Radical Equations Two - Intermediate Algebra - Lecture Slides, Slides of Algebra

Some concept of Intermediate Algebra are Factoring Strategies, Factoring Strategies, Factoring Strategies, Introduction, Inverse_Fcns, Lines_By_Slp-Inter, Log_Change_Base, Multiply Polynomials, Multiply Polynomials. Main points of this lecture are: Radical_Equations Two, Rational Exponents, Variable, Least, Radicand, Power Rule, Radical Eqns, Solutions, Original Equation, New Equation

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2012/2013

Uploaded on 04/30/2013

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§7.6 Radical
Equations
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§7.6 Radical

Equations

Review §

 Any QUESTIONS About

  • §7.5 → Rational Exponents

 Any QUESTIONS About HomeWork

  • §7.5 → HW-

MTH 55

Power Rule vs Radical Eqns

  • Power Rule for Solving Radical Equations:

If BOTH SIDES of an equation are RAISED

TO THE SAME POWER, ALL solutions of

the original equation are ALSO solutions

of the NEW equation

Caveat PowerRule → Check

  • CAUTION
  • Read the power rule carefully; it does not

say that all solutions of the new equation

are solutions of the original equation. They

may or may not be…

  • Solutions that do not satisfy the original

equation are called extraneous solutions;

they must be discarded.

 Thus the CHECK is CRITICAL

Example  Solve by PwrRule

  • Solve Radical Equations: a) b) y = 12 3 x = − 4

 SOLUTION

a) b) ( ) 2 2 y = 12 y = 144 144 = 12 12 = 12 Check True ( ) (^ ) 3 3 3 x = − 4 x = − 64 Check 3 − 64 = − 4 − 4 = − 4 True

Example  Solve

 SOLUTION

4 x = x + 60 4 x = x + 60 ( ) ( ) 2 2 4 x = x + 60 ( ) 2 2 4 x = x + 60 16 x = x + 60 15 x = 60 x = 4

 Check

4 x = x + 60 4 4 = 4 + 60 4 2⋅ = 64 8 = 8

 4 Satisfies the

original Eqn,

so 4 is verified

as a Solution

Example  Solve

 SOLUTION

x − 5 = x + 7 x − 5 = x + 7 ( ) (^) ( ) 2 2 x − 5 = x + 7 2 x − 10 x + 25 = x + 7 2 x − 11 x + 25 = 7 2 x − 11 x + 18 = 0 ( x − 2)( x − 9) = 0 x − 2 = 0 or x − 9 = 0 x = 2 x = 9 Square both sides. Use FOIL or Formula. Subtract x from both sides. Factor. Use the zero-products theorem. Subtract 7 from both sides. The TENTATIVE Solutions

Example  Solve

x − 5 = x + 7

 Check BOTH Tentative Solutions

x = 2 2 − 5 = 2 + 7 − 3 = 9 − 3 ≠ 3 False. x = 9 9 − 5 = 9 + 7 4 = 16 4 = 4 True.

 Because 2 does not check, it is an

extraneous solution. The only soln is 9

Example  Solve

 SOLUTION  Check

x − 4 = − 6 x − 4 = − 6 x = − 2 ( ) (^ ) 2 2 x = − 2 x = 4 x − 4 = − 6 4 − 4 = − 6 2 − 4 = − 6 − 2 = − 6

 This tentative solution x =4 does not

check, so it is an extraneous solution.

The equation has no solution; the

solution set is {Ø}

Example  Solve

 SOLUTION  Check

 So 13 checks. The solution set is {13}

 4 x + 3 + 3 = 5. 4 x + 3 + 3 = 5 4 x + 3 = 2 ( ) 4 4 4 x + 3 = 2 x + 3 = 16 x = 13 4 x + 3 + 3 = 5 ( ) 4 13 + 3 + 3 = 5 4 16 + 3 = 5 2 + 3 = 5 5 = 5

Example  Solve

 SOLN

x = x + 5 + 1 x = x + 5 + 1

x − 1 = x + 5

( ) (^) ( ) 2 2

x − 1 = x + 5

2

x − 2 x + 1 = x + 5

2

x − 3 x − 4 = 0

( x − 4)( x +1) = 0

Isolate the variable radical Sq Both Sides to Remove Radical ( x −1) 2 ≠ x 2 − 1 2

x − 4 = 0 or x + 1 = 0

x = 4 or x = − 1

Apply Zero-Products Tentative Solutions

Example  Solve

x = x + 5 + 1

 Check BOTH Tentative Solutions

x = x + 5 + 1

x = x + 5 + 1

− (^1) 

 In this Case 4 checks while −1 does

NOT. The solution set is {4}

WhiteBoard Work

 Problems From §7.6 Exercise Set

  • 20, 26, 30, 46, 56

 Remember, Raising

Both Sides of Eqn

to an EVEN Power

can introduce

EXTRANEOUS

Solutions

All Done for Today

Life Expectancy