The usual algebraic function for solving cubic equations involves inverting the cubic power function $P_3(x) = x^3$. This can be defined as the function which can be developed in power series around t=1 as $P_\frac{1}{3}(t) = 1 + \frac{1}{3}(t-1) - \frac{1}{9}(t-1)^2 + \cdots$, and which can be analytically continued, with a branch cut from 0 to $-\infty$. The roots of the polynomial $x^3-t$ are then $x = P_{\frac{1}{3}}(t)$, ωx and ω^2x, where ω is a primitive cube root of unity.

However, we can use instead the Chebyshev polynomial (here normalized to -2 to 2) $C_3(x) = x^3-3x$, which can be inverted as an algebraic function developed in power series around t=2 as $C(t)_\frac{1}{3} = 2 + \frac{1}{9}(t-2) - \frac{2}{243}(t-2)^2 + \cdots$, and which can be analytically continued, with a branch cut from -2 to $-\infty$. The roots of the polynomial x^3-3x-t are then $C\frac{1}{3}(t)$, $-C\frac{1}{3}(-t)$, and $C\frac{1}{3}(-t)-C\frac{1}{3}(t)$.

If we want to solve x^3+ax+b, then if a=0 we take ordinary cube roots. Otherwise, we apply the above three functions to $-(-\frac{3}{a})^\frac{3}{2}b$ and divide by $\sqrt{-\frac{3}{a}}$. That is, one of the roots will be $C\frac{1}{3}(-(-\frac{3}{a})^\frac{3}{2}b)/\sqrt{-\frac{3}{a}}$, another will be $-C\frac{1}{3}((-\frac{3}{a})^\frac{3}{2}b)/\sqrt{-\frac{3}{a}}$, and the third will be minus the sum of these two.

Just as $P\frac{1}{3}(t)$ can be computed via transcendental functions as $\exp(\log(t)/3)$, $C\frac{1}{3}(t)$ can be computed by 2cosh(arccosh(t/2)/3) or 2cos(arccos(t/2)/3). This no more makes the Chebychev cube root solution a solution in transcendental functions than logarithms make the ordinary cube root solution a solution in transcendental functions. Moreover, in most cases solving a solvable polynomial in Chebyshev radicals leads to a neater solution than solving it in ordinary radicals.