Chapter 3 Mathematics of Finance

Slides:

Advertisements

Similar presentations

Chapter 5 Mathematics of Finance.

Advertisements

Chapter 03: Mortgage Loan Foundations: The Time Value of Money

Chapter 5 Mathematics of Finance.

McGraw-Hill/Irwin Copyright © 2009 by The McGraw-Hill Companies, Inc. All rights reserved. Chapter 11 The Time Value of Money.

Chapter 3 Mathematics of Finance

Risk, Return, and the Time Value of Money

Exam 2 Practice Problems

Computer Science & Engineering 2111 Lecture 6 Financial Functions 1CSE 2111 Lecture 6-Financial Functions.

Time Value of Money.

Learning Objectives for Section 3.2

Copyright © Cengage Learning. All rights reserved.

Chapter 3 Mathematics of Finance

Chapter 3 Mathematics of Finance

Chapter 1 Linear Equations and Graphs

Key Concepts and Skills

Chapter 4 Systems of Linear Equations; Matrices

Chapter 4 Systems of Linear Equations; Matrices

Time Value of Money Time value of money: $1 received today is not the same as $1 received in the future. How do we equate cash flows received or paid at.

Objectives Discuss the role of time value in finance, the use of computational tools, and the basic patterns of cash flow. Understand the concepts of.

Copyright © Cengage Learning. All rights reserved.

Copyright © Cengage Learning. All rights reserved.

MATH 3286 Mathematics of Finance

Test B, 100 Subtraction Facts

Copyright © 2008 Pearson Education Canada11-1 Chapter 11 Ordinary Simple Annuities Contemporary Business Mathematics With Canadian Applications Eighth.

Chapter 3 Mathematics of Finance Section 3 Future Value of an Annuity; Sinking Funds.

Chapter 4 Systems of Linear Equations; Matrices

Chapter 5. The Time Value of Money Simple Interest n Interest is earned on principal n $100 invested at 6% per year n 1 st yearinterest is $6.00 n 2.

Key Concepts and Skills

Your Money and and Your Math Chapter Credit Cards and Consumer Credit

Chapter 3 Mathematics of Finance

Chapter 3 Mathematics of Finance

What is Compound Interest? Compound interest is interest that is compounded at certain intervals or earned continuously (all the time). Annually: A = P(1.

Annuities Section 5.3.

3.3 Future value of an Annuity;Sinking Funds An annuity is any sequence of equal periodic payments. An ordinary annuity is one in which payments are made.

Section 1.1, Slide 1 Copyright © 2014, 2010, 2007 Pearson Education, Inc. Section 8.4, Slide 1 Consumer Mathematics The Mathematics of Everyday Life 8.

4 The Time Value Of Money.

Section 1.1, Slide 1 Copyright © 2014, 2010, 2007 Pearson Education, Inc. Section 8.4, Slide 1 Consumer Mathematics The Mathematics of Everyday Life 8.

Warm up You took out a loan for $1460 and the bank gave you a 5 year add on loan at an interest rate of 10.4%. How much interest will you pay and how much.

Chapter 5 Mathematics of Finance

Mathematics of finance

Understanding the Time Value of Money

Present Value of an Annuity; Amortization (3.4) In this section, we will address the problem of determining the amount that should be deposited into an.

Chapter 5. The Time Value of Money Simple Interest n Interest is earned on principal n $100 invested at 6% per year n 1 st yearinterest is $6.00 n 2.

Chapter 3 Mathematics of Finance Section 3 Future Value of an Annuity; Sinking Funds.

Annuities ©2014 Cengage Learning. All Rights Reserved. May not be scanned, copied or duplicated, or posted to a publicly accessible website, in whole or.

Mathematics of Finance

Exponential Functions and their Graphs

Chapter 9: Mathematics of Finance

Formulas for Compound Interest

MTH108 Business Math I Lecture 25.

Chapter 3 Mathematics of Finance

Sections 4.1, 4.2, 4.3, 4.4 Suppose the payments for an annuity are level, but the payment period and the interest conversion period differ. One approach.

HAWKES LEARNING Students Count. Success Matters. Copyright © 2015 by Hawkes Learning/Quant Systems, Inc. All rights reserved. Section 9.3 Saving Money.

Future Value of an Ordinary Simple Annuity Annuity - Series of equal payments or deposits earning compound interest and made at regular intervals over.

Barnett/Ziegler/Byleen Finite Mathematics 11e1 Chapter 3 Review Important Terms, Symbols, Concepts 3.1. Simple Interest Interest is the fee paid for the.

8 – 5 Properties of Logarithms Day 2

Annuities, Loans, and Mortgages Section 3.6b. Annuities Thus far, we’ve only looked at investments with one initial lump sum (the Principal) – but what.

1 IIS Chapter 5 - The Time Value of Money. 2 IIS The Time Value of Money Compounding and Discounting Single Sums.

Compound Interest Formula. Compound interest arises when interest is added to the principal, so that, from that moment on, the interest that has been.

Determine the amount saved if $375 is deposited every month for 6 years at 5.9% per year compounded monthly. N = 12 X 6 = 72 I% = 5.9 PV = 0 PMT = -375.

Annuities; Loan Repayment  Find the 5-year future value of an ordinary annuity with a contribution of $500 per quarter into an account that pays 8%

Lesson 2 – Annuities Learning Goal I can solve for the future value of an annuity.

QMT 3301 BUSINESS MATHEMATICS

Simple Interest Formula I = PRT.

Chapter 3 Mathematics of Finance

Chapter 3 Mathematics of Finance

Chapter 3 Mathematics of Finance

Lial/Hungerford/Holcomb/Mullins: Mathematics with Applications 11e Finite Mathematics with Applications 11e Copyright ©2015 Pearson Education, Inc. All.

Copyright © 2019 Pearson Education, Inc.

Presentation transcript:

Chapter 3 Mathematics of Finance Section 3 Future Value of an Annuity; Sinking Funds

Learning Objectives for Section 3.3 Future Value of an Annuity: Sinking Funds The student will be able to compute the future value of an annuity. The student will be able to solve problems involving sinking funds. The student will be able to approximate interest rates of annuities. Barnett/Ziegler/Byleen Finite Mathematics 12e

Definition of Annuity An annuity is any sequence of equal periodic payments. An ordinary annuity is one in which payments are made at the end of each time interval. If for example, $100 is deposited into an account every quarter (3 months) at an interest rate of 8% per year, the following sequence illustrates the growth of money in the account after one year: 3rd qtr 2nd quarter 1st quarter This amount was just put in at the end of the 4th quarter, so it has earned no interest. Barnett/Ziegler/Byleen Finite Mathematics 12e

General Formula for Future Value of an Annuity where FV = future value (amount) PMT = periodic payment i = rate per period n = number of payments (periods) Note: Payments are made at the end of each period. Barnett/Ziegler/Byleen Finite Mathematics 12e

Example Suppose a $1000 payment is made at the end of each quarter and the money in the account is compounded quarterly at 6.5% interest for 15 years. How much is in the account after the 15 year period? Barnett/Ziegler/Byleen Finite Mathematics 12e

Example Suppose a $1000 payment is made at the end of each quarter and the money in the account is compounded quarterly at 6.5% interest for 15 years. How much is in the account after the 15 year period? Solution: Barnett/Ziegler/Byleen Finite Mathematics 12e

Amount of Interest Earned How much interest was earned over the 15 year period? Barnett/Ziegler/Byleen Finite Mathematics 12e

Amount of Interest Earned Solution How much interest was earned over the 15 year period? Solution: Each periodic payment was $1000. Over 15 years, 15(4)=60 payments were made for a total of $60,000. Total amount in account after 15 years is $100,336.68. Therefore, amount of accrued interest is $100,336.68 - $60,000 = $40,336.68. Barnett/Ziegler/Byleen Finite Mathematics 12e

Graphical Display Barnett/Ziegler/Byleen Finite Mathematics 12e

Balance in the Account at the End of Each Period Barnett/Ziegler/Byleen Finite Mathematics 12e

Sinking Fund Definition: Any account that is established for accumulating funds to meet future obligations or debts is called a sinking fund. The sinking fund payment is defined to be the amount that must be deposited into an account periodically to have a given future amount. Barnett/Ziegler/Byleen Finite Mathematics 12e

Sinking Fund Payment Formula To derive the sinking fund payment formula, we use algebraic techniques to rewrite the formula for the future value of an annuity and solve for the variable PMT: Barnett/Ziegler/Byleen Finite Mathematics 12e

Sinking Fund Sample Problem How much must Harry save each month in order to buy a new car for $12,000 in three years if the interest rate is 6% compounded monthly? Barnett/Ziegler/Byleen Finite Mathematics 12e

Sinking Fund Sample Problem Solution How much must Harry save each month in order to buy a new car for $12,000 in three years if the interest rate is 6% compounded monthly? Solution: Barnett/Ziegler/Byleen Finite Mathematics 12e

Approximating Interest Rates Example Mr. Ray has deposited $150 per month into an ordinary annuity. After 14 years, the annuity is worth $85,000. What annual rate compounded monthly has this annuity earned during the 14 year period? Barnett/Ziegler/Byleen Finite Mathematics 12e

Approximating Interest Rates Solution Mr. Ray has deposited $150 per month into an ordinary annuity. After 14 years, the annuity is worth $85,000. What annual rate compounded monthly has this annuity earned during the 14 year period? Solution: Use the FV formula: Here FV = $85,000, PMT = $150 and n, the number of payments is 14(12) = 168. Substitute these values into the formula. Solution is approximated graphically. Barnett/Ziegler/Byleen Finite Mathematics 12e

Solution (continued) Graph each side of the last equation separately on a graphing calculator and find the point of intersection. Barnett/Ziegler/Byleen Finite Mathematics 12e

Solution (continued) Graph of y = 566.67 Graph of y = The monthly interest rate is about 0.01253 or 1.253%. The annual interest rate is about 15%. Barnett/Ziegler/Byleen Finite Mathematics 12e