Spending multiplier/Tutorials: Difference between revisions

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==The algebra of the spending multiplier identity==
An injection of 100 currency units is assumed to be made into a [[circular flow of income]] model of the economy and that the [[marginal propensity to consume]] of its recipients  is c (round 1).
Of the 100 units injected, an amount equal to 100 times c is spent (round 2)
The recipients of that amount spend the  same proportion of it (round 3)
- and so on as below
::::{|class="wikitable"
|
|expenditure
|    saving    
|-
|round 1
|align="center"| 100
|
|-
|round 2
|align="center"| 100c
|align="center"| 100(1 - c)
|-
|round 3
|align="center"|100c<sup>2</sup>
|align="center"|100(1&nbsp;-&nbsp;c)<sup>2</sup>
|-
|...
|
|
|-
|round n
|align="center"|100c<sup>n</sup>
|align="center"|100(1&nbsp;-&nbsp;c)<sup>n</sup>
|}
The total spending in the economy after n rounds is
::100&nbsp;+&nbsp;100c&nbsp;+&nbsp;100c<sup>2</sup>&nbsp;+&nbsp;100c<sup>3</sup>&nbsp;....+&nbsp;100c<sup>n</sup>
- which is a [[geometric progression]].
It can be proved that such a geometric progression converges to the value &nbsp;100/(1&nbsp;-&nbsp;c) as n approaches infinity.
The final outcome is therefore a total expenditure in the economy that is a multiple 1/(1&nbsp;-&nbsp;c) of the initial injection, where 1&nbsp;-&nbsp;c is definitionally equal to the [[marginal propensity to save]].

Latest revision as of 05:29, 16 November 2012

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Tutorials relating to the topic of Spending multiplier.

The algebra of the spending multiplier identity

An injection of 100 currency units is assumed to be made into a circular flow of income model of the economy and that the marginal propensity to consume of its recipients is c (round 1).

Of the 100 units injected, an amount equal to 100 times c is spent (round 2)

The recipients of that amount spend the same proportion of it (round 3)

- and so on as below

expenditure     saving    
round 1 100
round 2 100c 100(1 - c)
round 3 100c2 100(1 - c)2
...
round n 100cn 100(1 - c)n

The total spending in the economy after n rounds is

100 + 100c + 100c2 + 100c3 ....+ 100cn

- which is a geometric progression.

It can be proved that such a geometric progression converges to the value  100/(1 - c) as n approaches infinity.

The final outcome is therefore a total expenditure in the economy that is a multiple 1/(1 - c) of the initial injection, where 1 - c is definitionally equal to the marginal propensity to save.