# Leonardo Pisano Fibonacci

### Quick Info

(probably) Pisa (now Italy)

(possibly) Pisa (now Italy)

**Leonard of Pisa**or

**Fibonacci**played an important role in reviving ancient mathematics and made significant contributions of his own.

*Liber abaci*introduced the Hindu-Arabic place-valued decimal system and the use of Arabic numerals into Europe.

### Biography

**Leonardo Pisano**is better known by his nickname

**Fibonacci.**He was the son of Guilielmo and a member of the Bonacci family. Fibonacci himself sometimes used the name Bigollo, which may mean good-for-nothing or a traveller. As stated in [1]:-

Did his countrymen wish to express by this epithet their disdain for a man who concerned himself with questions of no practical value, or does the word in the Tuscan dialect mean a much-travelled man, which he was?Fibonacci was born in Italy but was educated in North Africa where his father, Guilielmo, held a diplomatic post. His father's job was to represent the merchants of the Republic of Pisa who were trading in Bugia, later called Bougie and now called Bejaia. Bejaia is a Mediterranean port in northeastern Algeria. The town lies at the mouth of the Wadi Soummam near Mount Gouraya and Cape Carbon. Fibonacci was taught mathematics in Bugia and travelled widely with his father and recognised the enormous advantages of the mathematical systems used in the countries they visited. Fibonacci writes in his famous book

*Liber abaci*Ⓣ (1202):-

When my father, who had been appointed by his country as public notary in the customs at Bugia acting for the Pisan merchants going there, was in charge, he summoned me to him while I was still a child, and having an eye to usefulness and future convenience, desired me to stay there and receive instruction in the school of accounting. There, when I had been introduced to the art of the Indians' nine symbols through remarkable teaching, knowledge of the art very soon pleased me above all else and I came to understand it, for whatever was studied by the art in Egypt, Syria, Greece, Sicily and Provence, in all its various forms.Fibonacci ended his travels around the year 1200 and at that time he returned to Pisa. There he wrote a number of important texts which played an important role in reviving ancient mathematical skills and he made significant contributions of his own. Fibonacci lived in the days before printing, so his books were hand written and the only way to have a copy of one of his books was to have another hand-written copy made. Of his books we still have copies of

*Liber abaci*Ⓣ (1202),

*Practica geometriae*Ⓣ (1220),

*Flos*Ⓣ (1225), and

*Liber quadratorum*Ⓣ. Given that relatively few hand-made copies would ever have been produced, we are fortunate to have access to his writing in these works. However, we know that he wrote some other texts which, unfortunately, are lost. His book on commercial arithmetic

*Di minor guisa*Ⓣ is lost as is his commentary on Book X of Euclid's

*Elements*which contained a numerical treatment of irrational numbers which Euclid had approached from a geometric point of view.

One might have thought that at a time when Europe was little interested in scholarship, Fibonacci would have been largely ignored. This, however, is not so and widespread interest in his work undoubtedly contributed strongly to his importance. Fibonacci was a contemporary of Jordanus but he was a far more sophisticated mathematician and his achievements were clearly recognised, although it was the practical applications rather than the abstract theorems that made him famous to his contemporaries.

The Holy Roman emperor was Frederick II. He had been crowned king of Germany in 1212 and then crowned Holy Roman emperor by the Pope in St Peter's Church in Rome in November 1220. Frederick II supported Pisa in its conflicts with Genoa at sea and with Lucca and Florence on land, and he spent the years up to 1227 consolidating his power in Italy. State control was introduced on trade and manufacture, and civil servants to oversee this monopoly were trained at the University of Naples which Frederick founded for this purpose in 1224.

Frederick became aware of Fibonacci's work through the scholars at his court who had corresponded with Fibonacci since his return to Pisa around 1200. These scholars included Michael Scotus who was the court astrologer, Theodorus Physicus the court philosopher and Dominicus Hispanus who suggested to Frederick that he meet Fibonacci when Frederick's court met in Pisa around 1225.

Johannes of Palermo, another member of Frederick II's court, presented a number of problems as challenges to the great mathematician Fibonacci. Three of these problems were solved by Fibonacci and he gives solutions in

*Flos*Ⓣ which he sent to Frederick II. We give some details of one of these problems below.

After 1228 there is only one known document which refers to Fibonacci. This is a decree made by the Republic of Pisa in 1240 in which a salary is awarded to:-

... the serious and learned Master Leonardo Bigollo ....This salary was given to Fibonacci in recognition for the services that he had given to the city, advising on matters of accounting and teaching the citizens.

*Liber abaci*Ⓣ, published in 1202 after Fibonacci's return to Italy, was dedicated to Scotus. The book was based on the arithmetic and algebra that Fibonacci had accumulated during his travels. The book, which went on to be widely copied and imitated, introduced the Hindu-Arabic place-valued decimal system and the use of Arabic numerals into Europe. Indeed, although mainly a book about the use of Arab numerals, which became known as algorism, simultaneous linear equations are also studied in this work. Certainly many of the problems that Fibonacci considers in

*Liber abaci*Ⓣ were similar to those appearing in Arab sources.

The second section of

*Liber abaci*Ⓣ contains a large collection of problems aimed at merchants. They relate to the price of goods, how to calculate profit on transactions, how to convert between the various currencies in use in Mediterranean countries, and problems which had originated in China.

A problem in the third section of

*Liber abaci*Ⓣ led to the introduction of the Fibonacci numbers and the Fibonacci sequence for which Fibonacci is best remembered today:-

A certain man put a pair of rabbits in a place surrounded on all sides by a wall. How many pairs of rabbits can be produced from that pair in a year if it is supposed that every month each pair begets a new pair which from the second month on becomes productive?The resulting sequence is 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, ... (Fibonacci omitted the first term in

*Liber abaci*Ⓣ). This sequence, in which each number is the sum of the two preceding numbers, has proved extremely fruitful and appears in many different areas of mathematics and science. The

*Fibonacci Quarterly*is a modern journal devoted to studying mathematics related to this sequence.

Many other problems are given in this third section, including these types, and many many more:

A spider climbs so many feet up a wall each day and slips back a fixed number each night, how many days does it take him to climb the wall.

A hound whose speed increases arithmetically chases a hare whose speed also increases arithmetically, how far do they travel before the hound catches the hare.

Calculate the amount of money two people have after a certain amount changes hands and the proportional increase and decrease are given.

There are also problems involving perfect numbers, problems involving the Chinese remainder theorem and problems involving summing arithmetic and geometric series.
A hound whose speed increases arithmetically chases a hare whose speed also increases arithmetically, how far do they travel before the hound catches the hare.

Calculate the amount of money two people have after a certain amount changes hands and the proportional increase and decrease are given.

Fibonacci treats numbers such as √10 in the fourth section, both with rational approximations and with geometric constructions.

A second edition of

*Liber abaci*Ⓣ was produced by Fibonacci in 1228 with a preface, typical of so many second editions of books, stating that:-

... new material has been added [to the book] from which superfluous had been removed...Another of Fibonacci's books is

*Practica geometriae*Ⓣ written in 1220 which is dedicated to Dominicus Hispanus whom we mentioned above. It contains a large collection of geometry problems arranged into eight chapters with theorems based on Euclid's

*Elements*and Euclid's

*On Divisions*. In addition to geometrical theorems with precise proofs, the book includes practical information for surveyors, including a chapter on how to calculate the height of tall objects using similar triangles. The final chapter presents what Fibonacci called geometrical subtleties [1]:-

Among those included is the calculation of the sides of the pentagon and the decagon from the diameter of circumscribed and inscribed circles; the inverse calculation is also given, as well as that of the sides from the surfaces. ... to complete the section on equilateral triangles, a rectangle and a square are inscribed in such a triangle and their sides are algebraically calculated ...In

*Flos*Ⓣ Fibonacci gives an accurate approximation to a root of $10x + 2x^{2} + x^{3} = 20$, one of the problems that he was challenged to solve by Johannes of Palermo. This problem was not made up by Johannes of Palermo, rather he took it from Omar Khayyam's algebra book where it is solved by means of the intersection of a circle and a hyperbola. Fibonacci proves that the root of the equation is neither an integer nor a fraction, nor the square root of a fraction. He then continues:-

And because it was not possible to solve this equation in any other of the above ways, I worked to reduce the solution to an approximation.Without explaining his methods, Fibonacci then gives the approximate solution in sexagesimal notation as 1.22.7.42.33.4.40 (this is written to base 60, so it is $1 + \large\frac{22}{60}\normalsize + \large\frac{7}{60^{2}\normalsize} + \large\frac{42}{60^{3}\normalsize} + ...$). This converts to the decimal 1.3688081075 which is correct to nine decimal places, a remarkable achievement.

*Liber quadratorum*, written in 1225, is Fibonacci's most impressive piece of work, although not the work for which he is most famous. The book's name means the book of squares and it is a number theory book which, among other things, examines methods to find Pythogorean triples. Fibonacci first notes that square numbers can be constructed as sums of odd numbers, essentially describing an inductive construction using the formula $n^{2} + (2n+1) = (n+1)^{2}$. Fibonacci writes:-

I thought about the origin of all square numbers and discovered that they arose from the regular ascent of odd numbers. For unity is a square and from it is produced the first square, namely 1; adding 3 to this makes the second square, namely 4, whose root is 2; if to this sum is added a third odd number, namely 5, the third square will be produced, namely 9, whose root is 3; and so the sequence and series of square numbers always rise through the regular addition of odd numbers.To construct the Pythogorean triples, Fibonacci proceeds as follows:-

Thus when I wish to find two square numbers whose addition produces a square number, I take any odd square number as one of the two square numbers and I find the other square number by the addition of all the odd numbers from unity up to but excluding the odd square number. For example, I take 9 as one of the two squares mentioned; the remaining square will be obtained by the addition of all the odd numbers below 9, namely 1, 3, 5, 7, whose sum is 16, a square number, which when added to 9 gives 25, a square number.Fibonacci also proves many interesting number theory results such as:

there is no $x, y$ such that $x^{2} + y^{2}$ and $x^{2} - y^{2}$ are both squares.

and $x^{4} - y^{4}$ cannot be a square.

He defined the concept of a and $x^{4} - y^{4}$ cannot be a square.

*congruum*, a number of the form $ab(a + b)(a - b)$, if $a + b$ is even, and 4 times this if $a + b$ is odd. Fibonacci proved that a congruum must be divisible by 24 and he also showed that for $x, c$ such that $x^{2} + c$ and $x^{2} - c$ are both squares, then $c$ is a congruum. He also proved that a square cannot be a congruum.

As stated in [2]:-

... the Liber quadratorum Ⓣ alone ranks Fibonacci as the major contributor to number theory between Diophantus and the 17th -century French mathematician Pierre de Fermat.Fibonacci's influence was more limited than one might have hoped and apart from his role in spreading the use of the Hindu-Arabic numerals and his rabbit problem, Fibonacci's contribution to mathematics has been largely overlooked. As explained in [1]:-

Direct influence was exerted only by those portions of the "Liber abaci" and of the "Practica" that served to introduce Indian-Arabic numerals and methods and contributed to the mastering of the problems of daily life. Here Fibonacci became the teacher of the masters of computation and of the surveyors, as one learns from the "Summa" Ⓣ of Luca Pacioli ... Fibonacci was also the teacher of the "Cossists", who took their name from the word 'causa' which was first used in the West by Fibonacci in place of 'res' or 'radix'. His alphabetic designation for the general number or coefficient was first improved by Viète ...Fibonacci's work in number theory was almost wholly ignored and virtually unknown during the Middle ages. Three hundred years later we find the same results appearing in the work of Maurolico.

The portrait above is from a modern engraving and is believed to not be based on authentic sources.

### References (show)

- K Vogel, Biography in
*Dictionary of Scientific Biography*(New York 1970-1990).

See THIS LINK. - Biography in
*Encyclopaedia Britannica.*

http://www.britannica.com/biography/Leonardo-Pisano - J Gies and F Gies,
*Leonard of Pisa and the New Mathematics of the Middle Ages*(1969). - H Lüneburg,
*Leonardi Pisani Liber Abbaci oder Lesevergnügen eines Mathematikers*(Mannheim, 1993) - A Agostini, Leonardo Fibonacci (Italian),
*Archimede***5**(1953), 205-206. - A Agostini, L'uso delle lettere nel 'Liber abaci' di Leonardo Fibonacci,
*Boll. Un. Mat. Ital.*(3)**4**(1949), 282-287. - I G Basmakova, The 'Liber quadratorum' of Leonardo of Pisa (Russian), in
*History and methodology of the natural sciences***XX**(Moscow, 1978), 27-37. - P K Chong, The life and work of Leonardo of Pisa,
*Menemui Mat.***4**(2) (1982), 60-66. - M Dunton and R E Grimm, Fibonacci on Egyptian fractions,
*Fibonacci Quart***4**(1966), 339-354. - R Franci and L Toti Rigatelli, Towards a history of algebra from Leonardo of Pisa to Luca Pacioli,
*Janus***72**(1-3) (1985), 17-82. - P Freguglia, The determination of π in Fibonacci's 'Practica geometriae' in a fifteenth-century manuscript (Italian), in
*Contributions to the history of mathematics*(Modena, 1992), 75-84. - S Glushkov, On approximation methods of Leonardo Fibonacci,
*Historia Math.***3**(1976), 291-296. - A F Horadam, Fibonacci's mathematical letter to Master Theodorus,
*Fibonacci Quart.***29**(2) (1991), 103-107. - A F Horadam, Eight hundred years young,
*The Australian Mathematics Teacher***31**(1975) 123-134. - G Loria, Leonardo Fibonacci,
*Storia delle mathematiche***I**(Turin, 1929), 379-410. - H Lüneburg, Fibonaccis aufsteigende Kettenbrüche, ein elegantes Werkzeug mittelalterlicher Rechenkunst, in
*Séminaire Lotharingien de Combinatoire*(Strasbourg, 1991), 135-149. - H Lüneburg, Fibonaccis aufsteigende Kettenbrüche, ein elegantes Werkzeug mittelalterlicher Rechenkunst,
*Sudhoffs Arch.***75**(2) (1991), 129-139. - E A Marchisotto, Connections in mathematics : an introduction to Fibonacci via Pythagoras,
*Fibonacci Quart.***31**(1) (1993), 21-27. - E Picutti, Leonardo of Pisa's congruous-congruent numbers (Italian),
*Physis - Riv. Internaz. Storia Sci.***23**(2) (1981), 141-170. - E Picutti, The 'Book of squares' of Leonardo of Pisa and the problems of indeterminate analysis in the Palatine Codex 557 of the National Library in Florence : Introduction and comments (Italian),
*Physis - Riv. Internaz. Storia Sci.***21**(1-4) (1979), 195-339. - S Shalhub, The calculations and algebra of abu Kamil Shuja- ibn Aslam and his effects on the work of al-Karaji and on the work of Leonardo Fibonacci (Arabic), in
*Deuxième Colloque Maghrebin sur l'Histoire des Mathématiques Arabes*(Tunis, 1990), A23-A39. - J Weszely, Fibonacci, Leonardo Pisano (c. 1170-c. 1240) (Romanian),
*Gaz. Mat. Mat. Inform.***1**(3) (1980), 124-126.

### Additional Resources (show)

Other pages about Fibonacci:

### Honours (show)

Honours awarded to Fibonacci

### Cross-references (show)

- History Topics: A chronology of pi
- History Topics: A history of Zero
- History Topics: An overview of the history of mathematics
- History Topics: Mathematical games and recreations
- History Topics: Prime numbers
- History Topics: The Arabic numeral system
- History Topics: The Golden ratio
- History Topics: The real numbers: Pythagoras to Stevin
- History Topics: The trigonometric functions
- Student Projects: Indian Mathematics - Redressing the balance: Chapter 11
- Student Projects: Indian Mathematics - Redressing the balance: Chapter 15
- Other: 1908 ICM - Rome
- Other: 1928 ICM - Bologna
- Other: 2009 Most popular biographies
- Other: Earliest Known Uses of Some of the Words of Mathematics (A)
- Other: Earliest Known Uses of Some of the Words of Mathematics (C)
- Other: Earliest Known Uses of Some of the Words of Mathematics (E)
- Other: Earliest Known Uses of Some of the Words of Mathematics (F)
- Other: Earliest Known Uses of Some of the Words of Mathematics (G)
- Other: Earliest Known Uses of Some of the Words of Mathematics (H)
- Other: Earliest Known Uses of Some of the Words of Mathematics (P)
- Other: Earliest Uses of Grouping Symbols
- Other: Earliest Uses of Symbols for Constants
- Other: Earliest Uses of Symbols for Fractions
- Other: Earliest Uses of Symbols for Variables
- Other: Earliest Uses of Symbols of Operation
- Other: Most popular biographies

Written by J J O'Connor and E F Robertson

Last Update October 1998

Last Update October 1998