α and β roots arise from (x-α) and (x-β) of x²+bx+c=0. Show that roots have sum -b and product c.

Question

If α and β are the roots of the quadratic equation x² + bx + c=0 then these arise from factors (x - α) and (x - β) of x² + bx + c. Show that the equation x² + bx + c = 0 has roots which have sum -b and product c.

Answer 1

this is the quadratik equashun

roots=[-b +- sqrt(b*b -41c]/2a