Discount
Discount is price reduction given on marked price of an article. It is given by the sellers to increase their sales by attracting customers.
Discount is always calculated with respect to marked price
| Discount = Marked price - Selling price |
| Marked price = selling price + Discount |
| Selling price = Marked price - Discount |
Example: The marked price of a clock is ₹ 3200 and selling price is ₹ 2500. Find the discount price on the clock.
Solution: given, marked price = ₹ 3200
selling price = ₹ 2500
Discount = Marked price - Selling price
= 3200 - 2500
= 700 ₹
| Discount % = | × 100 | |
| Marked Price |
Example: The marked price of a bicycle is ₹ 2500 and selling price is ₹ 1500. Find the discount % on the bicycle.
Solution: given, marked price = ₹ 2500
selling price = ₹ 1500
Discount = Marked price - Selling price
= 2500 - 1500
= ₹1000
| Discount % = | × 100 | |
| Marked price |
| = | × 100 = 40 % | |
| 2500 |
Successive Discount
A series of discounts are allowed on marked price of an article one after the other, then these discount are called successive discount.
Let x1%, x2%, x3%……….. be the series of discounts on an article with marked price of ₹ M, then the selling price of the article after all the discount is given by
| Selling Price = M |  |
1 - |  |
× | |
1 - | |
× | |
1 - | |
|||
| 100 | 100 | 100 |
Example: A shopkeeper on the eve of Diwali allowed a series of discount on television sets. Find the selling price of a television set, if the marked price of television is ₹ 5000 and successive discount are 20 %, 10 % and 5 %.
Solution: given, marked price = 5000
x1 = 20 %
x2 = 10 %
x3 = 5 %
| Selling Price = M | |
1 - | |
× | |
1 - | |
× | |
1 - | |
|||
| 100 | 100 | 100 |
| = 5000 | |
1 - | |
× | |
1 - | |
× | |
1 - | |
|||
| 100 | 100 | 100 |
| = 5000 | |
1 - | |
× | |
1 - | |
× | |
1 - | |
|||
| 5 | 10 | 20 |
| = 5000 | × | × | × | = 5 × 4 × 9 × 19 | |||
| 5 | 10 | 20 |
= 20 × 171
= ₹ 3420
Some Useful Shortcut Method
Trick 1: Single discount equivalent to two successive discounts x1% and x2%
| Single Equivalent discount = x 1 + x2 - |  |
x1 × x2 |  |
% |
| 100 |
Example: What will be the single equivalent discount for successive discount of 20 % and 10 %.
Solution : given x1 = 10 %
x2 = 20 %
| Single Equivalent discount = x 1 + x2 - | |
x1 × x2 | |
% |
| 100 |
| = 20 + 10 - | |
20 × 10 | |
% |
| 100 |
= 30 - 2
= 28 %
Example: What will be the single equivalent discount for successive discount of 20 % and 20 %.
Solution: given x1 = 20 % & x2 = 20 %.
| Single Equivalent discount = x 1 + x2 - | |
x1 × x2 | |
% |
| 100 |
| = 20 + 20 - | |
20 × 20 | |
% |
| 100 |
= 40 - 4
= 36 %
Trick 2: Single discount equivalent to three successive discount x1 %, x2 % and x3 %.
| Selling price = | |
1 - | |
1 - | x1 | |
× | |
1 - | |
× | |
1 - | |
|
× 100% | ||
| 100 | 100 | 100 |
Example: What is the single equivalent discount for successive discount of 40 % , 30 % and 20 % on marked price of an article.
Solution:- Let x1 = 40 %
x2 = 30 %
x3 = 20 %
| Selling price = | |
1 - | |
1 - | x1 | |
× | |
1 - | |
× | |
1 - | |
|
× 100% | ||
| 100 | 100 | 100 |
| = | |
1 - | |
1 - | 40 | |
× | |
1 - | |
× | |
1 - | |
|
× 100% | ||
| 100 | 100 | 100 |
| = | |
1 - | |
1 - | 2 | |
× | |
1 - | |
× | |
1 - | |
|
× 100% | ||
| 5 | 10 | 5 |
| = | |
1 - | |
3 | × | × | |
|
× 100% | ||
| 5 | 10 | 5 |
| = | |
1 - | |
84 | |
|
× 100% |
| 250 |
| = | |
|
250 - 84 | |
|
× 100% |
| 250 |
| = | |
166 | |
× 100% |
| 250 |
= 66.4 %
Example: A shopkeeper marked the price 20 % more than its cost price. If he allows a discount of 30 %, then find his loss per cent.
Solution: Let the cost price = 100
then marked price = 120
discount price = 30 % of 120
| = | |
30 | |
× 120 |
| 100 |
= 36
| Marked price = selling price + Discount |
= 120 - 36
= 84
| Loss = Cost Price - Sale Price |
= 100 - 84
= 16
| Loss % = | |
Loss | |
× 100 |
| CP |
| = | |
16 | |
× 100 |
| 100 |
= 16 %