An **algebraic solution** or **solution in radicals** is a closed-form expression, and more specifically a closed-form algebraic expression, that is the solution of an algebraic equation in terms of the coefficients, relying only on addition, subtraction, multiplication, division, raising to integer powers, and the extraction of nth roots (square roots, cube roots, and other integer roots).

The most well-known example is the solution

introduced in secondary school, of the quadratic equation

(where *a* ≠ 0).

There exist more complicated algebraic solutions for the general cubic equation^{[1]} and quartic equation.^{[2]} The Abel–Ruffini theorem^{[3]}^{:211} states that the general quintic equation lacks an algebraic solution, and this directly implies that the general polynomial equation of degree *n*, for *n* ≥ 5, cannot be solved algebraically. However, for *n* ≥ 5, some polynomial equations have algebraic solutions; for example, the equation can be solved as See Quintic function § Other solvable quintics for various other examples in degree 5.

Évariste Galois introduced a criterion allowing one to decide which equations are solvable in radicals. See Radical extension for the precise formulation of his result.

Algebraic solutions form a subset of closed-form expressions, because the latter permit transcendental functions (non-algebraic functions) such as the exponential function, the logarithmic function, and the trigonometric functions and their inverses.

## See also

## References

**^**Nickalls, R. W. D., "A new approach to solving the cubic: Cardano's solution revealed,"*Mathematical Gazette*77, November 1993, 354-359.**^**Carpenter, William, "On the solution of the real quartic,"*Mathematics Magazine*39, 1966, 28-30.**^**Jacobson, Nathan (2009), Basic Algebra 1 (2nd ed.), Dover, ISBN 978-0-486-47189-1

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