Proving e^ix = cos x + i sin x

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Discussion Overview

The discussion centers on proving the identity e^ix = cos x + i sin x, exploring various methods and approaches to establish this relationship. The scope includes mathematical reasoning and technical explanations related to complex analysis and trigonometric functions.

Discussion Character

  • Mathematical reasoning
  • Technical explanation
  • Exploratory

Main Points Raised

  • One participant suggests using infinite series expansions for e^x, sin(x), and cos(x) to demonstrate the identity by rearranging terms.
  • Another participant proposes verifying that both functions satisfy the same differential equation and initial conditions, specifically f'' + f = 0.
  • A different approach is presented involving the function z = cos(x) + i*sin(x) and using differentiation and integration to derive the identity, concluding with z(0)=1 to find constants.
  • It is noted that multiple proofs exist, which may vary based on prior knowledge and definitions of the functions involved.

Areas of Agreement / Disagreement

Participants present various methods to prove the identity, indicating that there is no single consensus on the best approach, and multiple competing views remain regarding the proofs.

Contextual Notes

Some limitations include the dependence on the definitions of the functions involved and the assumptions made in each proof method. The discussion does not resolve which proof is superior or more valid.

Who May Find This Useful

Readers interested in complex analysis, trigonometric identities, or mathematical proofs may find this discussion relevant.

Hyperreality
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How can I proof the identity

e^ix = cos x + i sin x?
 
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Consider the infinite sums:
e^x = 1 + x/1! + x^2/2! + x^3/3! + ...
sin(x) = x/1! - x^3/3! + x^5/5! -x^7/7! + ...
cos(x) = 1 - x^2/2! + x^4/4! -x^6/6! + ...

e^ix = 1 + ix/1! + (ix)^2/2! + (ix)^3/3!...
Notice the patterns with the powers of i and rearrange the terms to see how they relate to sin and cos.
 
or check that both functions satisfy the same de and same initial conditions,

i.e. f'' + f = 0 and f(0) = 1, f'(0) = i.
 
Hyperreality said:
How can I proof the identity

e^ix = cos x + i sin x?

You could use the function z = cos(x) + i*sin(x) with z(0)=1 and dz/dx = -sin(x) + i*cos(x) = i*cos(x) + i^2*sin(x) = i*(cos(x)+i*sin(x)) = iz. Which gives dz/dx = iz <=> dz/z = i dx integration gives [tex]\int \frac{dz}{z} = \int i \ dx[/tex] which gives ln(z) + C = ix + D => ln(z) = ix+E => z = e^(ix+E). Now we have that cos(x)+i*sin(x) = e^(ix+E), and with z(0)=1 it gives that e^(i*0+E)=e^E=1 => E=0 which yields e^(ix)=cos(x)+i*sin(x).

Edit: E = D - C
 
In other words, there are a number of different proofs, depending on what you already know and how you are defining the different functions.
 

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