on the shoulders of eastern giants the forgotten contribution of medieval physicists on the...
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On the Shoulders of Eastern Giants
The Forgotten Contribution of Medieval Physicists
On the Shoulders of Eastern Giants
The Forgotten Contribution of Medieval Physicists
Jim Al-Khalili
Department of Physics, University of Surrey
Jim Al-Khalili
Department of Physics, University of Surrey
A General Interest Seminar at the University of EdinburghDepartment of Physics and Astronomy 10 May 2012
Nathaniel Schmidt, Ibn Khaldun: Historian, Sociologist and Philosopher (New York: AMS Press, Inc., 1967)
Source: Jacob Lassner, Journal of the Economic and Social History of the Orient, Vol. 9, (1966) p.1
Oil painting Julius Koeckert (1827-1918), dated 1864, Maximilianeum Foundation, Munich
Abbasid Caliph Harun al-Rashid and king Charlemagne
Al-Mamun built a new academy:
Bayt al-Hikma
“The House of Wisdom”
6
Indian numerals
179.685
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x +x
10+
x +x
1010
+x +
x
10+
x +x
1010
10= x ⋅
11
10 ⎛ ⎝
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In this case, x = 135In this case, x = 135
Al-Khwarizmi (c.780 – 850 CE)
The father of algebra.
The Babylonians and early algebra
A typical problem might have been:Find the number if, when added to its
reciprocal, equals a known number.
This is an example of a quadratic equation:
Solved using ‘formula method’ we all learn at school.
But this is not what we regard as real algebra. They did not regard
the unknown (x) as an object in itself, but merely solved specific
problems (instead of developing general algebraic rules).9
Diophantus, wrote Arithmetica and pioneered class of equations involving two or more unknown quantities raised to any power, such that solutions always integers (Diophantine
equations)
Brahmagupta studied particular Diophantine equation –the ‘Pell equation’, which has the general form
10
Algebra or number theory?Algebra or number theory?
He posed the challenge of finding a solution if a =92.
He suggested that anyone who could solve this problem within a year earned the right to be called a mathematician.
Today, this is easy. We have computers!!
Al-Biruni (973–1048)
Persian polymath, regarded as the Da Vinci of the medieval world.
First Biruni measured the
height of a mountain (in
Pakistan)
He then climbed to the top of the mountain and measured the angle of dip to the horizon.
Φ
Φ RR+h
If we know h and Φ then we can find R.
Origin of ‘sine’
Robert of Chester in 12th century gave us the word sine, but how did we get this from the Hindus?
Etymologically, we must begin with the Sanskrit word jya-ardha, which means ‘half the bowstring’(or, geometrically, half the chord of a circle).
Jya-ardha abbreviated to jiva,
transliterated in Arabic as jiba.
When translated to Latin, mistaken to say jayb (‘pocket’).
Latin for pocket is sinus
Hence sine.
Span of two thousand years
Archimedes 3rd c. BCE
Ibn al-Haytham 11th century Isaac Newton
17th century
Greatest Physicists in History
Alhazen’s problemIn optics.
Requires a quartic equation
Solution using conical sections
Latinized first name of ibn al-Haytham: Al-Hassan
Conic Sections
From Ibn Sahl’s On The Burning Instruments (984 AD)
Six centuries before Willebrord Snell wrote down his law of refraction
Was Copernicus first to propose heliocentric model?
No, first proposed by Greek philosopher, Aristarchus (3rd c. BCE); No one believed him (apart from a lone Babylonian called Seleucus );
But, like them, he was just guessing!
Indian astronomers proposed heliocentric modelArab astronomer al-Sijzi (c. 945-1020) also proposed
heliocentric model and was supported by al-Biruni.
Just like these earlier astronomers, Copernicus was
courageous…
Archimedes, wrote: "You know that most astronomers designate by the word cosmos the sphere whose centre coincides with the centre of the earth... But Artistarchus … assumes that the fixed stars and the sun remain stationary, while the earth moves round the sun through the circumference of a circle.”
Archimedes, wrote: "You know that most astronomers designate by the word cosmos the sphere whose centre coincides with the centre of the earth... But Artistarchus … assumes that the fixed stars and the sun remain stationary, while the earth moves round the sun through the circumference of a circle.”
On the other hand, he did turn a philosophical idea into a fully predictive mathematical theory.
Copernicus (1543) Tusi (1261)
Galileo Galilei (1564-1642)
Ibn al-Haytham and Galileo on the frontispiece of Selenographia, a 1647 description of the moon by Johannes Hevelius
The theoretician and the experimentalist
Ibn al-Haytham can and should also be regarded as first person to define the ‘scientific method’:
“We should destinguish the properties of particulars, and
gather by induction what pertains to the eye to be uniform,
unchanging, manifest and not subject to doubt. After which
we should assend in our enquiry and reasoning, gradually
and orderly, criticizing premises and exercising caution in
regard to conclusions – our aim in all that we make subject
to inspection and review being to employ justice, not to
follow prejudice, and to take care in all that we judge and
criticize that we seek the truth and not be swayed by
opinion.”
Mathematical advances in Muslim world
continued into 15th century.
Jamshid al-Kashi (1380-1429) in Samarkand
• Calculated pi to 16 decimal places
• Gave us the ‘Cosine Rule’In France this is still known as théorème d’al-Kashi
a
b
cθ
When it comes to understanding our world through reason AND experimentation…
“The Greeks systematised, generalised and theorised, but the
patient ways of investigation, the accumulation of positive
knowledge, the minute methods of science, detailed and
prolonged observation and experimental enquiry, were altogether
alien to the Greeks’ temperament… What we call science arose in
Europe as a result of a new spirit of enquiry… of the methods of
experiment, observation and measurement, of the development of
mathematics in a form unknown to the Greeks. That spirit and
those methods were introduced into the European world by the
Arabs.”
Robert Briffault, The Making of Humanity (1930)