A proof by elementary methods, without complex quantities, that every algebraic function (with real coefficiences) has factors of the form \((x^2-px+q)(p, q \quad \text{real})\), and hence, every algebraic equation with coefficients, real or imaginary, ha

Publication date: 1915

This page was built for publication: A proof by elementary methods, without complex quantities, that every algebraic function (with real coefficiences) has factors of the form \((x^2-px+q)(p, q \quad \text{real})\), and hence, every algebraic equation with coefficients, real or imaginary, ha