SOLUTION: Step by step Original- ax^2 + bx + c =0 1. subtract c from each side 2. Divide each side by a 3. Add he square of half the coefficient of x to each side 4.write the left s

Algebra ->  Algebra  -> Quadratic Equations and Parabolas  -> Quadratic Equations Lessons  -> Quadratic Equation Lesson -> SOLUTION: Step by step Original- ax^2 + bx + c =0 1. subtract c from each side 2. Divide each side by a 3. Add he square of half the coefficient of x to each side 4.write the left s      Log On

 Ad: You enter your algebra equation or inequality - Algebrator solves it step-by-step while providing clear explanations. Free on-line demo . Ad: Algebrator™ solves your algebra problems and provides step-by-step explanations! Ad: Algebra Solved!™: algebra software solves algebra homework problems with step-by-step help!

 Click here to see ALL problems on Quadratic Equations Question 36454: Step by step Original- ax^2 + bx + c =0 1. subtract c from each side 2. Divide each side by a 3. Add he square of half the coefficient of x to each side 4.write the left side as a perfect square 5.use a common denominator to express the right side as a single fraction 6. find the square root of eac side 7. solve for x by subtracting the same term form each side 8. use a common denominator to express the right side as a single fraction once all the steps are done you should end up with the quadratice formula but i cant get past step three and i need each step. PLEASE HELpAnswer by atif.muhammad(135)   (Show Source): You can put this solution on YOUR website!```Original- ax^2 + bx + c =0 1. subtract c from each side ax^2 + bx = -c 2. Divide each side by a x^2 + (b/a)x = -c/a 3. Add he square of half the coefficient of x to each side x^2 + (b/a)x + (b/2a)^2 = -c/a + (b/2a)^2 x^2 + (b/a)x + (b^2/4a^2) = -c/a + (b^2/4a^2) 4.write the left side as a perfect square (x+ b/2a)^2 = -c/a + (b^2/4a^2) 5.use a common denominator to express the right side as a single fraction (x+ b/2a)^2 = (-4ac + b^2)/(4a^2) 6. find the square root of eac side (x+ b/2a)^2 = (b^2 - 4ac)/(4a^2) (x+ b/2a) = 7. solve for x by subtracting the same term form each side (x+ b/2a) = x = 8. use a common denominator to express the right side as a single fraction x = ```