let x, a, b, c be Real; :: thesis: ( a > 0 & ((((2 * a) * x) + b) ^2) - (delta (a,b,c)) > 0 implies ((a * (x ^2)) + (b * x)) + c > 0 )
assume that
A1: a > 0 and
A2: ((((2 * a) * x) + b) ^2) - (delta (a,b,c)) > 0 ; :: thesis: ((a * (x ^2)) + (b * x)) + c > 0
4 * a <> 0 by A1;
then A3: ((((2 * a) * x) + b) ^2) - ((4 * a) * ((delta (a,b,c)) / (4 * a))) > 0 by A2, XCMPLX_1:87;
2 * a <> 0 by A1;
then ((((2 * a) * x) + ((2 * a) * (b / (2 * a)))) ^2) - ((4 * a) * ((delta (a,b,c)) / (4 * a))) > 0 by A3, XCMPLX_1:87;
then A4: (4 * a) * ((a * ((x + (b / (2 * a))) ^2)) - ((delta (a,b,c)) / (4 * a))) > 0 ;
4 * a > 0 by A1, XREAL_1:129;
then (a * ((x + (b / (2 * a))) ^2)) - ((delta (a,b,c)) / (4 * a)) > 0 / (4 * a) by A4, XREAL_1:83;
hence ((a * (x ^2)) + (b * x)) + c > 0 by A1, Th1; :: thesis: verum