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Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com PDF Download

The cost function and average cost function from marginal cost function : If C is the cost of producing an output x then marginal cost dC function, mc = dc/dx Using integration as reverse process of differentiation we obtain,

Cost function,  Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

where k is the constant of integration which can be evaluated if the fixed cost is known. If the fixed cost is not known, then k = 0.

Average cost fucntion,  Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
 

 

Example 12
The marginal cost function of manufacturing x units of a commodity is 6 + 10x - 6x2 . Find the total cost and average cost, given that the total cost of producing 1 unit is 15.

Solution : Given that,

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Given, when x = 1,C = 15
15= 6 + 5 - 2 + k
⇒ k = 6
∴ Total Cost function, C = 6x + 5x 2- 2x 3 + 6

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Example 13
The marginal cost function of manufacturing x units of a commodity is 3x2 - 2x + 8. If there is no fixed cost find the total cost and average cost functions.

Solution : Given that,

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Example 14 The marginal cost function of manufacturing x units of a commodity is 3 - 2x -x 2 . If the fixed cost is 200, find the total cost and average cost functions.
Solution : Given that, 

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

 The revenue function and demand function from marginal revenue function

If R is the total revenue function when the output is x, then marginal revenue MR = dx/dR . Integrating with respect to ‘x’ we get

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
where ‘k’ is the constant of integration which can be evaluated under given conditions. If the total revenue R = 0, when x = 0

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Example 15 If the marginal revenue for a commodity is MR = 9 - 6x2 + 2x, find the total revenue and demand function.
Solution : Given that, MR = 9 - 6x 2 + 2x

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Example 16
For the marginal revenue function MR = 3 - 2x - x 2 , find the revenue function and demand function.

Solution : Given that
MR = 3 - 2x - x2

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
since R = 0, when x = 0, k = 0
Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Example 17
If the marginal revenue for a commodity is​ 
Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com find the revenue function.

Solution : Given that,
Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
when no product is sold, revenue is zero. when x = 0, R = 0.

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

The demand function when the elasticity of demand is given
We know that, Elasticity of demand  Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
This equation yields the demand function ‘ p’ as a function of ‘x ’.
The revenue function can be found out by using the relation, R = px .

Example 18
The elasticity of demand with respect to price p for a commodity is demand x- 5/x , x > 5 when the demand is ‘x’. Find the if the price is 2 when demand is 7. Also find function the revenue function​


Solution : Given that, Elasticity of demand   Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Integrating both sides,

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

when p = 2, x = 7, k = 4
∴ The demand function is,

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com


Example 19
The elasticity of demand with respect to price for a commodity is a constant and is equal to 2. Find the demand function and hence the total revenue function, given that when the price is 1, the demand is 4.


Solution : Given that, Elasticity of demand, ηd = 2

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Integrating both sides,

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Given, when x = 4, p = 1
From (1) we get k = 4
∴  (1) ⇒ xp2 = 4 or p2 = 4/x

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Example 20
 Revenue R = px = 2 x The marginal cost and marginal revenue with respect to a commodity of a firm are given by C' (x) = 4 + 0.08x and R'(x) = 12. Find the total profit, given that the total cost at zero output is zero.

Solution :
Given that,
MC = 4 + 0.08x
Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
But given when x = 0,C = 0
∴ (1)⇒ 0 = 0 + 0 + k
∴ k = 0
∴ C(x) = 4x + 0.04x 2 ---------(2)

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Revenue = 0 when x = 0.
∴ k = 0
∴ R (x) = 12x ---------(3)
Total profit function, P(x) = R(x) - C (x)
= 12x - 4x - 0.04x2
= 8x - 0.04x2 .

Example 21 The marginal revenue function (in thousands of rupees) of a c o m mo d ity is 7 + e -0.05x where x is the number of units sold. Find the total revenue from the sale of 100 units ( e -5 = 0.0067)

Solution : Given that,
Marginal revenue, R'(x) = 7 + e - 0.05x
∴ Total revenue from sale of 100 units is

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
Revenue, R = Rs.7,19,866.

Example 22 The marginal cost C'(x) and marginal revenue R'(x) are x given by C'(x) = 20 +x/20 and R'(x) = 30 The fixed cost is Rs. 200. Determine the maximum profit. Solution :

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

When quantity produced is zero, the fixed cost is Rs. 200. i.e. when x = 0, C = 200,
⇒ k = 200

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
The revenue, R'(x) = 30

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

When no product is sold, revenue = 0 --------(2)
i.e., when x = 0, R = 0
∴ Revenue, R(x) = 30x
Profit, P = Total revenue - Total cost

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

∴ Profit is maximum when x = 200

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Example 23 A company determines that the marginal cost of producing x units is C'(x) = 10.6x. The fixed cost is Rs. 50. The selling price per unit is Rs. 5. Find (i) Total cost function (ii) Total revenue function (iii) Profit function.

Solution : Given,

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

= 5.3x2 + k --------(1)
Given fixed cost = Rs. 50

(i.e.) when x = 0, C = 50 ∴ k = 50
Hence Cost function, C = 5.3x 2 + 50

(ii) Total revenue = number of units sold x price per unit Let x be the number of units sold. Given that selling price per unit is Rs. 5.
∴ Revenue R(x) = 5x.
(iii) Profit, P= Total revenue - Total cost

= 5x - (5.3x 2 + 50)
= 5x - 5.3x 2 - 50.

Example 24 Determine the cost of producing 3000 units of commodity  if the marginal cost in rupees per unit is C'(x)  Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Solution : Given, Marginal cost, C'(x)  Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

When x = 3000,
Cost of production, C(x) = Rs.9000

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Solution :  

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

The cost of producing 10 incremental units after 15 units have been produced

Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

The document Integration in economics and commerce - Integration, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com is a part of the B Com Course Business Mathematics and Statistics.
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FAQs on Integration in economics and commerce - Integration, Business Mathematics & Statistics - Business Mathematics and Statistics - B Com

1. What is integration in economics and commerce?
Ans. Integration in economics and commerce refers to the process of combining different parts or elements into a unified whole. In the context of economics and commerce, integration can involve the merging of companies or industries, the harmonization of economic policies and regulations, or the establishment of common markets and trade agreements.
2. How does integration benefit the economy?
Ans. Integration can bring several benefits to the economy. It promotes trade and investment by reducing barriers and facilitating the movement of goods, services, and capital across borders. It can lead to economies of scale, increased competition, and specialization, resulting in higher productivity and efficiency. Integration also allows for the sharing of knowledge and technology, which can spur innovation and economic growth.
3. What are the different types of integration in commerce?
Ans. There are various types of integration in commerce, including: 1. Horizontal Integration: This involves the merger or acquisition of companies operating in the same industry or at the same stage of the production process. It aims to increase market share, reduce competition, and achieve economies of scale. 2. Vertical Integration: This refers to the integration of companies operating at different stages of the production process or supply chain. It can involve backward integration (acquiring suppliers) or forward integration (acquiring distributors or retailers). Vertical integration helps to streamline operations, control costs, and ensure the availability of inputs or distribution channels. 3. Conglomerate Integration: This occurs when companies from unrelated industries merge or form strategic alliances. Conglomerate integration allows for diversification and risk reduction by entering new markets or expanding product offerings.
4. How does integration impact competition in the marketplace?
Ans. Integration can have both positive and negative effects on competition in the marketplace. On one hand, it can lead to increased competition by bringing together more players and creating a larger market. This can result in lower prices, greater product variety, and improved consumer choice. On the other hand, integration can also lead to the concentration of market power in the hands of a few dominant firms, reducing competition and potentially harming consumer welfare. It is important to strike a balance between promoting integration for efficiency gains and ensuring competition is not unduly restricted.
5. What role does business mathematics and statistics play in integration?
Ans. Business mathematics and statistics play a crucial role in integration. They provide the analytical tools and techniques necessary to evaluate the financial viability, synergies, and potential risks associated with integration initiatives. These disciplines help in analyzing market trends, forecasting demand and supply, conducting cost-benefit analysis, and assessing the impact of integration on key performance indicators. Additionally, business mathematics and statistics enable the measurement and interpretation of data related to market share, profitability, and other relevant metrics, supporting informed decision-making throughout the integration process.
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