TM 661 M2 - Probs II. Consider a simple five year investment project with discrete end-of-year cash flows shown below. Revenue at the end of year one.

Slides:

Advertisements

Similar presentations

Chapter 4 More Interest Formulas

Advertisements

Example 1: In the following cash flow diagram, A8=A9=A10=A11=5000, and

William F. Bentz1 Session 11 - Interest Cost. William F. Bentz2 Interest A.Interest is the compensation that must be paid by a borrower for the use of.

Interest and Equivalence L. K. Gaafar. Interest and Equivalence Example: You borrowed $5,000 from a bank and you have to pay it back in 5 years. There.

Chapter 2 Solutions 1 TM 661Chapter 3 Solutions 1 5) If you desire a real return of 8% on your money, excluding inflation, and inflation is running 3%,

APPLICATIONS OF MONEY-TIME RELATIONSHIPS

Chapter 3 Measuring Wealth: Time Value of Money

1 Warm-Up Review Homepage Rule of 72 Single Sum Compounding Annuities.

Engineering Economics Outline Overview

1 Dr. Lotfi K.GAAFAR Eng. Ahmed Salah RIFKY ENGR 345 Engineering Economy.

Borrowing, Lending, and Investing

TM 661 Engineering Economics for Managers

InvestmentWorth Investment Worth. Given a minimum attractive rate-of-return, be able to evaluate the investment worth of a project using Net Present Worth.

Multiple Investment Alternatives Sensitivity Analysis.

McGraw-Hill /Irwin Copyright © 2008 by The McGraw-Hill Companies, Inc. All rights reserved. May 31 Capital Budgeting Decisions.

8/25/04 Valerie Tardiff and Paul Jensen Operations Research Models and Methods Copyright All rights reserved Economic Decision Making Decisions.

State University of New York WARNING All rights reserved. No part of the course materials used in the instruction of this course may be reproduced in any.

Contemporary Engineering Economics, 4 th edition, © 2007 Discounted Cash Flow Analysis Lecture No.16 Chapter 5 Contemporary Engineering Economics Copyright.

Irwin/McGraw-Hill © The McGraw-Hill Companies, Inc., 2000 Chapter Three Opportunity Cost of Capital and of Capital and Capital Budgeting.

Advanced Engineering Economy Contemporary Engineering Economics, 5th edition, © 2010.

Quiz Book Summer 2003 Prepared by: Eng. Ahmed Taha.

Topic 9 Time Value of Money.

CHAPTER 6 Discounted Cash Flow Valuation. Key Concepts and Skills Be able to compute the future value of multiple cash flows Be able to compute the present.

FINAL EXAM REVIEW Spring Nominal and Effective Interest Rates Payment Period  Compounding Period Mortgages and Car Loans MARR and WACC Present.

Test 2 solution sketches Note for multiple-choice questions: Choose the closest answer.

Chapter 4 The Time Value of Money Chapter Outline

Naval Postgraduate School Time Value of Money Discounted Cash Flow Techniques Source: Raymond P. Lutz, “Discounted Cash Flow Techniques,” Handbook of Industrial.

EGR Interest and Interest Rate Interest, I ($) = amount owed now – original amount A)$1000 placed in bank account one year ago is now worth.

Intro to Engineering Economy

FINAL EXAM REVIEW Fall Nominal and Effective Interest Rates Payment Period  Compounding Period Mortgages and Car Loans MARR and WACC Present Worth.

Chapter 7 Rate of Return Analysis

Test 1 solution sketches Note for multiple-choice questions: Choose the closest answer.

Rate of Return Analysis

Finance 2009 Spring Chapter 4 Discounted Cash Flow Valuation.

Example [1] Time Value of Money

1 Reviewing…Reviewing… EAW and Types of Projects: Revenue projects are expected to make money at a rate at least as high as the MARR, select largest EAW.

Comparing Projects Using Time Value of Money

Summer 2012 Test 1 solution sketches. 1(a) If the effective annual discount rate is 12.5%, then what is the effective discount rate for 9 months? The.

Engineering Orientation Engineering Economics. Value and Interest The value of a dollar given to you today is of greater value than that of a dollar given.

Multiple/Continuous Compounding. Understand Effective Interest Rates Figure out how to use Inflation/Deflation in your decisions.

TM 661 Engineering Economics for Managers Unit 2 Multiple/Continuous Compounding.

Net Present Worth Review NPW can compare mutually exclusive projects or prioritize investments (using Incremental Analysis) Criteria: Choose highest NPW.

Interest and Interest Rate Interest ($) = amount owed now – original amount A)$1000 placed in bank account one year ago is now worth $1025. Interest earned.

Solution sketches, Test 2 Ordering of the problems is the same as in Version D.

Copyright © 2011 Pearson Education, Inc. Managing Your Money.

Present Value Present value is the current value of a future sum.

TIME VALUE OF MONEY A dollar on hand today is worth more than a dollar to be received in the future because the dollar on hand today can be invested to.

Chapter 3 Time Value of Money © 2007 Thomson South-Western Professor XXX Course name/number.

Engineering Orientation Engineering Economics. Value and Interest Cost of Money Simple and Compound Interest Cash Flow Diagrams Cash Flow Patterns Equivalence.

1 Chapter 7 Rate of Return Analysis. 2 Recall the $5,000 debt example in chapter 3. Each of the four plans were used to repay the amount of $5000. At.

Opportunity Cost of Capital and Capital Budgeting Chapter Three Copyright © 2014 by The McGraw-Hill Companies, Inc. All rights reserved. McGraw-Hill/Irwin.

The Time value of Money Time Value of Money is the term used to describe today’s value of a specified amount of money to be receive at a certain time in.

12/17/2015rd1 Engineering Economic Analysis Chapter 15  Selection of a MARR.

Lecture Outline Basic time value of money (TVM) relationship

Engineering Your Future Engineering Economics Economics Value and Interest The value of a dollar given to you today is of greater value than that.

1 Engineering Economics.  Money has a time value because it can earn more money over time (earning power).  Money has a time value because its purchasing.

Example 1: Because of general price inflation in the economy, the purchasing power of the Turkish Lira shrinks with the passage of time. If the general.

Test 1 solution sketches Note for multiple-choice questions: Choose the closest answer.

ENGM 661 Engineering Economics for Managers InvestmentWorth Investment Worth.

Living with the lab Engineering Economics - Cash Flow Diagrams Cash flow diagrams provide a simple way to visualize the cash that comes “in” and the cash.

Engineering Economics Exam 2 Review. CASH FLOW DIAGRAM Yes -- you do need the Sticks!!

Consider a principal P invested at rate r compounded annually for n years: Compound Interest After the first year: so that the total is now 1.

1 Equivalence Between Two Cash Flows Step 1: Determine the base period, say, year 5. Step 2: Identify the interest rate to use. Step 3: Calculate equivalence.

EGGC4214 Systems Engineering & Economy Lecture 6 Rate of Return Analysis 1.

TM 661 Chapter 3 Solutions 1 Chapter 2 Solutions 1

PROBLEM SOLVING.

Inflation and Its Effects on Project Cash Flows

Meaning and Measure of Inflation

Example 1: Because of general price inflation in the economy, the purchasing power of the Turkish Lira shrinks with the passage of time. If the general.

Presentation transcript:

TM 661 M2 - Probs II

Consider a simple five year investment project with discrete end-of-year cash flows shown below. Revenue at the end of year one is estimated to be 20,000 which is expected to experience a 10% geometric growth rate so that in year five revenues are estimated to be 29,282. In addition, the project has an estimated salvage value in year 5 of 10,000. Year Cash Flow 0 $-100, , , , , ,282 Determine the Present Worth equivalent if the value of money is 10% compounded annually.

Year Cash Flow 0 $-100, , , , , ,282 Determine the Present Worth equivalent if the value of money is 10% compounded annually.

Year Cash Flow 0 $-100, , , , , ,282 Determine the Present Worth equivalent if the value of money is 10% compounded continuously.

Year Cash Flow 0 $-100, , , , , ,282 Determine the Present Worth equivalent if the value of money is 10% compounded continuously.

A bank advertises a certificate of deposit which pays 6% per year. Compute the effective annual interest rate (yield) if the bank a.compounds monthly. b.uses continuous compounding.

A bank advertises a certificate of deposit which pays 6% per year. Compute the effective annual interest rate (yield) if the bank a.compounds monthly. b.uses continuous compounding.

You are given the following cash flow. You are also given that for a specified MARR of 10%, the Net Present Worth is $40,000. PeriodCash Flow 0-$250, , ,000 3 A 3 4 A ,000 A 3 and A 4 represent the cash flow streams in periods 3 and 4. These are unknown and are not necessarily equivalent. However, you are also given that at a MARR of 10%, the net present worth (this includes the –250,000 at time 0) of the project is $40,000. a. Compute the Equivalent Uniform Annual Worth for this cash flow.

PeriodCash Flow 0-$250, , ,000 3 A 3 4 A ,000 NPW = 40,000

PeriodCash Flow 0-$250, , ,000 3 A 3 4 A ,000 b.Is the IRR for this project greater, less than, or equal to the MARR? NPW = 40,000 IRR > MARR

You are considering purchasing a bond for $9,000. The bond has a stated face value of $10,000 and pays 6% bond dividends per year. The bond has a remaining life of 5 years at which time the face value of $10,000 will be paid out. a. Compute the effective interest rate (IRR) earned for the bond. (If you choose to iterate to a solution, you need only show 2 iterations and then indicate how you would find the final solution.) ,000 9,000

,000 9,000 i NPW 10 8, , ,202 i = 8.5%

,000 9,000 No No b. If MARR is 10%, would you invest? IRR = 8.5% < MARR

,000 9,000 b. Set up the formula for ERR?

,000 9,000

,000 9,000

,000 9,000

,000 9, ln(').  i

,000 9, ln(').  i Note: IRR < ERR < MARR 8.5% < 8.7% < 10%

You are given the following cash flow diagram. MARR = 10% per period. Compute the NPW. 100,000 20,000 10,000 20,

You are given the following cash flow diagram. MARR = 10% per period. Compute the NPW. 100,000 20,000 10,000 20,

Compute the EUAW. 100,000 20,000 10,000 20,

K-Corp is considering investing in a machine which costs $40,000. Estimated revenues from the investment (above and beyond additional maintenance costs) are estimated to be $8,000 per year over the 7 year life of the machine. In addition, the machine has an estimated salvage value of $5,000 in year 7. The cash flow is given below. Compute an equivalent single period at t = ,000 5,000 40,000

,000 5,000 40,000 P3P3

,000 5,000 40,000 P3P3

Suppose you invest $3,000 per year in a mutual fund that historically earns an average of 10% per year on all monies invested. All money is invested at the start of each year (beginning of period payments). a.Compute the value of the fund at the end of 30 years. b.Because of the effects of inflation, you are considering changing mutual funds. If you desire a real rate of return of 10% after you discount out the effects of inflation, what combined interest rate should you be looking for?

Suppose you invest $3,000 per year in a mutual fund that historically earns an average of 10% per year on all monies invested. All money is invested at the start of each year (beginning of period payments). a.Compute the value of the fund at the end of 30 years. F ,000

b.Compute the value of the fund at the end of 20 years. F ,000

b.Compute the value of the fund at the end of 20 years. F F F A F P  ,(,,)(,,)  007$189, 3,000

b.Because of the effects of inflation, you are considering changing mutual funds. If you desire a real rate of return of 10% after you discount out the effects of inflation, what combined interest rate should you be looking for? d =10% f = 4%