion, a probably female mathematician of ancient Greece, found a numerically accurate approximate solution using planes in three dimensions, but was heavily criticized by

Pappus of Alexandria Pappus of Alexandria (; ; AD) was a Greek mathematics, Greek mathematician of late antiquity known for his ''Synagoge'' (Συναγωγή) or ''Collection'' (), and for Pappus's hexagon theorem in projective geometry. Almost nothing is known a ...

for not providing a proper

mathematical proof A mathematical proof is a deductive reasoning, deductive Argument-deduction-proof distinctions, argument for a Proposition, mathematical statement, showing that the stated assumptions logically guarantee the conclusion. The argument may use othe ...

solved the problem in the 4th century BC using geometric construction in three dimensions, determining a certain point as the intersection of three surfaces of revolution. Descartes' theory of geometric solution of equations uses a parabola to introduce cubic equations, in this way it is possible to set up an equation whose solution is a cube root of two. Note that the parabola itself is not constructible except by three dimensional methods. False claims of doubling the cube with compass and straightedge abound in mathematical crank literature (

pseudomathematics Pseudomathematics, or mathematical crankery, is a mathematics-like activity that does not adhere to the framework of rigor of formal mathematical practice. Common areas of pseudomathematics are solutions of problems proved to be unsolvable or re ...

). Origami may also be used to construct the cube root of two by folding paper.

Using a marked ruler

There is a simple neusis construction using a marked ruler for a length which is the cube root of 2 times another length. #Mark a ruler with the given length; this will eventually be GH. #Construct an equilateral triangle ABC with the given length as side. #Extend AB an equal amount again to D. #Extend the line BC forming the line CE. #Extend the line DC forming the line CF. #Place the marked ruler so it goes through A and one end, G, of the marked length falls on ray CF and the other end of the marked length, H, falls on ray CE. Thus GH is the given length. Then AG is the given length times

\sqrt /math>.

In music theory

music theory Music theory is the study of theoretical frameworks for understanding the practices and possibilities of music. ''The Oxford Companion to Music'' describes three interrelated uses of the term "music theory": The first is the "Elements of music, ...

, a natural analogue of doubling is the

octave In music, an octave (: eighth) or perfect octave (sometimes called the diapason) is an interval between two notes, one having twice the frequency of vibration of the other. The octave relationship is a natural phenomenon that has been referr ...

(a musical interval caused by doubling the frequency of a tone), and a natural analogue of a cube is dividing the octave into three parts, each the same interval. In this sense, the problem of doubling the cube is solved by the

major third In music theory, a third is a Interval (music), musical interval encompassing three staff positions (see Interval (music)#Number, Interval number for more details), and the major third () is a third spanning four Semitone, half steps or two ...

equal temperament An equal temperament is a musical temperament or Musical tuning#Tuning systems, tuning system that approximates Just intonation, just intervals by dividing an octave (or other interval) into steps such that the ratio of the frequency, frequencie ...

. This is a musical interval that is exactly one third of an octave. It multiplies the frequency of a tone by

2^=2^=\sqrt /math>, the side length of the Delian cube.

Explanatory notes

References

External links

* Frédéric Beatrix, Peter Katzlinger:
A pretty accurate solution to the Delian problem
'. In
Parabola Volume 59 (2023) Issue 1
online magazine (ISSN 1446-9723) published by the School of Mathematics and Statistics

University of New South Wales The University of New South Wales (UNSW) is a public research university based in Sydney, New South Wales, Australia. It was established in 1949. The university comprises seven faculties, through which it offers bachelor's, master's and docto ...

Doubling the cube, proximity construction as animation (side = 1.259921049894873)
��

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*
Doubling the cube
J. J. O'Connor and E. F. Robertson in the MacTutor History of Mathematics archive.

Excerpt from '' A History of Greek Mathematics'' by Sir Thomas Heath.
Delian Problem Solved. Or Is It?
at

cut-the-knot Alexander Bogomolny (January 4, 1948 July 7, 2018) was a Soviet Union, Soviet-born Israeli Americans, Israeli-American mathematician. He was Professor Emeritus of Mathematics at the University of Iowa, and formerly research fellow at the Moscow ...

.
Mathologer video: "2000 years unsolved: Why is doubling cubes and squaring circles impossible?"
{{Authority control Straightedge and compass constructions Cubic irrational numbers Euclidean plane geometry History of geometry Unsolvable puzzles Greek mathematics