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Bond Analysis: Science or
Numerology?
Part II — EVALUATING BENEFITS
In Part I, we examined some of the risks associated with bond
investing. Here we'll look more quantitatively at evaluating
the potential rewards.
One of the most common and obviously useful quantitative
techniques is yield calculations.
Calculating Yields
The simplest yield calculation is the current yield. Simply,
divide the annual coupon amount paid by the current price. For
example, a $1000 bond with a 7% coupon currently selling at
$950, has a current yield of:
CY = [($1000 x .07)/950] = 70/950 = .0737 = 7.37%.
A mathematically more complex, but more common and useful yield
is the YTM, Yield To Maturity. The formula is daunting, but
essentially involves including capital gain (or loss) and
accounting for the (fractional number of) years remaining until
the bond matures. The YTM for the above example is: 8.53%,
which represents the return on the bond purchased today at
discount and held to maturity.
Other forms and calculations are even more mathematically
involved, including Duration (or Macaulay Duration), Convexity
and others. All are variations on the same theme. Make
assumptions about changes in rates and prices over the next X
years, throw in the known coupon, face value and maturity of
the given bond, and turn the crank.
Fortunately the investor less interested in elegant formulae
and more in profit, needn't forgo bond investing since
calculators are readily available to make these estimates easy.
Charts and dynamic tools to compare yields among different
instruments, based on differing assumptions, are also easy to
find.
Yield Curve
Use of these tools makes possible the creation of one of the
more useful graphs called the Yield Curve. Essentially a graph
of Yield (plotted vertically) vs Maturity (the horizontal
axis), it allows the comparison of different yields for
different length bonds. The normal yield curve tends to rise
gently, tapering off to a flat line. A steeper rise taking
longer to flatten is called a steep yield curve.
When rates are higher on short-term bonds than long-term, the
curve becomes what's called 'inverted', producing a graph
somewhat bowl shaped. This represents a relatively unusual
situation, since predictions are, in general, less certain the
longer the time horizon and the more investors have to be
compensated for the increased risk by higher rates.
What causes the inversion? Usually the result of political
trends, investors may settle for lower yields now when rates
are expected to be even lower in the future. I.e. Investors are
projecting an opportunity to lock in rates before the bottom
falls out.
Naturally the specific shape of the curve changes over
time.
Just as one example of its usefulness:
Typically, 30-year Treasuries yield three percentage points
more than three-month Treasury bills. If the spread increases,
the slope of the yield curve increases drastically. Long-term
bond holders are signaling their view that the economy will
improve quickly in the future.
Add it to your quantitative toolbox, but remember that no
single indicator tells the whole story. Acquire as much
information as you have time to analyze and study it until you
understand the implications.
Also remember that bonds, from the perspective of the average
investor, are intended to be much longer-time frame
investments. Today even the short 13-week Treasury is long
relative to many stock investments. Be prepared to weather the
ups and downs, while keeping an eye on developments. Rarely do
long term trends change significantly in a day.
Rather than good luck, think 'good planning'. And,
incidentally, good luck.
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