Euler's formula

Euler's formula

Euler's formula denotes the equation that is valid for everyone${\ displaystyle y \ in \ mathbb {R}}$

${\ displaystyle \ mathrm {e} ^ {\ mathrm {i} \, y} = \ cos \ left (y \ right) + \ mathrm {i} \, \ sin \ left (y \ right)}$,

As a consequence of Euler's formula, the equation results for all of them${\ displaystyle z = {x + \ mathrm {i} y} \ in \ mathbb {C}}$

${\ displaystyle \ mathrm {e} ^ {z} = \ mathrm {e} ^ {x + \ mathrm {i} y} = \ mathrm {e} ^ {x} \ cdot \ mathrm {e} ^ {\ mathrm { i} y} = \ mathrm {e} ^ {x} \ cdot \ left (\ cos \ left (y \ right) + \ mathrm {i} \, \ sin \ left (y \ right) \ right)}$.

Derivation by means of series expansion

Animation of the derivation of Euler's formula

Euler's formula can be calculated from the Maclaurin series of functions and , , derive ${\ displaystyle \ mathrm {e} ^ {y}, \ sin y}$${\ displaystyle \ cos y}$${\ displaystyle y \ in \ mathbb {R}}$

${\ displaystyle {\ begin {aligned} \ mathrm {e} ^ {\ mathrm {i} y} & = 1+ \ mathrm {i} y + {(\ mathrm {i} y) ^ {2} \ over 2! } + {(\ mathrm {i} y) ^ {3} \ over 3!} + {(\ mathrm {i} y) ^ {4} \ over 4!} + \ dots \\ & = \ left (1 - {\ frac {y ^ {2}} {2!}} + {\ frac {y ^ {4}} {4!}} - \ dots \ right) + \ mathrm {i} \ cdot \ left (y - {\ frac {y ^ {3}} {3!}} + {\ frac {y ^ {5}} {5!}} - \ dots \ right) \\ & = \ cos (y) + \ mathrm {i} \ cdot \ sin (y) \ end {aligned}}}$

The transformations are based on ${\ displaystyle i ^ {2} = - 1.}$

Euler's identity

Animation of the approximation of by the expression . The dots each for the values to represent.${\ displaystyle \ mathrm {e} ^ {\ mathrm {i} \ pi}}$${\ displaystyle \ lim _ {n \ rightarrow \ infty} (1+ \ mathrm {i} \ pi / n) ^ {n}}$${\ displaystyle n}$${\ displaystyle (1+ \ mathrm {i} \ pi / n) ^ {j}}$${\ displaystyle j = 0, \ dots, n}$

${\ displaystyle \ mathrm {e} ^ {\ mathrm {i} \, \ pi} = {- 1}}$,

${\ displaystyle \ mathrm {e} ^ {\ mathrm {i} \, \ pi} + 1 = 0}$.

Relationship between exponentials and trigonometric functions

Relationship between sine, cosine and exponential function

formulation

Euler's formula is a central link between analysis and trigonometry :

${\ displaystyle \ sin x = {\ frac {\ mathrm {e} ^ {\ mathrm {i} x} - \ mathrm {e} ^ {- \ mathrm {i} x}} {2 \ mathrm {i}} }, \ quad \ cos x = {\ frac {\ mathrm {e} ^ {\ mathrm {i} x} + \ mathrm {e} ^ {- \ mathrm {i} x}} {2}}}$.

Derivation

Sine and cosine result from the real part and the imaginary part of the complex exponential function.

${\ displaystyle \ cos (x) = \ mathrm {Re} (\ mathrm {e} ^ {\ mathrm {i} x}) = {\ frac {\ mathrm {e} ^ {\ mathrm {i} x} + \ mathrm {e} ^ {- \ mathrm {i} x}} {2}}}$.

The imaginary part is obtained by calculating: ${\ displaystyle {\ frac {z - {\ bar {z}}} {2 \ mathrm {i}}}}$

${\ displaystyle \ sin (x) = \ mathrm {Im} (\ mathrm {e} ^ {\ mathrm {i} x}) = {\ frac {\ mathrm {e} ^ {\ mathrm {i} x} - \ mathrm {e} ^ {- \ mathrm {i} x}} {2 \ mathrm {i}}}}$.

Explanation

The Euler formula allows a completely new view of the trigonometric functions, since the functions sine and cosine , which are used in conventional trigonometry only with real arguments, now also have a meaning in complex analysis.

The formulas for the real and imaginary part result from:

${\ displaystyle {\ begin {aligned} \ mathrm {Re} (a ​​+ b \, \ mathrm {i}) = {\ frac {z + {\ bar {z}}} {2}} = {\ frac {( a + b \ mathrm {i}) + (ab \, \ mathrm {i})} {2}} = {\ frac {2a} {2}} = a, \\\ mathrm {Im} (a + b \, \ mathrm {i}) = {\ frac {z - {\ bar {z}}} {2 \ mathrm {i}}} = {\ frac {(a + b \, \ mathrm {i}) - (from \, \ mathrm {i})} {2 \ mathrm {i}}} = {\ frac {2b \ mathrm {i}} {2 \ mathrm {i}}} = b \ end {aligned}}}$

A consequence of the connection of trigonometric functions and exponential functions from the Euler formula is Moivresche's theorem (1730).

Hyperbolic functions

Providing the sines and cosines with imaginary arguments, a bridge to the hyperbolic functions is built :

${\ displaystyle \ sin (\ mathrm {i} y) = {\ mathrm {e} ^ {- y} - \ mathrm {e} ^ {y} \ over 2 \ mathrm {i}} = \ mathrm {i} \, {\ frac {\ mathrm {e} ^ {y} - \ mathrm {e} ^ {- y}} {2}} = \ mathrm {i} \, \ sinh (y)}$

${\ displaystyle \ cos (\ mathrm {i} y) = {\ frac {\ mathrm {e} ^ {- y} + \ mathrm {e} ^ {y}} {2}} = {\ frac {\ mathrm {e} ^ {y} + \ mathrm {e} ^ {- y}} {2}} = \ cosh (y)}$

As can be seen, the two functions obtained correspond exactly to the definitions of the hyperbolic sine and hyperbolic cosine .

Other uses

Vector representation of an alternating voltage in the complex plane

A practically important application of Euler's formula can be found in the field of alternating current technology , namely in the investigation and calculation of alternating current circuits with the help of complex numbers.

history

Before that, Roger Cotes published an incorrect mathematical connection in 1714, which is similar to Euler's formula.

In modern notation it looks like this:

${\ displaystyle \ mathrm {i} \ cdot r \ cdot \ ln (\ cos (\ varphi) + \ mathrm {i} \ sin (\ varphi)) = r \ cdot \ varphi \ quad {\ text {(sic! )}}}$,

where a circle with a radius fixed in the coordinate origin and an angle between the x-axis and a ray that intersects the origin are considered. ${\ displaystyle r}$${\ displaystyle \ varphi}$

The imaginary unit should be on the other side of the equation. ${\ displaystyle \ mathrm {i}}$

See also

• Fourier analysis
• District group

Individual evidence

1. ↑ Roger Cotes: Logometria . Philosophical Transactions of the Royal Society of London ,. 1714, p. 32 (Latin, hathitrust.org ). 

literature

• Konrad Königsberger : Analysis 1 . Springer, Berlin 2004, ISBN 3-540-41282-4