CHAPTER 7. SOLVINGQUADRATIC EQUATIONS 7.3
(x + 1)(x− 11) = 0
∴ x =−1 or x = 11Example 5: Solving Quadratic Equations by Completing the Square
QUESTIONSolve by completing thesquare:
2 x^2 − 8 x− 16 = 0SOLUTIONStep 1 : Write the equation in the form ax^2 + bx + c = 02 x^2 − 8 x− 16 = 0Step 2 : Take the constant overto the right hand side of the equation2 x^2 − 8 x = 16Step 3 : Check that the coefficient of the x^2 term is 1.
The coefficient of the x^2 term is 2. Therefore, divide bothsides by 2 :x^2 − 4 x = 8Step 4 : Take half the coefficient of the x term, square it and addit to both sides
The coefficient of the x term is− 4 ;(− 2 4)=− 2 and (−2)^2 = 4. Therefore:x^2 − 4 x + 4 = 8 + 4Step 5 : Write the left hand side as a perfect square(x− 2)^2 − 12 = 0Step 6 : Factorise equation as difference of squares[(x− 2) +√
12][(x− 2)−√
12] = 0
Step 7 : Solve for the unknownvalue[x− 2 +√
12][x− 2 −√
12] = 0
∴ x = 2−√
12 or x = 2 +√
12
Step 8 : The last three steps canalso be done in a different way