Euler's identity

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In mathematics, Euler's identity[note 1] (also known as Euler's equation) is the equality where

is Euler's number, the base of natural logarithms,
is the imaginary unit, which by definition satisfies , and
is pi, the ratio of the circumference of a circle to its diameter.

Euler's identity is named after the Swiss mathematician Leonhard Euler. It is a special case of Euler's formula when evaluated for . Euler's identity is considered to be an exemplar of mathematical beauty as it shows a profound connection between the most fundamental numbers in mathematics. In addition, it is directly used in a proof[3][4] that π is transcendental, which implies the impossibility of squaring the circle.

Mathematical beauty

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Euler's identity is often cited as an example of deep mathematical beauty.[5] Three of the basic arithmetic operations occur exactly once each: addition, multiplication, and exponentiation. The identity also links five fundamental mathematical constants:[6]

The equation is often given in the form of an expression set equal to zero, which is common practice in several areas of mathematics.

Stanford University mathematics professor Keith Devlin has said, "like a Shakespearean sonnet that captures the very essence of love, or a painting that brings out the beauty of the human form that is far more than just skin deep, Euler's equation reaches down into the very depths of existence".[7] And Paul Nahin, a professor emeritus at the University of New Hampshire, who has written a book dedicated to Euler's formula and its applications in Fourier analysis, describes Euler's identity as being "of exquisite beauty".[8]

Mathematics writer Constance Reid has opined that Euler's identity is "the most famous formula in all mathematics".[9] And Benjamin Peirce, a 19th-century American philosopher, mathematician, and professor at Harvard University, after proving Euler's identity during a lecture, stated that the identity "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".[10]

A poll of readers conducted by The Mathematical Intelligencer in 1990 named Euler's identity as the "most beautiful theorem in mathematics".[11] In another poll of readers that was conducted by Physics World in 2004, Euler's identity tied with Maxwell's equations (of electromagnetism) as the "greatest equation ever".[12]

At least three books in popular mathematics have been published about Euler's identity:

  • Dr. Euler's Fabulous Formula: Cures Many Mathematical Ills, by Paul Nahin (2011)[13]
  • A Most Elegant Equation: Euler's formula and the beauty of mathematics, by David Stipp (2017)[14]
  • Euler's Pioneering Equation: The most beautiful theorem in mathematics, by Robin Wilson (2018).[15]

Explanations

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Imaginary exponents

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In this animation N takes various increasing values from 1 to 100. The computation of (1 + /N)N is displayed as the combined effect of N repeated multiplications in the complex plane, with the final point being the actual value of (1 + /N)N. It can be seen that as N gets larger (1 + /N)N approaches a limit of −1.

Euler's identity asserts that   is equal to −1. The expression   is a special case of the expression  , where z is any complex number. In general,   is defined for complex z by extending one of the definitions of the exponential function from real exponents to complex exponents. For example, one common definition is:

 

Euler's identity therefore states that the limit, as n approaches infinity, of   is equal to −1. This limit is illustrated in the animation to the right.

 
Euler's formula for a general angle

Euler's identity is a special case of Euler's formula, which states that for any real number x,

 

where the inputs of the trigonometric functions sine and cosine are given in radians.

In particular, when x = π,

 

Since

 

and

 

it follows that

 

which yields Euler's identity:

 

Geometric interpretation

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Any complex number   can be represented by the point   on the complex plane. This point can also be represented in polar coordinates as  , where r is the absolute value of z (distance from the origin), and   is the argument of z (angle counterclockwise from the positive x-axis). By the definitions of sine and cosine, this point has cartesian coordinates of  , implying that  . According to Euler's formula, this is equivalent to saying  .

Euler's identity says that  . Since   is   for r = 1 and  , this can be interpreted as a fact about the number −1 on the complex plane: its distance from the origin is 1, and its angle from the positive x-axis is   radians.

Additionally, when any complex number z is multiplied by  , it has the effect of rotating z counterclockwise by an angle of   on the complex plane. Since multiplication by −1 reflects a point across the origin, Euler's identity can be interpreted as saying that rotating any point   radians around the origin has the same effect as reflecting the point across the origin. Similarly, setting   equal to   yields the related equation   which can be interpreted as saying that rotating any point by one turn around the origin returns it to its original position.

Generalizations

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Euler's identity is also a special case of the more general identity that the nth roots of unity, for n > 1, add up to 0:

 

Euler's identity is the case where n = 2.

A similar identity also applies to quaternion exponential: let {i, j, k} be the basis quaternions; then,

 

More generally, let q be a quaternion with a zero real part and a norm equal to 1; that is,   with   Then one has

 

The same formula applies to octonions, with a zero real part and a norm equal to 1. These formulas are a direct generalization of Euler's identity, since   and   are the only complex numbers with a zero real part and a norm (absolute value) equal to 1.

History

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While Euler's identity is a direct result of Euler's formula, published in his monumental work of mathematical analysis in 1748, Introductio in analysin infinitorum,[16] it is questionable whether the particular concept of linking five fundamental constants in a compact form can be attributed to Euler himself, as he may never have expressed it.[17]

Robin Wilson states the following.[18]

We've seen how it [Euler's identity] can easily be deduced from results of Johann Bernoulli and Roger Cotes, but that neither of them seem to have done so. Even Euler does not seem to have written it down explicitly – and certainly it doesn't appear in any of his publications – though he must surely have realized that it follows immediately from his identity [i.e. Euler's formula], eix = cos x + i sin x. Moreover, it seems to be unknown who first stated the result explicitly....

See also

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Notes

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  1. ^ The term "Euler's identity" (or "Euler identity") is also used elsewhere to refer to other concepts, including the related general formula eix = cos x + i sin x,[1] and the Euler product formula.[2] See also List of things named after Leonhard Euler.

References

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  1. ^ Dunham, 1999, p. xxiv.
  2. ^ Stepanov, S.A. (2001) [1994], "Euler identity", Encyclopedia of Mathematics, EMS Press
  3. ^ Milla, Lorenz (2020), The Transcendence of π and the Squaring of the Circle, arXiv:2003.14035
  4. ^ Hines, Robert. "e is transcendental" (PDF). University of Colorado. Archived (PDF) from the original on 2021-06-23.
  5. ^ Gallagher, James (13 February 2014). "Mathematics: Why the brain sees maths as beauty". BBC News Online. Retrieved 26 December 2017.
  6. ^ Paulos, 1992, p. 117.
  7. ^ Nahin, 2006, p. 1.
  8. ^ Nahin, 2006, p. xxxii.
  9. ^ Reid, chapter e.
  10. ^ Maor, p. 160, and Kasner & Newman, p. 103–104.
  11. ^ Wells, 1990.
  12. ^ Crease, 2004.
  13. ^ Nahin, Paul (2011). Dr. Euler's fabulous formula : cures many mathematical ills. Princeton University Press. ISBN 978-0-691-11822-2.
  14. ^ Stipp, David (2017). A Most Elegant Equation : Euler's Formula and the Beauty of Mathematics (First ed.). Basic Books. ISBN 978-0-465-09377-9.
  15. ^ Wilson, Robin (2018). Euler's pioneering equation : the most beautiful theorem in mathematics. Oxford: Oxford University Press. ISBN 978-0-19-879493-6.
  16. ^ Conway & Guy, p. 254–255.
  17. ^ Sandifer, p. 4.
  18. ^ Wilson, p. 151-152.

Sources

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