So it's well-known that "i^i" is surprisingly a real number.
This got me wondering, what is "i to the ith root" (I'm not sure if I worded that correctly, pic related). Can anyone help me with this?
So it's well-known that "i^i" is surprisingly a real number.
This got me wondering, what is "i to the ith root" (I'm not sure if I worded that correctly, pic related). Can anyone help me with this?
insert 1/i into the following and solve
[math] \displaystyle
e^{ix} = cos(x) + i \cdot sin(x) \\
e^{i \frac{ \pi}{2}} = cos \left ( \frac{ \pi}{2} \right )
+ i \cdot sin \left ( \frac{ \pi}{2} \right ) = 0 + i \cdot 1 = i \\
i^i= ({e^{i \frac{ \pi}{2}}})^i = e^{i^2 \frac{ \pi}{2}} = e^{- \frac{ \pi}{2}}
= \frac{1}{e^{ \frac{\pi}{2}}} = \frac{1}{(e^ \pi)^ { \frac{1}{2}}}
= \frac{1}{ \sqrt{e^ \pi }} \approx 0.20788 \\
i^i = e^{ln(i^i)} = e^{i \cdot ln(i)} = e^{i \cdot ln(e^{i \frac{ \pi}{2}})}
= e^{i^2 \cdot \frac{ \pi}{2} \cdot ln(e)} = e^{- \frac{ \pi}{2}} \approx 0.20788
[/math]
[eqn]\sqrt[i]{i} = i^{\frac{1}{i}} = i^{-i} = \frac{1}{i^i}[/eqn]
You have a brain, use it.
What the fuck? this is nonsense. Why not just do the thing below?
Oh.
Yeah, that makes sense.
Thanks!
what's the fun in that
LOL OP BTFO
YOU ARE TARDED OP
GTFO OF THIS BOARD
YOU BRAINLET
one derives it from something known one derives it from the identity
don't really know what your issue is here
[eqn] \sqrt [i] { i } = i^{ \frac { 1 } { i } } = \ln \left( i^{ \frac { 1 } { i } }\right) = \frac { 1 } { i } \frac { i \pi } { 2 } = \frac { \pi } { 2 } [/eqn]
it's ugly
uh excuse me the complex log is not a function. please specify if you're using the principal branch :)
TIL pi/2 is about 4.81
easy there Cadet Capslock
Wait am I missing something? Why does 1/i = -i
1/i * i/i = i/-1 = -i
Well I'll be darned, ya learn something new every day
KILL YOURSELF NIGGER
crazy
>it's ugly
>crazy
why the ableism?
[math]
\begin{align*}
i^2&=-1 \\
-i^2&=1 \\
-i \cdot i&=1 \\
-i&= \dfrac{1}{i}
\end{align*}
[/math]
Well, the nth root of some number k can be expressed as k^(1/n). So the ith root of i is the same as i^(1/i). 1/i becomes -i if you multiply it by i/i, so therefore, i^1/i = i^-i. We're almost there now. Per Euler's Identity, i=e^(pi/2*i). -i = e^(3*pi/2), so i^-i = e^((pi/2*i)*3*pi/2*i) = e^(-3*pi^2/4), which is about .0006099.
the correct answer is about 4.81
try again
the correct answer is [math] \sqrt{e^ \pi} \approx 4.81[/math]
try again
If you want to bluff about expressing simple stuff in complex words then sociology is probably a better fit major for you. We as mathematicians must strive for simplicity.
there is nothing simplistic about mathematics.
This is sort of backwards thinking. For a number a, the number 1/a is defined as a number b such that a*b=1. now i*(-i)=-i^2=1, you do the same process but in reverse for some reason.
i = e^(i pi/2)
i^(-i) = e^(-i^2 pi/2) = e^(pi / 2)
you were on the right track
>in reverse
It's an equation, not a sentence in English.
You're manipulating both sides of a scale,
not reciting a poem of Shakespeare.
No, you're verifying a statement "-i is the multiplicative inverse of i" and rather than solving an equation you can just show that it satisfies the criteria for being that. Your approach is exploratory however and shows how one would come up with the identity in the first place which could be useful for OP.
fuck off to
I'm just helping you get better at math, throwing everything in an equation blender is not the best solution every time.
rude
oof