3.9 Differentials Let y = f(x) represent a function that is differentiable in an open interval containing x. The differential of x (denoted by dx) is any.

Slides:

Advertisements

Similar presentations

The Derivative in Graphing and Application

Advertisements

Linear Approximation and Differentials

Section Differentials Tangent Line Approximations A tangent line approximation is a process that involves using the tangent line to approximate a.

CHAPTER Continuity The Chain Rule. CHAPTER Continuity The Chain Rule If f and g are both differentiable and F = f o g is the composite function.

3 Copyright © Cengage Learning. All rights reserved. Applications of Differentiation.

Sec. 4.5: Integration by Substitution. T HEOREM 4.12 Antidifferentiation of a Composite Function Let g be a function whose range is an interval I, and.

Chapter 3 – Differentiation Rules

DERIVATIVES Linear Approximations and Differentials In this section, we will learn about: Linear approximations and differentials and their applications.

Section Differentials. Local Linearity If a function is differentiable at a point, it is at least locally linear. Differentiable.

DO NOW Find the equation of the tangent line of y = 3sin2x at x = ∏

DERIVATIVES 3. We have seen that a curve lies very close to its tangent line near the point of tangency. DERIVATIVES.

DERIVATIVES 3. Summary f(x) ≈ f(a) + f’(a)(x – a) L(x) = f(a) + f’(a)(x – a) ∆y = f(x + ∆x) – f(x) dx = ∆x dy = f’(x)dx ∆ y≈ dy.

Who wants to be a Millionaire? Hosted by Kenny, Katie, Josh and Mike.

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.

Lesson 3-11 Linear Approximations and Differentials.

Aim: Differentials Course: Calculus Do Now: Aim: Differential? Isn’t that part of a car’s drive transmission? Find the equation of the tangent line for.

Determine whether Rolle’s Theorem can be applied to f on the closed interval [a,b]. If Rolle’s theorem can be applied, find all values of c in the open.

3.1 Definition of the Derivative & Graphing the Derivative

Differentials Intro The device on the first slide is called a micrometer….it is used for making precision measurements of the size of various objects…..a.

4.1 ANTIDERIVATIVES & INDEFINITE INTEGRATION. Definition of Antiderivative  A function is an antiderivative of f on an interval I if F’(x) = f(x) for.

1 Linear Approximation and Differentials Lesson 3.8b.

Linear approximation and differentials (Section 2.9)

For any function f (x), the tangent is a close approximation of the function for some small distance from the tangent point. We call the equation of the.

Linear Approximation and Differentials Lesson 4.8.

3 Copyright © Cengage Learning. All rights reserved. Applications of Differentiation.

3.9 Differentials. Objectives Understand the concept of a tangent line approximation. Compare the value of a differential, dy, with the actual change.

Miss Battaglia AB/BC Calculus.  /tangent_line/ /tangent_line/ y.

 y’ = 3x and y’ = x are examples of differential equations  Differential Form dy = f(x) dx.

1) The graph of y = 3x4 - 16x3 +24x is concave down for

MTH 251 – Differential Calculus Chapter 3 – Differentiation Section 3.11 Linearization and Differentials Copyright © 2010 by Ron Wallace, all rights reserved.

Miss Battaglia BC Calculus. Let y=f(x) represent a functions that is differentiable on an open interval containing x. The differential of x (denoted by.

3 Copyright © Cengage Learning. All rights reserved. Applications of Differentiation.

Tangent Line Approximations A tangent line approximation is a process that involves using the tangent line to approximate a value. Newton used this method.

Calculus 3-R-b Review Problems Sections 3-5 to 3-7, 3-9.

Find all critical numbers for the function: f(x) = (9 - x 2 ) 3/5. -3, 0, 3.

Area of R = [g(x) – f(x)] dx

5-5 Day 2 Linearization and differentials

Linear approximation and differentials (Section 3.9)

Linear Approximation and Differentials

Warm-Up- Test in the box…

z = z0 + fx(x0,y0)(x – x0) + fy(x0,y0)(y – y0)

3.1 – Derivative of a Function

3.1 – Derivative of a Function

Copyright © Cengage Learning. All rights reserved.

2.9 Linear Approximations and Differentials

Over what interval(s) is f increasing?

Chain Rule AP Calculus.

Linear Approximation and Differentials

Question Find the derivative of Sol..

Section Euler’s Method

AP Calculus AB Chapter 3, Section 1

Section 11.4 – Representing Functions with Power Series

Derivative of Logarithm Function

8. Linearization and differentials

Integration review.

Copyright © Cengage Learning. All rights reserved.

Copyright © Cengage Learning. All rights reserved.

11.10 – Taylor and Maclaurin Series

6.2a DISKS METHOD (SOLIDS OF REVOLUTION)

Copyright © Cengage Learning. All rights reserved.

Open Box Problem Problem: What is the maximum volume of an open box that can be created by cutting out the corners of a 20 cm x 20 cm piece of cardboard?

Linearization and Newton’s Method

Differentials and Error

Copyright © Cengage Learning. All rights reserved.

4.1 – Graphs of the Sine and Cosine Functions

Linear approximation and differentials (Section 3.9)

Volumes by Cylindrical Shells Rita Korsunsky.

3.10 Linear Approximations and Differentials

Integration and the Logarithmic Function

Presentation transcript:

3.9 Differentials Let y = f(x) represent a function that is differentiable in an open interval containing x. The differential of x (denoted by dx) is any nonzero real number. The differential of y (denoted by dy) is given by dy = f’(x) dx

x dy

Comparing Let y = x 2. Find dy when x = 1 and dx = Compare this value to when x = 1 and = dy = f’(x) dx dy = 2x dx dy = 2(1)(.01) =.02 = f(1.01) – f(1) = – 1 2 =.0201 (1, 1) dy = 0.02

Estimation of error. The radius of a ball bearing is measured to be.7 inch. If the measurement is correct to within.01 inch, estimate the propagated error in the Volume of the ball bearing. r =.7 r =.7 and propagated error relative error is Percentage error

Finding differentials Function DerivativeDifferential y = x 2 dy = 2x dx y = 2sin x dy = 2cos x dx y = x cos x y = sin 3x

and dy = f’(x) dx Let x = 100 and