Deriving Euler's formula four ways!

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Fun video. 🙂 One small thing, in method 3 there's a substitution of x=tan(θ/2) , which is fine but note that there's a restricted domain on it since tan(π/2) is undefined. So unlike the first two methods you might need to be a little careful handling the domain.

Personally, my favourite method is as follows:
The diff equation y'' = -y has cosine and sine as obvious solutions, and obviously any linear combination of them as well. But we could also have taken exp(c•x), whose second derivative is c²exp(cx), with c some constant. If c²=-1, i.e. if c=i, this is also a solution. But how do we compute exp(ix)? Luckily, we don't need to, because by Picard-Lindelöf we know there is a two parameter family of solutions for this equation, already covered by the sines and cosines from before, so e^ix must be some combination of the two. Adjusting constants and noticing e^i0 = 1 and its derivative at zero is i, we reach the famous result.
I love this method, because it is both intuitive and really highlights the connection between the trigonometric functions and the exponential. In fact, if you're more knowledgable in complex analysis, you'll know the relationship is actually backwards, and sine and cosine are actually combinations of complex exponentials and not the other way around

The problems of these proofs is how do you define each functions? What is assumed about each functions? For example, in the second proof, you are supposed to know that the derivative of exp(iθ) wrt θ is equal to iexp(iθ), but you first need to define the exponential of a complex number.

here's another way: set f(θ) = cos(θ) + i sin(θ) and take the derivative
f'(θ) = -sin(θ) + i cos(θ) = i (cos(θ) + i sin(θ)) = i f(θ)
which is a differential equation whose solution (with initial condition f(0) = 1) is f(θ) = exp(iθ)

So good to see the return of the magic chalk squares as you progress through the problem. It's what got me into your videos in the first place. Long may they continue...

Fantastic. Thanks for your efforts 🙏

There is a way with the definition through the limit. e^(ix)=lim (1+ix/n)^n=lim [sqrt(1+x^2/n^2)] ^n * [cos(atg(x/n))+i sin (atg(x/n))]^n=lim [sqrt(1+x^2/n^2)]^n * [cos(n atg(x/n))+i sin (n atg(x/n))] =1 [cos(x)+i sin(x)]

The Beatles of math formulas. Nicely done! 🙂

Brilliant as usual. Thanks Michael

I love the complex logarithm way. You can derive the formula from the harmonic oscillator equation. The eigenvalues are complex and when you diagonalize you end up with a rotation matrix. This proves Euler formula.

An awesome video - well done !

Amazing as usual. Thanks for this weekend mental refreshment.
@20:42 cos(φ) *First equation + sin(φ)* second equation

The derivations using calculus are probably circular. That is, the derivative of e raised to an imaginary power is undefined until and unless Euler’s formula is derived. For example, taking the derivative of both sides of Euler’s formula yields Euler’s formula. But that only works if you already know that the derivative of e^i*theta = i*e^i*theta. The power series for the sine, cosine and exponential function are really fundamental to proving the formula without any circularity. I think that’s how Euler discovered his famous formula.

Thank you 💖

Fantastic!!!...& very nice!..Thank you.

Your videos are always nice :)

I know of a 5th way!
It uses the close approximation of theta and sine (and by extension tangent) and the limit form of e^(r). Pretty lengthy but decent enough for a PreCalculus class

I love all patterns that bring together exponential and trig functions.

Try using rotation matrices: Look at R(theta) = R(theta/n)^n in the limit as n->inf. Show that in this limit you get the limit of (I+J*theta/n)^n =exp(J*theta). Where Z=xI+yJ is the matrix representation of the complex numbers. (I = diag(1,1) J = ((0,-1),(1,0))^T. R(theta)= ((c,-s),(s,c))^T c =cos(theta), s = sin(theta). [I'm using column of rows to represent square matrix, and column = row^T ... 'cause, YT comments don't allow LaTex input. ]

On of your best videos

I'm a math teacher here in France, and I love your videos! Very well explained, a pure pleasure! Thanks 💜

z = cos(x) + i sin(x) = cos(xN/N) + i sin(xN/N) = (cos(x/N) + 1 sin(x/N))^N by de Moivre's formula which is proved by indiction and intuitively clear from the fact that the angles of complex numbers add up when multiplied. Letting N -> infinity: cos(x)+i sin(x) = (1 + ix/N)^N = e^(ix).

You can also define sine and cosine to be imaginary and real parts of e^ix and then proof that those functions are indeed normal trygonometric ones

Here's a method I learned that is very similar to your METHOD 2: Let f_1(x) = e^{ix} and f_2(x) = \cos(x) + i\sin(x). Both of these functions satisfy the differential equation: F' = iF, and the initial condition F(0) = 1. Therefore, by the existence-uniqueness theorem of first-order, homogeneous, linear ordinary differential equations, the two functions must be identical.

I derived it in a similar way as the last one, but without making any initial assumptions about what the polar form should be.
Take some complex number 𝑧 = 𝑎 + 𝑖∙𝑏. From the interpretation that a complex number is a point in the complex plane, we can verify that 𝑧 can be equivalently defined as the point that is at a distance 𝑟 from the origin 𝑂 and which has a line segment connecting it to the origin forming an angle 𝜃 with the positive real axis measured in the counter-clockwise direction. 𝑟 and 𝜃 will be called the polar coordinates of 𝑧 and it follows that 𝑧 = 𝑟(cos 𝜃 + 𝑖∙sin 𝜃) from trigonometry. Similarly, we can take a second complex number 𝑤 = 𝑠(cos 𝜑 + 𝑖∙sin 𝜑), where 𝑠 and 𝜑 are the polar coordinates of 𝑤.
Then we can calculate the product 𝑧𝑤 = 𝑟𝑠[cos 𝜃 cos 𝜑 - sin 𝜃 sin 𝜑 + 𝑖∙(cos 𝜃 sin 𝜑 + sin 𝜃 cos 𝜑)] = 𝑟𝑠[cos (𝜃 + 𝜑) + 𝑖∙sin(𝜃 + 𝜑)], by using trigonometric identities, which has polar coordinates 𝑟𝑠 and 𝜃 + 𝜑. This fact motivates us to represent a complex number in polar form as 𝑧 = 𝑟∙𝑢^𝜃, where 𝑢 is some yet to be determined complex number, such that 𝑧𝑤 = 𝑟𝑠∙𝑢^(𝜃 + 𝜑).
To determine 𝑢, we can take the derivative of 𝑧 w.r.t. 𝜃 in both the rectangular and polar forms:
∂𝑧/∂𝜃 = 𝑟(-sin 𝜃 + 𝑖∙cos 𝜃) = 𝑟∙𝑖∙(cos 𝜃 + 𝑖∙sin 𝜃) = 𝑖∙𝑧;
∂𝑧/∂𝜃 = 𝑟∙ln 𝑢∙𝑢^𝜃 = ln 𝑢∙𝑧.
Therefore, ln 𝑢 = 𝑖 ⟺ 𝑢 = 𝑒^𝑖.
In conclusion, it was shown that a complex number 𝑎 + 𝑖∙𝑏 can be equivalently represented in polar form as 𝑟∙𝑒^(𝑖∙𝜃) and Euler's formula was automatically proven along the way.

IMHO, the second proof is the best...it's the most elegant and simple.

20:40 isn't this supposed to be cos φ instead of cos θ? Because I don't think we know at this point that φ=θ

From De Moivre’s Theorem (cosx + isinx)^n=cos(nx) +isin(nx), let t=nx, then (cos(t/n)+isin(t/n)^n = cos(t) + isin(t)
Now let n be big… approximate cos(t/n) by 1+(t/2n)^2 which goes to 1 as n gets big and sin(t/n) by t/n…
Then cos(t) + isin(t) = limit as n goes to infinity of (1+it/n)^n which is, of course e^(it).

A simple way of showing that Euler's equation is correct is to define a function y(x) = cosx+i*sinx. If you differentiate y, you end up with a differential equation dy/dx = i*y. If you separate variables and integrate, you get ln(y) = i*x+C1. If you exponentiate both sides, you get y(x) = C2*exp(i*x), where C2=exp(C1). If you evaluate both forms of y(x) at x = 0, you find C2=1, and Euler's equation is obtained.

I've always struggled to understand how this formula makes any sense but when you mentioned that exp(i*theta) is a complex number so it has to have a polar form... suddenly it was so obvious!

How do we know that i behaves like a real constant wrt complex derivatives and integrals. We all know it does, but isn't that an assumption that needs to be proved?

This one looks like the a perfect "Animation vs Math" video explanation 😀

For the second method, how are we sure that the rules of derivation with functions involving complex numbers are the same which hold in the real field?

Nice. I love all of the methods.
Method 2 is wonderful, but makes me laugh as it's clearly a strategy come up with in hindsight.

Foundation of these proof assume we have d(e^i theta)/ d theta = i e^i theta
But behavior of i in exponentiation is undefined here. Can you share why do we have that?

That Nintendo switch click ❤

Another way:
Let z=cosθ+isinθ
Then dz/dθ=-sinθ+icosθ=iz
So dz/dθ=iz
Obviously z=C×e^(iθ)
And by plugging 0 into the original function for z we get that C=1
Therefore cosθ+isinθ=e^(iθ)

Hi,
I've been thinking about this problem for quite a long time, but it seems to me that there is another way of doing that.
If the Euler's formula is true, then you have to proof that ix is the logarithm of cos x + i sin x. The whole problem is to define the complex logarithm without using Euler's formula.
Why not use the definition for a positive real, and extend it for a complex number? For a positive real number : ln x = int_1^x {dt/t) . Let's say that, for a complex number :
ln z = int_1^z {dw/w) , where w is the dummy complex integration variable.
As the function 1/z as only a pole in z=0, the result of the integration will not depend upon the path used, as long as you don't cross the "cut direction" y=0 and x0, and I found the expected result: ln (|z|) + i arctan (y/x) . Once again : without using the Euler formula, only by integration of 1/z .
And for x

Consider z = cos θ + i sin θ, so that
dz/dθ = -sin θ + i cos θ
dz/dθ = i(i sin + cos θ)
dz/dθ = zi
dz/z = i dθ
By integrating both side we get
ln z = θi + C
z = e^(θi + C)
z = Ce^(θi)
cos θ + i sin θ = Ce^(θi)
Substitue θ = 0 to get rid of the C
cos 0 + i sin 0 = C
1 = C
Therefore
cos θ + i sin θ = e^(θi)

I like to do it by showing the following:
Let f(x) = exp(i*x)
Let g(x) = cos(x) + i sin(x)
Proceed to show that f'''' = f, f''''' = f', f'''''' = f'', f''''''' = f''.
Show that the same holds for g.
Then show that f(0) = g(0), f'(0) = g'(0), f''(0) = g''(0), and f'''(0) = g'''(0).
Then observe that this means that f(x) and g(x) are not only equal at x=0, but all of their infinite derivatives are also equal. Thus f and g must be equal everywhere.

My proof is pretty short.
Define a function f(t)=cos(t)+i*sin(t). Take the derivative of this function by taking the derivative of real and imaginary part separately:: f'(t)=-sin(t)+i*cos(t)
By definition i*i=-1, thus f'(t)=i*(i*sin(t)+cos(t))=i*f(t).
But this a linear differential equation, and these can only have solutions consisting of sums of exponential functions, so in this case f(t) must be of the form f(t)=C*exp(k*t), where C and k are constants. Plugging this into the differentiial equation you'll find that k=i, and because of the border condition f(0) = cos(0)+i*sin(0) = 1, therefore C=1. QED.
In case you're not convinced you can explicitly solve the differential equation by separating the variables and integrating both sides: df/dt=i*f => ∫df/f = ∫i*dt => ln(f) = i*t+c => f(t)=exp(i*t+c)
Because f(0)=1, c=0.

In the next video, please try to prove de Moivre's formula.

I like how only the first proof is correct and complete. The rest three are either incomplete or incorrect (perhaps both)

Is there a part in the video where z^w is defined, for complex numbers z, w?

I'm curious, for problem 3, where di the fraction 2i/(x^2+1) come from? Does that fraction come from somewhere?

The way my teacher did was to use maclaurin series for sin, cos and e^(ix) to show how the series for e^(ix) has the series for sin and cos inside of it

25:31

Cool video but how did u define e to the complex power? In my degree I learn this formula as a definition of it wich is a simple way but also a boring one.

I would have shown that both exp(iθ) and cos(θ) + i sin(θ) are solutions of the differential problem y' = iy , y(0) = 1.

@22:00 we assume a and cos(phi) are non-zero by dividing by them. Why are we allowed to do that?

With all these ways of proving Euler's formula, one must make sure you don't assume Euler's Formula and get a circular proof. None of these solutions seem to implicitly use Euler's Formula, from what I can see.

16:35 wait, bro you cannot assume that.

The simplest and most obvious way to demonstrate that e^ix = cos x + Isin x is to just take the derivative of the polar form of a complex number. For example:
a+bi = rcos x + irsin x
D(a+bi) = -rsin x + ircos x
D(a+bi) = (i^2)rsin x + ircos x
D(a+bi) = i( rcos x + irsin x)
D(a+bi) = i(itself)
So the derivative of a complex number is itself times a constant (in this case is the imaginary unit). The only function that does this is e^ix, as D(e^ix) = i(itself)

I always feel strange about the proofs of this formula. The formula is more like a notation to me, through which we could define powers with complex number exponents.

Are there any ways to do this where one only needs precalculus skills? Anyone?!

15:50 how can we have C=-1 when at 10:15 C was defined as e^c?

0:29 aren’t the Taylor expansions only made for real numbers ? I believe it’s not right to plug in iθ here

My calc book (Thomas/Finney 7th ed) says the following after deriving Euler's formula using the Taylor Series expansions, "It would not be accurate to say that the calculations just completed have proved [Euler's formula]. Rather, we shall adopt the point of view that [Euler's formula] is the definition of e^i*theta." Can anyone comment on what is meant by that?

if you assume polar coordinates are known, you can literally just convert exp(iθ) into cartesian coordinates graphically.

isn't the last one circular reasoning?

in the last method, you didn't need to consider the case of a=-1 because it stands for the value of r - the magnitude in polar coords, defined to be positive.

In the last proof Mike states that Φ is a function of θ. He then differentiates with respect to θ, but how can he know the this function: Φ(θ) is necessarily differentiable❔

Using complex logarithm ! (*Screams in Terror*)
f(x)=log(cos(x)+isin(x))
f'(x)=(-sin(x)+icos(x))/(cos(x)+isin(x))
f'(x)=i (cos(x)+isin(x))/(cos(x)+isin(x))
f'(x)=i => f(x)=ix+ C
f(0)=log(1)=0 =>C=0
So ix=log(cos(x)+isin(x))
So e^(ix)=cos(x)+isin(x)

John McEnroe, mathematician

what is a log of a complex number??

I think method two should be problematic to many people because it involves using trigonometric idientities whose demonstrations are usually only taught by using Euler's formula. Therefore, circular logic.

I once had a professor suggest there were alternative ways to derive Euler's Formula there, but that gave different, logically consistent meanings to e^itheta. Is there an alternative definition? I haven't encountered one. Having 4 methods to prove the usual relationship seems to settle it, there are no alternatives.

cool

The second ‘derivation’ is just a check. You overlook that f(theta)=1. Now take the derivative of that, too, and you’re not having to integrate and find C. You’ve made things harder than they need to be, I would say in order to make things more involved, then claim a derivation. The clear and obvious difference between the first two is that you start with the very thing you want to derive, in the second. That’s not the case with the Taylor series; there, I don’t see the result until the end!
Honestly, you’re a Ph.D. and all you do is confuse people, make math harder than it really is? On the other hand, that would certify you as having a Ph.D. in math. Crazy smart? More like practically devious for having outsized respect for your achievement.

dang bro, you got some nice veiny arms

Um - How did Euler do it?

The nintendo switch sound was kinda jarring

Zero rizz

You had to replace teta by x to know that it's variable.

With the third method i believe there is circular reasoning. When both sides are exponentiated you are using the fact that the exponential is the inverse of the logarithm. Since the logarithm is complex the associated exponetial must be though as the complex one, therefore including euler´s formula as a special case and hence the circular reasoning.

Which mathematical formula or theorem has the MOST known valid proofs? I guess we'd have to agree on what constitutes an 'atomic' sub proof and where we'd be getting into 'reductio ad absurdam '

Sorry… that is 1+(1/2)(t/n)^2

Last

The log identities shouldn't be applied just like that because these are complex numbers.

Surely all but the first method are circular reasoning as the power series expansion is the definition of sine and cosine.

Just because you can derive something from something doesn’t make it mentionable! I see math geeks do this all the time. Ask yourself, Why would anyone think to start there? The only derivation you do that begins in a rational sense is the power series. The others merely show that, having made yourself lost in a forest, you can find your way out. But getting lost on purpose is dumb is the point.
Honestly, most of this video amounts to grandstanding, not teaching. You are far from alone in this, however.

If your name is Hilary Priestly, then you simply DEFINE it to be the case...

But you aren’t deriving the formula so much as you are defining equivalences.

Euler formula is the epitome of ridiculeness. Imaginary numbers are fake invented math. The very fact that you apply series that are valid for countable real numbers to non countable imaginary numbers says it all, but I guess you don't grasp that.

@20:56, why do those two terms cancel?

A lot of these are just so obscure or lengthy, it is like you are deliberately trying to find it, and that would be because you know the identity in the first place, for the differential equation, it is a proof sure, but deriving? Let us assume nobody knew the identity in the first place, who the hell would write that exact equation to derive it, how would they know to write that?
Power series or Taylor series is like the standard proof but make stuff more complex, we need to define extra stuff like their representation in infinite series which is also abstract since you can't actually solve it because it involves infinity and such. Whose idea was it to make this the "official" proof?
The simplest proof is the best, the polar form is great, you just know it must be something a+ib which is rsinθ+ircosθ because vector.
A simpler and more straightforward method is to just use Laplace Transform, it doesn't use the identity, no circular reasoning. Straight up just evaluate L{e^iθ} and you get the answer.
Some people are very weird and asks why can you evaluate e^iθ or complex exponential or blablah without defining the identity, like bruh this isn't even using the identity, this is simply using the definition of i=√-1 or that i is another axis, essentially a vector. An operator and a number must result in another number, √-1 must be a NUMBER which is CONSTANT even if we don't know, i must be a constant and can be manipulated as such. With vector definition, we can also manipulate it just as we would with vector, there is literally nothing here that says we cant manipulate or evaluate it like normal, we can integrate e^iθ all the same. It's not even about e^iθ, these people probably don't even understand i in the first place......