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Lesson 3.9 Solving quadratics using Square roots Learning Objectives: SWBAT 1. Simplify Square Root (radical) expressions by using perfect square factors and by rationalizing the denominator 2. Solve quadratic equations using the properties of square roots Making a connection: • Because quadratics are always "squared" we must remember some things about "square roots" when it comes to solving: • The above a fancy way of saying that all numbers have two square roots: A positive and a negative > Example: √4 = 2 and -2 (also can be written as ±2) Simplifying Square roots • When solving quadratics using square roots, we also need to remember how how to simplify square roots using radical form (from Algebra 1 or Geometry). NO DECIMALS > Radical form is more accurate/exact than decimals > A square root is in its simplest radical form if the number under the square root sign does not have any perfect squares as factors > Therefore the first step in simplifying radical numbers is to factor the number under the square root sign using a perfect square Example: Simplify √8 – Use a perfect square to factor the number under the radical sign – Any perfect square under the square root sign equals its square root (radical sign goes away) Simplifying Radicals Practice Lesson 3.9 Solving quadratics using Square roots Rationalizing the denominator • Many of the solutions that we will be dealing with in the remainder of this unit will be fractions (sorry). • When dealing with fractions and square roots in the same expression, the expression is not simplified if there is a radical number in the denominator. • If we ever see an expression that has a radical number in the denominator, we get rid of it through a process called "Rationalizing the Denominator" Example: Multiply by "fancy form of the number "1" Rationalizing the denominator practice Radical sign goes away Lesson 3.9 Solving quadratics using Square roots When do you solve quadratic equations using square roots? • When b = 0 (in other words, there is no x1 term) What is the process for solving quadratics using square roots? 1. Isolate the x2 term 2. Take the square root of both sides of the equation 3. Simplify you answer (as we practiced on the previous two pages) How do you know you are finished with the process? • The answer is in simplest radical form • There are no radicals in the denominator • Remember, your answer will have a positive and negative square root (±) Example 1: Solve 4x2 + 13 = 253 • Objective: Isolate the x2 term and take the square root of both sides > Subtract 13 from both sides: 4x2 = 240 > Divide both sides by 4: x2 = 60 (the x2 term is now isolated) > Take square rood of both sides: x = ±√60 > Simplify: x = ±2√15 Example 2: Solve 3x2 + 10 = 20 • Objective: Isolate the x2 term and take the square root of both sides > Subtract 10 from both sides: 3x2 = 10 > Divide both sides by 3: x2 = 10/3 > Take square rood of both sides: x = ±√10/√3 > Simplify by rationalizing denominator: x = ±√30/3 Your Turn #1: Solve the following quadratic equations by using square roots. remember to simplify you answer Your Turn #2: Solve (hint, make "a" positive) Lesson 3.9 Solving quadratics using Square roots Practice: Solve the following quadratic equations, leave your answer in simplest radical form Lesson 3.9 Solving quadratics using Square roots Practice: Solve the following quadratic equations, leave your answer in simplest radical form
