Section 3.6 1. Implicitly differentiate to find dy/dx. y 3 – x 2 = 4.

Slides:

Advertisements

Similar presentations

4.6 Related Rates Any equation involving two or more variables that are differentiable functions of time t can be used to find an equation that relates.

Advertisements

Copyright © 2013, 2009, 2005 Pearson Education, Inc. Section 1.4 Variables, Equations, and Formulas.

Copyright © Cengage Learning. All rights reserved.

Differentiation Using Limits of Difference Quotients

10.4: The Derivative. The average rate of change is the ratio of the change in y to the change in x The instantaneous rate of change of f at a is the.

Cost, revenue, profit Marginals for linear functions Break Even points Supply and Demand Equilibrium Applications with Linear Functions.

Rolle’s Theorem and the Mean Value Theorem. Rolle’s Theorem  Let f be continuous on the closed interval [a, b] and differentiable on the open interval.

Sec. 3.2: Rolle’s Theorem and MVT Rolle’s Theorem: Let f be continuous on the closed interval [a, b] and differentiable on the open interval (a, b). If.

Sales Taxes, Revenue, and Burden. The effect of a sales tax collected from buyers is to A)Shift the demand curve up by the amount of the tax. B)Shift.

Homework Homework Assignment #13 Read Section 3.5 Page 158, Exercises: 1 – 45 (EOO) Rogawski Calculus Copyright © 2008 W. H. Freeman and Company.

ConcepTest Section 4.6 Question 1 A spherical snowball of radius r cm has surface area S cm 2. As the snowball gathers snow, its radius increases as in.

Example: Write Equation of Line Given the X and Y Intercepts

Sec 2.6 – Marginals and Differentials 2012 Pearson Education, Inc. All rights reserved Let C(x), R(x), and P(x) represent, respectively, the total cost,

Displacement and Velocity Chapter 2 Section 1. Displacement Definitions Displacement – The change in position of an object from one point to another in.

Section 3.5 Find the derivative of g (x) = x 2 ln x.

2.8 Related Rates.

© A Very Good Teacher th Grade TAKS Review 2008 Objective 2 Day 1.

Chapter 1 Linear Functions

1.In which year was the amount of rainfall highest? How many inches fell that year. 2.What was the average number of inches of rainfall in 2006? 3.What.

By: Kyler Hall Autrey: AP Calculus March 7, 2011.

Function Notation and Linear Functions

Section Find the derivative of the following function. Use the product rule.

Section 1-2 Exponents and Order of Operations SPI 11E: Apply order of operations when computing with integers SPI 12E: Use estimation to determine a reasonable.

R ELATED R ATES. The Hoover Dam Oil spills from a ruptured tanker and spreads in a circular pattern. If the radius of the oil spill increases at a constant.

Business and Economic Applications. Summary of Business Terms and Formulas  x is the number of units produced (or sold)  p is the price per unit  R.

Champion “Chips” Product Rule Quotient Rule Chain Rule CombosApps

QUADRATIC MODELS: BUILDING QUADRATIC FUNCTIONS

ACT QUESTION OF THE DAY Part A radio station offers free competitions. Normally, one in every twenty contestants wins the free competition. What.

4.4 Find Slope and Rate of Change

3.9 Related Rates 1. Example Assume that oil spilled from a ruptured tanker in a circular pattern whose radius increases at a constant rate of 2 ft/s.

1 §4.2 The Chain Rule (Pages 251~261) Composite Functions: The Chain Rule: Lectures 9 & 10.

Related Rates 5.6. First, a review problem: Consider a sphere of radius 10cm. If the radius changes 0.1cm (a very small amount) how much does the volume.

In this section, we will investigate the question: When two variables are related, how are their rates of change related?

Related Rates. I. Procedure A.) State what is given and what is to be found! Draw a diagram; introduce variables with quantities that can change and constants.

Goldstein/Schneider/Lay/Asmar, CALCULUS AND ITS APPLICATIONS, 11e – Slide 1 of 107 § 2.7 Applications of Derivatives to Business and Economics.

Jeopardy SupplyDemandEquilibriumGov. Interv. Other Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q $300 Q $400 Q $500 Final Jeopardy.

Sullivan PreCalculus Section 2.6 Mathematical Models: Constructing Functions Objectives Construct and analyze functions.

Rev.S08 MAC 1140 Module 9 System of Equations and Inequalities I.

1-2 & 1-3 Functions and Models

SECTION 1.6 MATHEMATICAL MODELS: CONSTRUCTING FUNCTIONS MATHEMATICAL MODELS: CONSTRUCTING FUNCTIONS.

AP CALCULUS AB Chapter 4: Applications of Derivatives Section 4.6: Related Rates.

Mathematical models Section 2.8.

Line of Best Fit 4.2 A. Goal Understand a scatter plot, and what makes a line a good fit to data.

1.8 OTHER TYPES OF INEQUALITIES Copyright © Cengage Learning. All rights reserved.

Warm Up Page 251 Quick Review 1-6 Reference page for Surface Area & Volume formulas.

Copyright © Cengage Learning. All rights reserved. 3 Applications of the Derivative.

Copyright © 2016, 2012 Pearson Education, Inc

9.1 and 9.2 word problems. Solving these word problems… Set up a system of equations Set up a system of equations Solve the system using elimination or.

The fuel gauge of a truck driver friend of yours has quit working. His fuel tank is cylindrical like one shown below. Obviously he is worried about running.

Applications of Derivatives Objective: to find derivatives with respect to time.

2.7 Mathematical Models Some will win, some will lose, some are born to sing the blues. Oh the movie never ends, it goes on and on and on and on. -Journey.

 On any continuous function between points a and b there exists some point(s) c where the tangent line at this point has the same slope as the secant.

Drill: find the derivative of the following 2xy + y 2 = x + y 2xy’ +2y + 2yy’ = 1 + y’ 2xy’ + 2yy’ – y’ = 1 – 2y y’(2x + 2y – 1) = 1 – 2y y’ = (1-2y)/(2x.

4.6 RELATED RATES. STRATEGIES FOR SOLVING RELATED RATES PROBLEMS 1.READ AND UNDERSTAND THE PROBLEM. 2.DRAW AND LABEL A PICTURE. DISTINGUISH BETWEEN CONSTANT.

Copyright © 2016, 2012 Pearson Education, Inc

240,000 20p + a SATMathVideos.Net A) 550 books B) 600 books C) 650 books D) 700 books 1,000 books sold in a month when the price was $10 per book. An equation.

3.10 Business and Economic Applications.

Calculating the Derivative

Solving Application Problems Using System of Equations Section 4.3.

Differentiation 3 Basic Rules of Differentiation The Product and Quotient Rules The Chain Rule Marginal Functions in Economics Higher-Order Derivatives.

Copyright © 2006 Brooks/Cole, a division of Thomson Learning, Inc.

You need two points to calculate slope.

1.4 Rewrite Formulas & Equations

Copyright © 2006 Brooks/Cole, a division of Thomson Learning, Inc.

DERIVATIVES WITH RESPECT TO TIME

30 miles in 1 hour 30 mph 30 miles per hour

Starter Questions Convert the following to minutes :-

Related Rates Chapter 5.5.

Section 3.5 – Related Rates

Calculating speed.

Presentation transcript:

Section 3.6 1. Implicitly differentiate to find dy/dx. y 3 – x 2 = 4

2. Implicitly differentiate to find dy/dx. y 4 – x 3 = 2x

3. Implicitly differentiate to find dy/dx. x 2y = 8

4. Implicitly differentiate to find dy/dx. x(y – 1) 2 = 6

5. Implicitly differentiate to find dy/dx.

6. Implicitly differentiate to find dy/dx and evaluate it at the given point. y 2 – x 3 = 1 at x = 2, y = 3.

7. Implicitly differentiate to find dy/dx and evaluate it at the given point. x 2 y + y 2x = 0 at x = - 2, y = 2.

8. For the following demand equation Implicitly differentiate to find dp/dx. p 2 + p + 2x = 100

9. For the following demand equation Implicitly differentiate to find dp/dx. xp 3 = 36

BUSINESS: Demand Equation – A company’s demand equation is x = (2000 – p 2 ) ½ , where p is the price in dollars. Find dp/dx when p = 50 and interpret your answer. Implicitly differentiate the given function.

BUSINESS: Sales – The number of MP3 music players that a store will sell and their price p (in dollars) are related by the equation 2x 2 = 15,000 – p 2 . Find dx/dp when p = 100 and interpret your answer.

12. BUSINESS: Work Hours - A management consultant estimates that the number h of hours per day that employees will work and their daily pay pf p dollars are related by the equation 60h5 + 2,000,000 = p3. Find dh/dp at p = 200 and interpret your answer.

13. GENERAL” Snowball - A large snowball is melting so that its radius is decreasing at a rate of 2 inches per hour. How fast is the volume decreasing at the moment when the radius is 3 inches away? [The volume if a sphere of a radius r is V = 4/3 (pie) r3 ]

14. Business: Revenue - A company's revenue from selling x units of an item is given as R = 100x – x2 dollars. If sales are increasing at the rate of 80 per day, find how rapidly revenue is growing (in dollars per day) when 400 units have been sold. R = 1000x – x2 R’ = 1000x’ – 2xx’ = x’(1000 – 2x) The quantity sold, x, is increasing at 80 per day. i.e., x’ = 80 when x = 400. R’ = 80[1000 – 2(400)] = 16,000 Therefore the company’s revenue is increasing at $ 16,000 per day.

15. Related Rates: Speeding - A traffic patrol helicopter is stationary a quarter of a mile directly above a highway, as shown below. It’s radar detects a car whose line-of-sight distance from the helicopter is half a mile and is increasing at the rate of 57 mph. Is the car exceeding the highway’s speed limit of 60 mph? 0.25

16. Business: Sales - The number x of printers cartridges that a store will sell per week and their price p (in dollars) are related by the equation x 2 = 4500 – 5p 2. If the price is falling at the rate of $1 per week, find how the sales will change if the current price is $20.