chapter 7 valuation lawrence j. gitman jeff madura introduction to finance
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Chapter
7
Valuation
Lawrence J. GitmanJeff Madura
Introduction to Finance
7-2Copyright © 2001 Addison-Wesley
Describe the key inputs and basic model used in the valuation process.
Review the basic bond valuation model.
Discuss bond value behavior, particularly the impact that required return and time to maturity have on bond value.
Explain yield to maturity and the procedure used to value bonds that pay interest annually.
Learning Goals
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Perform basic common stock valuation using each of three models: zero-growth, constant-growth, and variable-growth.
Understand the relationships among financial decisions, return, risk, and stock value.
Learning Goals
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Valuation Fundamentals
The (market) value of any investment asset is simply the present value of expected cash flows.
The interest rate that these cash flows are discounted at is called the asset’s required return.
The required return is a function of the expected rate of inflation and the perceived risk of the asset.
Higher perceived risk results in a higher required return and lower asset market values.
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Where:
V0 = value of the asset at time zero
CFt = cash flow expected at the end of year t
k = appropriate required return (discount rate)
n = relevant time period
CF1
(1 + k)1
CF2
(1 + k)2
CFn
(1 + k)nV0 = + + . . . +
Basic Valuation Model
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V0 = [(CF1 x PVIFk,1)] + [CF2 x (PVIFk,2)] + … + [CFn x (PVIFk,n)]
Basic Valuation Model
Using present value interest factor notation, PVIFk,n from Chapter 5, the previous equation can be rewritten as:
Example
Nina Diaz, a financial analyst for King industries, a diversified holding company, wishes to estimate the value of three of its assets—common stock in Unitech, an interest in an oil well, and an original painting by a well-known artist. Forecasted cash flows, required returns, and the resulting present values are shown in Table 7.1 on the following two slides.
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Basic Valuation Model
Table 7.1 (Panel 1)
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Basic Valuation Model
Table 7.1 (Panel 2)
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Bond Fundamentals
A bond is a long-term debt instrument that pays the bondholder a specified amount of periodic interest over a specified period of time.
Note: a bond is equal to debt.
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Bond Fundamentals
The bond’s principal is the amount borrowed by the company and the amount owed to the bondholder on the maturity date.
The bond’s maturity date is the time at which a bond becomes due and the principal must be repaid.
The bond’s coupon rate is the specified interest rate (or dollar amount) that must be periodically paid.
The bond’s current yield is the annual interest (income) divided by the current price of the security.
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Bond Fundamentals
The bond’s yield to maturity is the yield (expressed as a compound rate of return) earned on a bond from the time it is acquired until the maturity date of the bond.
A yield curve graphically shows the relationship between the time to maturity and yields for debt in a given risk class.
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100
(1 + .10)1
100
(1 + i)2
(100 + 1,000)
(1 + .10)3B0 = + +
I1
(1 + i)1
I2
(1 + i)2
(In + Pn)
(1 + i)nB0 = + + . . . +
Bonds with Maturity Dates
Annual Compounding
For example, find the price of a 10% coupon bond with three years to maturity if market interest rates are currently 10%.
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Bonds with Maturity Dates
Annual Compounding Using Microsoft® Excel
• For example, find the price of a 10% coupon bond with three years to maturity if market interest rates are currently 10%.
Note: the equationfor calculating price is =PV(rate,nper,pmt,fv)
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When the coupon rate matches the discount rate, the bond always sells for its par value.
Bonds with Maturity Dates
Annual Compounding Using Microsoft® Excel
• For example, find the price of a 10% coupon bond with three years to maturity if market interest rates are currently 10%.
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When the interest rate goes up, the bond price will always go down.
Bonds with Maturity Dates
Annual Compounding Using Microsoft® Excel
• What would happen to the bond’s price if interest rates increased from 10% to 15%?
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And the longer the maturity, the greater the price decline.
Bonds with Maturity Dates
Annual Compounding Using Microsoft® Excel
• What would happen to the bond’s price it had a 15-year maturity rather than a 3-year maturity?
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When interest rates go down, bond prices will always go up.
Bonds with Maturity Dates
Annual Compounding Using Microsoft® Excel
• What would happen to the original 3-year bond’s price if interest rates dropped from 10% to 5%?
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And the longer the maturity, the greater the price increase will be.
Bonds with Maturity Dates
Annual Compounding Using Microsoft® Excel
• What if we considered a similar bond, but with a 15-year maturity rather than a 3-year maturity?
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Graphically
As interest rates go up
Bon
d prices go do
wn
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Semi-Annual Compounding Using Microsoft® Excel
• If we had the same bond, but with semi-annual coupon payments, we would have to divide the 10% coupon rate by two, divided the discount rate by two, and multiply n by two.
For the original example, divide the 10% coupon by 2, divide the 15% discount rate by 2, and multiply 3 years by 2.
Bonds with Maturity Dates
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Semi-Annual Compounding Using Microsoft® Excel
• If we had the same bond, but with semi-annual coupon payments, we would have to divide the 10% coupon rate by two, divided the discount rate by two, and multiply n by two.
Thus, the value is slightly larger than the price of the annual coupon bond (1,136.16) because the investor receives payments sooner.
Bonds with Maturity Dates
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Coupon Effects on Price Volatility
The amount of bond price volatility depends on three basic factors: Length of time to maturity Risk Amount of coupon interest paid by the bond
First, we already have seen that the longer the term to maturity, the greater is a bond’s volatility.
Second, the riskier a bond, the more variable the required return will be, resulting in greater price volatility.
Finally, the amount of coupon interest also impacts a bond’s price volatility.
Specifically, the lower the coupon rate, the greater will be the bond’s volatility, because it will be longer before the investor receives a significant portion (the par value) of the cash flow from his or her investment.
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Coupon Effects on Price Volatility
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Price Converges on Par at Maturity
It is also important to note that a bond’s price will approach par value as it approaches the maturity date, regardless of the interest rate and regardless of the coupon rate.
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Price Converges on Par at Maturity
It is also important to note that a bond’s price will approach par value as it approaches the maturity date, regardless of the interest rate and regardless of the coupon rate.
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The current yield measures the annual return to an investor based on the current price.
Yields
Current yield =Annual coupon interest
Current market price
For example, a 10% coupon bond which is currently selling at $1,150 would have a current yield of:
Current yield =$100
$1,150= 8.7%
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Yields
The yield to maturity measures the compound annual return to an investor and considers all bond cash flows. It is essentially the bond’s IRR based on the current price.
Notice that this is the same equation we saw earlier when we solved for price. The only difference then was that we were solving for a different unknown. In this case, we know the market price but are solving for return.
I1
(1 + i)1
I2
(1 + i)2
(In + Pn)
(1 + i)nPV = + + . . . +
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The yield to maturity measures the compound annual return to an investor and considers all bond cash flows. It is essentially the bond’s IRR based on the current price.
Using Microsoft® Excel For example, suppose we wished to determine the YTM on the following bond.
Yields
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The yield to maturity measures the compound annual return to an investor and considers all bond cash flows. It is essentially the bond’s IRR based on the current price.
Using Microsoft® Excel For example, suppose we wished to determine the YTM on the following bond.
Yields
To compute the yield on this bond we simply listed all of the bond cash flows in a column and computed the IRR.
=IRR(d10:d20)
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Yields
The yield to maturity measures the compound annual return to an investor and considers all bond cash flows. It is essentially the bond’s IRR based on the current price. Note that the yield to maturity will only be equal to the current yield if the bond is selling for its face value ($1,000).
And that rate will also be the same as the bond’s coupon rate.
For premium bonds, the current yield > YTM.
For discount bonds, the current yield < YTM.
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For example, if the firm’s $1 dividend on a $25 stock is expected to grow at 7%, the expected return is:
Stock returns are derived from both dividends and capital gains, where the capital gain results from the appreciation of the stock’s market price due to the growth in the firm’s earnings. Mathematically, the expected return may be expressed as follows:
E(r) = D/P + g
E(r) = 1/25 + .07 = 11%
Common Stock Valuation
7-32Copyright © 2001 Addison-Wesley
Stock Valuation Models
The Basic Stock Valuation Equation
D1
(1 + k)1
D2
(1 + k)2
Dn
(1 + k)nP0 = + + . . . +
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Stock Valuation Models
The Zero Growth Model The zero dividend growth model assumes
that the stock will pay the same dividend each year, year after year.
For assistance and illustration purposes, I have developed a spreadsheet tutorial using Microsoft® Excel.
A non-functional excerpt from the spreadsheet appears on the following slide.
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Stock Valuation Models
The Zero Growth Model Using Microsoft® Excel
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Stock Valuation Models
The Zero Growth Model Using Microsoft® Excel
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Stock Valuation Models
The Constant Growth Model The constant dividend growth model assumes that the
stock will pay dividends that grow at a constant rate each year, year after year.
For assistance and illustration purposes, I have developed a spreadsheet tutorial using Microsoft® Excel.
A non-functional excerpt from the spreadsheet appears on the following slide.
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Stock Valuation Models
The Constant Growth Model Using Microsoft® Excel
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Stock Valuation Models
The Constant Growth Model Using Microsoft® Excel
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Stock Valuation Models
Variable Growth Model The non-constant (variable) dividend growth model
assumes that the stock will pay dividends that grow at one rate during one period, and at another rate in another year or thereafter.
A non-functional excerpt from the spreadsheet appears on the following slide.
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Stock Valuation Models
The Variable Growth Model Using Microsoft® Excel
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Stock Valuation Models
The Variable Growth Model Using Microsoft® Excel
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Stock Valuation Models
The Variable Growth Model Using Microsoft® Excel
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Stock Valuation Models
The Variable Growth Model Using Microsoft® Excel
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Decision Making and Common Stock Value
Changes in Dividends or Dividend Growth Valuation equations measure the stock value at a point in time
based on expected return and risk.
Changes in expected dividends or dividend growth can have a profound impact on the value of a stock.
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Decision Making and Common Stock Value
Changes in Dividends or Dividend Growth Changes in risk and required return can also have significant
effects on price.
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Decision Making and Common Stock Value
Changes in Dividends or Dividend Growth Changes in expected dividends or dividend growth
can have a profound impact on the value of a stock.
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Using Microsoft® Excel
The Microsoft® Excel Spreadsheets used in the this presentation can be downloaded from the Introduction to Finance companion web site: http://www.awl.com/gitman_madura
Chapter
7
End of Chapter
Lawrence J. GitmanJeff Madura
Introduction to Finance
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