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Chapter 10 - Limit and Continuity
1.
INTRODUCTORY MATHEMATICALINTRODUCTORY MATHEMATICAL ANALYSISANALYSISFor
Business, Economics, and the Life and Social Sciences Β©2007 Pearson Education Asia Chapter 10Chapter 10 Limits and ContinuityLimits and Continuity
2.
Β©2007 Pearson Education
Asia INTRODUCTORY MATHEMATICAL ANALYSIS 0. Review of Algebra 1. Applications and More Algebra 2. Functions and Graphs 3. Lines, Parabolas, and Systems 4. Exponential and Logarithmic Functions 5. Mathematics of Finance 6. Matrix Algebra 7. Linear Programming 8. Introduction to Probability and Statistics
3.
Β©2007 Pearson Education
Asia 9. Additional Topics in Probability 10. Limits and Continuity 11. Differentiation 12. Additional Differentiation Topics 13. Curve Sketching 14. Integration 15. Methods and Applications of Integration 16. Continuous Random Variables 17. Multivariable Calculus INTRODUCTORY MATHEMATICAL ANALYSIS
4.
Β©2007 Pearson Education
Asia β’ To study limits and their basic properties. β’ To study one-sided limits, infinite limits, and limits at infinity. β’ To study continuity and to find points of discontinuity for a function. β’ To develop techniques for solving nonlinear inequalities. Chapter 10: Limits and Continuity Chapter ObjectivesChapter Objectives
5.
Β©2007 Pearson Education
Asia Limits Limits (Continued) Continuity Continuity Applied to Inequalities 10.1) 10.2) 10.3) Chapter 10: Limits and Continuity Chapter OutlineChapter Outline 10.4)
6.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.1 Limits10.1 Limits Example 1 β Estimating a Limit from a Graph β’ The limit of f(x) as x approaches a is the number L, written as a. Estimate limxβ1 f (x) from the graph. Solution: b. Estimate limxβ1 f (x) from the graph. Solution: ( ) Lxf ax = β lim ( ) 2lim 1 = β xf x ( ) 2lim 1 = β xf x
7.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.1 Limits Properties of Limits 1. 2. for any positive integer n 3. 4. 5. ( ) constantaiswherelimlim cccxf axax == ββ nn ax ax = β lim ( ) ( )[ ] ( ) ( )xgxfxgxf axaxax βββ Β±=Β± limlimlim ( ) ( )[ ] ( ) ( )xgxfxgxf axaxax βββ β =β limlimlim ( )[ ] ( )xfcxcf axax ββ β = limlim
8.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.1 Limits Example 3 β Applying Limit Properties 1 and 2 Properties of Limits ( ) 162limc. 366limb. 77lim;77lima. 44 2 22 6 52 =β= == == β β βββ t x t x xx ( ) ( ) ( ) ( ) ( ) 0limif lim lim lim6. β = β β β β xg xg xf xg xf ax ax ax ax ( ) ( )n ax n ax xfxf ββ = limlim7.
9.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.1 Limits Example 5 β Limit of a Polynomial Function Find an expression for the polynomial function, Solution: where ( ) 01 1 1 ... cxcxcxcxf n n n n ++++= β β ( ) ( ) ( )af cacacac ccxcxc cxcxcxcxf n n n n axax n ax n n ax n n n n n axax = ++++= ++++= ++++= β β ββ β β β β β β ββ 01 1 1 01 1 1 01 1 1 ... limlim...limlim ...limlim ( ) ( )afxf ax = β lim
10.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.1 Limits Example 7 β Finding a Limit Example 9 β Finding a Limit Find . Solution: If ,find . Solution: 1 1 lim 2 1 + β β x x x ( ) 2111lim 1 1 lim 1 2 1 β=ββ=β= + β ββββ x x x xx ( ) 12 += xxf ( ) ( ) h xfhxf h β+ β0 lim ( ) ( ) [ ] ( ) xhx h xhxhx h xfhxf h hh 22lim 112 limlim 0 222 00 =+= ββ+++ = β+ β ββ Limits and Algebraic Manipulation β’ If f (x) = g(x) for all x β a, then ( ) ( )xgxf axax ββ = limlim
11.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.2 Limits (Continued)10.2 Limits (Continued) Example 1 β Infinite Limits Infinite Limits β’ Infinite limits are written as and . Find the limit (if it exists). Solution: a. The results are becoming arbitrarily large. The limit does not exist. b. The results are becoming arbitrarily large. The limit does not exist. β=+ ββ xx 1 lim 0 ββ=β ββ xx 1 lim 0 1 2 lima. 1 ++ ββ xx 4 2 limb. 22 β + β x x x
12.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.2 Limits (Continued) Example 3 β Limits at Infinity Find the limit (if it exists). Solution: a. b. ( )3 5 4 lima. βββ xx ( ) 0 5 4 lim 3 = βββ xx ( )x x β ββ 4limb. ( ) β=β ββ x x 4lim Limits at Infinity for Rational Functions β’ If f (x) is a rational function, and( ) m m n n xx xb xa xf ββββ = limlim ( ) m m n n xx xb xa xf ββββββ = limlim
13.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.2 Limits (Continued) Example 5 β Limits at Infinity for Polynomial Functions Find the limit (if it exists). Solution: Solution: ( ) β=β=+β ββββββ 33 2lim92lim xxx xx ( ) ββ==β+β ββββββ 323 lim2lim xxxx xx ( ) 33 2lim92limb. xxx xx β=+β ββββββ ( ) 323 lim2lima. xxxx xx ββββββ =β+β
14.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.3 Continuity10.3 Continuity Example 1 β Applying the Definition of Continuity Definition β’ f(x) is continuous if three conditions are met: a. Show that f(x) = 5 is continuous at 7. Solution: Since , . b. Show that g(x) = x2 β 3 is continuous at β4. Solution: ( ) ( ) ( ) ( )afxf xf xf = β β ax ax lim3. existslim2. exists1. ( ) 55limlim 77 == ββ xx xf ( ) ( )75lim 7 fxf x == β ( ) ( ) ( )43limlim 2 44 β=β= ββββ gxxg xx
15.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.3 Continuity Example 3 β Discontinuities a. When does a function have infinite discontinuity? Solution: A function has infinite discontinuity at a when at least one of the one-sided limits is either β or ββ as x βa. b. Find discontinuity for Solution: f is defined at x = 0 but limxβ0 f (x) does not exist. f is discontinuous at 0. ( )  ο£³  ο£² ο£± <β = > = 0if1 0if0 0if1 x x x xf
16.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.3 Continuity Example 5 β Locating Discontinuities in Case-Defined Functions For each of the following functions, find all points of discontinuity. ( ) ο£³ ο£² ο£± < β₯+ = 3if 3if6 a. 2 xx xx xf ( ) ο£³ ο£² ο£± < >+ = 2if 2if2 b. 2 xx xx xf
17.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.3 Continuity Example 5 β Locating Discontinuities in Case-Defined Functions Solution: a. We know that f(3) = 3 + 6 = 9. Because and , the function has no points of discontinuity. ( ) ( ) 96limlim 33 =+= ++ ββ xxf xx ( ) 9limlim 2 33 == βββ β xxf xx
18.
Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.3 Continuity Example 5 β Locating Discontinuities in Case-Defined Functions Solution: b. It is discontinuous at 2, limxβ2 f (x) exists. ( ) ( )xfxxxf xxxx +βββ ββββ =+=== 22 2 22 lim2lim4limlim
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Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.4 Continuity Applied to Inequalities10.4 Continuity Applied to Inequalities Example 1 β Solving a Quadratic Inequality Solve . Solution: Let . To find the real zeros of f, Therefore, x2 β 3x β 10 > 0 on (ββ,β2) βͺ (5,β). 01032 >ββ xx ( ) 1032 ββ= xxxf ( )( ) 5,2 052 01032 β= =β+ =ββ x xx xx
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Β©2007 Pearson Education
Asia Chapter 10: Limits and Continuity 10.4 Continuity Applied to Inequalities Example 3 β Solving a Rational Function Inequality Solve . Solution: Let . The zeros are 1 and 5. Consider the intervals: (ββ, 0) (0, 1) (1, 5) (5,β) Thus, f(x) β₯ 0 on (0, 1] and [5,β). 0 562 β₯ +β x xx ( ) ( )( ) x xx x xx xf 51562 ββ = +β =
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