{{Short description|Economic term}} In economics, '''output elasticity''' is the percentage change of output (GDP or production of a single firm) divided by the percentage change of an input. It is sometimes called ''partial output elasticity'' to clarify that it refers to the change of only one input.<ref>{{cite journal |first1=A. |last1=Charnes |author-link2=William W. Cooper |first2=W. W. |last2=Cooper |first3=A. P. |last3=Schinnar |year=1976 |title=A theorem on homogeneous functions and extended Cobb–Douglas forms |journal=Proc. Natl. Acad. Sci. |volume=73 |issue=10 |pages=3747–3748 |doi=10.1073/pnas.73.10.3747 |pmid=16592356 |pmc=431197 |bibcode=1976PNAS...73.3747C |doi-access=free }}</ref>

As with every elasticity, this measure is defined locally, i.e. defined at a point.

If the production function contains only one input, then the output elasticity is also an indicator of the degree of returns to scale. If the coefficient of output elasticity is greater than 1, then production is experiencing increasing returns to scale. If the coefficient is less than 1, then production is experiencing decreasing returns to scale. If the coefficient is 1, then production is experiencing constant returns to scale. Note that returns to scale may change as the level of production changes.<ref name="Perloff, Microeconomics Theory 2008">{{cite book |last=Perloff |title=Microeconomics Theory & Applications with Calculus |url=https://archive.org/details/microeconomicsth00jmpe |url-access=limited |publisher=Pearson |year=2008 |page=[https://archive.org/details/microeconomicsth00jmpe/page/n212 193] }}</ref>

A different usage of the term "output elasticity" is defined as the percentage change in output per one percent change in ''all'' the inputs.<ref name="Hirschey (2003) p. 238">Hirschey (2003) p. 238.{{full|date=April 2015}}</ref> The coefficient of output elasticity can be used to estimate returns to scale.<ref name="Hirschey (2003) p. 238" />

The mathematical formula is:

<math> E_Q = \dfrac{\partial Q / Q}{\partial \textbf{x} / \textbf{x}}</math>

where '''x''' represents the inputs and Q, the output.<ref name="Hirschey (2003) p. 238" /> Multi-input-multi-output generalisations also exist in the literature. <ref>{{Cite journal |last=Zelenyuk |first=Valentin |date=2013 |title=A Note on Equivalences in Measuring Returns to Scale |url=https://ideas.repec.org//a/ijb/journl/v12y2013i1p85-89.html |journal=International Journal of Business and Economics |language=en |volume=12 |issue=1 |pages=85–89}}</ref>

==See also== *Elasticity (economics)

==References== {{Reflist}}

{{DEFAULTSORT:Output Elasticity}} Category:Elasticity (economics) Category:Macroeconomic indicators

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