9. a)
9.
e cost price.
(iii) Find the actual price with 10% VAT.
Price of an article is marked 40% above the cost price and sold with 15%
discount including 10% VAT at Rs. 26,180.
(i) Find the cost price.
(ii) Find the marked price.
(iii) Find the profit percentage.



Answer :

Certainly! Let's solve this step-by-step.

Given:
- Selling price including 10% VAT = Rs. 26,180
- Discount rate = 15%
- Markup rate (above cost price) = 40%

Step-by-Step Solution:

(i) Find the Cost Price:

1. Calculate the price before VAT:
- The selling price includes a 10% VAT. To find the price before VAT, we remove the VAT component.
- Price before VAT = [tex]\( \frac{\text{Selling Price}}{1 + \text{VAT rate}} \)[/tex]
- Substituting the given values:
[tex]\[ \text{Price before VAT} = \frac{26180}{1 + 0.10} = \frac{26180}{1.10} = 23799.999999999996 \approx 23800 \][/tex]

2. Calculate the marked price:
- The price before VAT is inclusive of a 15% discount on the marked price. To find the marked price, we account for this discount.
- Marked Price = [tex]\( \frac{\text{Price before VAT}}{1 - \text{Discount rate}} \)[/tex]
- Substituting the values:
[tex]\[ \text{Marked Price} = \frac{23800}{1 - 0.15} = \frac{23800}{0.85} = 27999.999999999996 \approx 28000 \][/tex]

3. Calculate the cost price:
- The marked price is 40% above the cost price. To find the cost price, we account for the markup ratio.
- Cost Price = [tex]\( \frac{\text{Marked Price}}{1 + \text{Markup rate}} \)[/tex]
- Substituting the values:
[tex]\[ \text{Cost Price} = \frac{28000}{1 + 0.40} = \frac{28000}{1.40} = 20000 \][/tex]

(ii) Find the Marked Price:
- From the calculations above, the marked price is Rs. 28000.

(iii) Find the Profit Percentage:

1. Calculate the profit:
- Profit = Price before VAT - Cost Price
- Using previously calculated values:
[tex]\[ \text{Profit} = 23800 - 20000 = 3800 \][/tex]

2. Calculate the profit percentage:
- Profit Percentage = [tex]\( \frac{\text{Profit}}{\text{Cost Price}} \times 100 \)[/tex]
- Substituting the values:
[tex]\[ \text{Profit Percentage} = \frac{3800}{20000} \times 100 = 19\% \][/tex]

Summary:
(i) The cost price is Rs. 20000.
(ii) The marked price is Rs. 28000.
(iii) The profit percentage is 19%.