Euler's identity
From Free net encyclopedia
- For other meanings, see Euler function (disambiguation)
In mathematical analysis, Euler's identity, named after Leonhard Euler, is the equation
- <math>e^{i \pi} + 1 = 0, \,\!</math>
where
- <math>e\,\!</math> is Euler's number, the base of the natural logarithm,
- <math>i\,\!</math> is the imaginary unit, one of the two complex numbers whose square is negative one (the other is <math>-i\,\!</math>), and
- <math>\pi\,\!</math> is Pi, the ratio of the circumference of a circle to its diameter.
Euler's identity is also sometimes called "Euler's equation".
Contents |
Derivation
Image:Euler's formula.png The identity is a special case of Euler's formula from complex analysis, which states that
- <math>e^{ix} = \cos x + i \sin x \,\!</math>
for any real number x. In particular, if <math>x = \pi\,\!</math>, then
- <math>e^{i \pi} = \cos \pi + i \sin \pi \,\!</math>.
Since
- <math>\cos \pi = -1 \, \! </math>
and
- <math>\sin \pi = 0\,\!</math>,
it follows that
- <math>e^{i \pi} = -1 \,\!</math>
which gives the identity.
Perceptions of the identity
Euler's identity is remarkable for its mathematical beauty. Three basic arithmetic functions are present exactly once: addition, multiplication, and exponentiation. As well, the identity links five fundamental mathematical constants:
- The number 0.
- The number 1.
- The number π, which is ubiquitous in trigonometry, Euclidean geometry, and mathematical analysis.
- The number e, the base of natural logarithms, which occurs widely in mathematical analysis.
- The number i, imaginary unit of the complex numbers, which contain the roots of all nonconstant polynomials and lead to deeper insight into many operators, such as integration.
Furthermore, in mathematical analysis, equations are commonly written with zero on one side.
Constance Reid even claimed that Euler's identity was "the most famous formula in all mathematics".
After proving the identity in a lecture, Benjamin Peirce, a noted nineteenth century mathematician and Harvard professor, said, "It is absolutely paradoxical; we cannot understand it, and we don't know what it means, but we have proved it, and therefore we know it must be the truth."Template:Rf
A reader poll conducted by Physics World in 2004 named Euler's identity the "greatest equation ever" next to Maxwell's equations.
Gauss is reported to have commented that if this formula were not immediately obvious to him, the reader would never be a first-class mathematician.
Notes
Template:Ent Maor p. 160 and Kasner and Newman p.103
References
- E. Kasner and J. Newman, Mathematics and the imagination (Bell and Sons, 1949) pp. 103–104
- Maor, Eli, e: The Story of a number (Princeton University Press, 1998), ISBN 0691058547
- Reid, Constance, From Zero to Infinity (Mathematical Association of America, various editions).
- Crease, Robert P., "The greatest equations ever", PhysicsWeb, October 2004
See also
de:Eulersche Identität es:Identidad de Euler fr:Identité d'Euler he:זהות אוילר it:Identità di Eulero ja:オイラーの等式 ko:오일러의 등식 nl:Formule van Euler pt:Identidade de Euler sl:Eulerjeva enačba sr:Ојлеров идентитет th:เอกลักษณ์ของออยเลอร์ zh:歐拉恆等式