Financial Markets and Institutions (2-downloads)

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Part 5 Financial Markets

you can purchase insurance. The Commodity Futures Modernization Act removed

this requirement for derivative securities. Thus, speculators could, in essence, legally

bet on whether a firm or security would fail in the future.

During the period between 2000 and 2008 major CDS players included AIG,

Lehman Brothers, and Bear Stearns. The amount of CDSs outstanding mushroomed

to over $62 trillion by its peak in 2008. To put that figure in context, the Gross

National Product of the entire world is around $50 trillion. In 2008, Lehman Brothers

failed, Bear Stearns was acquired by J.P. Morgan for pennies on the dollar, and AIG

required a $182 billion government bailout. This topic is discussed in greater detail

in Chapter 21 “Insurance and Pension Funds.”

Current Yield Calculation

Chapter 3 introduced interest rates and described the concept of yield to maturity.

If you buy a bond and hold it until it matures, you will earn the yield to maturity.

This represents the most accurate measure of the yield from holding a bond.

Current Yield

The current yield is an approximation of the yield to maturity on coupon bonds that

is often reported because it is easily calculated. It is defined as the yearly coupon pay-

ment divided by the price of the security,

(1)

where

i

c

= current yield

P = price of the coupon bond

C = yearly coupon payment

This formula is identical to the formula in Equation 5 of Chapter 3, which describes

the calculation of the yield to maturity for a perpetuity. Hence for a perpetuity, the

current yield is an exact measure of the yield to maturity. When a coupon bond has

a long term to maturity (say, 20 years or more), it is very much like a perpetuity, which

pays coupon payments forever. Thus, you would expect the current yield to be a rather

close approximation of the yield to maturity for a long-term coupon bond, and you can

safely use the current yield calculation instead of looking up the yield to maturity in

a bond table. However, as the time to maturity of the coupon bond shortens (say, it

becomes less than five years), it behaves less and less like a perpetuity and so the

approximation afforded by the current yield becomes worse and worse.

We have also seen that when the bond price equals the par value of the bond, the

yield to maturity is equal to the coupon rate (the coupon payment divided by the

par value of the bond). Because the current yield equals the coupon payment divided

by the bond price, the current yield is also equal to the coupon rate when the bond

price is at par. This logic leads us to the conclusion that when the bond price is at par,

the current yield equals the yield to maturity. This means that the nearer the bond

price is to the bond’s par value, the better the current yield will approximate the yield

to maturity.

The current yield is negatively related to the price of the bond. In the case of

our 10% coupon rate bond, when the price rises from $1,000 to $1,100, the cur-

rent yield falls from 10% (

) to 9.09% (

). As Table 3.1

⫽ $100>$1,100

⫽ $100>$1,000

i

c

⫽

C

P

Chapter 12 The Bond Market

295

in Chapter 3 indicates, the yield to maturity is also negatively related to the price

of the bond; when the price rises from $1,000 to $1,100, the yield to maturity falls

from 10% to 8.48%. In this we see an important fact: The current yield and the

yield to maturity always move together; a rise in the current yield always signals that

the yield to maturity has also risen.

What is the current yield for a bond that has a par value of $1,000 and a coupon inter-

est rate of 10.95%? The current market price for the bond is $921.01.

Solution

The current yield is 11.89%.

where

C =

yearly payment 

=

P =

price of the bond 

= $921.01

Thus,

i

c

⫽

$109.50

$921.01

⫽ 0.1189 ⫽ 11.89%

0.1095

⫻ $1,000 ⫽ $109.50

i

c

⫽

C

P

E X A M P L E   1 2 . 2 Current Yield

The general characteristics of the current yield (the yearly coupon payment

divided by the bond price) can be summarized as follows: The current yield better

approximates the yield to maturity when the bond’s price is nearer to the bond’s

par value and the maturity of the bond is longer. It becomes a worse approximation

when the bond’s price is further from the bond’s par value and the bond’s maturity

is shorter. Regardless of whether the current yield is a good approximation of the

yield to maturity, a change in the current yield always signals a change in the same

direction of the yield to maturity.

Finding the Value of Coupon Bonds

Before we look specifically at how to price bonds, let us first look at the general

theory behind computing the price of any business asset. Luckily, the value of all

financial assets is found the same way. The current price is the present value of all

future cash flows. Recall the discussion of present value from Chapter 3. If you have

the present value of a future cash flow, you can exactly reproduce that future cash

flow by investing the present value amount at the discount rate. For example, the

present value of $100 that will be received in one year is $90.90 if the discount rate

is 10%. An investor is completely indifferent between having the $90.90 today or hav-

ing the $100 in one year. This is because the $90.90 can be invested at 10% to pro-

vide $100.00 in the future (

). This represents the essence of

value. The current price must be such that the seller is indifferent between contin-

uing to receive the cash flow stream provided by the asset or receiving the offer price.

$90.90

⫻ 1.10 ⫽ $100

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Part 5 Financial Markets

One question we might ask is why prices fluctuate if everyone knows how value

is established. It is because not everyone agrees about what the future cash flows are

going to be. Let us summarize how to find the value of a security:

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