Download presentation
Presentation is loading. Please wait.
1
Calculus I Chapter Three1
2
2 Calculus Timeline: Descartes 1596-1650 Cavalieri 1598-1647 Fermat 1601-1665 Wallis 1616-1703 Barrow 1630-1677 Gregory 1638-1675 Newton 1642-1727 Leibniz 1646-1716
3
Calculus I Chapter Three3 GeoGebra
4
Calculus I Chapter Three4
5
5 Explain how slopes of secant lines approach the slopes of the tangent line at a point.(Definition(1)) Definition(1) Derivative at a point GeoGebra fileDerivative at a point
6
Calculus I Chapter Three6 Explain how slopes of secant lines approach the slopes of the tangent line at a point. (Definition(2)) Definition(2) Derivative at a point GeoGebra file
7
Calculus I Chapter Three7 The Derivative Function
8
Calculus I Chapter Three8 Average Rates The pattern of the average rates looks quadratic! xAverage Rate 17 219 337 461 591 6127
9
Calculus I Chapter Three9 The derivative can be interpreted in two ways: the slope of the tangent line to the graph of the relation at the given x value. the rate of change of the function with respect to x at the given x value.
10
Calculus I Chapter Three10
11
Calculus I Chapter Three11
12
Calculus I Chapter Three12
13
Calculus I Chapter Three13
14
Calculus I Chapter Three14 a-D b-C c-B d-A
15
Calculus I Chapter Three15
16
Calculus I Chapter Three16 Differentiable Implies Continuous
17
Calculus I Chapter Three17
18
Calculus I Chapter Three18
19
Calculus I Chapter Three19
20
Calculus I Chapter Three20
21
Calculus I Chapter Three21
22
Calculus I Chapter Three22
23
Calculus I Chapter Three23
24
Calculus I Chapter Three24
25
Calculus I Chapter Three25
26
Calculus I Chapter Three26
27
Calculus I Chapter Three27
28
Calculus I Chapter Three28
29
Calculus I Chapter Three29
30
Calculus I Chapter Three30
31
Calculus I Chapter Three31
32
Calculus I Chapter Three32
33
Calculus I Chapter Three33
34
Calculus I Chapter Three34
35
Calculus I Chapter Three35
36
Calculus I Chapter Three36
37
Calculus I Chapter Three37
38
Calculus I Chapter Three38
39
Calculus I Chapter Three39
40
Calculus I Chapter Three40
41
Calculus I Chapter Three41
42
Calculus I Chapter Three42
43
Calculus I Chapter Three43
44
Calculus I Chapter Three44
45
Calculus I Chapter Three45
46
Calculus I Chapter Three46
47
Calculus I Chapter Three47
48
Calculus I Chapter Three48
49
Calculus I Chapter Three49 Alternative proof of the product rule using linearization
50
Calculus I Chapter Three50
51
Calculus I Chapter Three51
52
Calculus I Chapter Three52
53
Calculus I Chapter Three53
54
Calculus I Chapter Three54
55
Calculus I Chapter Three55
56
Calculus I Chapter Three56
57
Calculus I Chapter Three57
58
Calculus I Chapter Three58
59
Calculus I Chapter Three59
60
Calculus I Chapter Three60
61
Calculus I Chapter Three61
62
Calculus I Chapter Three62
63
Calculus I Chapter Three63
64
Calculus I Chapter Three64
66
Calculus I Chapter Three66
67
Derivative of lnx:
68
Calculus I Chapter Three68
69
Derivative of :
70
Calculus I Chapter Three70
71
Derivative of :
72
Calculus I Chapter Three72
73
Calculus I Chapter Three73
74
Calculus I Chapter Three74
75
Calculus I Chapter Three75
76
Calculus I Chapter Three76
77
Derivative of sine inverse function:
78
Calculus I Chapter Three78
79
Derivative of cosine inverse function:
80
Calculus I Chapter Three80
81
Derivative of tangent inverse function:
82
Calculus I Chapter Three82
83
Derivative of cotangent inverse function:
84
Calculus I Chapter Three84
85
Derivative of secant inverse function:
86
Calculus I Chapter Three86
87
Derivative of cosecant inverse function:
88
Calculus I Chapter Three88
89
Calculus I Chapter Three89
90
Calculus I Chapter Three90
91
Calculus I Chapter Three91
92
Calculus I Chapter Three92
93
Calculus I Chapter Three93
94
Calculus I Chapter Three94
95
Calculus I Chapter Three95
96
Calculus I Chapter Three96
97
Calculus I Chapter Three97
98
Calculus I Chapter Three98
99
Calculus I Chapter Three99
100
Calculus I Chapter Three100
101
Calculus I Chapter Three101
102
Calculus I Chapter Three102
103
Calculus I Chapter Three103
104
Calculus I Chapter Three104
105
Calculus I Chapter Three105 Higher-order Derivatives Geogebra’s answer
106
Calculus I Chapter Three106
107
Calculus I Chapter Three107 Tangent lines and Normal lines The normal line to a curve C at a point A is the line through A that is perpendicular to the tangent line at A. The concept of the normal line to a curve has applications in the study of optics where one needs to consider the angle between a light ray and the normal line to a lens.
108
Calculus I Chapter Three108
Similar presentations
