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Sec 3.2: The Derivative as a Function If ƒ’(a) exists, we say that ƒ is differentiable at a. (has a derivative at a) DEFINITION.

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Presentation on theme: "Sec 3.2: The Derivative as a Function If ƒ’(a) exists, we say that ƒ is differentiable at a. (has a derivative at a) DEFINITION."— Presentation transcript:

1 Sec 3.2: The Derivative as a Function If ƒ’(a) exists, we say that ƒ is differentiable at a. (has a derivative at a) DEFINITION

2 Sec 3.2: The Derivative as a Function Calculating Derivatives from the Definition Notations ƒ is differentiable at 2 If ƒ’(a) exists, we say that ƒ is differentiable at a. (has a derivative at a) DEFINITION

3 Sec 3.2: The Derivative as a Function Calculating Derivatives from the Definition ƒ is differentiable at 3 If ƒ’(a) exists, we say that ƒ is differentiable at a. (has a derivative at a) DEFINITION Differentiate

4 Sec 3.2: The Derivative as a Function Right-hand derivative at a DEFINITION exist Left-hand derivative at a DEFINITION exist Find the right-hand derivative at 0 and the left-hand derivative at 0

5 Definition: A function f is differentiable on an open interval (a, b) if it is differentiable at every number in the interval. Definition: A function f is differentiable on an open interval (a, b) if it is differentiable at every number in the interval. Sec 3.2: The Derivative as a Function If ƒ’(a) exists, we say that ƒ is differentiable at a. (has a derivative at a) DEFINITION

6 Slopes : 0 + - Sec 3.2: The Derivative as a Function

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9 Sketch the Graph of the derivative of the function

10 Sec 3.2: The Derivative as a Function

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13 2 properties continuity differentiability Proof: Sec 3.2: The Derivative as a Function Continuous at Differentiable at

14 2 properties continuity differentiability Proof: Remark: f cont. at af diff. at a Remark: f discont. at af not diff. at a Remark: f discont. at a f not diff. at a Sec 3.2: The Derivative as a Function

15 Example: f cont. at af diff. at a f discont. at af not diff. at a f discont. at a f not diff. at a Sec 3.2: The Derivative as a Function

16 Example: f cont. at af diff. at a f discont. at af not diff. at a f discont. at a f not diff. at a Sec 3.2: The Derivative as a Function

17 TERM-121 Exam-2

18 HOW CAN A FUNCTION FAIL TO BE DIFFERENTIABLE? Sec 3.2: The Derivative as a Function corner cusp vertical tangent, discontinuity oscillates

19 Sec 3.2: The Derivative as a Function

20 exists Continuous at Differentiable at

21 Sec 3.3: Differentiation Rules TERM-121 Exam-2

22 Sec 3.3: Differentiation Rules TERM-122 Exam-2

23 Sec 3.3: Differentiation Rules

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