FRBSF Economic Letter
2002-22; August 2, 2002
Using Chain-Weighted NIPA Data
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This Economic Letter discusses a topic that at first glance appears
to be boring and technical but that in fact turns out to be quite important:
the proper interpretation of chain-weighted data. To illustrate, consider
this simple question: What is the growth rate of real GDP? Figure 1 displays
two different answers to this question for the period 1992 to 1998. The
solid line is calculated using a chain-weighted index, the method currently
used by the U.S. Department of Commerce in the National Income and Product
Accounts (NIPA); the dashed line is calculated using a fixed-weighted
index, the method NIPA statisticians used up to 1997. According to the
chain-weighted measure, the growth rate of real GDP rose to just under
4% by 1997 and 1998. Although this was relatively rapid compared to the
growth rates observed earlier in the decade, it pales in comparison to
the growth rate calculated using a fixed-weighted measure, which rises
sharply after 1995, reaching a rate of 6.6% by 1998. By this measure,
the "New Economy" of the late 1990s looks even more remarkable!
Which growth measure is right, and why are the two rates different? This
Economic Letter attempts to answer these questions and to draw out their
implications for interpreting and using NIPA data.
Why chain
weights are preferred
A fundamental issue in comparing GDP this year with GDP in years past
is determining how much of any increase is real and how much reflects
price inflation. A natural way to control for price inflation is to value
GDP in both periods using the same, constant set of prices. This is exactly
what the fixed-weighted GDP measure does: GDP is valued at a common basket
of prices, say 1992 prices, and the resulting estimates are called GDP
in "constant 1992 dollars."
The problem with this approach is that the measure of real GDP becomes
less and less accurate as one moves further away from the base year; as
Figure 1 illustrates, in constant 1992 dollars, the growth rate of fixed-weighted
GDP increasingly overstates the "true" chain-weighted growth
rate of real GDP. The reason is that the components of GDP that grow fastest
tend to be those that exhibit the smallest price increases, or even price
declines, so the fixed-weighted real GDP measure tends to weight these
components more heavily than later prices would suggest.
To see how this happens, consider an economy consisting of just two sectors—computers
and oranges—and whose consumers spend half their income on computers
and half their income on oranges each year. Now suppose that productivity
growth in the computer sector is a very rapid 10% per year, while productivity
growth in the orange sector is zero, so that each year the economy produces
10% more computers and a constant number of oranges. In such an economy,
the price of computers relative to the price of oranges declines over
time.
To construct a real fixed-weighted GDP using prices from, say, Year 1
of the economy, we sum the number of computers produced and the number
of oranges produced in every year, weighted by their fixed prices. Since
the number of computers is growing rapidly while the number of oranges
is fixed, the growth rate of the fixed-weighted GDP rises over time, eventually
approaching 10% per year, the growth rate of computers. In this example,
the contribution of oranges to GDP essentially disappears, even though
consumers always spend half their (nominal) income on oranges.
The chain-weighted measure of real GDP solves this problem by updating
the weights in every period. For example, the growth rate between 1992
and 1993 is computed using prices that prevailed in 1992 and 1993, while
the growth rate between 1997 and 1998 is computed using prices that prevailed
in 1997 and 1998. What happens if we apply the chain-weighted approach
in the computers-oranges example? Although the result depends on some
rather complicated mathematics that is beyond the scope of this Letter,
it is nonetheless intuitive: the growth rate of real GDP is simply a weighted
average of the growth rates of the two sectors, where the weights are
the expenditure shares, equal to 1/2 in our example. Therefore the growth
rate of real chain-weighted GDP in this example is constant over time
and equals 1/2 the growth rate in the computer sector, or 5%. Intuitively,
this more accurately reflects what is going on in our simple economy than
the fixed-weighted measure. Since 1997, these chain-weighted measures
have been reported in the NIPA data, and one rarely encounters the fixed-weighted
measures.
Not surprisingly, similar measurement issues arise at the industry level.
For example, according to fixed-weighted measures based on 1987 prices,
the manufacturing sector grew at a rate of 1.7% per year between 1977
and 1987. In contrast, using the more accurate chain?weighting, the average
annual growth rate over this period was a full percentage point higher
at 2.7% (Landefeld and Parker 1997).
Ah, but be
careful!
If the chain-weighted measures are preferred and the fixed-weighted measures
are no longer reported, then what is there to be careful about? It turns
out that one of the main advantages of the fixed-weighted measures of
real GDP is lost: fixed-weighted measures are additive, but chain-weighted
measures are not. Nominal GDP is equal to the sum of consumption, investment,
government purchases, and net exports. The same thing is true with a fixed?weight
measure of real GDP. However, it is not true of the chain-weighted indexes
for real GDP and its components: real GDP does not generally equal the
sum of real consumption, real investment, real government expenditures,
and real net exports.
To get an intuition about why this is so, we can return to the computers-oranges
economy. Chain-weighted calculations start the same way as fixed-weighted
calculations do, namely, by picking a reference year (current 1996 in
the NIPA data) and setting that year's real GDP equal to that year's nominal
GDP. The level in subsequent years is computed by successively applying
the chain growth rate—here equal to 5%—to the level in the reference
year. The same method applies to the other components of GDP, real computer
output and real orange output. In the reference year, by construction,
the real chain-weighted outputs sum to equal GDP because all are equal
to their nominal counterparts. But since real computer output grows at
10% per year while real orange output is constant, these outputs do not
add up to real GDP in any subsequent year; in fact, they suffer the same
problem as a fixed-weighted index in that the sum of the real outputs
will eventually be dominated by the computer sector and grow at a rate
of 10% per year.
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An important problem that arises from this lack of additivity is in calculating
shares of output. For example, one might naturally wonder how the share
of equipment and software investment in GDP has changed over time. Two
candidates for this share are plotted in Figure 2. One is constructed
by dividing nominal equipment and software investment by nominal GDP.
The other is constructed by dividing real equipment and software investment
by real GDP. Obviously, the two measures look quite different: the nominal
ratio has grown from about 6% in 1950 to about 10% in 2000, while the
real ratio has grown from about 3% in 1950 to nearly 12% in 2000. Which
series is correct?
The difference between the two series is a relative price: the price
index for equipment and software divided by the price index for GDP. This
price has been declining very rapidly over this period, in large part
reflecting the rapid productivity growth in semiconductor production.
Because nominal GDP is additive, the nominal ratio is a true "share"—it
must lie between zero and one. However, because real chain-weighted GDP
is not additive, there is no reason for this real ratio to be between
zero and one. In fact, if the rapid productivity growth in semiconductors
continues, one can imagine that someday this ratio will exceed one. In
this case, then, the nominal share is more informative. The lesson from
this example is that one must be very careful in using ratios and sums
of the components of real GDP because these series lack additivity.
Conclusion
The use of chain?weights instead of fixed?weights in the NIPA data is
a significant step forward. It should provide policymakers, forecasters,
and businesses with a more accurate picture of economic growth. Nevertheless,
this more accurate picture does come at a cost: the chain-weighted data
are not additive, and this means that interpreting and using the NIPA
data require additional care.
Charles I. Jones
Associate Professor, UC Berkeley,
and Visiting Scholar, FRBSF
Reference
Landefeld, J. Steven, and Robert P. Parker. 1997. "BEA's
Chain Indexes, Time Series, and Measures of Long?Term Economic Growth."
Survey of Current Business (May) pp. 58-68.
Recommended reading
Department of Commerce. Bureau of Economic Analysis. "National
Income and Product Accounts Tables."
Whelan, Karl. 2000. "A Guide to the Use of Chain Aggregated NIPA
Data." Mimeo. Federal Reserve Board of Governors (June).
Whelan, Karl. 2001. "A Two?Sector Approach to Modeling U.S. NIPA
Data." Mimeo. Federal Reserve Board of Governors (April).
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