1. Chapters Four and Five: �Demand (or Knowing Your Customer) Demand Function The relation between demand and factors influencing its level.
Quantity of product X demanded = Qx =
f(Price of X, Prices of Related Goods, Consumer Income, Advertising Expenditure, etc.)
2. The Market Demand Function, cont. The model:
Qx = a0 + a1Px + a2Pz + a3Y + a4POP + a5i + a6AD + e
The terms a0 , a1 , etc. are the parameters of the model.
This is what we need to estimate.
Estimation of the model:
Q = 100 + -.002Px + .001Pz + .00008Y + .22POP + -800i + .002A
Interpretation of the model:
If the average price increases by $1, the demand for the product falls by .002 units How does demand for the industry differ from demand for the firm?How does demand for the industry differ from demand for the firm?
3. The Demand Curve Demand Curve The relation between price and the quantity demanded, holding all else constant.
General Form: P = a bQ
Why is this the general form?
Moving from the Demand Function to the Demand Curve.
4. Connecting the Curve to the Function Changes in quantity demanded movement along a given demand curve reflecting a change in price and quantity.
Shift in demand Switch from one demand curve to another following a change in a non-price determinant of demand
IF AN INDEPENDENT VARIABLE CHANGES, OTHER THAN PRICE OF THE GOOD, YOU MUST DRAW A NEW DEMAND CURVE!!!
5. Demand Analysis and Estimation: Discussion Outline Demand Sensitivity Analysis: Elasticity
Price Elasticity of Demand
Cross Price Elasticity of Demand
Income Elasticity of Demand
Additional Demand Elasticity Concepts
6. Demand Sensitivity Analysis: Elasticity Elasticity The percentage change in a dependent variable resulting from a 1% change in an independent variable.
Elasticity = % change in Y / % change in X
ELASTICITY IS A RATIO!!!
7. Price Elasticity of Demand Price Elasticity of Demand (Own-Price):
Measure of the magnitude by which consumers alter the quantity of some product they purchase in response to a change in the price of that product.
Responsiveness of the quantity demanded to changes in the price of the product, holding constant the values of all other variables in the demand function.
Estimating from the Demand Function.
Estimating from the Demand Curve.
8. Own Price Elasticity and the �Demand Curve Own-price elasticity = %?Q / %?P
How does elasticity vary along a linear demand curve?
The upper half of a linear demand curve is elastic.
The lower half of a linear demand curve is inelastic.
BE ABLE TO EXPLAIN WHY!!!
The search for substitutes as price increases
Big number, small number explanation
Calculating elasticity at the midpoint.
9. Elasticity and Total Revenue Connecting Elasticity to Total Revenue
If % change in Q > % change in P
decreasing the price will increase TR
and marginal revenue must be positive.
If % change in Q < % change in P
increasing the price will increase TR
and marginal revenue must be negative.
BE ABLE TO ILLUSTRATE THE RELATIONSHIP
10. Marginal Revenue Marginal Revenue - amount of revenue from the last unit sold.
the rate of change in total revenue
the slope of the total revenue curve.
If demand is downward sloping, then price will exceed marginal revenue. In other words, the amount of revenue generated by an additional sale will be less than the price the firm charges.
Why? To increase quantity the firm will need to lower the price, not just for the last unit sold, but also for every unit the firm wishes to sell.
11. Optimal Pricing Policy MR = P [1 + 1/EP]
Be able to show why this relationship exists.
To maximize profits: MR = MC
MC = P [1+1/EP]
P = MC / [1 + 1/EP] TR = P*Q
?TR = p ?q + q ?p
p ? q - increased quantity will increase revenue by price * ?q (new price*change in q)
q ? p - increased quantity will lower price, so revenue will be changed by
quantity* ? p (change in price * old quantity)
KEY: Every unit is sold for the new price (No price discrimination)
Numerical example: P = 20 - 2Q
P = 16; Q = 2; Total Revenue = $32
if P = 14; Q = 3; TR = $42
p ?q = 14*1 = $14 and q ?p = 2*2 = $4
MR = ?TR / ? q = p + q*[? p/ ? q] = p[1 + q/p * ? p/ ? q] = p [1 + {1/Ep,q}]
MR = 20 - 4Q = $8 or 14 * [1 + 1/-2.33] = $8 TR = P*Q
?TR = p ?q + q ?p
p ? q - increased quantity will increase revenue by price * ?q (new price*change in q)
q ? p - increased quantity will lower price, so revenue will be changed by
quantity* ? p (change in price * old quantity)
KEY: Every unit is sold for the new price (No price discrimination)
Numerical example: P = 20 - 2Q
P = 16; Q = 2; Total Revenue = $32
if P = 14; Q = 3; TR = $42
p ?q = 14*1 = $14 and q ?p = 2*2 = $4
MR = ?TR / ? q = p + q*[? p/ ? q] = p[1 + q/p * ? p/ ? q] = p [1 + {1/Ep,q}]
MR = 20 - 4Q = $8 or 14 * [1 + 1/-2.33] = $8
12. Lerner Index Lerner Index (Measure of Inequality)
L = (p - MC)/p
Lerner Index is bound between (0,1)
Closer to 1 the more pricing power the firm has.
NOTE: Mark-up power reflects monopoly power.
13. The Lerner Index Own Price Elasticity is Always Negative.
MR = P[1 1/EP] and therefore
MC = P[1 1/EP] or
MC = P - P/EP or
P MC = P/ EP or
[P-MC]/P = 1/EP
PUNCHLINE: If elasticity increases, mark-up will decline. If the product becomes less elastic, mark-up will increase. An alternative way of arriving at the same conclusion is as follows.
ANOTHER APPROACH!!!
LI = [P-MC] /P
LI = P/P MC/P
Remember, MC = P[1 + 1/EP] or
MC = P + P/EP
LI = P/P [P + P/EP]/P
LI = 1 P/P + (P/EP)/P
LI = 1 1 + P/EP * 1/P
LI = 1/EP
An alternative way of arriving at the same conclusion is as follows.
ANOTHER APPROACH!!!
LI = [P-MC] /P
LI = P/P MC/P
Remember, MC = P[1 + 1/EP] or
MC = P + P/EP
LI = P/P [P + P/EP]/P
LI = 1 P/P + (P/EP)/P
LI = 1 1 + P/EP * 1/P
LI = 1/EP
14. Determinants of Price Elasticity The extent the good is considered a necessity.
Proportion of income spent on the product
Time
Availability of substitutes
HINT: The fourth determinant encompasses the first three.
PUNCHLINE: The key to establishing market power is the elimination of substitutes in the minds of consumers.
WHAT IMPACT DOES ADVERTISING HAVE ON ELATICITY?
15. Cross Price Elasticity of Demand�Substitutes vs. Complements Substitutes products for which a price increase for one leads to an increase in demand for the other.
NOTE: Two goods are substitutes only if the consumer behavior indicates this relationship.
Complements products for which a price increase for one leads to a decrease in demand for the other.
16. Cross- Price Elasticity Responsiveness of demand for one product to changes in the price of another.
Calculating from the Demand Function
Note: We already know if two goods are substitutes or complements from the demand function. We do not know the magnitude of the relationship without calculating elasticity.
17. Income Elasticity�Normal vs. Inferior Goods Normal Goods products for which demand is positively related to income.
Inferior Goods products for which demand is negatively related to income.
Note: What is normal or inferior can vary across time and geographic distance.
18. Income Elasticity Responsiveness of demand to changes in income.
Calculating from the Demand Function
Note: We already know if two goods are normal or inferior from the demand function. We do not know the magnitude of the relationship without calculating elasticity.
19. Income Elasticity and the Business Cycle Counter-cyclical goods inferior goods
During recessions demand will increase.
During expansion demand will decrease.
Non-cyclical normal goods income elasticity is less than 1.
Cyclical normal goods superior goods luxury goods income elasticity is greater than 1.
20. Additional Demand Elasticity Concepts Advertising Elasticity
Interest Rate Elasticity
Weather Elasticity
Any factor that can be included in a demand function can be analyzed in terms of elasticity.
21. Linear Functional Form Y = 0 + 1 X1 + 2 X2 + e
Slope = 1
Impact of X1 on Y is independent of the quantity of X2.
Elasticity = 1 * [X1/ Y]
22. Double-Log Functional Form What if you wished to estimate the following model?
Y = 0 X1 1 X22
To make this linear in the parameters
InY = 0 + 1 InX1 + 2 InX2 + e
Slope = 1 = ?lnY / ?lnX1 = [?Y / Y] / [?X1 / X1]
What is this? The elasticity, which is constant across the sample.
23. What is the slope in a double-functional form? Slope = 1 * (Y/X) =
[?Y / Y] / [?X1 / X1] * (Y/X) =
?Y / ?X
Impact of X1 on Y depends upon the quantity of X2
In other words, the slope of X1 varies across the sample.
Why would this be a realistic property?
