The main reason behind support for
capitalism comes from optimism. We hope that someday, due to the greater
productivity of capitalism, there will be sufficient resources for all. Data
seems to support this belief. GDP’s are increasing and despite the vastly
unfair distribution, poverty seems to be receding. Or is it? While many ‘advanced’
countries have eliminated poverty, some feel that they have merely pushed the
problem around geographically and poverty has not reduced. Statistics cannot
help us here, as different countries have different poverty standards rendering
‘global poverty’ a meaningless benchmark.
In this post, I
argue that even complete elimination of poverty would merely be a temporary
respite. Before we demonstrate that, we need to establish that the GDP of a
capitalist economy grows exponentially. Let us look at how we can know this for
certain.
The first
indication comes from data. Just looking at the graph of GDP verses time gives
us a feeling that it grows exponentially. Mathematically too, the very fact
that we measure it in ‘percentage growth’ shows that it grows exponentially. But is this pattern unique to capitalism, or
is it a phenomenon that happens in every economy? For that, we will have to try
to prove that GDP grows exponentially and consider the possible reasons.
In capitalism, a
company produces products for profit. Some of this profit goes towards paying
for the costs of production, such as employee’s salary, electricity, machine
costs etc. The rest is re-invested as capital. This capital is used to increase
the productivity by purchase of more machines or by hiring of new
labourers. Thus, the productivity of a
nation grows with time, and with it, we assume, the financial abundance of its
population. What is the trend of this growth? Let’s first write a simple
equation.
(Amount of produce re-invested) = (Amount produced) – (Amount
consumed).
Simple? Now, let
us write it in a slightly different form:
=> (Change in capital) = (Amount produced) – (Amount consumed)
=> ∆C = P.∆t – X.∆t
C = Capital invested
P = Productivity
X = Rate of consumption
=> ∆C/∆t
= P – X -------- (1)
To simplify this
equation we must simplify the right hand side. Let us try to relate
productivity and consumption. First, notice that consumption always happens at
the individual level as after all we produce for human consumption. Thus, we can equate the amount consumed to
the amount of consumable goods produced (such as food, water, FMCGs,
electronics, electricity (partly)…). In any economy, the size of industries
producing these goods won’t change very fast. Thus, we can assume that over a
short span of time rate of consumption will be proportional to productivity.
I.e.
X = kP ;where k is the
constant of proportionality
----------------(2)
From equations (1) and (2),
∆C/∆t
= P(1-k) ----------------(3)
We also
know that productivity of an economy will be proportional to the amount of
capital invested in it. Thus,
P
= a.C ;a is constant of
proportionality
Combining
with (3), we get,
∆C/∆t
= aC(1-k)
------------------(4)
For people who know calculus replace ‘∆’ by ‘d’
and integrate. Others, please take my word for it that we get the following:
=> C1
= C2ea(1-k)t
Thus, we
see that theoretically too GDP grows exponentially and is caused due to
reinvestment of capital. Does it mean that people did not reinvest capital
before the advent of capitalism? Most probably not, as having capital certainly
had its advantages. But there is only so much to invest in land and labour, for
example a landlord expanding his estate would not lead to any overall increase
in production (assuming the land was previously utilized). The advent of
technology, however, has increased the scope for capital, which has made it
possible to increase one’s productivity exponentially.
It might seem then, that since capitalism has
such huge gains in terms of productivity, it might be a good thing after all.
For a short duration, maybe. But it makes it almost impossible for a system A
to catch up with another system B which is ahead of A. Why? To understand that
we must consider what exponential growth really means.
We say
that a quantity Q is growing exponentially if the rate of growth of Q is
proportional to Q. Note, that this is what is happening in equation (4). Now,
if economy A has a higher capital investment (and a higher GDP) than country B,
then the rate of growth of capital investment will also be higher than that of
economy B. Thus, we see that, under normal circumstances, the capital
investment (and thus the GDP) of economy B can never catch up with that of
economy A.
Not only
will poorer countries be unable to catch up, the difference in their GDP’s will
also keep increasing. Already, the rich countries (such as USA) are engaged in
poking their noses where they do not belong and bullying the poorer nations.
This domination will only continue to increase until they are powerful enough
to obtain direct political control over other countries, resulting in a second
wave of colonization. History speaks of the disaster thereafter. Once colonies
are established, the people there will be exploited brutally and no attempt
will be made to help them come up. Thus, any reduction in poverty that
capitalism may have achieved would be undone by the colonization that will
follow it.
