Factoring Quadratic Equations

Algebra QUADRATIC EQUATIONS Factoring Quadratic Equations Certain complete quadratic equations can be solved by factoring. If the left-hand side of the general form of a quadratic equation can be factored, the only way for the factored equation to be true is for one or both of the factors to be zero. For example, the left-hand side of the quadratic equation x² + x - 6 = 0 can be factored into (x + 3)(x - 2). The only way for the equation (x + 3) (x - 2) = 0 to be true is for either (x + 3) or (x - 2) to be zero. Thus, the roots of quadratic equations which can be factored can be found by setting each of the factors equal to zero and solving the resulting linear equations. Thus, the roots of (x + 3)(x - 2) = 0 are found by setting x + 3 and x - 2 equal to zero. The roots are x = -3 and x = 2. Factoring estimates can be made on the basis that it is the reverse of multiplication. For example, if we have two expressions (dx + c) and (cx + g) and multiply them, we obtain (using the distribution laws) (dx + c) (fx + g) = (dx) (fx) + (dx) (g) + (c) (fx) + cg = = dfx² + (dg + cf)x + cg. Thus, a statement (dx + c) (fx + g) = 0 can be written df x² + (dg + cf)x + cg = 0. Now, if one is given an equation ax² + bx + c = 0, he knows that the symbol a is the product of two numbers (df) and c is also the product of two numbers. For the example 3x² - 4x - 4 = 0, it is a reasonable guess that the numbers multiplying x² in the two factors are 3 and 1, although they might be 1.5 and 2. The last -4 (c in the general equation) is the product of two numbers (eg), perhaps -2 and 2 or -1 and 4. These combinations are tried to see which gives the proper value of b (dg + ef), from above. There are four steps used in solving quadratic equations by factoring. Step 1. Using the addition and subtraction axioms, arrange the equation in the general quadratic form ax² + bx + c = 0. Step 2. Factor the left-hand side of the equation. Step 3. Set each factor equal to zero and solve the resulting linear equations. Step 4. Check the roots. Rev. 0 Page 21 MA-02