We Know,
Profit = 392?320 = Rs72
Cost price of the article is given by
= 400x100/(20+20)
= Rs.1000
Article I Article II
-20 25%
5%
20% 25%
4 : 5
Now, Selling of first article = (4-20%) = 0.8
Selling of second article = (5+25%) = 6.25
Therefore the ratio of selling price = 8 : 62.5
Income = Rs. 100
Expenditure = Rs. 80
Savings = Rs. 20
Present Expenditure 80x(15/100) = Rs. 12 = 80 + 12 = Rs. 92
Present Savings = 100 ? 92 = Rs. 8
100 ------ 8
? --------- 400 => 5000
His salary = Rs. 5000
Since S.P. = 5 (M.P. - S.P.) => 5 M.P. = 6 S.P.
M.P. = (6/5) S.P.
Since the percentage discount = Percentage profit,
Therefore, 1/6 = (S.P/C.P) ? 1 => S.P = (7/6) C.P
M.P = 6/5 S.P = 6/5 x 7/6 C.P = 7/5 C.P
Therefore, Ratio of discount to C.P
= (M.P ? S.P)/C.P = [{(7/5)C.P - (7/6)C.P} / C.P.]
= 7/30
Therefore, the ratio is 7 : 30
From the given data,
The cost price of the article = 5640 x 100/60 = Rs. 9400
The selling price of the article to gain 25% profit = 9400 x 125/100 = Rs. 11750.
Let the total amount be 200 {L.C.M of 40 and 50}
Chacobar C.P. = 200/50 = 4
Fivestar C.P = 200/40 = 5
Remaining Money after petrol = [200 - 200×10%] = 180
Remaining money after buying fivestars = [180 - 20×5] = 80
So number of Chacobar she can buy = 80/4 = 20
Let the selling price of the rice = Rs.P/kg
Now, according to the question,
1040 - 100p = 30p
=> p = 8/kg
Hence, the selling price of the rice = Rs. 8/kg
Let the list price be Rs.100.
Therefore, the retailer is buying the products at Rs.60 and selling it to the customer at Rs.75, earning a profit of Rs.15.
Therefore, his percentage is = = 25%
10% profit at half plot = 600000/2 x 10/100 = Rs. 30,000
15% profit at remaining half plot = 600000/2 x 15/100 = Rs. 45,000
Now, total profit = 30000 + 45000 = 75000
Profit % = 75000/600000 x 100 = 12.5 %
When profit is calculated on Marked Price (M.P) then,
Let M.P = 100
=> C.P = 100 - 30 = 70
But S.P = Rs. 80 as he gave 20% discount,
Now, Actual Profit =
= 100/7 %
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