mathematics of econmics
⊃
"includes"
∈
"is an element of"
⊂
"is included in"
Properties of a Production Set Y
(1) 0 belongs to Y (possibility of inaction) (2) Y ∩ {R(l)+} = {0} (no free lunch) (3) -{R(l)+} is a subset of Y (free disposal) (4) Y ∩ {-Y} = {0} (irreversibility) (5) Y is closed (6) Y is convex
Point Income-Elasticity of Demand
(dQdx/dI)(I/Qdx)
Point Cross Price-Elasticity of Demand
(dQdx/dPw)(Pw/Qdx)
decreasing returns to scale
(diseconomies) an increase in a firms scale of production leads to higher costs per unit produced
increasing returns to scale
(economies of scale) an increase in a firms scale of production leads to lower costs per unit produced
profit
(pie) = TR - TC
null set
(Ø or {}) Empty set, considered a subset of every set
The Power Rule of differentiation
*see notes
Convexity/concavity in multivariate functions
- A function f is convex at x if and only if its Hessian matrix is positive semidefinite at x - A function f is strictly convex at x if and only if its Hessian matrix is positive definite at x - A function f is concave at x if and only if its Hessian matrix is negative semidefinite at x - A function f is strictly concave at x if and only if its Hessian matrix is negative definite at x
[1st Three of Six] Steps of Risk Filtering, Ranking, and Mgmt.
- Identify risk scenarios - Scenario filtering based on scope, temporal domain, and level of decision making - P-I matrix filtering and ranking
[Last Three of Six] Steps of Risk Filtering, Ranking, and Mgmt.
- Multi-criteria evaluation, e.g., multi-objective, sensitivity analysis - Quantitative ranking - Risk management: response planning, report, implementation, review
Equation for MRS
-MUx1/MUx2
Decreasing returns to scale
-Q(λK,λL)<λQ(K,L) -Degree of homogeneity is less than 1 *If input is 2, output will be 1
Constant return to scale
-Q(λK,λL)=λQ(K,L) -Degree of homogeneity is 1 *If input is 2, output will be 2
Increasing returns to scale
-Q(λK,λL)>λQ(K,L) -Degree of homogeneity is greater than 1 *If input is 2, output will be 3
Normal Good: Necessity Value of Ei
0.0 < Ei < 1.0
What is the antiderivative of e^2x?
0.5e^2x
Rules for matrix multiplication
1. (AB)C = A(BC) 2. A(B + C) = AB + AC 3. (A + B)C = AC + BC 4. (αA)B = A(αB) = αAB Also: • AB ≠ BA • AB = 0 does not imply that either A or B = 0 • AB = AC and A ≠ 0 does not imply that B = C
Elements of a function
1. Domain - representing X 2. Target space - representing Y 3. Rule for mapping
Solving Differential Equations
1. Find Homogenous Solution 2. Find Particular Solution (Steady State) 3. Find the General Solution 4. Solve Initial Value problem
Give the steps for finding the max profit for a firm that produces into two different markets
1. Find TR=Tr1+Tr2 2. Find profit = TR-TC 3. Partially derive profit with respect to each good and solve 4. Find second order derivatives and prove it is a max using f'(x1)f'(x2) -f'(x1x2) > 0
Verifying critical points for functions of several variables
1. Find all four second partial derivatives 2. Find the Hessian determinant (D2) 3. Use the second partial derivative with respect to x or respect to y as D1 4. Substitute the critical point(s) into D1 and D2 5. Observe if D2 is greater than 0, if it is then observe D1's value *D1>0: minimum D1<0: maximum
Properties of a function
1. Function has to be defined for every element in the domain 2. Each element in the domain is mapped to only one
What is the substitution method and how can it be used to find maximum output?
1. Given Q(L,K) 2. Find PlL + PkK = C Where Pl=price of labour, Pk=price of capital, C = total input cost 3. Express K as a function of L 4. Partially derive with respect to L and prove it is a maximum Same for utility
Give the steps for finding max profit for a monopolist producing 2 goods
1. Identity the constraint 2. Find profit equation 3. Form Lagrangian function (pi - constraint x Llamda) 4. Form Lagrangian equations by deriving with respect to each variable 5. Find Q1, Q2, and Llamda 6. Calculate optimal profit
Obtaining critical points for functions of several variables
1. Take the first partial derivative with respect to x and with respect to y 2. Set each result equal to 0 (FOC) to obtain the critical point(s) *By setting equal to 0, one finds the point(s) where the minimum or maximum is the same in both x and y directions
What are the 6 rules of differentiation for a function with one independent variable such as y= f(x)
1. The Constant Rule 2. The Power Rule 3. The Addition Rule 4. The Product Rule 5. The Quotient Rule 6. The Chain Rule (Function of a Function Rule
What are two concepts that the derivative can represent?
1. The slope of a function 2. The "marginal" function of a "total" function
The derivative of log base b of x
1/ (lnb*x)
The derivative of ln(x)
1/x
Number of subsets of a set with n elements
2^n
Opt. Profit (60%) Leisure (20%) Health (20%) Utility A 8 2 3 B 5 5 5 C 5 6 2 What're the Values and Which one Should He choose?
5.6 4.2 5.4
Risk Loving 𝑢(𝑝𝑥+(1−𝑝)𝑦) O? 𝑝𝑢(𝑥)+(1−𝑝)𝑢(𝑦)
<
Risk Neutral 𝑢(𝑝𝑥+(1−𝑝)𝑦) O? 𝑝𝑢(𝑥)+(1−𝑝)𝑢(𝑦)
=
Elasticity of supply or demand
= (dQ/dP) * (P/Q)
Marginal product of capital
=dQ/dK
Marginal product of labour
=dQ/dL
Risk Averse 𝑢(𝑝𝑥+(1−𝑝)𝑦) O? 𝑝𝑢(𝑥)+(1−𝑝)𝑢(𝑦)
>
Risk Premium if Risk Averse? RP>0, RP<0, or RP=0
>
Set (finite and infinite) (disjoint)
A collection of distinct objects. Membership of an element in a set is indicated by the symbol € (epsilon). { (is contained in) and ) } (includes) the symbol relates a subset to a set
Parameter
A constant value that is undetermined and, therefore, represented as a variable (usually lowercase a, b, c)
Homothetic function
A function is homothetic if they are indifferent between x and y whilst maintaining indifferent between tx and ty. f(x) = f(y) --> f(tx) = f(ty)
Homogeneous function
A function with multiplicative scaling behavior *if all its arguments are multiplied by a factor, then its value is multiplied by some power of this factor
Hessian determinant
A matrix composed of the four second partial derivatives used to find D2 First row: f(subscript xx) f(subscript xy) Second row: f(subscript yx) f(subscript yy) Multiply f(subscript xx) by f(subscript yy) and subtract Multiply f(subscript xy) by f(subscript yx) from it
Rational Number
A number that can be written as a fraction, including all integers and fractions. All rational numbers can be written as either terminating or repeating decimals.
Irrational Number
A number which cannot be represented as a fraction and whose decimal form never repeats or terminates (i.e. pi)
Matrix
A rectangular array of numbers considered as one mathematical object.
Behavioral Equation
A relationship that specifies the manner in which a variable behaves in response to changes in other variables
Bound and unbound sets
A set is bounded if the whole set is contained within a sufficiently large n-dimensional ball with a finite radius A set is unbounded if no ball with a finite radius can enclose it
Compact sets
A set is compact if it is closed and bounded.
Rule for convex set
A set is convex if any weighted average of any two points lies on the set. xa = ax1 + (1-a)x2 is in domain
Open and closed sets
A set is open if it consists only of interior points A set is closed if it contains all of its boundary points
Endogenous Variable
A value that depends on other variables in a model and is thus explained within the model
Exogenous Variable
A value that is wholly causally independent from other variables in the system (usually symbolized with a "₀" as in "P₀" instead of "P")
average cost
AC = TC/Q or FC/Q + VC
average variable cost
AVC = TVC/q Rising cost intersects average variable cost at the minimum point of AVC when MC < AVC, AVC is declining when MC > AVC, AVC is increasing
Real Numbers
All rational and irrational numbers (commonly symbolized as R)
Mathematical model
An approximate description or representation of a real-life situation expressed in terms of mathematical symbols (constants, variables, equations, inequalities, etc)
Law of diminishing marginal productivity
An economic principle that states that while increasing one input and keeping other inputs at the same level may initially increase output, further increases in that input will have a limited effect, and eventually no effect or a negative effect, on output
Conditional Equation
An equation that states a requirement to be satisfied
Definitional Equation
An identity between two expressions that have exactly the same meaning (Profit ≡ Revenue - Cost)
Labor Supply Decision
As in output markets, households face constrained choices in input markets. They must decide: 1. Whether to work 2. How much to work 3. What kind of job to take
appendix to chapter 9
Assumption: The new firms that enter the market are pretty much identical to the old firms
Inada conditions
Assumptions about the shape of a neoclassical production function that guarantee the stability of economic growth in a neoclassical growth model
Let P be a simplex and z:P->R(l) be a continuous function s.t. p*z(p) <= 0 for all p in P. Then there exists a p' in P s.t. z(p') <= 0
Baby Gale-Nikaido-Debreu
Marginal Cost
C'(x). Rate of change of cost as "x" changes
Cost function
C(x)
Cost Function
C(x). The cost of making "x" units.
Average cost
C(x)/x
Average Cost
C(x)/x. Cost per unit when "x" units are made.
Give the equation for consumption
C=aY + b where a= marginal prosperity to consume and b=autonomous consumption
Small increments formula
Change in z = Partial derivative of x . change in x + partial derivative of y . change in y
Define marginal cost
Cost of producing just one more item / the rate of change of cost with respect to x units produced
Define average cost
Cost per unit when x units are produced
Three types of equation
Definitional equations, behavioral equations, and conditional equations
Partial derivative of f(x) with respect to y
Derive in terms of y holding all other functions constant
Partial-Equilibrium Supply & Demand Model
Describes the behavior of a single good in the market as opposed to a general equilibrium model which describes all goods in the market and their inter-relationships
Implicit differentiation
Differentiate both sides of the equation with repect to x considering y as a function of x; then solve for y'.
Effective Annual Interest Rate (EAR) Formula
EAR = (1 + (i/m))^(m) -1
Relationship between Two Goods: Compliments
Ecp < 0.0 or negative
(Ecp) cross-price elasticity of demand formula
Ecp = % change in demand of Good x / % change in change in price of Good y
Relationship between Two Goods: Substitutes
Ecp > 0.0 or positive
Point Price-Elasticity of Demand
Ed= (dQdx/dPx)(Px/Qdx)
Point Price-Elasticity of Supply
Ed= (dQsx/dPx)(Px/Qsx)
Inferior Good Value of Ei
Ei < 0.0 or negative
Income Elasticity of Demand formula
Ei = % change in demand / % change in income
Normal Good: Luxery Value of Ei
Ei > 1.0
How do you decide if a good is inelastic or elastic?
Ep < 0 = inelastic Ep > 0 = elastic
Function for number of individuals between a and b (N)
F(∞)= n∫f(r)dr (from a to b)
Function for total income in a group (M)
F(∞)= n∫rf(r)dr (from a to b)
Cumulative distribution function
F(∞)=∫f(r)dr (from 0 to infinity)
Total Costs (TC)
FC + ( VC×Q)
First and second order conditions
FOC: f'(x)=0 SOC: looking at the sign of f''(x) (if <0, local maximum, if >0, local minimum - when f'(x) = 0 that is)
Characteristic of the Difference Equation
First Order, Linear, and Autonomous
Concave (in relation to derivatives)
For X in domain I; increasing in I, f''(x) </= 0
Convex (in relation to derivatives)
For X in domain I; increasing in I, f''(x) >/= 0
Young's theorem
For any two partials that involve differentiating with respect to each variable the same number of times, they are equal (cross-partials equal).
multivariate function
Function with more than one independent variable. The value of the dependent variable is determined by the values two variables.
Baby Brouwer
Given continuous f:[0,1] -> [0,1], there exists x' in [0,1] s.t. f(x') = x' (prove it)
Interpreting λ at maximum/minimum point
How optimal value of f changes with c (constant) • Function needs to satisfy FOC (as in, be at an optimum) ○ At a corner solution, this will not work • Needs to satisfy budget constraint
Give the equation for investment
I=I*
Brouwer's Theorem
If S (subset of R(l)) is a nonempty, convex, and compact set and f:S -> S is continuous, then there exists an x' in S s.t. f(x') = x'
Extreme value theorem (multivariate)
In a continuous function through a nonempty, compact domain D; there exists both a global minimum and a global maximum in D.
Union
In set theory, the union (U) of a collection of sets is the set of all elements in the collection.
Mean value theorem
In the interval [a, b] for a function connecting a to b, there will be at least one point on this function that has the same gradient as the linear line connecting a to b.
Let S be a non-empty, convex, compact set. additionally, let φ:S -> S be a upper semi-continuous, convex-valued correspondence. Then there exists a x' in S s.t. x' is in φ(x')
Kakutani's Theorem
The transpose
Let A be a m × n matrix. The transpose of A, denoted by A' or sometimes by AT, is defined as the n × m matrix whose first column is the first row of A, whose second column is the second row of A, and so on.
Gale-Nikaido-Debreu Lemma
Let P be a simplex in R(l) and Z a compact convex subset of R(l). Let ζ:P -> Z be a USC and convex valued correspondence s.t. p*ζ(p) <= 0 for all p in P. Then there exists a p' in P s.t. ζ(p') ∩ -{R(l)+} ≠ ∅
Profit maximizing theorem
Let Y subset of R(l) be convex. Let y' in Y be technologically efficient. Then there exists a p in R(l) s.t. p > 0 and py' >= py for all y in Y.
Intermediate value theorem
Let f be a function which is continuous in the interval [a, b]: 1. If f(a) and f(b) have different signs, then there is at least one c in (a, b) such that f(c) = 0 2. If f(a) ≠ f(b), then for every intermediate value y in the open interval between f(a) and f(b) there is at least one c in (a, b) such that f(c) = y
Mean income
M/N
Marginal cost
MC / C'(x)
Short run: supply curve for an individual firm
MC curve of a perfectly competitive profit maximizing firm
Average Product Trends
MP > AP, AP increases MP < AP, AP decreases
MRTS (marginal rate of technical substitution)
MPL/MPk
Equation for marginal rate of technical substitution
MPl/MPk
Short run: how much output will maximize profit?
MR = MC = p in perfect competition
marginal revenue formula
MR=(1+(1/Ed))
application to labor markets and land
MRPa = Pa (a = acres/land)
Multivariate functions
Map vectors to vectors
What does the second derivative represent?
Marginal changes of a marginal function.
Matrix operations
Matrix addition: if A = (aij)m x n and B = (bij)m x n are two matrices of the same order, we define: A + B = (aij)m x n + (bij)m x n = (aij + bij)m x n If α is a real number, we define: αA = α(aij)m x n = (αaij)m x n
Function
Method for mapping elements from one set (X) to elements of another set (Y) such that each element of X goes to one element of Y.
Assumptions for Cobweb Model
No Inventory Adaptive Expectations
Utility function
Numerical representation of ranking one's preferences over alternatives (this is descriptive and ordinal).
Interval of Compounding formula
P(1 + (i/m))^(mt) i = nominal interest rate m = number of times a bank pays you a year
profit maximizing conditions for inputs
PL = MRPL = (MPL x Px) for L, K, and A
Give the equation for PS
PQ - [Integral between Q and 0] P(q) dq
Give the equation for Total surplus
PS + CS
Marginal utility of a good
Partial derivative
Marginal product of capital MPk
Partial derivative of Q with respect to K
Equation for cross price elasticity of demand
Partial derivative of Q with respect to alternative Pa x Pa/Q
Equation for income elasticity of demand
Partial derivative of Q with respect to income x Y/Q
Equation for MPl
Partial derivative of Q with respect to labour
Equation for price elasticity of demand
Partial derivative of Q with respect to price x P/Q
How do you decide if a good is a normal or inferior good?
Positive - normal Negative - inferior
How do you decide if a good is a substitute or a complement good?
Positive = substitute Negative = complement
Profit, revenue, total costs
Profit = total revenue - total cost Economic Profit = total revenue - total economic cost
Equilibrium of supply and demand curve
Q1 = Q2 (intersection x coordinate)
Mathematical solution for equilibrium
Qd = Qs
Marginal revenue
R'(x)
Marginal Revenue
R'(x). Rate of change in revenue as "x" changes.
Profit function
R(x) - C(x)
Revenue function
R(x) = p(x) • x
Profit
R(x)-C(x). The revenue minus the cost.
Revenue Function
R(x). Total income from selling "x" units. R(x)=p(x)*x
Lagrange Multiplier
Rate at which the optimal value of the objective function changes with respect to changes in the constraint constant
Define marginal revenue
Rate of change of revenue with respect to the number of units sold
Kuhn Tucker Method (steps)
STEP 1: Associate Lagrange multipliers with the m constraints, then write down Lagrangian. STEP 2: Find the critical points of the Lagrangian by solving the system of equations (derive with respect to x, not λ) STEP 3: Impose the complementary slackness conditions: λ≥0, g_j (x)≤c_j, λ(g_j (x)-c_j) = 0 STEP 4: Find all vectors x that, together with associated λ's, satisfy conditions 2-3.
How do we use the substitution method for finding cost minimisation?
Same method but prove that stationary point is a minimum
Returns to scale
Scale determining whether or not output is multiplied by the same factor if all inputs are multiplied by that same factor *Used in production functions with labor and capital
How do you prove that a stationary point is a maximum?
Second order partial derivatives should be greater than 0 Derive one of the first oder partial derivatives in terms of the other variable Use equation: f"(x1).f"(x2) - f"(x1x2)^2 > 0
Partial Derivative
Shows the change in the dependent variable resulting from a small change in one independent while holding constant the value of other independent variables.
Equality of Cross Partial Derivatives
Smooth Functions
Sum of Geometric Sequence
Sn = (a(1-r^n))/(1-r)
Sum of Arithmetic Sequence
Sn = (n/2)(2a+(n-1)d)
Singular Matrix
Square-matrix that is not invertible
Introduction for Lagrangian Multiplier
State the Extreme Value Theorem: As the constraint is a closed and a bounded set as both x and y are non-negative, by Extreme Value Theorem, there will exist a minimum (maximum).
What does Particular Solution Mean?
Steady State, dy/dx = 0
Sequence
String of objects, like numbers, that follow a particular pattern (a 'set' does not need to follow such a pattern).
Matrix multiplication
Suppose A = (aij)m x n and B = (bij)n x p. Then the product C = AB is the m x p matric C = (cij)m x p whose element in the i-th row and the j-th column is the inner product.
Extreme value theorem
Suppose that f is a continuous function over a closed and bounded interval [a, b]. Then there exists a point d in [a, b] where f has a minimum, and a point c in [a, b] where f has a maximum. That is, one has f(d) ≤ f(x) ≤ f(c) for all x in [a, b].
Convex/concave theorem
Suppose that f is a function defined in an interval I and that c is a critical point for f in the interior of I... 1. If f is concave, then c is a maximum point for f in I. 2. If f is convex, then c is a minimum point for f in I.
Average Total Cost Formula
TC/Q
Average Fixed Cost
TFC/Q
total revenue
TR = P x Q
Total revenue quadratic formula
TR = aQ^2 +bQ
Total Revenue Test: When price is lowered when demand is elastic...
TR will rise
Total Variable Cost (TVC)
TVC = VC × Q
Average Variable Cost (AVC) Formula
TVC/Q
Long run
That period of time for which there are no fixed factors of production: firms can increase or decrease the scale of operation, and new firms can enter and existing firms can exit the industry
Elastic
The absolute value of Ed is greater that 1.0. Large response to a change. Located on the highest region of the demand curve.
Combinatorial mathematics
The branch of mathematics concerned with developing counting rules for given situations
What is the second derivative?
The derivative of the first derivative
Third Inada condition
The function is concave in K and L (law of diminishing marginal productivity) -Proven through the use of second partial derivatives of K and L *The second partial derivative of K must be less than 0 The second partial derivative of L must be less than 0
Second Inada condition
The function is increasing in K and L -Proven through use of first partial derivatives of K and L *The first partial derivative of K must be greater than 0 The first partial derivative of L must be greater than 0
Identity matrix
The identity matrix of order n, denoted by In or just I, is the n x n matric whose entries are 1 along the main diagonal and 0 elsewhere.
Fifth Inada condition
The limit of the first derivative is 0 as K and L approach infinity "Increasing input infinitely gives no change in output" *The limit of the first partial derivative of K as K approaches infinity must equal 0 The limit of the first partial derivative of L as L approaches infinity must equal 0 **Remember that a number divided by infinity is equal to 0
Fourth Inada condition
The limit of the first derivative is infinity as K and L approach 0 "Decreasing input gives an infinitely changing output" *The limit of the first partial derivative of K as K approaches 0 must equal infinity The limit of the first partial derivative of L as L approaches 0 must equal infinity **Remember that a positive number divided by a positive zero is equal to positive infinity
Budget Constraint
The limits imposed on household choices by income, wealth, and product prices PxX + PyY = I
Saddle point
The minimum of the function is in one direction and the maximum of the function is in another direction *Indicated by D2<0 If D2<0, the function has no minimum or maximum If D2=0, the function is inconclusive
Law of Diminishing Marginal Utility
The more of any one good consumed in a given period, the less satisfaction (utility) generated by consuming each additional (marginal) unit of the same good
Elements
The objects in a set
Short run
The period of time for which two conditions hold: the firm is operating under a fixed scale or production and firms can neither enter nor exit an industry
Define demand / price function
The price per unit that the company can charge if it sells x number of units
What does a derivative measure?
The rate of change of one variable in response to change in another.
Utility
The satisfaction a product yields
Substitution effect of price change
The shift in a purchasing pattern when a fall in the price of product X causes a household to buy more of X than its substitutes
Microeconomics
The study of the behavior of individual decision-making and how individuals or firms allocate scarce resources to make themselves and society as well off as possibe.
Define revenue function
The total amount of money taken in by selling x units
First Inada condition
The value of the function at (0,0) is 0
Geometric Sequence
Un = ar^(n−1)
Arithmetic Sequence
Un=a+(n-1)d
Three principal operations on sets
Union, intersection, and complement of sets
Gradient vector
Vector of all first-order partial derivatives. Can be used to draw an arrow.
Interval of Compounding
When banks pays interest more than once for example quarterly or monthly
external economies
When industry growth results in a decrease in long-run average costs
external diseconomies
When industry growth results in an increase in long-run average costs
Compound interest
When interest is NOT withdrawn, and yet for a period of time
Semidefinite
When the determinants and the diagonals are not strictly positive nor strictly negative but maybe equal to 0, they are positive (negative) semidefinite.
Simple interest
When you just keep your initial investment in the bank and withdrawn interest repayments
Total derivative
When z = f (x, y) with x = g(t) and y = h(t), then dz/dt = (∂f/∂x)(dx/dt) + (∂f/∂y)(dy/dt)
Level set
Where you let a function of multiple variables equal a constant and then plot various combinations of variables to equal that constant (e.g. indifference curve).
System of equations matricies
X=A^-1 * B
Give the equation for equilibrium
Y=C+I
Compound interest formula
Yn = P(1 + i)^n
Saving Formula
Yn = P(1+i)^t
Percentage Change in Quantity Demanded Formula
[(Qnew-Qold)/(Qnew+Qold/2)]/[(Pnew-Pold)/(Pnew+Pold/2)]
Give the equation for CS
[Integral between Qo and 0] of P(Q) dQ - PQ
() [] in denoting domain
[inclusive], (not inclusive)
Production function
a numerical or mathematical expression of a relationship between input and outputs. It shows units of total product as a function of units of inputs
uncertainty
a situation in which no reasonable probability can be assigned to potential outcomes. (the inability to determine the true state of affairs of a system)
What does Homogenous Solution Mean?
a=0
Product linear equation
aQ+b
The derivative of a^x
a^x * lna
Cost of Capital
add normal rate of return to capital as part of economic costs
Rule for concave functions
af(x1) + (1-a)f(x2) </= f[ax1 + (1-a)x2]
Rule for convex functions
af(x1) + (1-a)f(x2) >/= f[ax1 + (1-a)x2]
constant returns to scale
an increase in a firms scale of production has no effect on costs per unit
Sensitivity
changes in system's performance index (or output) to possible variations in the decision variables, constraint levels, and uncontrolled parameters (model coefficients)
Define cost function
cost of producing x units of a certain product
First order conditions provide
critical points that might be maxima or minima *First derivative equals 0
Derivative of a Constant
d/dx (c)=0
Power Rule
d/dx(x*)-n^(x*-1)
The Power Rule
d/dx[x^n]=[nx^(n-1)]
Give the equation for the investment multiplier
dY/dI* = 1/(1-a)
Give the equation for the marginal prospenity to consume multiplier
dY/da = (b+I*)/(1-a)^2
What is the law of diminishing marginal utility?
d^2U/dx1^2 < 0 and d^2U/dx1^2 < 0
Second Order Condition
d^2y/dx^2 < 0
derived demand
demand for input is dependent on demand for outputs those inputs are used to make
demand for inputs
demand up until the MC > MR
Envelope theorem (multivariate)
df*(r)/dr = df(x*(r), r)/dr Often you would need to use the chain rule in such a circumstance, however as we have x*(r), we no longer have to assume x is a function of r. Instead, we can treat both x and r as independent exogenous parameters.
Give the equation for the autonomous consumption multiplier
dv/da = 1-/(1-a)
First Order Condition
dy/dx = 0
Chain rule
dy/dx = dy/du.du/dx
Product rule
dy/dx = v du/dx + u dv/dx
The derivative of e^x
e^x
Utility Maximizing Rule
equating the ratio of the marginal utility of a good to its price for all goods
Homogenous function
f (tx1,tx2,...,txn) = t^k f (x1, x2,..., xn) HOD k
The Chain Rule
f'(g(x)) * g'(x)
Higher-order derivatives
f'(x) = slope of f(x) =dx/dy f"(x) = slope of f'(x) =(d^2y)/(dx^2) f"'(x) = slope of f"(x) = (d^3y)/(dx^3)
The Product Rule
f'(x)g(x)+g'(x)f(x)
Mathematical expression of homogenous function
f(ax, ay)=(a^k)(f(x,y)) a=constant number k=degree of homogeneity
Optimization is
finding the maximum or minimum of a function *Done through use of first order conditions and second order conditions
Separating Hyperplane Theorem
if A and B are two non-empty, disjoint, convex subsets of R(l), then there exists a p vector in R(l) and a scalar c within R s.t. px <= c for all x in A and px >= c for all x in B
Short run: should the firm shut down to minimize losses?
if TR > TC, P = MC; operate in short run; expand in long run and firms can enter if TR > TVC, P = MC; operate at a loss; contract in long run and firms exit if TR < TVC, P = MC; shut down in short run; contract in long run and firms exit
Intermediate Value Theorem
if f:[a,b] -> R is continuous, a<b, f(a)>0 and f(b)<0, then there exists x' in [a,b] s.t. f(x') = 0
increasing cost industries
industry encounters external diseconomies - AC increases as industry grows. Positive slope
decreasing cost industries
industry realizes external economies - AC decreases ad industry grows. Negative slope
constant cost industries
industry shows no diseconomies or economies of scale as industry grows. Flat curve
Definition of Derivative
lim h->0 [ f(x+h)-f(x)/h ]
CRRA when r=1
log(x)
Hessian matrix
n x n matrix of second order partials.
disjoint
not containing any of the same elements
Demand / Price function
p(x)
Demand Function
p(x). The price per unit that the company can charge at "x" units
Technologically Efficient
production plan y' in Y is technologically efficient if there does not exist y in Y s.t. y > y'
shifting the demand for inputs
shifts are caused by change in demand for output, change in quantity and substitutable inputs available, the prices of other inputs, and changes in technology
long-run average cost
shows the way per-unit costs change with output in the long run decrease in LRAC leads to external economies increase in LRAC leads to external diseconomies
minimum efficient scale
smallest size at which the LRAC curve is at its minimum
short run industry supply curve
sum of the MC curves (above AVC) of all the firms in an industry
Marginal Product
the additional output that can be produced by adding one more unit of a specific input
Marginal revenue product
the additional revenue a firms earns by employing 1 additional unit MRPL = MPL x Px
marginal revenue for price taking firms
the additional revenue that a firm takes in when it increases output by one additional unit. In perfect competition, MR = price = MC
Marginal Utility
the additional satisfaction gained by the consumption or use of one more unit of a good or service
productivity of input
the amount of output that can be produced from 1 unit of input
Average Product
the average amount produced by each unit of a variable factor of production. average product of labor = total product/total units of labor
Income effect of price change
the change in consumption of X due to an improvement in well-being
marginal cost
the derivative of the total cost function
Marginal Cost
the increase in total cost that results from producing 1 more unit of output. Marginal costs reflect changes in variable costs. **MC increases with output in the short run
Risk Neutral (r) is at the point where
the interval crosses 0; from negative to positive
total revenue for price taking firms
the total amount that a firm takes in from the sale of its product total revenue = price x quantity
Total fixed cost
the total of all costs that do not change with output even if output is zero
Total variable cost
the total of all costs that vary with output in the short run
Total average cost
total cost divided by the number of units of output; a per-unit measure of total costs. ATC = TC/q If MC is below ATC, ATC will decline toward MC. If MC is above ATC, ATC will increase. MC intersects ATC at ATC's minimum point for the same reason that it intersects the AVC curve at its minimum point
average fixed cost
total fixed cost divided by the number of units of output; a per-unit measure of fixed costs. AFC = TFC/q as output increases, AFC declines
long run industry supply curve
traces out price and total output over time as an industry expands
Give the equation for integration by parts
uv-[integral] du/dx . v dx
Second order conditions provide
verification of critical points as either maxima or minima *Second derivative>0: minimum Second derivative<0: maximum
The Quotient Rule
vu'-uv'/v^2
Law of Diminishing Returns
when additional units of a variable input are added to fixed inputs, after a certain point, the marginal produce of the variable input declines.
Exponential rule
y = e^x dy/dx = e^x
log rule
y = lnx dy/dx = 1/x
Quotient rule
y = u/v dy/dx = (v . du/dx - u . dv/dx)/ v^2
Rules for transposition
• (A')' = A • (A + B)' = A' + B' • (αA)' = αA' • (AB) = B'A' • Combining rules: AB = (B'A')'
For point c which is an interior point...
• If Hessian matrix of f at c is positive semidefinite, then c is a local minimum point • If Hessian matrix of f at c is negative semidefinite, then c is a local maximum point • If Hessian matrix of f at c is indefinite, then c is a saddle point
Interior and boundary points
• Interior point: a point of set S is an interior point if there exists a n-dimensional ball centred at that point such that all points strictly inside the ball lie in the set S • Boundary point: every n-dimensional ball centred at the point contains points of S as well as points outside S
Roy's identity
• Interpretation: the marginal disutility of a price increase is the marginal utility of income (λ) multiplied by the quantity demanded (xi*) • Intuitively, for a small price change, the loss of real income is approximately equal to the change in price multiplied by the quantity demanded
Pos/neg (semi)definite with quadratic form
• f is a positive definite quadratic form if f(x) > 0 for all non-zero vector x • f is a positive semidefinite quadratic form if f(x) ≥ 0 for every vector x • f is a negative definite quadratic form if f(x) < 0 for all non-zero vector x • f is a negative semidefinite quadratic form if f(x) ≤ 0 for every vector x
Absolute Risk Aversion (ARA) Formula
𝐴(𝑥)= −(𝑢"(𝑥) )/(𝑢′(𝑥) )
Relative Risk Aversion Formula (RRA)
𝑅(𝑥)=−(𝑥𝑢"(𝑥) )/(𝑢^′ (𝑥) )=𝑥𝐴(𝑥)
CRRA Formula
𝑢(𝑥) = (𝑥^(1−𝑟)) − 1 / (1−𝑟) ; 𝑅(𝑥)=𝑟, if 𝑟≠1
CARA Formula
𝑢(𝑥)=1−𝑒^(−𝑎𝑥), 𝐴(𝑥)=𝑎.
