# Squaring the circle

https://en.wikipedia.org/wiki/Squaring_the_circle

Squaring the circle: the areas of this square and this circle are both equal to π. In 1882, it was proven that this figure cannot be constructed in a finite number of steps with an idealized compass and straightedge.
Some apparent partial solutions gave false hope for a long time. In this figure, the shaded figure is the Lune of Hippocrates. Its area is equal to the area of the triangle ABC (found by Hippocrates of Chios).

Squaring the circle is a problem proposed by ancient geometers. It is the challenge of constructing a square with the same area as a given circle by using only a finite number of steps with compass and straightedge. The difficulty of the problem raised the question of whether specified axioms of Euclidean geometry concerning the existence of lines and circles implied the existence of such a square.

In 1882, the task was proven to be impossible, as a consequence of the Lindemann–Weierstrass theorem which proves that pi (π) is a transcendental, rather than an algebraic irrational number; that is, it is not the root of any polynomial with rational coefficients. It had been known for decades that the construction would be impossible if π were transcendental, but π was not proven transcendental until 1882. Approximate squaring to any given non-perfect accuracy, in contrast, is possible in a finite number of steps, since there are rational numbers arbitrarily close to π.

The expression "squaring the circle" is sometimes used as a metaphor for trying to do the impossible. [1]

The term quadrature of the circle is sometimes used to mean the same thing as squaring the circle, but it may also refer to approximate or numerical methods for finding the area of a circle.

## History

Methods to approximate the area of a given circle with a square, which can be thought of as a precursor problem to squaring the circle, were known already to Babylonian mathematicians. The Egyptian Rhind papyrus of 1800 BC gives the area of a circle as 64/81 d 2, where d is the diameter of the circle. In modern terms, this is equivalent to approximating π as 256/81 (approximately 3.1605), a number that appears in the older Moscow Mathematical Papyrus and is used for volume approximations (i.e. hekat). Indian mathematicians also found an approximate method, though less accurate, documented in the Shulba Sutras. [2] Archimedes proved the formula for the area of a circle (A = πr2, where r is the radius of the circle) and showed that the value of π lay between 3+1/7 (approximately 3.1429) and 3+10/71 (approximately 3.1408). See Numerical approximations of π for more on the history.

The first known Greek to be associated with the problem was Anaxagoras, who worked on it while in prison. Hippocrates of Chios squared certain lunes, in the hope that it would lead to a solution – see Lune of Hippocrates. Antiphon the Sophist believed that inscribing regular polygons within a circle and doubling the number of sides will eventually fill up the area of the circle, and since a polygon can be squared, it means the circle can be squared. Even then there were skeptics— Eudemus argued that magnitudes cannot be divided up without limit, so the area of the circle will never be used up. [3] The problem was even mentioned in Aristophanes's play The Birds.

It is believed that Oenopides was the first Greek who required a plane solution (that is, using only a compass and straightedge). James Gregory attempted a proof of its impossibility in Vera Circuli et Hyperbolae Quadratura (The True Squaring of the Circle and of the Hyperbola) in 1667. [4] Although his proof was faulty, it was the first paper to attempt to solve the problem using algebraic properties of π. It was not until 1882 that Ferdinand von Lindemann rigorously proved its impossibility.

A partial history by Florian Cajori of attempts at the problem. [5]

The Victorian-age mathematician, logician, and writer Charles Lutwidge Dodgson, better known by the pseudonym Lewis Carroll, also expressed interest in debunking illogical circle-squaring theories. In one of his diary entries for 1855, Dodgson listed books he hoped to write including one called "Plain Facts for Circle-Squarers". In the introduction to "A New Theory of Parallels", Dodgson recounted an attempt to demonstrate logical errors to a couple of circle-squarers, stating: [6]

The first of these two misguided visionaries filled me with a great ambition to do a feat I have never heard of as accomplished by man, namely to convince a circle squarer of his error! The value my friend selected for Pi was 3.2: the enormous error tempted me with the idea that it could be easily demonstrated to BE an error. More than a score of letters were interchanged before I became sadly convinced that I had no chance.

A ridiculing of circle-squaring appears in Augustus de Morgan's A Budget of Paradoxes published posthumously by his widow in 1872. Having originally published the work as a series of articles in the Athenæum, he was revising it for publication at the time of his death. Circle squaring was very popular in the nineteenth century, but hardly anyone indulges in it today and it is believed that de Morgan's work helped bring this about. [7]

The two other classical problems of antiquity, famed for their impossibility, were doubling the cube and trisecting the angle. Like squaring the circle, these cannot be solved by compass-and-straightedge methods. However, unlike squaring the circle, they can be solved by the slightly more powerful construction method of origami, as described at mathematics of paper folding.

## Impossibility

The solution of the problem of squaring the circle by compass and straightedge requires the construction of the number π. If π is constructible, it follows from standard constructions that π would also be constructible. In 1837, Pierre Wantzel showed that lengths that could be constructed with compass and straightedge had to be solutions of certain polynomial equations with rational coefficients. [8] [9] Thus, constructible lengths must be algebraic numbers. If the problem of the quadrature of the circle could be solved using only compass and straightedge, then π would have to be an algebraic number. Johann Heinrich Lambert conjectured that π was not algebraic, that is, a transcendental number, in 1761. [10] He did this in the same paper in which he proved its irrationality, even before the general existence of transcendental numbers had been proven. It was not until 1882 that Ferdinand von Lindemann proved the transcendence of π and so showed the impossibility of this construction. [11]

The transcendence of π implies the impossibility of exactly "circling" the square, as well as of squaring the circle.

It is possible to construct a square with an area arbitrarily close to that of a given circle. If a rational number is used as an approximation of π, then squaring the circle becomes possible, depending on the values chosen. However, this is only an approximation and does not meet the constraints of the ancient rules for solving the problem. Several mathematicians have demonstrated workable procedures based on a variety of approximations.

Bending the rules by introducing a supplemental tool, allowing an infinite number of compass-and-straightedge operations or by performing the operations in certain non-Euclidean geometries also makes squaring the circle possible in some sense. For example, the quadratrix of Hippias provides the means to square the circle and also to trisect an arbitrary angle, as does the Archimedean spiral. [12] Although the circle cannot be squared in Euclidean space, it sometimes can be in hyperbolic geometry under suitable interpretations of the terms. [13] [14] As there are no squares in the hyperbolic plane, their role needs to be taken by regular quadrilaterals, meaning quadrilaterals with all sides congruent and all angles congruent (but these angles are strictly smaller than right angles). There exist, in the hyperbolic plane, (countably) infinitely many pairs of constructible circles and constructible regular quadrilaterals of equal area, which, however, are constructed simultaneously. There is no method for starting with a regular quadrilateral and constructing the circle of equal area, and there is no method for starting with a circle and constructing a regular quadrilateral of equal area (even when the circle has small enough radius such that a regular quadrilateral of equal area exists).

## Modern approximative constructions

Though squaring the circle with perfect accuracy is an impossible problem using only compass and straightedge, approximations to squaring the circle can be given by constructing lengths close to π. It takes only minimal knowledge of elementary geometry to convert any given rational approximation of π into a corresponding compass-and-straightedge construction, but constructions made in this way tend to be very long-winded in comparison to the accuracy they achieve. After the exact problem was proven unsolvable, some mathematicians applied their ingenuity to finding elegant approximations to squaring the circle, defined roughly and informally as constructions that are particularly simple among other imaginable constructions that give similar precision.

### Construction by Kochański

One of the early historical approximations is Kochański's approximation which diverges from π only in the 5th decimal place. It was very precise for the time of its discovery (1685). [15]

Kochański's approximate construction
Construction according to Kochański with continuation

In the left diagram

${\displaystyle |P_{3}P_{9}|=|P_{1}P_{2}|{\sqrt {{\frac {40}{3}}-2{\sqrt {3}}}}\approx 3.141\,5{\color {red}33\,338}\cdot |P_{1}P_{2}|\approx \pi r.}$

### Construction by Jacob de Gelder

Jacob de Gelder's construction with continuation

In 1849 an elegant and simple construction by Jacob de Gelder (1765-1848) was published in Grünert's Archiv. That was 64 years earlier than the comparable construction by Ramanujan. [16] It is based on the approximation

${\displaystyle \pi \approx {\frac {355}{113}}=3.141\;592{\color {red}\;920\;\ldots }}$

This value is accurate to six decimal places and has been known in China since the 5th century as Zu Chongzhi's fraction, and in Europe since the 17th century.

Gelder did not construct the side of the square; it was enough for him to find the following value

${\displaystyle {\overline {AH}}={\frac {4^{2}}{7^{2}+8^{2}}}}$.

The illustration opposite – described below – shows the construction by Jacob de Gelder with continuation.

Draw two mutually perpendicular center lines of a circle with radius CD = 1 and determine the intersection points A and B. Lay the line segment CE = ${\displaystyle {\tfrac {7}{8}}}$ fixed and connect E to A. Determine on AE and from A the line segment AF = ${\displaystyle {\tfrac {1}{2}}}$. Draw FG parallel to CD and connect E with G. Draw FH parallel to EG, then AH = ${\displaystyle {\tfrac {4^{2}}{7^{2}+8^{2}}}.}$ Determine BJ = CB and subsequently JK = AH. Halve AK in L and use the Thales's theorem around L from A, which results in the intersection point M. The line segment BM is the square root of AK and thus the side length ${\displaystyle a}$ of the searched square with almost the same area.

Examples to illustrate the errors:

• In a circle of radius r = 100 km, the error of side length a ≈ 7.5 mm
• In the case of a circle with radius r = 1 m, the error of the area A ≈ 0.3 mm2

### Construction by Hobson

Among the modern approximate constructions was one by E. W. Hobson in 1913. [16] This was a fairly accurate construction which was based on constructing the approximate value of 3.14164079..., which is accurate to three decimal places (i.e. it differs from π by about 4.8×10−5).

Hobson's construction with continuation
"We find that GH = r . 1 .77246 ..., and since ${\displaystyle {\sqrt {\pi }}}$ = 1 .77245 we see that GH is greater than the side of the square whose area is equal to that of the circle by less than two hundred thousandths of the radius."

Hobson does not mention the formula for the approximation of π in his construction. The above illustration shows Hobson's construction with continuation.

### Constructions by Ramanujan

The Indian mathematician Srinivasa Ramanujan in 1913, [17] [18] Carl Olds in 1963, Martin Gardner in 1966, and Benjamin Bold in 1982 all gave geometric constructions for

${\displaystyle {\frac {355}{113}}=3.141\;592{\color {red}\;920\;\ldots }}$

which is accurate to six decimal places of π.

Ramanujan's approximate construction with the approach 355/113
DR is the side of the square
Sketch of "Manuscript book 1 of Srinivasa Ramanujan" p. 54

In 1914, Ramanujan gave a ruler-and-compass construction which was equivalent to taking the approximate value for π to be

${\displaystyle \left(9^{2}+{\frac {19^{2}}{22}}\right)^{\frac {1}{4}}={\sqrt[{4}]{\frac {2143}{22}}}=3.141\;592\;65{\color {red}2\;582\;\ldots }}$

giving eight decimal places of π. [19] He describes his construction till line segment OS as follows. [20]

"Let AB (Fig.2) be a diameter of a circle whose centre is O. Bisect the arc ACB at C and trisect AO at T. Join BC and cut off from it CM and MN equal to AT. Join AM and AN and cut off from the latter AP equal to AM. Through P draw PQ parallel to MN and meeting AM at Q. Join OQ and through T draw TR, parallel to OQ and meeting AQ at R. Draw AS perpendicular to AO and equal to AR, and join OS. Then the mean proportional between OS and OB will be very nearly equal to a sixth of the circumference, the error being less than a twelfth of an inch when the diameter is 8000 miles long."

In this quadrature, Ramanujan did not construct the side length of the square, it was enough for him to show the line segment OS. In the following continuation of the construction, the line segment OS is used together with the line segment OB to represent the mean proportionals (red line segment OE).

Squaring the circle, approximate construction according to Ramanujan of 1914, with continuation of the construction (dashed lines, mean proportional red line), see animation.

Continuation of the construction up to the desired side length a of the square:

Extend AB beyond A and beat the circular arc b1 around O with radius OS, resulting in S′. Bisect the line segment BS′ in D and draw the semicircle b2 over D. Draw a straight line from O through C up to the semicircle b2, it cuts b2 in E. The line segment OE is the mean proportional between OS′ and OB, also called geometric mean. Extend the line segment EO beyond O and transfer EO twice more, it results F and A1, and thus the length of the line segment EA1 with the above described approximation value of π, the half circumference of the circle. Bisect the line segment EA1 in G and draw the semicircle b3 over G. Transfer the distance OB from A1 to the line segment EA1, it results H. Create a vertical from H up to the semicircle b3 on EA1, it results B1. Connect A1 to B1, thus the sought side a of the square A1B1C1D1 is constructed, which has nearly the same area as the given circle.

Examples to illustrate the errors:

• In a circle of radius r = 10,000 km the error of side length a ≈ −2.8 mm
• In the case of a circle with the radius r = 10 m the error of the area A ≈ −0.1 mm2

### Construction using the golden ratio

${\displaystyle {\frac {6}{5}}\cdot \left(1+\varphi \right)=3.141\;{\color {red}640\;\ldots },}$
where ${\displaystyle \varphi }$ is the golden ratio. [21] Three decimal places are equal to those of π.
• If the radius ${\displaystyle r=1}$ and the side of the square
${\displaystyle a={\sqrt {{\frac {6}{5}}\cdot \left(1+\varphi \right)}}={\sqrt {\varphi +1+{\frac {1}{5}}\cdot \left(1+\varphi \right)}}=1.772\;4{\color {red}67\;\ldots }}$
then the expanded second formula shows the sequence of the steps for an alternative construction (see the following illustration). Four decimal places are equal to those of π.
Approximate construction using the golden ratio
${\displaystyle {\sqrt {{\overline {AE}}+1+{\tfrac {1}{5}}\cdot (1+{\overline {AE}})}}={\sqrt {AG}}=a\approx {\sqrt {\pi }}}$.

## Squaring or quadrature as integration

Finding the area under a curve, known as integration in calculus, or quadrature in numerical analysis, was known as squaring before the invention of calculus. Since the techniques of calculus were unknown, it was generally presumed that a squaring should be done via geometric constructions, that is, by compass and straightedge. For example, Newton wrote to Oldenburg in 1676 "I believe M. Leibnitz will not dislike the Theorem towards the beginning of my letter pag. 4 for squaring Curve lines Geometrically" (emphasis added). [22] After Newton and Leibniz invented calculus, they still referred to this integration problem as squaring a curve.

## Claims of circle squaring

### Connection with the longitude problem

The mathematical proof that the quadrature of the circle is impossible using only compass and straightedge has not proved to be a hindrance to the many people who have invested years in this problem anyway. Having squared the circle is a famous crank assertion. (See also pseudomathematics.) In his old age, the English philosopher Thomas Hobbes convinced himself that he had succeeded in squaring the circle, a claim that was refuted by John Wallis as part of the Hobbes–Wallis controversy. [23] [24]

During the 18th and 19th century, the notion that the problem of squaring the circle was somehow related to the longitude problem seems to have become prevalent among would-be circle squarers. Using "cyclometer" for circle-squarer, Augustus de Morgan wrote in 1872:

Montucla says, speaking of France, that he finds three notions prevalent among cyclometers: 1. That there is a large reward offered for success; 2. That the longitude problem depends on that success; 3. That the solution is the great end and object of geometry. The same three notions are equally prevalent among the same class in England. No reward has ever been offered by the government of either country. [25]

Although from 1714 to 1828 the British government did indeed sponsor a £20,000 prize for finding a solution to the longitude problem, exactly why the connection was made to squaring the circle is not clear; especially since two non-geometric methods (the astronomical method of lunar distances and the mechanical chronometer) had been found by the late 1760s. De Morgan goes on to say that "[t]he longitude problem in no way depends upon perfect solution; existing approximations are sufficient to a point of accuracy far beyond what can be wanted." In his book, de Morgan also mentions receiving many threatening letters from would-be circle squarers, accusing him of trying to "cheat them out of their prize".

### Other modern claims

Heisel's 1934 book

Even after it had been proved impossible, in 1894, amateur mathematician Edwin J. Goodwin claimed that he had developed a method to square the circle. The technique he developed did not accurately square the circle, and provided an incorrect area of the circle which essentially redefined pi as equal to 3.2. Goodwin then proposed the Indiana Pi Bill in the Indiana state legislature allowing the state to use his method in education without paying royalties to him. The bill passed with no objections in the state house, but the bill was tabled and never voted on in the Senate, amid increasing ridicule from the press. [26]

The mathematical crank Carl Theodore Heisel also claimed to have squared the circle in his 1934 book, "Behold! : the grand problem no longer unsolved: the circle squared beyond refutation." [27] Paul Halmos referred to the book as a "classic crank book." [28]

In 1851, John Parker published a book Quadrature of the Circle in which he claimed to have squared the circle. His method actually produced an approximation of π accurate to six digits. [29] [30] [31]

## In literature

J. P. de Faurè, Dissertation, découverte, et demonstrations de la quadrature mathematique du cercle, 1747

The problem of squaring the circle has been mentioned by poets such as Dante and Alexander Pope, with varied metaphorical meanings. Its literary use dates back at least to 414 BC, when the play The Birds by Aristophanes was first performed. In it, the character Meton of Athens mentions squaring the circle, possibly to indicate the paradoxical nature of his utopian city. [32]

Dante's Paradise, canto XXXIII, lines 133–135, contain the verses:

As the geometer his mind applies
To square the circle, nor for all his wit
Finds the right formula, howe'er he tries

For Dante, squaring the circle represents a task beyond human comprehension, which he compares to his own inability to comprehend Paradise. [33]

By 1742, when Alexander Pope published the fourth book of his Dunciad, attempts at circle-squaring had come to be seen as "wild and fruitless": [30]

Too mad for mere material chains to bind,
Now to pure space lifts her ecstatic stare,
Now, running round the circle, finds it square.

Similarly, the Gilbert and Sullivan comic opera Princess Ida features a song which satirically lists the impossible goals of the women's university run by the title character, such as finding perpetual motion. One of these goals is "And the circle – they will square it/Some fine day." [34]

The sestina, a poetic form first used in the 12th century by Arnaut Daniel, has been said to square the circle in its use of a square number of lines (six stanzas of six lines each) with a circular scheme of six repeated words. Spanos (1978) writes that this form invokes a symbolic meaning in which the circle stands for heaven and the square stands for the earth. [35] A similar metaphor was used in "Squaring the Circle", a 1908 short story by O. Henry, about a long-running family feud. In the title of this story, the circle represents the natural world, while the square represents the city, the world of man. [36]

In later works circle-squarers such as Leopold Bloom in James Joyce's novel Ulysses and Lawyer Paravant in Thomas Mann's The Magic Mountain are seen as sadly deluded or as unworldly dreamers, unaware of its mathematical impossibility and making grandiose plans for a result they will never attain. [37] [38]

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