8.6 Solving Exponential and Logarithmic Equations - PowerPoint PPT Presentation

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8.6 Solving Exponential and Logarithmic Equations

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Title: 8.6 Solving Exponential and Logarithmic Equations


1
8.6Solving Exponential and Logarithmic Equations
  • p. 501

2
Exponential Equations
  • One way to solve exponential equations is to use
    the property that if 2 powers w/ the same base
    are equal, then their exponents are equal.
  • For bgt0 b?1 if bx by, then xy

3
Solve by equating exponents
  • 43x 8x1
  • (22)3x (23)x1 rewrite w/ same base
  • 26x 23x3
  • 6x 3x3
  • x 1

Check ? 431 811 64 64
4
Your turn!
  • 24x 32x-1
  • 24x (25)x-1
  • 4x 5x-5
  • 5 x

Be sure to check your answer!!!
5
When you cant rewrite using the same base, you
can solve by taking a log of both sides
  • 2x 7
  • log22x log27
  • x log27
  • x 2.807

6
4x 15
  • log44x log415
  • x log415 log15/log4
  • 1.95

7
102x-34 21
  • -4 -4
  • 102x-3 17
  • log10102x-3 log1017
  • 2x-3 log 17
  • 2x 3 log17
  • x ½(3 log17)
  • 2.115

8
5x2 3 25
  • 5x2 22
  • log55x2 log522
  • x2 log522
  • x (log522) 2
  • (log22/log5) 2
  • -.079

9
Newtons Law of Cooling
  • The temperature T of a cooling substance _at_ time t
    (in minutes) is
  • T (T0 TR) e-rt TR
  • T0 initial temperature
  • TR room temperature
  • r constant cooling rate of the substance

10
  • Youre cooking stew. When you take it off the
    stove the temp. is 212F. The room temp. is 70F
    and the cooling rate of the stew is r .046. How
    long will it take to cool the stew to a serving
    temp. of 100?

11
  • T0 212, TR 70, T 100 r .046
  • So solve
  • 100 (212 70)e-.046t 70
  • 30 142e-.046t (subtract 70)
  • .211 e-.046t (divide by 142)
  • How do you get the variable out of the exponent?

12
Cooling cont.
  • ln .211 ln e-.046t (take the ln of both sides)
  • ln .211 -.046t
  • -1.556 -.046t
  • 33.8 t
  • about 34 minutes to cool!

13
Solving Log Equations
  • To solve use the property for logs w/ the same
    base
  • s b,x,y b?1
  • If logbx logby, then x y

14
log3(5x-1) log3(x7)
  • 5x 1 x 7
  • 5x x 8
  • 4x 8
  • x 2 and check
  • log3(52-1) log3(27)
  • log39 log39

15
When you cant rewrite both sides as logs w/ the
same base exponentiate each side
  • bgt0 b?1
  • if x y, then bx by

16
log5(3x 1) 2
  • 5log5(3x1) 52
  • 3x1 25
  • x 8 and check
  • Because the domain of log functions doesnt
    include all reals, you should check for
    extraneous solutions

17
log5x log(x1)2
  • log (5x)(x1) 2 (product property)
  • log (5x2 5x) 2
  • 10log5x 5x 102
  • 5x2 5x 100
  • x2 x - 20 0 (subtract 100 and
    divide by 5)
  • (x5)(x-4) 0 x -5, x 4
  • graph and youll see 4x is the only solution

2
18
One More!log2x log2(x-7) 3
  • log2x(x-7) 3
  • log2 (x2- 7x) 3
  • 2log2x -7x 32
  • x2 7x 8
  • x2 7x 8 0
  • (x-8)(x1)0
  • x8 x -1

2
19
Assignment
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