Corp Finance Chapter 5
Semiannual compounding
compounding of interest over 2 periods within the year Ex: $100 at 8% compounded semiannually 6 months: $100 x (1 + .04) = $104 12 months: $104 x (1 + .04) = 108.16
Quarterly Compounding
compounding of interest over 4 periods within the year Ex: $100 at 8% compounded quarterly 3 months: $100 x (1 + .02) = $102 6 months: $102 x (1 + .02) = 104.04... continues
Continuous Compounding
compounding of interest, literally, all the time. Equivalent to compounding interest an infinite number of times per year
Nominal (stated) annual rate
contractual annual rate of interest charged by a lender or promised by a borrower
Basic Patterns of Cash Flow: Annuity
-A level of periodic stream of cash flow -Receiving or making a fixed payment each month/year for several years -Mortgage payment
Basic Patterns of Cash Flow: Mixed Stream
-A stream of cash flow that is not an annuity; a stream of unequal periodic cash flows that reflect no particular pattern -Business investment decisions
Lecture: Monthly Compounding
-Adjust N & I/Y Accordingly -N (years) * 12 (months) -I/Y (interest rate) / 12 (months)
Lecture: Quarterly Compounding (Discounting)
-Adjust N & I/Y Accordingly -N (years) * 4 (quarters) -I/Y (interest rate) / 4 (quarters)
Lecture: Payments into Perpetuity
-Payments that happen forever (no maturity date/end point) (Ex: Dividend payment on a stock) (Ex: Stocks are issued into perpetuity) -PV of future payments that has no end point Payment (PMT)/Discount Rate (I/Y) = PV of future cash into perpetuity
Lecture: Present Value & Future Value
-Present Value = Value in today's $ -Future Value = Value at a future date
Lecture: Annuity
-Series of payments that happen over a period of time -Equals $ amount paid (or received) at set intervals for a number of periods -PMT is key on calculator (Used for the annuity payment) -Example: mortgage payment is a set # amount due on the 1st day of every month
Basic Patterns of Cash Flow
-Single Amount -Annuity -Mixed Stream
Comparison of an Annuity Due with an Ordinary Annuity: FV
-The future value of an annuity due is always greater than the future value of an otherwise identical ordinary annuity -Because the cash flow of the annuity due occurs at the beginning of the period rather than at the end, its future value is greater
Comparison of an Annuity Due with an Ordinary Annuity: PV
-The present value of an annuity due is always greater than the present value of an otherwise identical ordinary annuity -Because the cash flows of the annuity due occur at the beginning of each period rather than at the end, their present values are greater
Basic Patterns of Cash Flow: Single Amount
A lump sum amount either currently held or expected at some future date
Growing Perpetuity
An annuity with an infinite life, providing continual annual cash flow, with the cash flow growing at a constant annual rate
Lecture: When doing FV calculations
As I/Y increases, FV increases As N increases, FV increases
Lecture: When doing PV calculations
As I/Y increases, PV decreases As N increases, PV decreases INVERSE RELATIONSHIPS
Lecture: Compounding & Discounting
Compounding = Present Value to Future Value -Forward from PV to Future Value -Add interest every year to our calculation -Yr 1: 100 at 10% -Yr 2: 110 at 10% Discounting = Future Value to Present Value (Opportunity Cost) -Backwards from FV to PV
Lecture: PV or FV of a Mixed Stream of Payments
Either pay or receive payments at regular intervals, but dollar amount will not be the same (Different from annuities; payment amount changes) -Series of cash flows whose payment changes -Cash flow doesn't have to go in the same direction every time -Payments have to be either at beginning or end for every period (Either Ordinary Annuity or Annuity Due for every payment) Take PV of each amount and add them together
Types of Annuities
Ordinary Annuity: an annuity for which the cash flow occurs at the end of each period Annuity Due: an annuity for which the cash flow occurs at the beginning of each period
Lecture: Single Payment (Receipt)
PV = In today's $ FV = In future $ N = # of periods (years) I/Y = Annual Interest Rate -If you know 3 of the 4 factors, you can solve for the one you are missing -When you have PV and FV, one must be positive, one must be negative
Compounding & Future Value
The future value technique uses compounding to find the future value of each cash flow at the end of the investment's life and then sums these values to find the investment's future value
Discounting & Present Value
The present value technique uses discounting to find the present value of each cash flow at time zero and then sums these values to find the investment's value today
Lecture: Annuity Due
assumes payment happens @ beginning of period -First day of period (Jan 1) -Take Ordinary Annuity Amount x 1.(insert interest rate)***
Lecture: Ordinary Annuity
assumes payment happens @ end of period -Timing of payment, when money is actual paid -Last day of period (Jan 31) -PROBLEM DOESN'T SAY, ASSUME ORDINARY ANNUITY
Time value of money concept
better to receive money sooner rather than later
Mixed Stream & Future Value
To determine the future value of a mixed stream of cash flows, compute the future value of each cash flow at the specified future date and then add all the individual future values to find the total future value
Mixed Stream & Present Value
To determine the present value of a mixed stream of cash flows, compute the present value of each cash flow and then add all the individual present values to find the total present value
Timeline
a horizontal line on which time zero appears at the leftmost end and future periods are marked from left to right; can be used to depict investment cash flows -Negative value - cash outflows (what we spend/invest) -Positive value - cash inflows (what we earn)
Annuity: Definition
a stream of equal periodic cash flows over a specified time period. These cash flows can be inflows or outflows of funds
Mixed Stream: Definition
a stream of unequal periodic cash flows that reflect no particular pattern
Perpetuity: Definition
an annuity with an infinite life, providing continual annual cash flow
Compound Interest
interest that is earned on a given deposit and has become part of the principal at the end of a specified period
Simple Interest
interest that is earned only on an investment's original principal and not on interest that accumulates over time
Compounding
process of adding interest to an investment's principal and paying interest on the new, higher balance
Principal
the amount of money on which interest is paid
Effective (true) annual rate (EAR)
the annual rate of interest actually paid or earned
Discounting Cash Flows
the process of finding present values; the inverse of compounding interest
Present value
the value in today's dollars of some future cash flow
Future Value
the value on some future date of money that you invest today
