Taking Square Root

QUADRATIC EQUATIONS Algebra Taking Square Root A pure quadratic equation can be solved by taking the square root of both sides of the equation. Before taking the square root, the equation must be arranged with the x² term isolated on the left- hand side of the equation and its coefficient reduced to 1. There are four steps in solving pure quadratic equations by taking the square root. Step 1. Using the addition and subtraction axioms, isolate the x² term on the left-hand side of the equation. Step 2. Using the multiplication and division axioms, eliminate the coefficient from the x² term. Step 3. Take the square root of both sides of the equation. Step 4. Check the roots. In taking the square root of both sides of the equation, there are two values that satisfy the equation. For example, the square roots of x² are +x and -x since (+x)(+x) = x² and (-x)(-x) = x². The square roots of 25 are +5 and -5 since (+5)(+5) = 25 and (-5)(-5) = 25. The two square roots are sometimes indicated by the symbol ±. Thus, . Because of this 25 ±5 property of square roots, the two roots of a pure quadratic equation are the same except for their sign. At this point, it should be mentioned that in some cases the result of solving pure quadratic equations is the square root of a negative number. Square roots of negative numbers are called imaginary numbers and will be discussed later in this section. Example: Solve the following quadratic equation by taking the square roots of both sides. 3x² = 100 - x² Solution: Step 1. Using the addition axiom, add x² to both sides of the equation. 3x² + x² = 100 - x² + x² 4x² = 100 MA-02 Page 18 Rev. 0