Chapter 02 differentiation

TunisTunis bbususiinneessss scschhooooLL

MATHEMATICS FOR BUSINESS BCOR 120

DIFFERENTIATION

Content

• Limits of a function

• Continuity of a function

• Derivatives

• Differential

• Local/ Global Optimum

• Convexity and Concavity

• Taylor Polynomials

201/02/12

LIMIT AND CONTINUITY

1

3

LIMIT OF A FUNCTION

1.1

4

Limits of a Function

5

• The limit L has to be (a finite) number.

• Otherwise we say that the limit does not exist.– If the limit does not exist:

• f is said to be definitely divergent if L = ±∞; otherwise

• f is said to be indefinitely divergent

6

Left-side and Right-side limits

7

8

• We also write

for the right-side and left-side limits, respectively.

• A relationship between one-sided limits and the limit as introduced in Definition 4.1 is given by the following theorem.

• We note that it is not necessary for the existence of a limit of function f as x tends to x0 that the function value f (x0) at point x0 be defined.

9

10

11

Properties of Limits

12

Example

13

Example

14

To avoid indetermination (0/0) we can multiply both terms by

CONTINUITY OF A FUNCTION

1.2

15

Continuity of a Function

16

Continuity of a function

17

• or, using the notation

• continuity of a function at some point x0 D∈ f means that small changes in the independent variable x lead to small changes in the dependent variable y.

Continuous Function

18BCOR-120 Automn 2011

for all x from the open interval (x0 −δ, x0 +δ)

the function values f (x) are within the open interval (f (x0) − ε, f (x0) + ε)

Discontinuous Function

19BCOR-120 Automn 2011

There exist a least an x from the open interval (x0 −δ, x0 +δ)

For which the function values f (x) is outside the open interval (f (x0) − ε, f (x0) + ε)

When f is discontinuous at x0?

• The function f is discontinuous at x0

– If the one-sided limits of a function f as x tends to x0 are different; or

– If one or both of the one-sided limits do not exist; or

– if the one-sided limits are identical but the function value f (x0) is not defined; or

– if value f (x0) is defined but not equal to both one-sided limits.

20BCOR-120 Automn 2011

Types of discontinuities

A. Removable discontinuity: – f the limit of function f as x tends to x0 exists but

• (4) the function value f (x0) is different or

• (3) the function f is not defined at point x0. In this case we also say that function f has a gap at x0.

21BCOR-120 Automn 2011

Example: removable discontinuity

22BCOR-120 Automn 2011

, since

Example (cont.)

23BCOR-120 Autumn 2011

A. Irremovable dicontinuities

• finite jump at x0:

– (1) if both one-sided limits of function f as x tends to x0 exist and they are different.

• Infinite jump at x0:

– (2) if one of the one-sided limits as x tends to x0 exists and from the other side function f tends to (+ or -)infinity

24BCOR-120 Automn 2011

• Pole at point x0

A rational function f = P/Q has a Pole at point x0 if Q(x0)=0 but P(x0)≠ 0 – As a consequence, the function values at x0

+ or to x0

- tend to either ∞- or +∞.• The multiplicity of zero x0 of polynomial Q defines the

order of the pole:– In the case of a pole of even order, the sign of the function f

does not change at point x0;

– In the case of a pole of odd order, the sign of the function f changes at point x0

25BCOR-120 Automn 2011

• Oscillation point at x0 .

A function f has an oscillation point at x0 it he function is indefinitely divergent as x tends to x0.

• This means that neither the limit of function f as x tends to x0 exist not function f tends to ±∞ as x tends to x0.

26BCOR-120 Automn 2011

2701/02/12

One-sided Continuity

28

Properties of Continuous Functions

29

Properties of Continuous Functions

30

Properties of Continuous Functions

31

Properties of Continuous Functions

32

Properties of Continuous Functions

3301/02/12

Properties of Continuous Functions

34

DIFFERENCE QUOTIENT AND THE DERIVATIVE

2

35

Difference Quotients and Derivatives

3601/02/12

3701/02/12

3801/02/12

3901/02/12

4001/02/12

4101/02/12

4201/02/12

4301/02/12

4401/02/12

4501/02/12

A

B

A: the set of all points where function f is continuous

B: the set of all points where function f is Defferentiable

B included A.

DERIVATIVES OF ELEMENTARY FUNCTIONS; DIFFERENTIATIONRULES

3

46

Derivatives of Elementary Functions- Differentiation Rules

Derivatives of composite and Inverse Functions

DIFFERENTIAL; RATE OF CHANGE AND ELASTICITY

4

67

Differential, Rate of Change & Elasticity

The differential dy

Example-continued

GRAPHING FUNCTIONS

5

83

Graphing Functions

8401/02/12

8501/02/12

Monotonicity

8601/02/12

8701/02/12

8801/02/12

Extreme Points

8901/02/12

9001/02/12

9101/02/12

9201/02/12

01/02/1294

01/02/1295

01/02/12106

Convexity & Concavity

10701/02/12

01/02/12108

01/02/12109

01/02/12110

01/02/12111

01/02/12112

01/02/12113

01/02/12114

01/02/12115

01/02/12116

01/02/12117

Limits-revisited

11801/02/12

01/02/12119

01/02/12120

01/02/12121

01/02/12122

01/02/12123

01/02/12124

01/02/12125

01/02/12126

01/02/12127

01/02/12128

01/02/12129

01/02/12130

Graphing Functions

13101/02/12

01/02/12132

01/02/12133

01/02/12134

01/02/12135

01/02/12136

01/02/12137

01/02/12138

01/02/12139

Taylor Polynomials

14001/02/12

01/02/12141

01/02/12142

01/02/12143

01/02/12144

01/02/12145

01/02/12146

01/02/12147

01/02/12148

01/02/12149

01/02/12150

01/02/12151

01/02/12152

01/02/12153