Determination of Price Elasticity from a Demand Function
Illustration 14
Presume the price of a product drops from $12 to $8 per unit and due to this quantity demanded of the product enhances from 160 units to 240 units. Determine the price elasticity of demand.
Solution
Variation in the demand of quantity (Q2 – Q1)
Percentage change in demand of quantity = Q2 – Q1 *
100
Q2
+ Q1
2
= 240 – 160 *
100
240
+ 160
2
= 80 *
100 = 40
200
Change in Price = P2 – P1
= 8 – 12
Percentage change in Price = P2 – P1 *
100
P2
+ P1
2
= 8 – 12 *
100
8
+ 12
2
= -
4 * 100 = -
40
10
Price Elasticity of Demand = %
change in quantity demanded
%
change in price
= 40 = -
1
-
40
Disregarding the negative sign, the price elasticity of demand parities to zero.
Illustration 15
Presume a seller of a silk fabric necessitates lowering the price of its cloth form $180 per metre to $ 175 per metre. If its present sales are 1500 metres per month and moreover it is evaluated that its price elasticity of demand for the commodity is equal to 0. Determine the following.
- Whether or not his total revenue will enhance as a consequent of his judgement to lower the price and
- Compute the exact enormity of its fresh total revenue.
Solution
(1) Price Elasticity of a demand function = Δq p
Δp * q
Here, p = $180, q = 1500 metres,
Δp = 180 – 175 = 5; Δq = not known; price elasticity of the product ep = 0.5
Substituting the values of p, q, Δp and ep in the price elasticity standard formula, we procure,
0.5 = Δq 180
5 * 1500
Δq = 0.5
* 5 * 1500
180
= 3750
180
Δq = 21
As the price had dropped the quantity demanded will enhance by 21 metres and hence the new quantity sold per month would be 1500 + 21 = 1521 metres.
(2) Total Revenue before discount in price
= 1500 * 180 = $270,000
Total Revenue after price discount will be
= 1521 * 175 = $266,175
Therefore, the discount in price has enhanced sales total revenue of the seller.
Ascertaining Cross Elasticity of from a Demand function – Using Mid Point Method
Illustration 16
If price of green tea hikes from $75 per 250 grams to $85, results the consumer demand for ordinary tea enhances from 800 packs to 1000 packs of 250 grams pack then ascertain the cross elasticity of demand of green tea and ordinary tea.
Solution
Change in quantity demanded of ordinary tea= Qot2 – Qot1
= 1000 – 800 = 200
Change in price of green tea = Pgt2 – Pgt1
= 85 – 75 = 10
Substituting the values of the various variables in the cross elasticity of demand formula of midpoint method;
Cross Elasticity of Demand = 1000 – 800 / 85 – 75
1000
+ 800 / 85
+ 75
2 2
= 200 / 10
900 / 80
= 200 * 80
900 10
= 1.78
Illustration 17
Presume the demand function for green tea in terms of price of ordinary tea is provided. Determine the cross elasticity of demand when price of ordinary tea hikes from $40 per 250gms pack to $50.
Qgt = 200 + 2.5P ot, where Qgt is the quantity demand of green tea in terms of 250 grams pack and P ot is price of ordinary tea.
Solution
The plus sign of the co-efficient of P ot depicts that hike in price of ordinary tea will cause an enhancement in demand of quantity of green tea. This entails that ordinary tea and green tea are substitutes.
The demand function entails that co-efficient d
Qgt = 2.5
d
P ot
With a view to ascertain cross elasticity of demand among ordinary tea and green tea, we must first ascertain quantity demand of green tea when price of ordinary tea is $40 per 250 grams. Therefore,
Qgt = 200 + 2.5 * 40
= 200 + 100 = 300
Cross elasticity ec = dQgt Pot
dPot * Qgt
= 2.5 * 40
300
= 0.33
Illustration 18
Let us assume the demand function of oil in a metropolitan city Q = 1500 – 15P, Q is in thousands of litres. It is necessary to ascertain the price elasticity at price of $25 per litre.
Solution
ΔQ in the provided demand function is
15. To procure price elasticity we have
ΔP first to compute the demand quantity at
the provided price of $25 per litre.
Substituting the 25 for P in the provided demand function we procure,
Q = 1500 – 15 * 25
= 1500 – 375
Q = 1125
Now substituting the P = 25 and Q = 1125 and ΔQ =
15 in the elasticity expression
ΔP
of function ΔQ * P
ΔP Q
ep = 15
* 25
1125
= 0.33.
Therefore, the price elasticity at price $25 per litre is 0.33 and quantity demand of oil parities 1125 thousand litres.
Online Live Tutor Determination of Price Elasticity from a Demand Function:
We have the best tutors in Economics in the industry. Our tutors can break down a complex Determination of Price Elasticity from a Demand Function problem into its sub parts and explain to you in detail how each step is performed. This approach of breaking down a problem has been appreciated by majority of our students for learning Determination of Price Elasticity from Demand Function concepts. You will get one-to-one personalized attention through our online tutoring which will make learning fun and easy. Our tutors are highly qualified and hold advanced degrees. Please do send us a request for Determination of Price Elasticity from a Demand Function tutoring and experience the quality yourself.
Online Demand and Demand Function Help:
If you are stuck with an Demand and Demand Function Homework problem and need help, we have excellent tutors who can provide you with Homework Help. Our tutors who provide Demand and Demand Function help are highly qualified. Our tutors have many years of industry experience and have had years of experience providing Demand and Demand Function Homework Help. Please do send us the Demand and Demand Function problems on which you need help and we will forward then to our tutors for review.
- Basic Model of the Firm and Role of Profits
- Derivative of Function of a Function (Chain Rule)
- Macro Economics Policy
- Managerial Assessment Making Procedure
- Marginal and Incremental Analysis
- Maximisation by Marginal Examination
- Optimisation Concepts and Techniques
- Restrained Maximisation
- Restrained Maximisation: Substitution Method
