Wikipedia:Articles for deletion/Log/2005 November 5 and Isoquant: Difference between pages
| Line 1: | Line 1: | ||
[[Image:Isoquant_map.png|thumb|250px|An isoquant map where Q3 > Q2 > Q1. A typical choice of inputs would be labor for input X and capital for input Y. More of input X, input Y, or both is required to move from isoquant Q1 to Q2, or from Q2 to Q3.]] |
|||
<div class="boilerplate metadata vfd" style="background-color: #F3F9FF; margin: 0 auto; padding: 0 1px 0 0; border: 1px solid #AAAAAA; font-size:10px"> |
|||
In [[economics]], an '''isoquant''' is a [[contour line]] drawn through the set of points at which the same quantity of output is produced while changing the quantities of two or more inputs. Another way of defining the isoquant is a curve that shows all possible quantities of inputs that result in the same level of output with a given [[production function]]. The isoquant is a parallel of the [[indifference curve]] concept that deals with producers instead of consumers. While the indifference curve helps to answer the utility-maximizing problem of consumers, the isoquant deals with the cost-minimization problem of producers. Isoquants are typically drawn on [[capital-labor graph]]s, showing the tradeoff between capital and labor in the production function, and the decreasing marginal returns of both inputs. Adding one input while holding the other constant eventually leads to decreasing marginal output, and this is reflected in the shape of the isoquant. A family of isoquants can be represented by an '''isoquant map''', a graph combining a number of isoquants, each representing a different quantity of output. |
|||
{| width = "100%" |
|||
|- |
|||
! width="50%" align="left" | <font color="gray"><</font> [[Wikipedia:Articles for deletion/Log/2005 November 4|November 4]] |
|||
! width="50%" align="right" | <!-- [[Wikipedia:Articles for deletion/Log/2005 November 6|November 6]] --> <font color="gray">></font> |
|||
|} |
|||
</div> |
|||
An isoquant shows that the firm in question has the ability to substitute between the two different inputs at will in order to produce the same level of output. An isoquant map can also indicate decreasing or increasing [[returns to scale]] based on increasing or decreasing distances between the isoquants on the map as you increase output. If the distance between isoquants increases as output increases, the firm's production function is exhibiting decreasing returns to scale; doubling both inputs will result in placement on an isoquant with less than double the output of the previous isoquant. Conversely, if the distance is decreasing as output increases, the firm is experiencing increasing returns to scale; doubling both inputs results in placement on an isoquant with more than twice the output of the original isoquant. |
|||
<div align = "center">'''[[Wikipedia:Guide to deletion|Guide to deletion]]'''</div> |
|||
{{Cent}} |
|||
[[Image:Isoquant perfectsubs.PNG|thumb|250px|A) Example of an isoquant map with two inputs that are perfect substitutes.]] |
|||
<small>{{purge|Purge server cache}}</small> |
|||
== [[November 5]] == |
|||
As with indifference curves, two isoquants can never cross. Also, every possible combination of inputs is on an isoquant. Finally, any combination of inputs above or to the right of an isoquant results in more output than any point on the isoquant. Although the marginal product of an input decreases as you increase the quantity of the input while holding all other inputs constant, the marginal product is never negative since a logical firm would never increase an input to decrease output. |
|||
<!-- New votes to the bottom, please. --> |
|||
{{Wikipedia:Articles for deletion/Prophecy (Harry Potter)}} |
|||
---- |
|||
{{Wikipedia:Articles for deletion/Rufio Rush}} |
|||
{{Wikipedia:Articles for deletion/Thiago Reis}} |
|||
If the two inputs are perfect substitutes, the resulting isoquant map generated is represented in fig. A; with a given level of production Q3, input X is effortlessly replaced by input Y in the production function. The perfect substitute inputs do not experience decreasing marginal rates of return when they are substituted for each other in the production function. |
|||
{{Wikipedia:Articles for deletion/Tokitae}} |
|||
{{Wikipedia:Articles for deletion/Anoš}} |
|||
If the two inputs are perfect compliments, the isoquant map takes the form of fig. B; with a level of production Q3, input X and input Y can only be combined efficiently in a certain ratio represented by the kink in the isoquant. The firm will combine the two inputs in the required ratio to maximize output and minimize cost. If the firm is not producing at this ratio, there is no rate of return for increasing the input that is already in excess. |
|||
{{Wikipedia:Articles for deletion/Fing-longra}} |
|||
{{Wikipedia:Articles for deletion/Scripture2-channel}} |
|||
[[Image:Isoquant perfectcomps.PNG|thumb|250px|B) Example of an isoquant map with two inputs that are perfect compliments.]] |
|||
{{Wikipedia:Articles for deletion/BSOD - Blue Screen Of Death}} |
|||
{{Wikipedia:Articles for deletion/True Freedom}} |
|||
== See also == |
|||
{{Wikipedia:Articles for deletion/Manatoo}} |
|||
*[[microeconomics]] |
|||
{{Wikipedia:Articles for deletion/Metaloix}} |
|||
*[[production, costs, and pricing]] |
|||
{{Wikipedia:Articles for deletion/Robert Stinson}} |
|||
*[[production theory basics]] |
|||
{{Wikipedia:Articles for deletion/Big Poppa E}} |
|||
{{Wikipedia:Articles for deletion/Jeff Sorensen}} |
|||
[[Category:Economics of production]] |
|||
{{Wikipedia:Articles for deletion/Jamez}} |
|||
{{Wikipedia:Articles for deletion/Seventh Strike 2}} |
|||
[[cs:Izokvanta]] |
|||
{{Wikipedia:Articles for deletion/Toronto Aerodrome}} |
|||
{{Wikipedia:Articles for deletion/Toronto Flying Club}} |
|||
The Fig knows all. |
|||
{{Wikipedia:Articles for deletion/Team Giza}} |
|||
{{Wikipedia:Articles for deletion/Mental cruelty}} |
|||
{{Wikipedia:Articles for deletion/Resurgence of antonarian monotheistic concepts}} |
|||
{{Wikipedia:Articles for deletion/Elektrichka song}} |
|||
{{Wikipedia:Articles for deletion/Blackwood and Back - The Dream Mile}} |
|||
{{Wikipedia:Articles for deletion/Filtering vodka}} |
|||
{{Wikipedia:Articles for deletion/Nintendo Lounge}} |
|||
{{Wikipedia:Articles for deletion/Piggy Davis Syndrome}} |
|||
{{Wikipedia:Articles for deletion/Stewielocks and the Three Griffins}} |
|||
{{Wikipedia:Articles for deletion/Heinkel He 278}} |
|||
{{Wikipedia:Articles for deletion/Anthony Charles Jenkins}} |
|||
{{Wikipedia:Articles for deletion/M.O.C.K.}} |
|||
{{Wikipedia:Articles for deletion/Great and Little Belt}} |
|||
{{Wikipedia:Articles for deletion/Extreme Gothic Metal}} |
|||
{{Wikipedia:Articles for deletion/Oriental Logistics}} |
|||
{{Wikipedia:Articles for deletion/Meridian Park}} |
|||
{{Wikipedia:Articles for deletion/Saw III}} |
|||
{{Wikipedia:Articles for deletion/Mighty 'white' of you}} |
|||
{{Wikipedia:Articles for deletion/Baron von Brunk}} |
|||
{{Wikipedia:Articles for deletion/Testface}} |
|||
{{Wikipedia:Articles for deletion/Davido, Victoria}} |
|||
{{Wikipedia:Articles for deletion/Original Puff Daddy}} |
|||
{{Wikipedia:Articles for deletion/Owlie, Owly}} |
|||
{{Wikipedia:Articles for deletion/Twin county pythons}} |
|||
{{Wikipedia:Articles for deletion/Rumors inc}} |
|||
{{Wikipedia:Articles for deletion/Dual Monitors with nVidia TwinView}} |
|||
{{Wikipedia:Articles for deletion/Best & Company}} |
|||
{{Wikipedia:Articles for deletion/Executive Order 12333}} |
|||
{{Wikipedia:Articles for deletion/Jeremiah J. Sinkie}} |
|||
{{Wikipedia:Articles for deletion/Jay Gridley}} |
|||
{{Wikipedia:Articles for deletion/Alan Shefman (second nomination)}} |
|||
{{Wikipedia:Articles for deletion/Mom's Dirty Water}} |
|||
{{Wikipedia:Articles for deletion/Redeye (band)}} |
|||
{{Wikipedia:Articles for deletion/Pone}} |
|||
{{Wikipedia:Articles for deletion/Indiefucks}} |
|||
{{Wikipedia:Articles for deletion/Guy Hands}} |
|||
{{Wikipedia:Articles for deletion/Μαυρομάτι}} |
|||
{{Wikipedia:Articles for deletion/Be Buon Lam Ben Nay}} |
|||
{{Wikipedia:Articles for deletion/Rapier (Witham)}} |
|||
{{Wikipedia:Articles for deletion/Daynamic web page}} |
|||
{{Wikipedia:Articles for deletion/Out of School Suspension2}} |
|||
{{Wikipedia:Articles for deletion/Arcane Knights of the Apocalypse}} |
|||
{{Wikipedia:Articles for deletion/Black Left Pinky}} |
|||
{{Wikipedia:Articles for deletion/Caldicot Comprehensive School}} |
|||
{{Wikipedia:Articles for deletion/Dallas tariff}} |
|||
{{Wikipedia:Articles for deletion/Gloom (Game)}} |
|||
{{Wikipedia:Articles for deletion/Hamus allis}} |
|||
{{Wikipedia:Articles for deletion/Kim Urhahn}} |
|||
{{Wikipedia:Articles for deletion/King Country Electricity}} |
|||
{{Wikipedia:Articles for deletion/The Dark and The Light}} |
|||
{{Wikipedia:Articles for deletion/Tian Yun Yao}} |
|||
{{Wikipedia:Articles for deletion/Xinmin Secondary School}} |
|||
{{Wikipedia:Articles for deletion/Yenom records}} |
|||
{{Wikipedia:Articles for deletion/Yury Onischuk}} |
|||
{{Wikipedia:Articles for deletion/Gamepost2}} |
|||
{{Wikipedia:Articles for deletion/Speedball (sport)2}} |
|||
{{Wikipedia:Articles for deletion/Flying W Ranch}} |
|||
{{Wikipedia:Articles for deletion/Paddock (field)}} |
|||
{{Wikipedia:Articles for deletion/Bettiscombe}} |
|||
{{Wikipedia:Articles for deletion/Tedmeister}} |
|||
{{Wikipedia:Articles for deletion/Infochannel Software}} |
|||
{{Wikipedia:Articles for deletion/Wikiracist}} |
|||
{{Wikipedia:Articles for deletion/Wack}} |
|||
{{Wikipedia:Articles for deletion/Graffix}} |
|||
{{Wikipedia:Articles for deletion/ChaytorFamilyTree}} |
|||
{{Wikipedia:Articles for deletion/Michael J. Bernard}} |
|||
{{Wikipedia:Articles for deletion/The greatest college basketball game ever}} |
|||
{{Wikipedia:Articles for deletion/Current events by country}} |
|||
{{Wikipedia:Articles for deletion/Donnie dollas}} |
|||
{{Wikipedia:Articles for deletion/Riot (Marvel Comics)}} |
|||
{{Wikipedia:Articles for deletion/Lasher (comics)}} |
|||
{{Wikipedia:Articles for deletion/Shriek Symbiote (comics)}} |
|||
{{Wikipedia:Articles for deletion/Roger Boden}} |
|||
{{Wikipedia:Articles for deletion/Wrestle Rant}} |
|||
{{Wikipedia:Articles for deletion/Smarking Out}} |
|||
{{Wikipedia:Articles for deletion/Robert Seddon}} |
|||
{{Wikipedia:Articles for deletion/Stephen Smith (music producer)}} |
|||
{{Wikipedia:Articles for deletion/Scripture-channel}} |
|||
{{Wikipedia:Articles for deletion/Intercessory dance}} |
|||
{{Wikipedia:Articles for deletion/Bc radio history}} |
|||
{{Wikipedia:Articles for deletion/The Diary of Anne Frank 2: The Hidden Chapter}} |
|||
{{Wikipedia:Articles for deletion/House Of Maqbool 2}} |
|||
{{Wikipedia:Articles for deletion/Daniel R. Jennings}} |
|||
{{Wikipedia:Articles for deletion/GoGirls}} |
|||
{{Wikipedia:Articles for deletion/Dark gems}} |
|||
{{Wikipedia:Articles for deletion/Team of Destiny}} |
|||
{{Wikipedia:Articles for deletion/Lee Mirecki}} |
|||
{{Wikipedia:Articles for deletion/LAprepSoccer.com}} |
|||
{{Wikipedia:Articles for deletion/Alias Unbound}} |
|||
{{Wikipedia:Articles for deletion/Bureau of Anomaly Investigation}} |
|||
{{Wikipedia:Articles for deletion/Pennsylvania Hockey League}} |
|||
{{Wikipedia:Articles for deletion/Party Bus 08}} |
|||
{{Wikipedia:Articles for deletion/Leaf-cutter ants}} |
|||
{{Wikipedia:Articles for deletion/Suffschuppen}} |
|||
{{Wikipedia:Articles for deletion/Helena Ifill}} |
|||
{{Wikipedia:Articles for deletion/G&A}} |
|||
{{Wikipedia:Articles for deletion/Lucy Jones (linguist)}} |
|||
{{Wikipedia:Articles for deletion/Digital gaming}} |
|||
{{Wikipedia:Articles for deletion/Karma (Alias Unbound)}} |
|||
{{Wikipedia:Articles for deletion/Christopher Clark}} |
|||
{{Wikipedia:Articles for deletion/Jamileh}} |
|||
{{Wikipedia:Articles for deletion/New WWE}} |
|||
{{Wikipedia:Articles for deletion/Porn tastes good}} |
|||
{{Wikipedia:Articles for deletion/Fallen Angels and the Origins of Evil, Elizabeth Clare Prophet}} |
|||
{{Wikipedia:Articles for deletion/Katrina: The Wrath of Bush}} |
|||
{{Wikipedia:Articles for deletion/The Fishtank Casualties}} |
|||
{{Wikipedia:Articles for deletion/Claire's Unnatural Twin}} |
|||
Revision as of 22:15, 5 November 2005
In economics, an isoquant is a contour line drawn through the set of points at which the same quantity of output is produced while changing the quantities of two or more inputs. Another way of defining the isoquant is a curve that shows all possible quantities of inputs that result in the same level of output with a given production function. The isoquant is a parallel of the indifference curve concept that deals with producers instead of consumers. While the indifference curve helps to answer the utility-maximizing problem of consumers, the isoquant deals with the cost-minimization problem of producers. Isoquants are typically drawn on capital-labor graphs, showing the tradeoff between capital and labor in the production function, and the decreasing marginal returns of both inputs. Adding one input while holding the other constant eventually leads to decreasing marginal output, and this is reflected in the shape of the isoquant. A family of isoquants can be represented by an isoquant map, a graph combining a number of isoquants, each representing a different quantity of output.
An isoquant shows that the firm in question has the ability to substitute between the two different inputs at will in order to produce the same level of output. An isoquant map can also indicate decreasing or increasing returns to scale based on increasing or decreasing distances between the isoquants on the map as you increase output. If the distance between isoquants increases as output increases, the firm's production function is exhibiting decreasing returns to scale; doubling both inputs will result in placement on an isoquant with less than double the output of the previous isoquant. Conversely, if the distance is decreasing as output increases, the firm is experiencing increasing returns to scale; doubling both inputs results in placement on an isoquant with more than twice the output of the original isoquant.
As with indifference curves, two isoquants can never cross. Also, every possible combination of inputs is on an isoquant. Finally, any combination of inputs above or to the right of an isoquant results in more output than any point on the isoquant. Although the marginal product of an input decreases as you increase the quantity of the input while holding all other inputs constant, the marginal product is never negative since a logical firm would never increase an input to decrease output.
If the two inputs are perfect substitutes, the resulting isoquant map generated is represented in fig. A; with a given level of production Q3, input X is effortlessly replaced by input Y in the production function. The perfect substitute inputs do not experience decreasing marginal rates of return when they are substituted for each other in the production function.
If the two inputs are perfect compliments, the isoquant map takes the form of fig. B; with a level of production Q3, input X and input Y can only be combined efficiently in a certain ratio represented by the kink in the isoquant. The firm will combine the two inputs in the required ratio to maximize output and minimize cost. If the firm is not producing at this ratio, there is no rate of return for increasing the input that is already in excess.
See also
The Fig knows all.