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5.3 Solving Quadratic Equations by Finding Square Roots Goals p Solve quadratic equations. p Use quadratic equations to solve real-life problems. Your Notes VOCABULARY Square root A number r is a square root of a number s if r 2 ! s. Radical sign The symbol root !3", which denotes a square Radicand The number or expression beneath a radical sign Radical An expression of the form number or expression !s" where s is a Rationalizing the denominator The process of eliminating a radical in the denominator of a fraction by multiplying both the numerator and the denominator by an appropriate radical PROPERTIES OF SQUARE ROOTS (a > 0, b > 0) Product Property: !ab "! Quotient Property: #"$ab" ! !a" p !b " !a" !b " Lesson 5.3 • Algebra 2 Notetaking Guide 101 Your Notes Using Properties of Square Roots Example 1 Simplify the expression. !9" p !3" ! 3!3" a. !27 "! b. !5 " p !15 "! c. 5 "! #"$ 36 d. #$ 13 "" ! 3 !75 " ! !25 " p !3" ! 5!3" !5" !36 " !" 13 !" 5 ! "" 6 p !3" !3" !3" !39 " ! "" 3 Checkpoint Simplify the expression. 1. !5 " p !8 " 2. !" 15 "" 5 2!" 10 Example 2 #$"35" Solving a Quadratic Equation 1 Solve ""(x # 2)2 ! 8. 2 Solution 1 ""(x # 2)2 ! 8 2 (x #2)2 ! 16 x # 2 ! $!" 16 x ! 2$4 Write original equation. Multiply each side by 2 . Take square roots of each side. Add 2 to each side. The solutions are #2 and 6 . Check Check the solutions either by substituting them into 1 the original equation or by graphing y ! ""(x # 2)2 # 8 2 and observing the x-intercepts. 102 Algebra 2 Notetaking Guide • Chapter 5 Your Notes Example 3 Modeling a Falling Object’s Height An acorn falls out of a tree from a height of 40 feet. How many seconds does the acorn take to reach the ground? Solution The initial height is h0 ! 40 feet, so the height as a function of time is h ! #16t2 % 40. Find the value of t for which h ! 0 to determine how long it takes the acorn to reach the ground. Method 1: Make a table of values. t 0 The table shows that h ! 0 has a h 40 value of t between t ! 1 and t ! 2 . It takes between 1 second and 2 seconds for the acorn to reach the ground. 1 2 24 #24 Method 2: Solve a quadratic equation. h ! #16t2 % 40 0 ! #16t2 % 40 #40 ! #16t2 2.5 ! t2 !2.5 "!t 1.6 ≈ t Write height function. Substitute 0 for h. Subtract 40 from each side. Divide each side by #16 . Take positive square root. Use a calculator. The acorn takes about 1.6 seconds to reach the ground. Checkpoint Complete the following exercises. 3. Solve 5x2 # 30 ! 70. " $2!5 Homework 1 4. Solve ""(x % 7)2 ! 8. 3 #7 $ 2!6 " 5. You drop a football from a window 20 feet above the ground. For how much time is the football falling if your friend catches it at a height of 4 feet? 1 second Lesson 5.3 • Algebra 2 Notetaking Guide 103
