Spending multiplier: Difference between revisions
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Consider a closed economy in which private agents consume in average 80% of their income. If the government increases its purchases by 100, then the national output will increase by 500. | Consider a closed economy in which private agents consume in average 80% of their income. If the government increases its purchases by 100, then the national output will increase by 500. | ||
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Revision as of 11:25, 19 September 2008
In economics, the spending multiplier effect describes a process by which an initial increase of one economic aggregate is amplified and provokes an increase in the same or/and other aggregate(s) larger than the initial raise. The idea is that the raise of a first agent income improves the situation of a second agent by the way of consumption, and so on.
The spending multiplier is a key concept in Keynesian economics for it explains how the government purchases can have a strong stimulating effect on the national output, depending on the marginal propensity to consume.
Example in an closed economy
Consider a closed economy in which private agents consume in average 80% of their income. If the government increases its purchases by 100, then the national output will increase by 500.
Agent | Consumption | Saving |
---|---|---|
Government | 100 | 0 |
Through consumption, the government increases by 100 the income of one of its suppliers (agent #2). | ||
#2 | 80 | 20 |
Agent #2 saves 20% of its new wealth and spends the remaining money, increasing by 80 the income of agent #3. | ||
#3 | 64 | 16 |
#4 | 51 | 13 |
#5 | 41 | 10 |
#6 | 33 | 8 |
#7 | 26 | 6 |
... | ... | ... |
Total | 500 | 100 |
In mathematics, this result is known as the sum of a convergent geometric serie.
An other demonstration relies on the following accountant relation in a closed economy :
Income = Consumption + Investment
Income = Private Consumption + Governmental Consumption + Saving - Taxes
Y = C + G + I - T
Since C = cY with c the propensity to consume, then
Y = cY + G + I - T
(1-c)Y = G + I - T
Y = (G + S - T)/(1-c)
Thus, an increase of G by 1 implies an increase of Y by 1/(1-c).
Influence of imports in an open economy
Agent | Consumption of domestic products | Imports | Saving |
---|---|---|---|
Government | 100 | 0 | 0 |
Through consumption, the government increases by 100 the income of one of its suppliers (agent #2). | |||
#2 | 60 | 20 | 20 |
Agent #2 saves 20% of its new wealth and spends the remaining money. Because of imports, only three quarter of his purchases increase the income of another domestic agent. Thus agent #3 receives 60 instead of 80. | |||
#3 | 36 | 12 | 12 |
#4 | 21,6 | 7,2 | 7,2 |
#5 | 7,8 | 2,6 | 2,6 |
... | ... | ... | ... |
Total | 250 | 50 | 50 |