Presentation is loading. Please wait.

Presentation is loading. Please wait.

CHAPTER 2 2.4 Continuity Fundamental Theorem of Calculus In this lecture you will learn the most important relation between derivatives and areas (definite.

Published byBryan Stone Modified over 9 years ago

Similar presentations

Presentation on theme: "CHAPTER 2 2.4 Continuity Fundamental Theorem of Calculus In this lecture you will learn the most important relation between derivatives and areas (definite."— Presentation transcript:

1 CHAPTER 2 2.4 Continuity Fundamental Theorem of Calculus In this lecture you will learn the most important relation between derivatives and areas (definite integrals). animation

2  b a f (x) dx = –  a b f (x) dx  a a f (x) dx = 0 Comparison Properties of the Integral 1.If f (x) >= 0 for a = 0. 2.If f (x) >= g (x) for a <= x <= b, then  a b f (x) dx >=  a b g (x) dx. 1.If m <= f (x) <= M for a <= x <= b, then m(b-a) <=  a b f (x) dx <= M(b-a).

3 Example Estimate the value of the integral  -1 1 e x 2 dx.

4 ``Area so far’’ function. Let g(x) be the area between the lines: t=a, and t=x, and under the graph of the function f(t) above the T-axis. animation g’(x) = f(x) where g(x) =  a x f(t) dt.

5 Example Find the derivative with respect to x of  -2 x t 2 dt.

6 Example Find the derivative with respect to x of  -3 2 x sin t dt.

7 Example Find the derivative with respect to x of  -x 2 cos t dt.

8

Download ppt "CHAPTER 2 2.4 Continuity Fundamental Theorem of Calculus In this lecture you will learn the most important relation between derivatives and areas (definite."

Similar presentations

TECHNIQUES OF INTEGRATION

TECHNIQUES OF INTEGRATION
Maximum and Minimum Values

Maximum and Minimum Values
Follow the link to the slide. Then click on the figure to play the animation. A Figure 5.1.8 Figure 5.1.9.

Follow the link to the slide. Then click on the figure to play the animation. A Figure Figure
Copyright © 2008 Pearson Education, Inc. Chapter 7 Integration Copyright © 2008 Pearson Education, Inc.

Copyright © 2008 Pearson Education, Inc. Chapter 7 Integration Copyright © 2008 Pearson Education, Inc.
Chapter 5 Integration.

Chapter 5 Integration.
MTH 252 Integral Calculus Chapter 7 – Applications of the Definite Integral Section 7.1 – Area Between Two Curves Copyright © 2006 by Ron Wallace, all.

MTH 252 Integral Calculus Chapter 7 – Applications of the Definite Integral Section 7.1 – Area Between Two Curves Copyright © 2006 by Ron Wallace, all.
CHAPTER 2 2.4 Continuity Areas Between Curves The area A of the region bounded by the curves y = f(x), y = g(x), and the lines x = a, x = b, where f and.

CHAPTER Continuity Areas Between Curves The area A of the region bounded by the curves y = f(x), y = g(x), and the lines x = a, x = b, where f and.
9.1Concepts of Definite Integrals 9.2Finding Definite Integrals of Functions 9.3Further Techniques of Definite Integration Chapter Summary Case Study Definite.

9.1Concepts of Definite Integrals 9.2Finding Definite Integrals of Functions 9.3Further Techniques of Definite Integration Chapter Summary Case Study Definite.
CHAPTER 2 2.4 Continuity Derivatives Definition The derivative of a function f at a number a denoted by f’(a), is f’(a) = lim h  0 ( f(a + h) – f(a))

CHAPTER Continuity Derivatives Definition The derivative of a function f at a number a denoted by f’(a), is f’(a) = lim h  0 ( f(a + h) – f(a))
If is measured in radian Then: If is measured in radian Then: and: -

If is measured in radian Then: If is measured in radian Then: and: -
The Antiderivative Safa Faidi. The definition of an Antiderivative A function F is called the antiderivative of f on an interval I if F’(x) =f(x) for.

The Antiderivative Safa Faidi. The definition of an Antiderivative A function F is called the antiderivative of f on an interval I if F’(x) =f(x) for.
CHAPTER 2 2.4 Continuity Integration by Parts The formula for integration by parts  f (x) g’(x) dx = f (x) g(x) -  g(x) f’(x) dx. Substitution Rule that.

CHAPTER Continuity Integration by Parts The formula for integration by parts  f (x) g’(x) dx = f (x) g(x) -  g(x) f’(x) dx. Substitution Rule that.
Example We can also evaluate a definite integral by interpretation of definite integral. Ex. Find by interpretation of definite integral. Sol. By the interpretation.

Example We can also evaluate a definite integral by interpretation of definite integral. Ex. Find by interpretation of definite integral. Sol. By the interpretation.
6.1 Antiderivatives and Slope Fields Objectives SWBAT: 1)construct antiderivatives using the fundamental theorem of calculus 2)solve initial value problems.

6.1 Antiderivatives and Slope Fields Objectives SWBAT: 1)construct antiderivatives using the fundamental theorem of calculus 2)solve initial value problems.
Section 5.3 – The Definite Integral

Section 5.3 – The Definite Integral
5.c – The Fundamental Theorem of Calculus and Definite Integrals.

5.c – The Fundamental Theorem of Calculus and Definite Integrals.
Constructing the Antiderivative Solving (Simple) Differential Equations The Fundamental Theorem of Calculus (Part 2) Chapter 6: Calculus~ Hughes-Hallett.

Constructing the Antiderivative Solving (Simple) Differential Equations The Fundamental Theorem of Calculus (Part 2) Chapter 6: Calculus~ Hughes-Hallett.
Homework questions thus far??? Section 4.10? 5.1? 5.2?

Homework questions thus far??? Section 4.10? 5.1? 5.2?
7.4: The Fundamental Theorem of Calculus Objectives: To use the FTC to evaluate definite integrals To calculate total area under a curve using FTC and.

7.4: The Fundamental Theorem of Calculus Objectives: To use the FTC to evaluate definite integrals To calculate total area under a curve using FTC and.
4.10 - Antiderivatives. Antiderivatives Definition A function F is called an antiderivative of f if F ′(x) = f (x) for all x on an interval I. Theorem.

Antiderivatives. Antiderivatives Definition A function F is called an antiderivative of f if F ′(x) = f (x) for all x on an interval I. Theorem.

Similar presentations

Ads by Google