If I have a number and a power of this number. How to get the number that raised to the known power will give the known number?
$x^3 = 90$
How to get $x$?
If I have a number and a power of this number. How to get the number that raised to the known power will give the known number?
$x^3 = 90$
How to get $x$?
$x^{3(\frac13)}=x=90^\frac13$ or $\sqrt[3]x=x=\sqrt[3]90$
If you also wish to find the complex roots to this problem, rearrange the equation so that $x^3-90=0$.
$x=90^\frac13$, hence you know that $f(90^\frac13)=0$, so $(x-90^\frac13)$ is a factor.
Divide $x^3-90=0$ by $(x-90^\frac13)$, using long or synthetic division.
Find the complex roots of this quadratic you have just obtained, $x^2+\frac{2169}{484}x+\frac{4840}{241}=0$, using the quadratic formula.
First: there may be two such numbers. Think of $x^2=1$. Second: actually, you are simply defining, if it exists, the inverse function of a power function. Rigorously you'd need some work with real numbers and the axiom of continuity.
Use your knowledge of manipulations of exponents. Recall: $x^{a+b} = x^a \centerdot x^b$ and $(x^a)^b=x^{a \centerdot b}$ for real numbers $x,a,b$. Thus, we can obtain $x$ from $x^3$ by simply raising the latter to the 1/3-power. However, as every elementary algebra student is drilled with, what we do to one side, we must do to the other, so $(x^3)^{1/3}=x^{3 \centerdot 1/3}=x=90^{1/3}$. This is equivalently the cube root of 90.