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Jacques Philippe Marie Binet (February 2, 1786 – May 12, 1856) was a French mathematician, physicist and astronomer born in Rennes; he died in Paris, France, in 1856. He made significant contributions to number theory, and the mathematical foundations of matrix algebra which would later lead to important contributions by Cayley and others. In his memoir on the theory of the conjugate axis and of the moment of inertia of bodies he enumerated the principle now known as Binet's theorem. He is also recognized as the first to describe the rule for multiplying matrices in 1812, and Binet's formula expressing Fibonacci numbers in closed form is named in his honour, although the same result was known to Abraham de Moivre a century earlier.

Jacques Philippe Marie Binet

Binet graduated from l'École Polytechnique in 1806, and returned as a teacher in 1807. He advanced in position until 1816 when he became an inspector of studies at l'École. He held this post until November 13, 1830, when he was dismissed by the recently crowned King Louis-Philippe of France, probably because of Binet's strong support of the previous King, Charles X. In 1823 Binet succeeded Delambre in the chair of astronomy at the Collège de France. He was made a Chevalier in the Légion d'Honneur in 1821, and was elected to the Académie des Sciences in 1843.

Portions from the 1910 New Catholic Dictionary

Binet's Fibonacci number formula

This formula provides the n^\text{th} term in the Fibonacci sequence, and is defined using the recurrence formula:

\( u_n = u_{n-1} + u_{n-2},\text{ for }n > 1, \, \)

where

\( u_0 = 0 \,\)
\( u_1 = 1 \,\)

\( u_n = \frac{(1 + \sqrt{5})^n - (1 - \sqrt{5})^n}{2^n \sqrt{5}} \) [1]

See also

Binet–Cauchy identity
Binet equation

References

^ Weisstein, Eric W. "Binet's Fibonacci Number Formula". From MathWorld—A Wolfram Web Resource. Retrieved 10 January 2011.

John J O'Connor and Edmund F Robertson, 2005. Jacques Philippe Marie Binet. Retrieved November 21, 2005.
William A. McWorter Jr., 2005. When the Counting Gets Tough, the Tough Count on Mathematics. Retrieved November 21, 2005.

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