Barnett/Ziegler/Byleen Business Calculus 11e1 Objectives for Section 10.7 Marginal Analysis The student will be able to compute: ■ Marginal cost, revenue.

Slides:

Advertisements

Similar presentations

Differentiation Using Limits of Difference Quotients

Advertisements

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

Dr .Hayk Melikyan Departmen of Mathematics and CS

Chapter 3 Limits and the Derivative

10.7 Marginal Analysis in Business and Economics.

Chapter 7 Additional Integration Topics Section 2 Applications in Business and Economics.

The Derivative. Objectives Students will be able to Use the “Newton’s Quotient and limits” process to calculate the derivative of a function. Determine.

Chapter 2 Functions and Graphs Section 1 Functions.

Marginal Functions in Economics

Chapter 2 Functions and Graphs

Business Calculus More Derivative Applications.  2.6 Differentials We often use Δx to indicate a small change in x, and Δy for a small change in y. It.

Chapter 2 Functions and Graphs Section 1 Functions.

Section 12.1 Techniques for Finding Derivative. Constant Rule Power Rule Sum and Difference Rule.

Objectives for Section 11.2 Derivatives of Exp/Log Functions

Chapter 1 Linear Functions

Chain Rule: Power Form Marginal Analysis in Business and Economics

Chapter 3 Limits and the Derivative Section 7 Marginal Analysis in Business and Economics.

Chapter 1 Functions and Linear Models Sections 1.3 and 1.4.

Chapter 3 Introduction to the Derivative Sections 3. 5, 3. 6, 4

1 §2.4 Optimization. The student will learn how to optimization of a function.

Break-Even Analysis When a company manufactures x units of a product, it spends money. This is total cost and can be thought of as a function C, where.

Section 12.2 Derivatives of Products and Quotients

Objectives for Section 12.4 Curve Sketching Techniques

Basic Calculus for Economists

The mean value theorem and curve sketching

Chapter 2 Linear Systems in Two Variables and Inequalities with Applications Section 2.1.

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.

1 REVIEW REVIEW TEST Find the derivative for y = 3x 2 + 5x - 7 A. y’ = 3x + 5C. y’ = 6x C. y’ = 6x + 5D. y’ = 6x E. None of the above.

SOME BASIC DERIVATIVE d/dx (c) = 0d/dx (x n ) = n x n-1 d/dx (uv) = u dv/dx +v du/dx d/dx (x) = 1d/dx (u+v) = du/dx + dv/dx The derivative of is Can you.

Chapter 6 Integration Section 5 The Fundamental Theorem of Calculus.

Chapter 3 Limits and the Derivative

Summary C(x) is the cost function C(x)/x is the average cost C’(x) is the marginal cost p(x) is the demand function which is the price per unit if we sell.

Barnett/Ziegler/Byleen Business Calculus 11e Introduction to Limits The graph of the function y = f (x) is the graph of the set of all ordered pairs.

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

Steps in Solving Optimization Problems:

MAT Applied Calculus 3.4 – Marginal Functions in Economics

Steps in Solving Optimization Problems:

B.1.2 – Derivatives of Power Functions

Warm-Up: (let h be measured in feet) h(t) = -5t2 + 20t + 15

Differentiation, Curve Sketching, and Cost Functions.

Chapter 4 Additional Derivative Topics

1 §2.2 Product and Quotient Rules The student will learn about derivatives marginal averages as used in business and economics, and involving products,involving.

Chapter 5 Graphing and Optimization Section 6 Optimization.

Sections 4.1 and 4.2 Linear Functions and Their Properties Linear Models.

4 Techniques of Differentiation with Applications

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

Chapter 3 Limits and the Derivative

Chapter 3 Limits and the Derivative Section 3 Continuity.

Barnett/Ziegler/Byleen Business Calculus 11e1 Objectives for Section 13.5 Fundamental Theorem of Calculus ■ The student will be able to evaluate definite.

Copyright © 2016, 2012 Pearson Education, Inc

1.8 The Derivative as a Rate of Change. An important interpretation of the slope of a function at a point is as a rate of change.

Barnett/Ziegler/Byleen Business Calculus 11e1 Learning Objectives for Section 10.6 Differentials The student will be able to apply the concept of increments.

Learning Objectives for Section 10.4 The Derivative

LESSON 42 – RATES OF CHANGE (APPLICATIONS OF DERIVATIVES) - MOTION Math HL1 - Santowski 3/7/15 1 IBHL1 - Calculus - Santowski.

Chapter 6 Integration Section 5 The Fundamental Theorem of Calculus (Day 2)

Copyright © Cengage Learning. All rights reserved. 2 Differentiation.

1 Copyright © 2015, 2011, and 2008 Pearson Education, Inc. Chapter 2 Limits and the Derivative Section 7 Marginal Analysis in Business and Economics.

Economic Definitions Profit = Revenue – Cost P(x) = R(x) – C(x) Assume the cost of producing x radios is C(x) =.4x 2 +7x + 95 dollars. A. Find the cost.

Calculating the Derivative

1 Copyright © 2015, 2011, and 2008 Pearson Education, Inc. Chapter 1 Functions and Graphs Section 1 Functions.

Chapter 12 Graphing and Optimization

§ 1.7 More About Derivatives.

Chapter 10 Limits and the Derivative

Chapter 2 Functions and Graphs

Chapter 10 Limits and the Derivative

Chapter 10 Limits and the Derivative

Algebra: Graphs, Functions, and Linear Systems

Lesson 9: Marginal Analysis

Chapter 10 Limits and the Derivative

Chapter 2 Limits and the Derivative

Presentation transcript:

Barnett/Ziegler/Byleen Business Calculus 11e1 Objectives for Section 10.7 Marginal Analysis The student will be able to compute: ■ Marginal cost, revenue and profit ■ Marginal average cost, revenue and profit ■ The student will be able to solve applications

Barnett/Ziegler/Byleen Business Calculus 11e2 Marginal Cost Remember that marginal refers to an instantaneous rate of change, that is, a derivative. Definition: If x is the number of units of a product produced in some time interval, then Total cost = C(x) Marginal cost = C’(x)

Barnett/Ziegler/Byleen Business Calculus 11e3 Marginal Revenue and Marginal Profit Definition: If x is the number of units of a product sold in some time interval, then Total revenue = R(x) Marginal revenue = R’(x) If x is the number of units of a product produced and sold in some time interval, then Total profit = P(x) = R(x) – C(x) Marginal profit = P’(x) = R’(x) – C’(x)

Barnett/Ziegler/Byleen Business Calculus 11e4 Marginal Cost and Exact Cost Assume C(x) is the total cost of producing x items. Then the exact cost of producing the (x + 1)st item is C(x + 1) – C(x). The marginal cost is an approximation of the exact cost. C’(x) ≈ C(x + 1) – C(x). Similar statements are true for revenue and profit.

Barnett/Ziegler/Byleen Business Calculus 11e5 Example 1 The total cost of producing x electric guitars is C(x) = 1, x – 0.25x 2. 1.Find the exact cost of producing the 51 st guitar. 2.Use the marginal cost to approximate the cost of producing the 51 st guitar.

Barnett/Ziegler/Byleen Business Calculus 11e6 Example 1 (continued) The total cost of producing x electric guitars is C(x) = 1, x – 0.25x 2. 1.Find the exact cost of producing the 51 st guitar. The exact cost is C(x + 1) – C(x). C(51) – C(50) = 5, – 5375 = $ Use the marginal cost to approximate the cost of producing the 51 st guitar. The marginal cost is C’(x) = 100 – 0.5x C’(50) = $75.

Barnett/Ziegler/Byleen Business Calculus 11e7 Marginal Average Cost Definition: If x is the number of units of a product produced in some time interval, then Average cost per unit = Marginal average cost =

Barnett/Ziegler/Byleen Business Calculus 11e8 If x is the number of units of a product sold in some time interval, then Average revenue per unit = Marginal average revenue = If x is the number of units of a product produced and sold in some time interval, then Average profit per unit = Marginal average profit = Marginal Average Revenue Marginal Average Profit

Barnett/Ziegler/Byleen Business Calculus 11e9 Warning! To calculate the marginal averages you must calculate the average first (divide by x), and then the derivative. If you change this order you will get no useful economic interpretations. STOP

Barnett/Ziegler/Byleen Business Calculus 11e10 Example 2 The total cost of printing x dictionaries is C(x) = 20, x 1. Find the average cost per unit if 1,000 dictionaries are produced.

Barnett/Ziegler/Byleen Business Calculus 11e11 Example 2 (continued) The total cost of printing x dictionaries is C(x) = 20, x 1. Find the average cost per unit if 1,000 dictionaries are produced. = $30

Barnett/Ziegler/Byleen Business Calculus 11e12 Example 2 (continued) 2.Find the marginal average cost at a production level of 1,000 dictionaries, and interpret the results.

Barnett/Ziegler/Byleen Business Calculus 11e13 Example 2 (continued) 2.Find the marginal average cost at a production level of 1,000 dictionaries, and interpret the results. Marginal average cost = This means that if you raise production from 1,000 to 1,001 dictionaries, the price per book will fall approximately 2 cents.

Barnett/Ziegler/Byleen Business Calculus 11e14 Example 2 (continued) 3. Use the results from above to estimate the average cost per dictionary if 1,001 dictionaries are produced.

Barnett/Ziegler/Byleen Business Calculus 11e15 Example 2 (continued) 3. Use the results from above to estimate the average cost per dictionary if 1,001 dictionaries are produced. Average cost for 1000 dictionaries = $30.00 Marginal average cost = The average cost per dictionary for 1001 dictionaries would be the average for 1000, plus the marginal average cost, or $ $(- 0.02) = $29.98

Barnett/Ziegler/Byleen Business Calculus 11e16 The price-demand equation and the cost function for the production of television sets are given by where x is the number of sets that can be sold at a price of $p per set, and C(x) is the total cost of producing x sets. 1. Find the marginal cost. Example 3

Barnett/Ziegler/Byleen Business Calculus 11e17 The price-demand equation and the cost function for the production of television sets are given by where x is the number of sets that can be sold at a price of $p per set, and C(x) is the total cost of producing x sets. 1. Find the marginal cost. Solution: The marginal cost is C’(x) = $30. Example 3 (continued)

Barnett/Ziegler/Byleen Business Calculus 11e18 2.Find the revenue function in terms of x. Example 3 (continued)

Barnett/Ziegler/Byleen Business Calculus 11e19 2.Find the revenue function in terms of x. The revenue function is 3. Find the marginal revenue. Example 3 (continued)

Barnett/Ziegler/Byleen Business Calculus 11e20 2.Find the revenue function in terms of x. The revenue function is 3. Find the marginal revenue. The marginal revenue is 4.Find R’(1500) and interpret the results. Example 3 (continued)

Barnett/Ziegler/Byleen Business Calculus 11e21 2.Find the revenue function in terms of x. The revenue function is 3. Find the marginal revenue. The marginal revenue is 4.Find R’(1500) and interpret the results. At a production rate of 1,500, each additional set increases revenue by approximately $200. Example 3 (continued)

Barnett/Ziegler/Byleen Business Calculus 11e22 Example 3 (continued) 5. Graph the cost function and the revenue function on the same coordinate. Find the break-even point. 0 < y < 700,000 0 < x < 9,000

Barnett/Ziegler/Byleen Business Calculus 11e23 Example 3 (continued) 5. Graph the cost function and the revenue function on the same coordinate. Find the break-even point. 0 < y < 700,000 0 < x < 9,000 (600,168,000) (7500, 375,000) Solution: There are two break-even points. C(x)C(x) R(x)R(x)

Barnett/Ziegler/Byleen Business Calculus 11e24 6.Find the profit function in terms of x. Example 3 (continued)

Barnett/Ziegler/Byleen Business Calculus 11e25 6.Find the profit function in terms of x. The profit is revenue minus cost, so 7.Find the marginal profit. Example 3 (continued)

Barnett/Ziegler/Byleen Business Calculus 11e26 6.Find the profit function in terms of x. The profit is revenue minus cost, so 7.Find the marginal profit. 8. Find P’(1500) and interpret the results. Example 3 (continued)

Barnett/Ziegler/Byleen Business Calculus 11e27 6.Find the profit function in terms of x. The profit is revenue minus cost, so 7.Find the marginal profit. 8. Find P’(1500) and interpret the results. At a production level of 1500 sets, profit is increasing at a rate of about $170 per set. Example 3 (continued)