Concepts of Revenue (original) (raw)
Last Updated : 23 Dec, 2025
Revenue is one of the most fundamental concepts in economics and forms the basis for understanding how firms earn income from selling goods and services. It helps determine profitability, pricing decisions, and overall market performance. Revenue refers to the income a producer receives from the sale of output. It is the monetary return obtained from selling a certain quantity of goods at a particular price.
In simple terms, revenue is the amount a firm earns before deducting any costs or expenses. Understanding revenue and its components helps in analyzing business efficiency and predicting how changes in price or output affect income.
There are three main types of revenue: Total Revenue (TR), Average Revenue (AR), and Marginal Revenue (MR****).** These concepts are closely related but differ in how they measure a firm's earnings.
Total Revenue
The total receipts from the sale of a given quantity of a commodity are known as **Total Revenue. In simple terms, Total Revenue is the total income of a firm and is determined by multiplying the quantity of the commodity sold by its price. The formula for Total Revenue is,
Total Revenue = Quantity x Price
When the price of a product remains constant, total revenue increases proportionally with the number of units sold. However, if the price changes with output (as in imperfect competition), TR may rise at a decreasing rate or eventually fall.
Illustration
| Quantity (Units) | Price (₹) | Total Revenue (₹) |
|---|---|---|
| 1 | 10 | 10 |
| 2 | 10 | 20 |
| 3 | 10 | 30 |
| 4 | 10 | 40 |
| 5 | 10 | 50 |
Here, since price remains constant, TR increases at a constant rate. Under perfect competition, TR is a straight line rising proportionally with quantity sold.
Average Revenue
The revenue per unit of the output sold of a commodity is known as **Average Revenue. It is determined by dividing the Total Revenue by the number of units sold of a commodity. The formula for Average Revenue is,
Average~Revenue=\frac{Total~Revenue}{Quantity}
**For example, if the Total Revenue of a firm is ₹20,000 by selling 100 tables, then the Average Revenue will be, Average~Revenue=\frac{20,000}{100}=₹200
Average Revenue (AR) and Price are the same
As we know, Average Revenue is the per unit sales receipt of a commodity and price is always per unit. Now, as the sellers receive revenue based on the price of the commodity, Price and Average Revenue are one and the same thing.
**Explanation:
TR = Quantity x Price ......................... (1)
Average~Revenue=\frac{TR}{Quantity} .......................... (2)
Now, by putting the value of (1) in (2), we get
AR=\frac{Quantity\times{Price}}{Quantity}
**AR = Price
Illustration
| Quantity (Units) | Price (₹) | Total Revenue (₹) | Average Revenue (₹) |
|---|---|---|---|
| 1 | 10 | 10 | 10 |
| 2 | 10 | 20 | 10 |
| 3 | 10 | 30 | 10 |
| 4 | 10 | 40 | 10 |
Marginal Revenue
The additional revenue generated by selling an additional unit of output is known as **Marginal Revenue. In simple terms, it is the change in Total Revenue from the sale of one more unit of a commodity. The formula for Marginal Revenue is,
MRn = TRn - TRn-1
Where,
- **MR n = Marginal Revenue of the nth unit
- **TR n= Total Revenue from n units
- **TR n-1= Total Revenue from n-1 units
- **n = Number of units sold
Illustration
| Quantity (Units) | Price (₹) | Total Revenue (₹) | Marginal Revenue (₹) |
|---|---|---|---|
| 1 | 10 | 10 | 10 |
| 2 | 10 | 20 | 10 |
| 3 | 10 | 30 | 10 |
| 4 | 10 | 40 | 10 |
One more way to calculate MR
As we already know, Marginal Revenue is the change in TR when one more unit of the output is sold. However, when the change in units of output sold is more than one, then the previous formula can be difficult to use. In those cases, MR can be determined by using the following formula:
MR=\frac{Change~in~Total~Revenue}{Change~in~Number~of~Units}=\frac{\Delta{TR}}{\Delta{Q}}
Note
Slope of Total Revenue Curve is represented by Marginal Revenue. It is because MR=\frac{\Delta{TR}}{\Delta{Q}}
TR is the summation of MR
Another way to calculate TR is by adding the Marginal Revenues of all the units sold. In simple terms, another formula for determining TR is,
TRn = MR1 + MR2 + MR3 + ...................+MRn
OR
TR = ∑MR
Distinction Between TR, AR, and MR
| Basis | Total Revenue (TR) | Average Revenue (AR) | Marginal Revenue (MR) |
|---|---|---|---|
| Meaning | Total income earned from sales | Revenue per unit of output | Additional revenue from selling one more unit |
| Formula | P × Q | TR / Q or Price | ΔTR / ΔQ |
| Nature | Cumulative measure | Per-unit measure | Incremental measure |
| Under Perfect Competition | Increases proportionally | Constant | Constant |
| Under Imperfect Competition | Rises at decreasing rate | Falls as output increases | Falls faster than AR |
| Relation with Price | Depends on both price and output | Equal to price | Related to change in TR due to price-output variation |
Numericals on Concepts of Revenue
**Question 1: A firm sells its product at a constant price of ₹10 per unit in a perfectly competitive market.
| Output (units) | Price per unit (₹) |
|---|---|
| 0 | 10 |
| 1 | 10 |
| 2 | 10 |
| 3 | 10 |
| 4 | 10 |
Calculate TR, AR, and MR.
**Solution
We know that,
Total Revenue (TR) = Price × Quantity
Average Revenue (AR) = TR / Quantity
Marginal Revenue (MR) = Change in TR / Change in Quantity
| Output (Q) | Price (₹) | TR (₹) | AR (₹) | MR (₹) |
|---|---|---|---|---|
| 0 | 10 | **0 | **– | **– |
| 1 | 10 | **10 | **10 | **10 |
| 2 | 10 | **20 | **10 | **10 |
| 3 | 10 | **30 | **10 | **10 |
| 4 | 10 | **40 | **10 | **10 |
**Question 2: A bakery sells pastries. When it sells 30 pastries, its Total Revenue is ₹600. After increasing the output to 31 pastries, its Total Revenue becomes ₹624.
Calculate:
a) Average Revenue at 30 pastries
b) Marginal Revenue from the 31st pastry
**Solution
We know that,
Average Revenue (AR) = TR / Q
AR at 30 pastries = 600 / 30 = ₹20Marginal Revenue (MR) = Change in TR / Change in Q
MR from 31st pastry = (624 − 600) / (31 − 30) = ₹24
**Question 3: A seller charges ₹30 per unit for the first 40 units of a product. For every unit sold beyond 40, the seller offers a discount and charges ₹25 per unit.
If the buyer purchases 60 units, calculate the Total Revenue (TR) and Average Revenue (AR).
**Solution
Revenue from first 40 units:
TR1=40×30=₹1,200
Remaining units = 60 − 40 = 20 units
Revenue from remaining 20 units:
TR2=20×25=₹500
Total Revenue (TR):
TR=TR1+TR2
1,200 + 500 = ₹1,700TR
Average Revenue (AR):
AR = TR/Q = 1,700/60 = ₹28.33
So, Total Revenue = ₹1,700 and Average Revenue ≈ ₹28.33 per unit
**Question 4: A store normally sells a backpack for ₹900 and sells 40 backpacks in a day. To attract more customers, the shopkeeper offers a flat ₹100 discount and sales increase to 54 backpacks.
Calculate:
a) Total Revenue before discount
b) Total Revenue after discount
c) Change in Total Revenue
d) Whether the discount increased or decreased revenue
**Solution
****(a) Total Revenue before discount**
Price per backpack = ₹900
Quantity sold = 40TR = 900×40 = ₹36,000
****(b) Total Revenue after discount**
Discount = ₹100
New price = 900 − 100 = ₹800
Quantity sold = 54TR after discount = 800×54 = ₹43,200
****(c) Change in Total Revenue**
Change in TR=TR after discount − TR before discount
= 43,200−36,000
= ₹7,200****(d) Whether revenue increased or decreased**
Since Total Revenue increased by ₹7,200, the discount increased the revenue.