RE (complexity): Difference between revisions

Revision as of 17:28, 12 June 2013

A marginal value is

a value that holds true given particular constraints,
the change in a value associated with a specific change in some independent variable, whether it be of that variable or of a dependent variable, or
[when underlying values are quantified] the ratio of the change of a dependent variable to that of the independent variable.

(This third case is actually a special case of the second).

In the case of differentiability, at the limit, a marginal change is a mathematical differential, or the corresponding mathematical derivative.

These uses of the term “marginal” are especially common in economics, and result from conceptualizing constraints as borders or as margins.^[1] The sorts of marginal values most common to economic analysis are those associated with unit changes of resources and, in mainstream economics, those associated with instantaneous changes. Marginal values associated with units are considered because many decisions are made by unit, and marginalism explains unit price in terms of such marginal values. Mainstream economics uses instantaneous values in much of its analysis for reasons of mathematical tractability.

Quantified conception

Assume a functional relationship

y = f (x_{1}, x_{2}, \dots, x_{n})

Discrete change

If the value of $x_{i}$ is discretely changed from $x_{i, 0}$ to $x_{i, 1}$ while other independent variables remain unchanged, then the marginal value of the change in $x_{i}$ is

Δ x_{i} = x_{i, 1} - x_{i, 0}

and the “marginal value” of $y$ may refer to

Δ y = f (x_{1}, x_{2}, \dots, x_{i, 1}, \dots, x_{n}) - f (x_{1}, x_{2}, \dots, x_{i, 0}, \dots, x_{n})

or to

\frac{Δ y}{Δ x} = \frac{f (x_{1}, x_{2}, \dots, x_{i, 1}, \dots, x_{n}) - f (x_{1}, x_{2}, \dots, x_{i, 0}, \dots, x_{n})}{x_{i, 1} - x_{i, 0}}

Example

If an individual saw her income increase from $50000 to $55000 per annum, and part of her response was to increase yearly purchases of amontillado from 2 casks to three casks, then

the marginal increase in her income was $5000
the marginal effect on her purchase of amontillado was an increase of 1 cask, or of 1 cask per $5000.

Instantaneous margins

If instantaneous values are considered, then a marginal value of $x_{i}$ would be $d x_{i}$ , and the “marginal value” of $y$ would typically refer to

\frac{\partial y}{\partial x_{i}} = \frac{\partial f (x_{1}, x_{2}, \dots, x_{n})}{\partial x_{i}}

(For a linear functional relationship $y = a + b \cdot x$ , the marginal value of $y$ will simply be the co-efficient of $x$ (in this case, $b$ ) and this will not change as $x$ changes. However, in the case where the functional relationship is non-linear, say $y = a \cdot b^{x}$ , the marginal value of $y$ will be different for different values of $x$ .)

Example

Assume that, in some economy, aggregate consumption is well-approximated by

C = C (Y)

where

$Y$ is aggregate income.

Then the marginal propensity to consume is

M P C = \frac{d C}{d Y}

References

↑ Wicksteed, Philip Henry; The Common Sense of Political Economy (1910), Bk I Ch 2 and elsewhere.

[1] Wicksteed, Philip Henry; The Common Sense of Political Economy (1910), Bk I Ch 2 and elsewhere.

[1]

@@ Line 1: / Line 1: @@
-Hello, my name is Andrew and my spouse doesn't like it at all. I've always cherished residing in Mississippi. Invoicing is my occupation. Doing ballet is something she would never give up.<br><br>my site: email psychic readings - [http://www.weddingwall.com.au/groups/easy-advice-for-successful-personal-development-today/ related webpage],
+A '''marginal value''' is
+#a [[Value (mathematics)|value]] that holds true given particular constraints,
+#the ''change'' in a value associated with a specific change in some [[Dependent and independent variables|independent variable]], whether it be of that variable or of a [[Dependent and independent variables|dependent variable]], or
+#[when underlying values are quantified] the ''[[ratio]]'' of the change of a dependent variable to that of the independent variable.
+(This third case is actually a special case of the second).
+In the case of [[Differentiability#Continuity and differentiability|differentiability]], at the limit, a marginal change is a [[Differential (infinitesimal)|mathematical differential]], or the corresponding [[Derivative (calculus)|mathematical derivative]].
+These uses of the term “marginal” are especially common in [[economics]], and result from conceptualizing constraints as ''borders'' or as ''margins''.<ref>[[Philip Wicksteed|Wicksteed, Philip Henry]]; [http://www.econlib.org/library/Wicksteed/wkCS.html ''The Common Sense of Political Economy'' (1910),] [http://www.econlib.org/cgi-bin/searchbooks.pl?searchtype=BookSearchPara&id=wkCS&query=margin Bk I Ch 2 and elsewhere].</ref>  The sorts of marginal values most common to economic analysis are those associated with ''unit'' changes of resources and, in [[mainstream economics]], those associated with ''instantaneous'' changes.  Marginal values associated with units are considered because many decisions are made by unit, and [[marginalism]] explains ''unit price'' in terms of such marginal values.  Mainstream economics uses instantaneous values in much of its analysis for reasons of mathematical tractability.
+== Quantified conception ==
+Assume a functional relationship
+:<math>y=f\left(x_1 ,x_2 ,\ldots,x_n \right)</math>
+=== Discrete change ===
+If the value of <math>x_i</math> is ''discretely'' changed from <math>x_{i,0}</math> to <math>x_{i,1}</math> while other independent variables remain unchanged, then the marginal value of the change in <math>x_i</math> is
+:<math>\Delta x_i =x_{i,1}-x_{i,0}</math>
+and the “marginal value” of <math>y</math> may refer to
+:<math>\Delta y=f\left(x_1 ,x_2 ,\ldots ,x_{i,1},\ldots,x_n \right)-f\left(x_1 ,x_2 ,\ldots ,x_{i,0},\ldots,x_n \right)</math>
+or to
+:<math>\frac{\Delta y}{\Delta x}=\frac{f\left(x_1 ,x_2 ,\ldots ,x_{i,1},\ldots,x_n \right)-f\left(x_1 ,x_2 ,\ldots ,x_{i,0},\ldots,x_n \right)}{x_{i,1}-x_{i,0}}</math>
+==== Example ====
+If an individual saw her income increase from $50000 to $55000 per annum, and part of her response was to increase yearly purchases of [[amontillado]] from 2 casks to three casks, then
+*the marginal increase in her income was $5000
+*the marginal effect on her purchase of amontillado was an increase of 1 cask, or of 1 cask per $5000.
+=== Instantaneous margins ===
+If ''instantaneous'' values are considered, then a marginal value of <math>x_i</math> would be <math>dx_i</math>, and the “marginal value” of <math>y</math> would typically refer to
+:<math>\frac{\partial y}{\partial x_i}=\frac{\partial f\left(x_1 ,x_2 ,\ldots,x_n \right)}{\partial x_i}</math>
+(For a linear functional relationship <math>y = a + b\cdot x</math>, the marginal value of <math>y</math> will simply be the co-efficient of <math>x</math> (in this case, <math>b</math>) and this will not change as <math>x</math> changes. However, in the case where the functional relationship is non-linear, say <math>y = a\cdot b^x</math>, the marginal value of <math>y</math> will be different for different values of <math>x</math>.)
+==== Example ====
+Assume that, in some economy, aggregate consumption is well-approximated by
+:<math>C=C\left(Y\right)</math>
+where
+*<math>Y</math> is [[Measures of national income and output|aggregate income]].
+Then the ''[[marginal propensity to consume]]'' is
+:<math>MPC=\frac{dC}{dY}</math>
+== See also ==
+*[[Marginal concepts]]
+== References ==
+<references />
+[[Category:Economics terminology]]
+[[Category:Marginal concepts]]

RE (complexity): Difference between revisions

Revision as of 17:28, 12 June 2013

Contents

Quantified conception

Discrete change

Example

Instantaneous margins

Example

See also

References

Navigation menu