Presentation is loading. Please wait.

Presentation is loading. Please wait.

D- 1 Interest  Payment for the use of money.  Excess cash received or repaid over the amount borrowed (principal). Variables involved in financing transaction:

Similar presentations


Presentation on theme: "D- 1 Interest  Payment for the use of money.  Excess cash received or repaid over the amount borrowed (principal). Variables involved in financing transaction:"— Presentation transcript:

1 D- 1 Interest  Payment for the use of money.  Excess cash received or repaid over the amount borrowed (principal). Variables involved in financing transaction: 1.Principal (p) - Amount borrowed or invested. 2.Interest Rate (i) – An annual percentage. 3.Time (n) - The number of years or portion of a year that the principal is borrowed or invested. LO 1 Distinguish between simple and compound interest. Nature of Interest

2 D- 2 LO 1 Distinguish between simple and compound interest. Nature of Interest  Interest computed on the principal only. Illustration: Assume you borrow $5,000 for 2 years at a simple interest of 12% annually. Calculate the annual interest cost. Interest = p x i x n = $5,000 x.12 x 2 = $1,200 FULL YEAR Illustration D-1 Simple Interest

3 D- 3 LO 1 Distinguish between simple and compound interest. Nature of Interest  Computes interest on ► the principal and ► any interest earned that has not been paid or withdrawn.  Most business situations use compound interest. Compound Interest

4 D- 4 LO 1 Distinguish between simple and compound interest. Compound Interest Illustration: Assume that you deposit $1,000 in Bank Two, where it will earn simple interest of 9% per year, and you deposit another $1,000 in Citizens Bank, where it will earn compound interest of 9% per year compounded annually. Also assume that in both cases you will not withdraw any interest until three years from the date of deposit. Year 1 $1,000.00 x 9%$ 90.00$ 1,090.00 Year 2 $1,090.00 x 9%$ 98.10$ 1,188.10 Year 3 $1,188.10 x 9%$106.93$ 1,295.03 Illustration D-2 Simple versus compound interest

5 D- 5 LO 2 Solve for a future value of a single amount. Future Value Concepts Future value of a single amount is the value at a future date of a given amount invested, assuming compound interest. FV = p x (1 + i )n FV =future value of a single amount p =principal (or present value; the value today) i =interest rate for one period n =number of periods Illustration C-3 Formula for future value Future Value of a Single Amount

6 D- 6 Illustration: If you want a 9% rate of return, you would compute the future value of a $1,000 investment for three years as follows: Illustration D-4 LO 2 Solve for a future value of a single amount. Future Value of a Single Amount

7 D- 7 What factor do we use? LO 2 Solve for a future value of a single amount. $1,000 Present ValueFactorFuture Value x 1.29503= $1,295.03 Future Value of a Single Amount

8 D- 8 What table do we use? Illustration: LO 2 Solve for a future value of a single amount. Illustration D-5 Future Value of a Single Amount

9 D- 9 $20,000 Present ValueFactorFuture Value x 2.85434= $57,086.80 LO 2 Solve for a future value of a single amount. Future Value of a Single Amount

10 D- 10

11 D- 11 LO 3 Solve for a future value of an annuity. Future value of an annuity is the sum of all the payments (receipts) plus the accumulated compound interest on them. Necessary to know the 1.interest rate, 2.number of compounding periods, and 3.amount of the periodic payments or receipts. Future Value of an Annuity

12 D- 12 Illustration: Assume that you invest $2,000 at the end of each year for three years at 5% interest compounded annually. Illustration D-6 LO 3 Solve for a future value of an annuity. Future Value of an Annuity

13 D- 13 Illustration: Invest = $2,000 i = 5% n = 3 years LO 3 Solve for a future value of an annuity. Illustration D-7 Future Value of an Annuity

14 D- 14 When the periodic payments (receipts) are the same in each period, the future value can be computed by using a future value of an annuity of 1 table. Illustration: Illustration D-8 LO 3 Solve for a future value of an annuity. Future Value of an Annuity

15 D- 15 What factor do we use? $2,500 PaymentFactorFuture Value x 4.37462= $10,936.55 LO 3 Solve for a future value of an annuity. Future Value of an Annuity

16 D- 16 LO 4 Identify the variables fundamental to solving present value problems. The present value is the value now of a given amount to be paid or received in the future, assuming compound interest. Present value variables: 1.Dollar amount to be received in the future, 2.Length of time until amount is received, and 3.Interest rate (the discount rate). Present Value Concepts

17 D- 17 Present Value = Future Value ÷ (1 + i ) n Illustration D-9 Formula for present value p = principal (or present value) i = interest rate for one period n = number of periods LO 5 Solve for present value of a single amount. Present Value of a Single Amount

18 D- 18 LO 5 Solve for present value of a single amount. Illustration: If you want a 10% rate of return, you would compute the present value of $1,000 for one year as follows: Illustration D-10 Present Value of a Single Amount

19 D- 19 What table do we use? LO 5 Solve for present value of a single amount. Illustration D-10 Illustration: If you want a 10% rate of return, you can also compute the present value of $1,000 for one year by using a present value table. Present Value of a Single Amount

20 D- 20 $1,000x.90909= $909.09 What factor do we use? LO 5 Solve for present value of a single amount. Future ValueFactorPresent Value Present Value of a Single Amount

21 D- 21 What table do we use? LO 5 Solve for present value of a single amount. Illustration D-11 Illustration: If you receive the single amount of $1,000 in two years, discounted at 10% [PV = $1,000 / 1.10 2 ], the present value of your $1,000 is $826.45. Present Value of a Single Amount

22 D- 22 $1,000x.82645= $826.45 Future ValueFactorPresent Value What factor do we use? LO 5 Solve for present value of a single amount. Present Value of a Single Amount

23 D- 23 $10,000x.79383= $7,938.30 LO 5 Solve for present value of a single amount. Illustration: Suppose you have a winning lottery ticket and the state gives you the option of taking $10,000 three years from now or taking the present value of $10,000 now. The state uses an 8% rate in discounting. How much will you receive if you accept your winnings now? Future ValueFactorPresent Value Present Value of a Single Amount

24 D- 24 LO 5 Solve for present value of a single amount. Illustration: Determine the amount you must deposit now in a bond investment, paying 9% interest, in order to accumulate $5,000 for a down payment 4 years from now on a new Toyota Prius. Future ValueFactorPresent Value $5,000x.70843= $3,542.15 Present Value of a Single Amount

25 D- 25 The value now of a series of future receipts or payments, discounted assuming compound interest. Necessary to know 1.the discount rate, 2.The number of discount periods, and 3.the amount of the periodic receipts or payments. LO 6 Solve for present value of an annuity. Present Value of an Annuity

26 D- 26 Illustration: Assume that you will receive $1,000 cash annually for three years at a time when the discount rate is 10%. What table do we use? LO 6 Solve for present value of an annuity. Illustration D-14 Present Value of an Annuity

27 D- 27 What factor do we use? $1,000 x 2.48685 = $2,484.85 Future ValueFactorPresent Value LO 6 Solve for present value of an annuity. Present Value of an Annuity

28 D- 28 Illustration: Kildare Company has just signed a capitalizable lease contract for equipment that requires rental payments of $6,000 each, to be paid at the end of each of the next 5 years. The appropriate discount rate is 12%. What is the amount used to capitalize the leased equipment? $6,000 x 3.60478 = $21,628.68 LO 6 Solve for present value of an annuity. Present Value of an Annuity

29 D- 29 Illustration: Assume that the investor received $500 semiannually for three years instead of $1,000 annually when the discount rate was 10%. Calculate the present value of this annuity. $500 x 5.07569 = $2,537.85 LO 6 Solve for present value of an annuity. Present Value of an Annuity

30 D- 30 LO 8 Compute the present value in capital budgeting situations. Present Value in a Capital Budgeting Decision The time diagrams for the latter two cash are as follows: Illustration D-22

31 D- 31 LO 8 Compute the present value in capital budgeting situations. Present Value in a Capital Budgeting Decision The computation of these present values are as follows: Illustration D-23 The decision to invest should be accepted.

32 D- 32 LO 8 Compute the present value in capital budgeting situations. Present Value in a Capital Budgeting Decision Assume Nagle-Siegert uses a discount rate of 15%, not 10%. Illustration D-24 The decision to invest should be rejected.


Download ppt "D- 1 Interest  Payment for the use of money.  Excess cash received or repaid over the amount borrowed (principal). Variables involved in financing transaction:"

Similar presentations


Ads by Google