lglglgx=1 equation

The teacher will be very surprised to see your correct solution 😉

You have entered [src]

log(log(log(x))) = 1

$$\log{\left(\log{\left(\log{\left(x \right)} \right)} \right)} = 1$$

Simplify

The graph

Plot the graph f1(x)

Plot the graph f2(x)

Rapid solution [src]

      / E\
      \e /
x1 = e

$$x_{1} = e^{e^{e}}$$

x1 = exp(exp(E))

Sum and product of roots [src]

sum

 / E\
 \e /
e

$$e^{e^{e}}$$

 / E\
 \e /
e

$$e^{e^{e}}$$

product

 / E\
 \e /
e

$$e^{e^{e}}$$

 / E\
 \e /
e

$$e^{e^{e}}$$

exp(exp(E))

Numerical answer [src]

x1 = 3814279.10476022

x2 = 3814279.10476022 - 4.82299056285794e-19*i

x2 = 3814279.10476022 - 4.82299056285794e-19*i