Answer to Question #183512 in Abstract Algebra for Anand

This will be a field if the polynomial is irreducible. Let's use the Vieta formula: the equation will have one real root. Calculate one of the coefficients:

"Q=\\frac{a^2-3b}{9}=\\frac{46}{9}"

In the real root formula of the Vieta formula, there is a multiplication by "\\sqrt{Q}" .

And since this number is irrational, then the root will also be irrational, so that the polynomial is irreducible hence it's a field.