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Kalkulus 1 (01 -14)
1.
Kalkulus I Drs.
Tasman Abbas Sesion#01-14 JurusanFisika FakultasMatematikadanIlmuPengetahuanAlam
2.
3.
Evaluation of Limits
4.
Continuity
5.
Limits Involving Infinity1/8/2011
© 2010 Universitas Negeri Jakarta | www.unj.ac.id | 2
6.
Limits and Continuity
© 2010 Universitas Negeri Jakarta | www.unj.ac.id | 3 1/8/2011
7.
Limit L a
1/8/2011 4 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
8.
Limits, Graphs, and
Calculators 1/8/2011 5 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
9.
1/8/2011 6 ©
2010 Universitas Negeri Jakarta | www.unj.ac.id |
10.
11.
3)
Use your calculator to evaluate the limits Answer : 16 Answer : no limit Answer : no limit Answer : 1/2 1/8/2011 8 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
12.
The
Definition of Limit L a 1/8/2011 9 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
13.
1/8/2011 10 ©
2010 Universitas Negeri Jakarta | www.unj.ac.id |
14.
Examples What do
we do with the x? 1/8/2011 11 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
15.
1/2 1 3/2
1/8/2011 12 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
16.
One-Sided Limits The
right-hand limit of f (x), as x approaches a, equals L written: if we can make the value f (x) arbitrarily close to L by taking x to be sufficiently close to the right of a. L a 1/8/2011 13 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
17.
The left-hand limit
of f (x), as x approaches a, equals M written: if we can make the value f (x) arbitrarily close to L by taking x to be sufficiently close to the left of a. M a 1/8/2011 14 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
18.
1. Given
Find Find Examples of One-Sided Limit 1/8/2011 15 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
19.
More Examples Find
the limits: 1/8/2011 16 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
20.
A Theorem This
theorem is used to show a limit does not exist. For the function But 1/8/2011 17 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
21.
Limit Theorems 1/8/2011
18 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
22.
Examples Using
Limit Rule Ex. Ex. 1/8/2011 19 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
23.
More Examples 1/8/2011
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24.
Indeterminate Forms Indeterminate
forms occur when substitution in the limit results in 0/0. In such cases either factor or rationalize the expressions. Notice form Ex. Factor and cancel common factors 1/8/2011 21 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
25.
More Examples 1/8/2011
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26.
The Squeezing Theorem
1/8/2011 23 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
27.
Continuity A function
f is continuous at the point x = a if the following are true: f(a) a 1/8/2011 24 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
28.
A function f
is continuous at the point x = a if the following are true: f(a) a 1/8/2011 25 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
29.
Examples At which
value(s) of x is the given function discontinuous? Continuous everywhere Continuous everywhere except at 1/8/2011 26 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
30.
and and Thus
F is not cont. at Thus h is not cont. at x=1. F is continuous everywhere else h is continuous everywhere else 1/8/2011 27 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
31.
Continuous Functions If
f and g are continuous at x = a, then A polynomial functiony = P(x) is continuous at every point x. A rational function is continuous at every point x in its domain. 1/8/2011 28 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
32.
Intermediate Value Theorem
If f is a continuous function on a closed interval [a, b] and L is any number between f (a) and f (b), then there is at least one number c in [a, b] such that f(c) = L. f (b) L f (c) = f (a) a b c 1/8/2011 29 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
33.
Example f (x)
is continuous (polynomial) and since f (1) < 0 and f (2) > 0, by the Intermediate Value Theorem there exists a c on [1, 2] such that f (c) = 0. 1/8/2011 30 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
34.
Limits at Infinity
For all n > 0, provided that is defined. Divide by Ex. 1/8/2011 31 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
35.
More Examples 1/8/2011
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36.
1/8/2011 33 ©
2010 Universitas Negeri Jakarta | www.unj.ac.id |
37.
1/8/2011 34 ©
2010 Universitas Negeri Jakarta | www.unj.ac.id |
38.
Infinite Limits For
all n > 0, 1/8/2011 35 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
39.
Examples Find the
limits 1/8/2011 36 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
40.
Limit and Trig
Functions From the graph of trigs functions we conclude that they are continuous everywhere 1/8/2011 37 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
41.
Tangent and Secant
Tangent and secant are continuous everywhere in their domain, which is the set of all real numbers 1/8/2011 38 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
42.
Examples 1/8/2011 39
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43.
Limit and Exponential
Functions The above graph confirm that exponential functions are continuous everywhere. 1/8/2011 40 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
44.
Asymptotes 1/8/2011 41
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45.
Examples Find the
asymptotes of the graphs of the functions 1/8/2011 42 © 2010 Universitas Negeri Jakarta | www.unj.ac.id |
46.
1/8/2011 43 ©
2010 Universitas Negeri Jakarta | www.unj.ac.id |
47.
Thank You 1/8/2011
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