Profit And Loss

Answer: Option A
Solution:
Let:
– \( CP \) = Cost Price of the book
– \( MP \) = Marked (Printed) Price of the book
– \( SP \) = Selling Price of the book

Step 1: Express Selling Price in Terms of Marked Price
Since the book is sold at a **10% discount** on the printed price:
\[
SP = MP \times \left(1 – \frac{10}{100}\right) = MP \times 0.9
\]

Step 2: Express Cost Price in Terms of Selling Price
The shopkeeper earns a **12% profit** on the cost price:
\[
SP = CP \times \left(1 + \frac{12}{100}\right) = CP \times 1.12
\]

Step 3: Equate Both Expressions for Selling Price
\[
CP \times 1.12 = MP \times 0.9
\]

Step 4: Find the Ratio \( CP : MP \)
\[
\frac{CP}{MP} = \frac{0.9}{1.12}
\]

\[
= \frac{90}{112} = \frac{45}{56}
\]

Thus, the ratio of cost price to printed price is \( 45:56 \).

Answer: Option B
Solution:
Given Data:
– Selling Price (SP) at 14% profit = Rs. 2850
– Profit Percentage = 14%
– New Profit Percentage = 8%

Step 1: Find Cost Price (CP)
We use the formula:
\[
SP = CP \times \left(1 + \frac{\text{Profit \%}}{100} \right)
\]

Substituting values:
\[
2850 = CP \times \left(1 + \frac{14}{100} \right)
\]

\[
2850 = CP \times 1.14
\]

\[
CP = \frac{2850}{1.14} = 2500
\]

Step 2: Find New Selling Price at 8% Profit
\[
SP’ = CP \times \left(1 + \frac{8}{100} \right)
\]

\[
SP’ = 2500 \times 1.08
\]

\[
SP’ = 2700
\]

Answer:
The new selling price will be Rs. 2700.

Answer: Option B
Solution:
First Method
Let CP was 100 for A originally
A sells article to B at 10% profit,
CP for B = 100 + 10% of 100 = 110
Now, B sells it A again with loss 10%
Now, CP for A this time = 110 – 10% of 110 = 99
A makes Profit = 110 – 99 = 11
%profit for A =\( \frac{11 × 100}{100} \) = 11%
Second Method
It could be easily shown by net percentage change graphic.
100(A) == 10%(Profit) ⇒110(B) == 10%(Loss) ⇒ 99(A)
In this transaction A makes a profit of (110 – 99 = 11%) 11%
[10% on selling to B and 1% profit on buying back from B]

Answer: Option A
Solution:
Let the original cost price of the horse be Rs. \( x \).

Step 1: Express the Selling Price in Terms of \( x \)
Since the horse was sold at a 15% profit, the selling price (SP) is:

\[
SP = x + 15\% \text{ of } x = x \times 1.15
\]

Step 2: Express the New Cost Price and Selling Price
If the person had **bought it for 25% less**, the new cost price would be:

\[
CP’ = x – 25\% \text{ of } x = x \times 0.75
\]

If he had sold it for Rs. 600 less than before, the new selling price would be:

\[
SP’ = SP – 600 = 1.15x – 600
\]

He would have made a 32% profit** on the new cost price:

\[
SP’ = CP’ \times 1.32
\]

Step 3: Set Up the Equation
\[
1.15x – 600 = 0.75x \times 1.32
\]

\[
1.15x – 600 = 0.99x
\]

\[
1.15x – 0.99x = 600
\]

\[
0.16x = 600
\]

\[
x = \frac{600}{0.16} = 3750
\]

Final Answer:
The original cost price of the horse was Rs. 3750.

Answer: Option A
Solution:
Given Data:
– Selling Price (SP) at 25% loss = Rs. 720
– Loss Percentage = 25%
– We need to find the new SP to make a 25% profit.

Step 1: Find Cost Price (CP)
Using the loss formula:

\[
SP = CP \times \left(1 – \frac{\text{Loss \%}}{100} \right)
\]

\[
720 = CP \times (1 – 0.25) = CP \times 0.75
\]

\[
CP = \frac{720}{0.75} = 960
\]

Step 2: Find Selling Price for 25% Profit
Using the profit formula:

\[
SP’ = CP \times \left(1 + \frac{\text{Profit \%}}{100} \right)
\]

\[
SP’ = 960 \times (1 + 0.25) = 960 \times 1.25
\]

\[
SP’ = 1200
\]

Answer:
To gain 25% profit, he should sell the chair for Rs. 1200.

Answer: Option C
Solution:
This problem involves equal selling prices but different profit and loss percentages, which leads to an overall loss.

Given Data:
– Selling Price (SP) of each chair = Rs. 1200
– Profit on one chair = 20%
– Loss on the other chair = 20%

Step 1: Find Cost Prices of Both Chairs
First Chair (20% Gain)
Let Cost Price (CP₁) be \( x \), then:

\[
SP = CP₁ \times \left(1 + \frac{20}{100}\right)
\]

\[
1200 = CP₁ \times 1.2
\]

\[
CP₁ = \frac{1200}{1.2} = 1000
\]

Second Chair (20% Loss)
Let Cost Price (CP₂) be \( y \), then:

\[
SP = CP₂ \times \left(1 – \frac{20}{100}\right)
\]

\[
1200 = CP₂ \times 0.8
\]

\[
CP₂ = \frac{1200}{0.8} = 1500
\]

Step 2: Calculate Total Cost Price and Total Selling Price
– Total Cost Price = \( CP₁ + CP₂ = 1000 + 1500 = 2500 \)
– Total Selling Price = \( 1200 + 1200 = 2400 \)

Step 3: Find Overall Gain or Loss
\[
\text{Loss} = \text{Total CP} – \text{Total SP} = 2500 – 2400 = 100
\]

\[
\text{Loss Percentage} = \left(\frac{100}{2500} \times 100\right) = 4\%
\]

Final Answer:
The man incurs a loss of Rs. 100 (4%) in the whole transaction.

Answer: Option D
Solution:
Given Data:
– Marked Price (MP) is 30% above Cost Price (CP)
\[
MP = CP \times \left(1 + \frac{30}{100}\right) = CP \times 1.3
\] – Discount given = 10%
\[
SP = MP \times \left(1 – \frac{10}{100}\right) = MP \times 0.9
\]

Step 1: Express Selling Price (SP) in Terms of CP
Substituting \( MP = 1.3 \times CP \):

\[
SP = (1.3 \times CP) \times 0.9
\]

\[
SP = 1.17 \times CP
\]

Step 2: Find Profit Percentage
\[
\text{Profit} = SP – CP = (1.17 \times CP) – CP = 0.17 \times CP
\]

\[
\text{Profit %} = \left(\frac{0.17 \times CP}{CP} \times 100\right) = 17\%
\]

Final Answer:
The shopkeeper’s gain is 17%.

Answer: Option D
Solution:
Given Data:
– Let Cost Price (CP) = x rupees.
– Profit percentage is numerically equal to the cost price, i.e., Profit % = x.
– Selling Price (SP) = **Rs. 39**.
– Using the profit formula:

\[
SP = CP \times \left(1 + \frac{\text{Profit \%}}{100} \right)
\]

\[
39 = x \times \left(1 + \frac{x}{100} \right)
\]

Step 1: Solve for \( x \)

\[
39 = x + \frac{x^2}{100}
\]

\[
39 \times 100 = 100x + x^2
\]

\[
3900 = x^2 + 100x
\]

\[
x^2 + 100x – 3900 = 0
\]

Step 2: Solve the Quadratic Equation
The quadratic equation is:

\[
x^2 + 100x – 3900 = 0
\]

Using the quadratic formula:

\[
x = \frac{-b \pm \sqrt{b^2 – 4ac}}{2a}
\]

where a = 1, b = 100, and c = -3900.

\[
x = \frac{-100 \pm \sqrt{100^2 – 4(1)(-3900)}}{2(1)}
\]

\[
x = \frac{-100 \pm \sqrt{10000 + 15600}}{2}
\]

\[
x = \frac{-100 \pm \sqrt{25600}}{2}
\]

\[
x = \frac{-100 \pm 160}{2}
\]

Step 3: Find the Valid Value of \( x \)
\[
x = \frac{-100 + 160}{2} = \frac{60}{2} = 30
\]

(Negative value is not possible for cost price)

Final Answer:
The cost price is Rs. 30.

Answer: Option C
Solution:
Given Data:
– Total cost price (CP) of the field = Rs. 3,60,000.
– The man sells:
– One-third of the land at a loss of 20%.
– Two-fifths of the land at a gain of 25%.
– The remaining portion of the land is to be sold at a price that ensures an overall profit of 10%.

Step 1: Total Land Area Calculation
Let the total area of the field be represented by A.

– Cost price per unit area = \( \frac{3,60,000}{A} \).

Step 2: Selling One-Third at a Loss of 20%
The area sold at a loss of 20% is one-third of the total field:

\[
\text{Area sold at a loss} = \frac{1}{3} A
\] The cost price of this portion is:

\[
\text{Cost Price of one-third} = \frac{1}{3} \times 3,60,000 = 1,20,000
\]

Selling price at a 20% loss:

\[
\text{Selling Price of one-third} = 1,20,000 \times (1 – 0.20) = 1,20,000 \times 0.80 = 96,000
\]

Step 3: Selling Two-Fifths at a Gain of 25%
The area sold at a gain of 25% is two-fifths of the total field:

\[
\text{Area sold at a gain} = \frac{2}{5} A
\] The cost price of this portion is:

\[
\text{Cost Price of two-fifths} = \frac{2}{5} \times 3,60,000 = 1,44,000
\]

Selling price at a 25% gain:

\[
\text{Selling Price of two-fifths} = 1,44,000 \times (1 + 0.25) = 1,44,000 \times 1.25 = 1,80,000
\]

tep 4: Find the Desired Overall Selling Price
To achieve an overall profit of 10%, the total selling price should be:

\[
\text{Total Selling Price} = 3,60,000 \times (1 + 0.10) = 3,60,000 \times 1.10 = 3,96,000
\]

Step 5: Calculate the Selling Price of the Remaining Field
The remaining field is:

\[
\text{Remaining Field} = A – \left(\frac{1}{3} A + \frac{2}{5} A\right)
\] Simplifying:

\[
\text{Remaining Field} = A \times \left(1 – \frac{1}{3} – \frac{2}{5}\right) = A \times \left(\frac{15}{15} – \frac{5}{15} – \frac{6}{15}\right) = A \times \frac{4}{15}
\]

The cost price of the remaining field is:

\[
\text{Cost Price of remaining field} = \frac{4}{15} \times 3,60,000 = 96,000
\]

Now, the total selling price is:

\[
\text{Total Selling Price} = \text{Selling Price of one-third} + \text{Selling Price of two-fifths} + \text{Selling Price of remaining field}
\]

\[
3,96,000 = 96,000 + 1,80,000 + \text{Selling Price of remaining field}
\]

\[
\text{Selling Price of remaining field} = 3,96,000 – 96,000 – 1,80,000 = 1,20,000
\]

Final Answer:
The man must sell the remaining field for Rs. 1,20,000** to make an overall profit of 10%.

Answer: Option B
Solution:
Given Data:
– Listed Price (MP) = Rs. 920
– Selling Price after discounts (SP) = Rs. 742.90
– First discount = 15%
– We need to find the second discount rate.

Step 1: Apply the First Discount
Let the first discount rate be 15%.

The price after the first discount:

\[
\text{Price after first discount} = MP \times (1 – \frac{15}{100}) = 920 \times 0.85 = 782
\]

So, after the first discount, the price is **Rs. 782**.

Step 2: Apply the Second Discount
Let the second discount rate be x%. After applying the second discount, the final price is Rs. 742.90.

The price after the second discount:

\[
\text{Final Price} = \text{Price after first discount} \times (1 – \frac{x}{100}) = 782 \times (1 – \frac{x}{100}) = 742.90
\]

Step 3: Solve for the Second Discount Rate (x)
Now, we solve for x:

\[
782 \times (1 – \frac{x}{100}) = 742.90
\]

\[
1 – \frac{x}{100} = \frac{742.90}{782} \approx 0.9499
\]

\[
\frac{x}{100} = 1 – 0.9499 = 0.0501
\]

\[
x = 0.0501 \times 100 = 5.01
\]

Final Answer:
The second discount rate is approximately 5%.

Answer: Option D
Solution
Let’s solve this step by step.

– Let the cost price of the goods be \( C \).
– The tradesman marks the goods at 25% above the cost price. Therefore, the marked price (MP) is:

\[
MP = C + 0.25C = 1.25C
\]

– The tradesman allows a discount of \( \frac{25}{2} \% \), which is 12.5% on the marked price. The selling price (SP) is:

\[
SP = MP – 12.5\% \text{ of MP} = 1.25C – 0.125 \times 1.25C = 1.25C \times (1 – 0.125) = 1.25C \times 0.875 = 1.09375C
\]

– The profit is the difference between the selling price (SP) and the cost price (C):

\[
\text{Profit} = SP – C = 1.09375C – C = 0.09375C
\]

– The profit percentage is:

\[
\text{Profit Percentage} = \frac{\text{Profit}}{C} \times 100 = \frac{0.09375C}{C} \times 100 = 9.375\%
\]

Therefore, the profit is 9.375%.

Answer: Option A
Solution:
Let’s solve this step by step.

1. Marked Price (MP) of the bicycle is Rs. 2000.

2. First Discount of 20%:
– After applying the first discount, the price becomes:
\[
\text{Price after first discount} = 2000 – 20\% \text{ of } 2000 = 2000 – 0.20 \times 2000 = 2000 – 400 = 1600
\]

3. Second Discount of 10%:
– After applying the second discount, the price becomes:
\[
\text{Price after second discount} = 1600 – 10\% \text{ of } 1600 = 1600 – 0.10 \times 1600 = 1600 – 160 = 1440
\]

4. Additional Cash Discount of 5%:
– After applying the 5% discount for cash payment, the final price becomes:
\[
\text{Price after cash discount} = 1440 – 5\% \text{ of } 1440 = 1440 – 0.05 \times 1440 = 1440 – 72 = 1368
\]

So, the selling price of the bicycle with the cash discount is Rs. 1368.

Answer: Option C
Solution:
Let’s solve this step by step.

Step 1: Let the marked price of the shirt and trousers be in the ratio 1:2.
– Let the marked price of the shirt be \( x \).
– Therefore, the marked price of the trousers is \( 2x \).

Step 2: Discount on the shirt.
– The shopkeeper gives a 40% discount on the shirt, so the selling price of the shirt after the discount is:
\[
\text{Selling price of the shirt} = x – 0.40 \times x = 0.60x
\]

Step 3: Discount on the trousers.
– Let the discount offered on the trousers be \( y \% \). So, the selling price of the trousers after the discount is:
\[
\text{Selling price of the trousers} = 2x – \frac{y}{100} \times 2x = 2x \left( 1 – \frac{y}{100} \right)
\]

Step 4: Total discount on the set of shirt and trousers.
– The total marked price of the shirt and trousers together is:
\[
\text{Total marked price} = x + 2x = 3x
\] – The total selling price after the discounts is:
\[
\text{Total selling price} = 0.60x + 2x \left( 1 – \frac{y}{100} \right)
\] – The total discount is the difference between the total marked price and the total selling price:
\[
\text{Total discount} = 3x – \left( 0.60x + 2x \left( 1 – \frac{y}{100} \right) \right)
\] – The total discount percentage is given as 30%. So, the total discount is also:
\[
\text{Total discount} = 30\% \text{ of } 3x = 0.30 \times 3x = 0.90x
\]

Step 5: Set up the equation.
Now, we can set up the equation for the total discount:
\[
3x – \left( 0.60x + 2x \left( 1 – \frac{y}{100} \right) \right) = 0.90x
\]

Simplify the equation:
\[
3x – 0.60x – 2x \left( 1 – \frac{y}{100} \right) = 0.90x
\] \[
2.40x – 2x \left( 1 – \frac{y}{100} \right) = 0.90x
\] \[
2.40x – 2x + 2x \times \frac{y}{100} = 0.90x
\] \[
0.40x + 2x \times \frac{y}{100} = 0.90x
\] \[
2x \times \frac{y}{100} = 0.90x – 0.40x
\] \[
2x \times \frac{y}{100} = 0.50x
\]

Step 6: Solve for \( y \).
Now divide both sides of the equation by \( 2x \):
\[
\frac{y}{100} = \frac{0.50x}{2x}
\] \[
\frac{y}{100} = 0.25
\] \[
y = 25
\]

Conclusion:
The discount offered on the trousers is 25%.

Answer: Option B
Solution:
Let’s break this down step by step:

Step 1: Calculate the cost price of the article.
The dealer buys the article marked at Rs. 25,000, but he gets two successive discounts of 20% and 5%.

1. First Discount (20%):
\[
\text{Price after 20% discount} = 25000 – 20\% \text{ of } 25000 = 25000 – 0.20 \times 25000 = 25000 – 5000 = 20000
\]

2. Second Discount (5%):
\[
\text{Price after 5% discount} = 20000 – 5\% \text{ of } 20000 = 20000 – 0.05 \times 20000 = 20000 – 1000 = 19000
\]

So, the cost price of the article after both discounts is Rs. 19,000.

Step 2: Add the repair cost.
The dealer spends Rs. 1,000 for repairs. Therefore, the total cost price (including repairs) is:
\[
\text{Total cost price} = 19000 + 1000 = 20000
\]

Step 3: Selling Price.
The dealer sells the article for Rs. 25,000.

Step 4: Calculate the gain.
The gain is the difference between the selling price and the total cost price:
\[
\text{Gain} = 25000 – 20000 = 5000
\]

Step 5: Calculate the gain percentage.
The gain percentage is calculated as:
\[
\text{Gain Percentage} = \left( \frac{\text{Gain}}{\text{Total Cost Price}} \right) \times 100 = \left( \frac{5000}{20000} \right) \times 100 = 25\%
\]

Conclusion:
The dealer’s gain is 25%.

Answer: Option A
Solution:
Let’s solve this step by step.

Step 1: Define the variables
– Let the cost price (C.P.) of the goods be \( C \).
– Let the marked price (M.P.) of the goods be \( M \).
– The trader gives a 20% discount on the marked price.

Step 2: Selling price after discount
Since the trader gives a 20% discount on the marked price, the selling price (S.P.) after the discount is:
\[
S.P. = M – 20\% \text{ of } M = 0.80M
\]

Step 3: Profit with 25%
The trader still makes a profit of 25%, which means:
\[
S.P. = C + 25\% \text{ of } C = 1.25C
\]

So, we know:
\[
0.80M = 1.25C
\]

Step 4: Find the marked price in terms of the cost price
From the above equation:
\[
M = \frac{1.25C}{0.80} = 1.5625C
\]

Step 5: Selling at the marked price
If the trader sells the goods at the marked price (without any discount), the selling price is \( M \). So, the profit will be:
\[
\text{Profit} = M – C = 1.5625C – C = 0.5625C
\]

Step 6: Profit percentage
The profit percentage is:
\[
\text{Profit Percentage} = \frac{\text{Profit}}{C} \times 100 = \frac{0.5625C}{C} \times 100 = 56.25\%
\]

Conclusion:
If the trader sells the goods at the marked price, his profit will be 56.25%.

Answer: Option D
Solution:
Let’s solve this step by step:

Step 1: Define the variables
– Let the cost price (C.P.) of the radio be \( C \).
– The marked price (M.P.) of the radio is 20% more than its cost price, so:
\[
M.P. = C + 20\% \text{ of } C = 1.20C
\]

Step 2: Selling price after discount
A discount of 10% is given on the marked price, so the selling price (S.P.) after the discount is:
\[
S.P. = M.P. – 10\% \text{ of } M.P. = 1.20C – 0.10 \times 1.20C = 1.20C \times 0.90 = 1.08C
\]

Step 3: Calculate the gain
The gain is the difference between the selling price and the cost price:
\[
\text{Gain} = S.P. – C = 1.08C – C = 0.08C
\]

Step 4: Calculate the gain percentage
The gain percentage is:
\[
\text{Gain Percentage} = \frac{\text{Gain}}{C} \times 100 = \frac{0.08C}{C} \times 100 = 8\%
\]

Conclusion:
The gain percentage is 8%.

Answer: Option A
Solution:
Let’s break this down step by step:

Step 1: Define the variables
– Let the cost price of 1 kg (1000g) of sugar be \( C \).
– Therefore, the cost price of 950g of sugar is \( \frac{950}{1000} \times C = 0.95C \).

Step 2: Selling price of 950g of sugar
The shopkeeper sells 950g of sugar at the same price as the cost price of 1 kg (1000g) of sugar. So, the selling price (S.P.) of 950g of sugar is \( C \).

Step 3: Calculate the gain
The gain is the difference between the selling price and the cost price of 950g of sugar:
\[
\text{Gain} = S.P. – \text{Cost price of 950g} = C – 0.95C = 0.05C
\]

Step 4: Calculate the gain percentage
The gain percentage is calculated based on the cost price of 950g of sugar (which is \( 0.95C \)):
\[
\text{Gain Percentage} = \frac{\text{Gain}}{\text{Cost price of 950g}} \times 100 = \frac{0.05C}{0.95C} \times 100
\]

Simplifying the equation:
\[
\text{Gain Percentage} = \frac{0.05}{0.95} \times 100 \approx 5.26\%
\]

Conclusion:
The shopkeeper’s gain percentage is approximately 5.26%.

Answer: Option A
Solution:
Let’s solve this step by step.

Step 1: Define the variables
– Let the cost price (C.P.) of the goods be \( C \).
– Let the marked price (M.P.) of the goods be \( M \).

Step 2: Selling price after discount
The trader allows a discount of 11.11%, so the selling price (S.P.) after the discount is:
\[
S.P. = M – 11.11\% \text{ of } M = M – 0.1111 \times M = 0.8889M
\]

Step 3: Selling price and gain
The trader still makes a gain of 14.28%, which means the selling price is 14.28% more than the cost price. So, the selling price is:
\[
S.P. = C + 14.28\% \text{ of } C = 1.1428C
\]

Step 4: Equating the two expressions for selling price
Now, we can equate the two expressions for the selling price:
\[
0.8889M = 1.1428C
\]

Step 5: Solve for the marked price
Rearranging the above equation to solve for \( M \):
\[
M = \frac{1.1428C}{0.8889} = 1.2857C
\]

Step 6: Calculate the percentage markup
The marked price is \( 1.2857C \), meaning the goods are marked at 28.57% above the cost price.

Conclusion:
The trader marks his goods at 28.57% above the cost price.

Answer: Option D
Solution:
Let’s solve this step by step.

Step 1: Calculate the cost price per kilogram of the mixed dry fruits
The dealer mixes the dry fruits in the ratio 3:4:5 by weight. We will calculate the cost price (C.P.) per kilogram for the mixed dry fruits.

– The cost price of 1 kg of the first dry fruit is Rs. 100.
– The cost price of 1 kg of the second dry fruit is Rs. 80.
– The cost price of 1 kg of the third dry fruit is Rs. 60.

Since the ratio is 3:4:5, the total weight of the mix is \( 3 + 4 + 5 = 12 \) parts.

Now, calculate the total cost for the mixed 12 parts:

\[
\text{Total cost of the mix} = (3 \times 100) + (4 \times 80) + (5 \times 60)
\] \[
\text{Total cost of the mix} = 300 + 320 + 300 = 920
\]

The cost price per kilogram of the mix is:
\[
\text{C.P. per kg of the mix} = \frac{920}{12} = 76.67 \, \text{Rs. per kg}
\]

Step 2: Calculate the selling price
The dealer sells the mix at a profit of 50%. The selling price (S.P.) is calculated as:
\[
\text{S.P. per kg} = \text{C.P. per kg} \times (1 + \text{Profit Percentage})
\] \[
\text{S.P. per kg} = 76.67 \times (1 + 0.50) = 76.67 \times 1.50 = 115 \, \text{Rs. per kg}
\]

Conclusion:
The dealer sells the mixed dry fruits at Rs. 115 per kilogram.

Answer: Option C
Solution:
Let’s solve this step by step.

Step 1: Define the variables
– Let the marked price (M.P.) of the article be \( M \).
– The cost price (C.P.) is 80% of the marked price, so:
\[
C.P. = 0.80M
\]

Step 2: Selling price after discount
The tradesman allows a discount of 12%, so the selling price (S.P.) is:
\[
S.P. = M – 12\% \text{ of } M = 0.88M
\]

Step 3: Calculate the gain
The gain is the difference between the selling price and the cost price:
\[
\text{Gain} = S.P. – C.P. = 0.88M – 0.80M = 0.08M
\]

Step 4: Calculate the gain percentage
The gain percentage is calculated based on the cost price:
\[
\text{Gain Percentage} = \frac{\text{Gain}}{C.P.} \times 100 = \frac{0.08M}{0.80M} \times 100 = \frac{0.08}{0.80} \times 100 = 10\%
\]

Conclusion:
The tradesman gains 10% after allowing a discount of 12%.

Answer: Option D
Solution:
Let’s solve this step by step.

Step 1: Define the variables
– The cost of each shirt is Rs. 320.
– The merchant is offering a 25% rebate on the prices of ready-made garments.

Step 2: Calculate the rebate on one shirt
The rebate on one shirt is 25% of Rs. 320:
\[
\text{Rebate on one shirt} = 25\% \times 320 = 0.25 \times 320 = 80 \, \text{Rs.}
\]

Step 3: Determine the number of shirts needed
The total rebate required is Rs. 400. To find out how many shirts need to be purchased, divide the total rebate by the rebate on one shirt:
\[
\text{Number of shirts} = \frac{\text{Total rebate}}{\text{Rebate per shirt}} = \frac{400}{80} = 5
\]

Conclusion:
The purchaser should buy 5 shirts to get a rebate of Rs. 400.

Answer: Option C
Solution:
Let’s solve this step by step.

Step 1: Define the variables
– Let the original price per kg of tea be \( P \).
– The new price after a 10% reduction is \( 0.90P \).
– The dealer spends Rs. 22,500 to purchase tea.

Step 2: Number of kilograms purchased before and after the reduction
– Before the reduction, the dealer buys tea at the original price. The amount of tea purchased with Rs. 22,500 is:
\[
\text{Amount of tea before reduction} = \frac{22500}{P}
\]

– After the reduction, the dealer buys tea at the reduced price \( 0.90P \). The amount of tea purchased after the reduction is:
\[
\text{Amount of tea after reduction} = \frac{22500}{0.90P} = \frac{22500}{0.9P} = \frac{25000}{P}
\]

Step 3: The difference in the amount of tea
The dealer purchases 25 kg more tea after the reduction, so:
\[
\frac{25000}{P} – \frac{22500}{P} = 25
\]

Simplifying the equation:
\[
\frac{25000 – 22500}{P} = 25
\] \[
\frac{2500}{P} = 25
\]

Step 4: Solve for \( P \)
\[
P = \frac{2500}{25} = 100
\]

Step 5: Find the reduced price per kg
The reduced price is 10% less than the original price, so:
\[
\text{Reduced price} = 0.90 \times 100 = 90
\]

Conclusion:
The reduced price per kg of tea is Rs. 90.

Answer: Option A
Solution:
Let’s solve this step by step.

Step 1: Define the variables
Let the cost price of the article to A be \( x \).

Step 2: Calculate the price at each transaction
– A sells the article to B at a gain of 25%. Therefore, the price at which A sells to B is:
\[
\text{Price from A to B} = x + 25\% \times x = 1.25x
\]

– B sells it to C at a gain of 20%. Therefore, the price at which B sells to C is:
\[
\text{Price from B to C} = 1.25x + 20\% \times 1.25x = 1.25x \times 1.20 = 1.5x
\]

– C sells it to D at a gain of 10%. Therefore, the price at which C sells to D is:
\[
\text{Price from C to D} = 1.5x + 10\% \times 1.5x = 1.5x \times 1.10 = 1.65x
\]

Step 3: Price paid by D
We know that D pays Rs. 330 for the article, so:
\[
1.65x = 330
\]

Step 4: Solve for \( x \)
\[
x = \frac{330}{1.65} = 200
\]

Conclusion:
The cost price to A was Rs. 200.

Answer: Option D
Solution:
Let’s solve this step by step:

Step 1: Define the cost prices for the two watches
– Let the cost price of the first watch (sold at a loss of 20%) be \( C_1 \).
– Let the cost price of the second watch (sold at a profit of 20%) be \( C_2 \).

Step 2: Calculate the cost price of the first watch
The first watch was sold for Rs. 300 at a loss of 20%. The cost price \( C_1 \) can be calculated as:
\[
\text{Selling Price} = \text{Cost Price} – 20\% \times \text{Cost Price}
\] \[
300 = C_1 – 0.20 \times C_1 = 0.80 \times C_1
\] \[
C_1 = \frac{300}{0.80} = 375
\]

Step 3: Calculate the cost price of the second watch
The second watch was sold for Rs. 300 at a profit of 20%. The cost price \( C_2 \) can be calculated as:
\[
\text{Selling Price} = \text{Cost Price} + 20\% \times \text{Cost Price}
\] \[
300 = C_2 + 0.20 \times C_2 = 1.20 \times C_2
\] \[
C_2 = \frac{300}{1.20} = 250
\]

Step 4: Calculate the total cost price and total selling price
– The total cost price is \( C_1 + C_2 = 375 + 250 = 625 \).
– The total selling price is \( 300 + 300 = 600 \).

Step 5: Calculate the overall profit or loss
The total loss is:
\[
\text{Loss} = \text{Total Cost Price} – \text{Total Selling Price} = 625 – 600 = 25
\]

Step 6: Calculate the percentage of loss
The percentage of loss is:
\[
\text{Loss Percentage} = \frac{\text{Loss}}{\text{Total Cost Price}} \times 100 = \frac{25}{625} \times 100 = 4\%
\]

Conclusion:
The overall result is a loss of 4% from the transaction.

Answer: Option B
Solution:
Let’s solve this step by step.

Step 1: Define the variables
– Let the cost price (C.P.) of the article be Rs. 95.
– Let the marked price (M.P.) be \( M \).

Step 2: Calculate the selling price
The shopkeeper wants to earn a profit of 10%. The selling price (S.P.) can be calculated as:
\[
S.P. = C.P. + 10\% \times C.P. = 95 + 0.10 \times 95 = 95 + 9.5 = 104.5
\]

Step 3: Calculate the commission
The shopkeeper gives a 5% commission on the marked price. If \( M \) is the marked price, the commission is:
\[
\text{Commission} = 5\% \times M = 0.05M
\]

Step 4: Determine the relationship between selling price, marked price, and commission
The selling price is the marked price minus the commission:
\[
S.P. = M – 0.05M = 0.95M
\]

Step 5: Equate the selling price and solve for the marked price
We know the selling price is Rs. 104.5, so:
\[
0.95M = 104.5
\] \[
M = \frac{104.5}{0.95} = 110
\]

Conclusion:
The marked price of the article is Rs. 110.

Answer: Option B
Solution:
To find the single discount equivalent to two successive discounts of 10% and 20%, we can use the formula:

\[ \text{Single Discount} = 1 – (1 – d_1) \times (1 – d_2) \]

Where:
– \( d_1 \) is the first discount (10% or 0.10)
– \( d_2 \) is the second discount (20% or 0.20)

Substituting the values:

1 – (1 – 0.10) * (1 – 0.20) = 0.2799999999999999 equivalent single discount

Therefore, the single discount equivalent to two successive discounts of 10% and 20% is 28%.

This means that applying a single 28% discount results in the same final price as applying a 10% discount followed by a 20% discount.

Answer: Option C
Solution:
To determine the marked price of the radio, let’s break down the problem step by step:

Given:
– Cost Price (C.P.): Rs. 1,440
– Discount Offered: 25%
– Profit Desired: 25%

Step 1: Calculate the Selling Price (S.P.)

The dealer aims for a 25% profit on the cost price. Therefore, the selling price is:

\[
\text{S.P.} = \text{C.P.} + 25\% \times \text{C.P.} = 1,440 + 0.25 \times 1,440 = 1,440 + 360 = 1,800
\]

Step 2: Relate Selling Price to Marked Price

The selling price is the amount the customer pays after the 25% discount on the marked price. Therefore:

\[
\text{S.P.} = \text{M.P.} – 25\% \times \text{M.P.} = 0.75 \times \text{M.P.}
\]

Step 3: Solve for Marked Price

Substitute the known selling price into the equation:

\[
1,800 = 0.75 \times \text{M.P.}
\]

Solving for M.P.:

\[
\text{M.P.} = \frac{1,800}{0.75} = 2,400
\]

Conclusion:

The marked price of the radio is Rs. 2,400.

Answer: Option A
Solution:
To determine the marked price of the article, let’s break down the problem step by step:

Given:
– Selling Price (S.P.): Rs. 171
– First Discount:10%
– Second Discount: 5%

Step 1: Understand Successive Discounts

When two successive discounts are applied, the overall effect is equivalent to a single discount. The formula to calculate the overall discount percentage is:

\[ \text{Overall Discount} = 1 – (1 – d_1) \times (1 – d_2) \]

Where:
– \( d_1 \) is the first discount (10% or 0.10)
– \( d_2 \) is the second discount (5% or 0.05)

Step 2: Calculate the Overall Discount

Substitute the values into the formula:

\[ \text{Overall Discount} = 1 – (1 – 0.10) \times (1 – 0.05) \]

\[ \text{Overall Discount} = 1 – (0.90) \times (0.95) \]

\[ \text{Overall Discount} = 1 – 0.855 \]

\[ \text{Overall Discount} = 0.145 \]

Therefore, the overall discount is 14.5%.

Step 3: Relate Selling Price to Marked Price

The selling price is the marked price minus the overall discount:

\[ \text{S.P.} = \text{M.P.} \times (1 – \text{Overall Discount}) \]

Substitute the known values:

\[ 171 = \text{M.P.} \times (1 – 0.145) \]

\[ 171 = \text{M.P.} \times 0.855 \]

Step 4: Solve for Marked Price

\[ \text{M.P.} = \frac{171}{0.855} \]

\[ \text{M.P.} = 200 \]

Conclusion:

The marked price of the article is Rs. 200.

Answer: Option A
Solution:
To determine the profit percentage required on the remaining fruits to achieve an overall 20% profit, let’s break down the problem step by step:

Given:
– Total Cost Price (C.P.): Rs. 1,000
– Cost of Fruits Sold at 10% Profit: Rs. 400
– Desired Overall Profit: 20%

Step 1: Calculate the Desired Total Selling Price

The desired overall profit is 20% of the total cost price. Therefore, the total selling price (S.P.) should be:

\[
\text{Desired S.P.} = \text{C.P.} \times (1 + \text{Profit Percentage})
\]

\[
\text{Desired S.P.} = 1,000 \times (1 + 0.20) = 1,000 \times 1.20 = 1,200
\]

Step 2: Calculate the Selling Price of Fruits Sold at 10% Profit

The selling price of the fruits sold at a 10% profit is:

\[
\text{S.P. of Fruits Sold} = 400 \times (1 + 0.10) = 400 \times 1.10 = 440
\]

Step 3: Calculate the Required Selling Price for the Remaining Fruits

The remaining cost price of fruits is:

\[
\text{Remaining C.P.} = 1,000 – 400 = 600
\]

To achieve the desired total selling price, the selling price of the remaining fruits should be:

\[
\text{Required S.P. of Remaining Fruits} = \text{Desired S.P.} – \text{S.P. of Fruits Sold}
\]

\[
\text{Required S.P. of Remaining Fruits} = 1,200 – 440 = 760
\]

Step 4: Calculate the Required Profit Percentage on the Remaining Fruits

The required profit percentage on the remaining fruits is:

\[
\text{Required Profit Percentage} = \left( \frac{\text{Required S.P. of Remaining Fruits} – \text{Remaining C.P.}}{\text{Remaining C.P.}} \right) \times 100
\]

\[
\text{Required Profit Percentage} = \left( \frac{760 – 600}{600} \right) \times 100 = \left( \frac{160}{600} \right) \times 100 \approx 26.67\%
\]

Conclusion:

To achieve an overall 20% profit, the remaining fruits must be sold at a profit of approximately 26.67%.

Answer: Option A
Solution:
To determine the percentage above the cost price at which the dealer listed his wares, let’s break down the problem step by step:

Given:
– Cost Price (C.P.): Rs. 1
– Cash Discount Offered: 20%
– Profit Made: 20%
– Additional Offer:16 articles for the price of 12

Step 1: Calculate the Selling Price (S.P.)

The dealer makes a 20% profit on the cost price. Therefore, the selling price is:

\[
\text{S.P.} = \text{C.P.} + 20\% \times \text{C.P.} = 1 + 0.20 \times 1 = 1 + 0.20 = 1.20
\]

Step 2: Relate Selling Price to Marked Price

The dealer offers a 20% cash discount on the marked price. Therefore, the selling price is 80% of the marked price:

\[
\text{S.P.} = 0.80 \times \text{M.P.}
\]

Step 3: Solve for Marked Price

Equating the two expressions for the selling price:

\[
1.20 = 0.80 \times \text{M.P.}
\]

Solving for M.P.:

\[
\text{M.P.} = \frac{1.20}{0.80} = 1.50
\]

Step 4: Calculate the Percentage Above Cost Price

The marked price is 1.50 times the cost price. Therefore, the percentage above the cost price is:

\[
\left( \frac{1.50 – 1}{1} \right) \times 100\% = 0.50 \times 100\% = 50\%
\]

Conclusion:

The dealer listed his wares at 50% above the cost price.

Answer: Option A
Solution:
To determine the cost price of the chair, let’s break down the problem step by step:

Given:
– Total Cost Price (C.P.): Rs. 6,000
– Loss on Chair: 10%
– Gain on Table: 10%
– Overall Gain: Rs. 100

Step 1: Define Variables
Let:
– C.P. of Chair: Rs. x
– C.P. of Table: Rs. (6,000 – x)

Step 2: Calculate Selling Prices
– Selling Price of Chair:
\[
\text{S.P. of Chair} = x \times (1 – 0.10) = 0.90x
\] -Selling Price of Table:
\[
\text{S.P. of Table} = (6,000 – x) \times (1 + 0.10) = 1.10 \times (6,000 – x)
\]

Step 3: Set Up the Equation for Overall Gain
The total selling price is the sum of the selling prices of the chair and table. The overall gain is Rs. 100, so:
\[
\text{Total S.P.} = \text{C.P.} + 100
\] \[
0.90x + 1.10 \times (6,000 – x) = 6,000 + 100
\] Simplifying the equation:
\[
0.90x + 6,600 – 1.10x = 6,100
\] \[
-0.20x + 6,600 = 6,100
\] \[
-0.20x = -500
\] \[
x = \frac{-500}{-0.20} = 2,500
\]

Conclusion:
The cost price of the chair is Rs. 2,500.

Answer: Option B
Solution:
To solve this, we first need to calculate the cost price (C.P.) of the bicycle.

Given:
– Selling price (S.P.) = Rs. 2,850
– Profit = 14%

The formula for selling price is:

\[
\text{S.P.} = \text{C.P.} + \text{Profit}
\]

We can also express profit in terms of percentage:

\[
\text{Profit} = \frac{\text{Profit Percentage}}{100} \times \text{C.P.}
\]

Substituting the given profit percentage:

\[
\text{Profit} = \frac{14}{100} \times \text{C.P.} = 0.14 \times \text{C.P.}
\]

So, the selling price equation becomes:

\[
2,850 = \text{C.P.} + 0.14 \times \text{C.P.}
\]

This simplifies to:

\[
2,850 = 1.14 \times \text{C.P.}
\]

Now, solve for C.P.:

\[
\text{C.P.} = \frac{2,850}{1.14}
\]

Let’s calculate that.

The cost price (C.P.) of the bicycle is approximately Rs. 2,500.

Now, if the profit is reduced to 8%, the new selling price can be calculated using the same formula:

\[
\text{New S.P.} = \text{C.P.} + \frac{8}{100} \times \text{C.P.}
\]

This simplifies to:

\[
\text{New S.P.} = \text{C.P.} \times (1 + 0.08)
\]

Let’s calculate the new selling price.

The new selling price, when the profit is reduced to 8%, will be approximately Rs. 2,700.

Answer: Option D
Solution:

To solve this, let’s break it down again carefully:

We know:
– The profit is 25% of the selling price.
– We need to find the profit percentage based on the cost price.

Let the selling price (S.P.) of the article be \( S \) and the cost price (C.P.) be \( C \).

Since the profit is 25% of the selling price, we can write:

\[
\text{Profit} = 0.25 \times \text{S.P.}
\]

Also, the profit is the difference between the selling price and the cost price:

\[
\text{Profit} = \text{S.P.} – \text{C.P.}
\]

Equating these two:

\[
0.25 \times \text{S.P.} = \text{S.P.} – \text{C.P.}
\]

Solving for C.P.:

\[
\text{C.P.} = \text{S.P.} – 0.25 \times \text{S.P.} = 0.75 \times \text{S.P.}
\]

So, the cost price is 75% of the selling price.

To find the profit percentage based on the cost price, we use the formula:

\[
\text{Profit Percentage} = \frac{\text{Profit}}{\text{C.P.}} \times 100
\]

Since the profit is \( 0.25 \times \text{S.P.} \) and the cost price is \( 0.75 \times \text{S.P.} \), we get:

\[
\text{Profit Percentage} = \frac{0.25 \times \text{S.P.}}{0.75 \times \text{S.P.}} \times 100
\]

Simplifying:

\[
\text{Profit Percentage} = \frac{0.25}{0.75} \times 100 = 33.33\%
\]

So, the profit percentage based on the cost price is 33.33%.

Answer: Option C
Solution:
To calculate the effect of two successive price increases of 10% each, we use the following approach:

Let the original price of the article be \( P \).

1. First price increase: A 10% increase means the new price becomes:
\[
P_1 = P \times 1.10
\]

2. Second price increase: The second 10% increase is applied to \( P_1 \), so the price after the second increase is:
\[
P_2 = P_1 \times 1.10 = P \times 1.10 \times 1.10 = P \times (1.10)^2
\]

Now, calculate \( (1.10)^2 \):

\[
(1.10)^2 = 1.21
\]

Therefore, the overall effect of two successive 10% increases is equivalent to a single price increase of 21%.

Answer: Option B
Solution:
Let’s analyze each option in detail to see which one would maximize the stockist’s profit:

I. Sell sugar at 10% profit:
– The stockist would sell sugar at 10% above the cost price. This is a straightforward way to make a profit.
– The profit margin is 10%, but it’s a fixed profit, and the stockist’s profit would depend on how much sugar is sold.

II. Use 900 g of weight instead of 1 kg:
– By selling 900 grams of sugar while claiming it to be 1 kilogram, the stockist is essentially reducing the quantity but still charging the full price for 1 kilogram.
– This method could lead to profit because the stockist is selling less than what is being advertised.
– The stockist could make a 10% profit in this case, as they are selling 900 grams for the price of 1 kilogram. This would effectively be a 10% increase in profit margin.

III. Mix 10% impurities in sugar and selling sugar at cost price:
– Mixing impurities means the stockist is selling sugar mixed with lower-quality material but at the same price as pure sugar.
– This could technically increase the profit because the stockist is using less pure sugar to sell at the same price.
– However, this could harm the stockist’s reputation and lead to legal or ethical issues in the long term.

IV. Increase the price by 5% and reduce the weight by 5%:
– Increasing the price by 5% and reducing the weight by 5% would lead to a higher price per unit of sugar while still giving less quantity to the customer.
– This would increase the profit margin as both the price and the effective selling weight are altered to the stockist’s advantage.

Which Method Maximizes Profit?

– Option II (Use 900 g of weight instead of 1 kg) and Option IV (Increase the price by 5% and reduce the weight by 5%) are the two methods that could maximize profit.
– Option II allows the stockist to sell less sugar for the same price, resulting in a 10% higher profit.
– Option IV gives both a price increase and a reduction in quantity, increasing the profit margin.

Conclusion:Option IV (Increase the price by 5% and reduce the weight by 5%) would likely maximize the stockist’s profit, as it combines both a price increase and a reduction in quantity. However, Option II could also work effectively by selling less for the same price.

Answer: Option B
Solution:
Let’s go step by step to solve the problem.

Step 1: Calculate the Cost Price (C.P.) of Each Rickshaw
The dealer buys 30 rickshaws for Rs. 4725. So, the cost price per rickshaw is:

\[
\text{C.P. per rickshaw} = \frac{4725}{30} = 157.5
\]

Thus, the cost price of each rickshaw is Rs. 157.5.

Step 2: Identify the Cost Prices for Four-Seaters and Two-Seaters
There are 8 four-seaters and 22 two-seaters. The total cost price for each type is:

– Cost price for 8 four-seaters:
\[
8 \times 157.5 = 1260
\]

– Cost price for 22 two-seaters:
\[
22 \times 157.5 = 3465
\]

Step 3: Calculate the Total Required Selling Price for a 40% Profit
The dealer wants to make a 40% profit on his total outlay of Rs. 4725. The total selling price required to achieve this profit is:

\[
\text{Required Total Selling Price} = \text{Total C.P.} \times (1 + 0.40) = 4725 \times 1.40 = 6615
\]

Step 4: Let the Selling Price of a Four-Seater Be \( x \)
Let the selling price of each four-seater be \( x \). The selling price of each two-seater is \( \frac{2}{3} \times x \), as given.

Step 5: Express the Total Selling Price
The total selling price is the sum of the selling prices of all four-seaters and two-seaters. The total selling price is:

\[
\text{Total Selling Price} = 8 \times x + 22 \times \left( \frac{2}{3} \times x \right)
\]

Simplifying this:

\[
\text{Total Selling Price} = 8x + \frac{44}{3}x
\]

Now, the total selling price must equal Rs. 6615, as we calculated earlier:

\[
8x + \frac{44}{3}x = 6615
\]

Step 6: Solve the Equation
Multiply through by 3 to eliminate the fraction:

\[
3 \times (8x + \frac{44}{3}x) = 3 \times 6615
\]

\[
24x + 44x = 19845
\]

\[
68x = 19845
\]

Now, solve for \( x \):

\[
x = \frac{19845}{68} = 292.5
\]

Final Answer:
The dealer must sell each four-seater at Rs. 292.5 to make a 40% profit.

Answer: Option C
Solution:
Let’s break the problem into steps:

Step 1: Understand the First Scenario (3 Passengers, 20% Profit)
– The driver carries 3 passengers and makes a profit of 20% per trip.
– Let’s assume the cost of petrol used per trip is \( C_{\text{petrol}} \), and the revenue per passenger is \( R \).

The total revenue for 3 passengers would be:

\[
\text{Revenue} = 3 \times R
\]

Since the profit is 20%, the cost price (C.P.) of the trip is calculated using the formula:

\[
\text{Profit} = \text{Revenue} – \text{Cost Price}
\]

\[
\text{Profit} = \frac{20}{100} \times \text{Cost Price}
\]

Thus, the revenue is 120% of the cost price:

\[
\text{Revenue} = 1.20 \times \text{C.P.}
\]

Since the revenue is also \( 3R \):

\[
3R = 1.20 \times \text{C.P.}
\]

Now, the cost of petrol per trip is \( C_{\text{petrol}} \), and it is used in the total cost of the trip. Let’s say the petrol used per trip is \( x \) litres, and the price of petrol is Rs. 30 per litre:

\[
C_{\text{petrol}} = 30x
\]

So the total cost price \( C.P. \) is the cost of petrol, which is \( 30x \).

Now, substituting the cost price into the equation:

\[
3R = 1.20 \times 30x
\]

\[
3R = 36x
\]

So, the revenue per passenger is:

\[
R = 12x
\]

Step 2: Second Scenario (4 Passengers, Petrol Price Rs. 24)
Now, let’s consider the scenario with 4 passengers and the price of petrol reduced to Rs. 24 per litre.

The revenue per passenger remains the same, so the total revenue for 4 passengers is:

\[
\text{Revenue} = 4 \times R = 4 \times 12x = 48x
\]

The cost of petrol per trip is now \( C_{\text{petrol}} = 24y \), where \( y \) is the amount of petrol (in litres) used for the trip.

Since the journey is the same, the amount of petrol used per trip should remain the same, i.e., \( y = x \).

Thus, the total cost price for this scenario is:

\[
\text{Cost Price} = 24x
\]

Step 3: Calculate the Profit and Profit Percentage
The profit is the difference between revenue and cost price:

\[
\text{Profit} = 48x – 24x = 24x
\]

The profit percentage is:

\[
\text{Profit Percentage} = \frac{\text{Profit}}{\text{Cost Price}} \times 100 = \frac{24x}{24x} \times 100 = 100\%
\]

Final Answer:
The profit percentage for the same journey with 4 passengers and reduced petrol price is 100%.

Answer: Option C
Solution:
Let’s break down the situation step by step:

Step 1: Understand the Dealer’s Maneuvers
– The dealer marks up the price by 20%.
– The dealer gives a 10% discount on the marked price.
– The dealer uses a 900-gram weight instead of a 1-kg weight.

We need to find the overall profit percentage from these actions.

Step 2: Cost Price of Goods
Let the cost price of the goods be Rs. \( C \) for 1 kg.

Step 3: Marked Price
The dealer marks up the price by 20%, so the marked price of 1 kg is:

\[
\text{Marked Price} = C \times (1 + 0.20) = C \times 1.20
\]

Step 4: Selling Price After Discount
The dealer gives a 10% discount on the marked price, so the selling price after the discount is:

\[
\text{Selling Price} = \text{Marked Price} \times (1 – 0.10) = C \times 1.20 \times 0.90 = C \times 1.08
\]

Thus, the selling price of 1 kg (after the discount) is \( 1.08 \times C \).

Step 5: Quantity of Goods Sold
The dealer uses a 900-gram weight instead of a 1-kg weight, so the customer actually receives only 900 grams for the price of 1 kg.

Step 6: Profit
The dealer’s profit is the difference between the selling price and the cost price. The customer pays for 1 kg but receives only 900 grams, so the cost price of 900 grams is:

\[
\text{Cost Price of 900 grams} = C \times \frac{900}{1000} = 0.9C
\]

The selling price of 900 grams is \( 1.08 \times C \). Thus, the profit is:

\[
\text{Profit} = \text{Selling Price} – \text{Cost Price of 900 grams} = 1.08C – 0.9C = 0.18C
\]

Step 7: Profit Percentage
The profit percentage is calculated as:

\[
\text{Profit Percentage} = \frac{\text{Profit}}{\text{Cost Price of 900 grams}} \times 100 = \frac{0.18C}{0.9C} \times 100
\]

Simplifying:

\[
\text{Profit Percentage} = \frac{0.18}{0.9} \times 100 = 20\%
\]

Final Answer:
The dishonest dealer’s percentage profit due to these maneuvers is 20%.

Answer: Option A
Solution:
Let’s calculate the percentage profit made by the dishonest dealer based on the given information:

Step 1: Cost Price of the Goods
Let the cost price of 1 kg of goods be \( C \).

Step 2: Marked Price
The dealer marks up the price of the goods by 20%. So, the marked price for 1 kg of goods is:

\[
\text{Marked Price} = C \times (1 + 0.20) = C \times 1.20
\]

Step 3: Selling Price After Discount
The dealer gives a 10% discount on the marked price. So, the selling price after the discount is:

\[
\text{Selling Price} = \text{Marked Price} \times (1 – 0.10) = C \times 1.20 \times 0.90 = C \times 1.08
\]

Thus, the selling price for 1 kg (after the discount) is \( 1.08 \times C \).

Step 4: Quantity of Goods Sold
The dealer uses a 900-gram weight instead of a 1-kg weight. So, for the price of 1 kg, the customer receives only 900 grams of goods. The cost price of 900 grams is:

\[
\text{Cost Price of 900 grams} = C \times \frac{900}{1000} = 0.9C
\]

Step 5: Profit Made by the Dealer
The selling price for 900 grams (after the discount) is \( 1.08 \times C \). The dealer’s cost price for 900 grams is \( 0.9 \times C \). So, the profit is:

\[
\text{Profit} = \text{Selling Price} – \text{Cost Price of 900 grams} = 1.08C – 0.9C = 0.18C
\]

Step 6: Profit Percentage
The profit percentage is calculated as:

\[
\text{Profit Percentage} = \frac{\text{Profit}}{\text{Cost Price of 900 grams}} \times 100 = \frac{0.18C}{0.9C} \times 100
\]

Simplifying:

\[
\text{Profit Percentage} = \frac{0.18}{0.9} \times 100 = 20\%
\]

Final Answer:
The dishonest dealer’s percentage profit due to these maneuvers is 20%.

Answer: Option C
Solution:
Let’s break down the problem and calculate the sum to be obtained from advertisements to give a 10% profit on the cost.

Step 1: Fixed and Variable Costs

1. Fixed Cost:
The cost of setting up the type of the magazine is Rs. 1000.

2. Variable Costs:
– Cost of running the printing machine: Rs. 120 per 100 copies.
For 900 copies, the cost is:
\[
\text{Printing cost} = \frac{120}{100} \times 900 = 1080
\]

– Cost of paper, ink, and so on: 60 paise (Rs. 0.60) per copy.
For 900 copies, the cost is:
\[
\text{Paper and ink cost} = 0.60 \times 900 = 540
\]

Step 2: Total Cost
The total cost of producing 900 copies is the sum of the fixed cost and the variable costs:

\[
\text{Total Cost} = \text{Fixed cost} + \text{Printing cost} + \text{Paper and ink cost}
\] \[
\text{Total Cost} = 1000 + 1080 + 540 = 2620
\]

Step 3: Revenue from Sales
The magazine is sold at Rs. 2.75 each. However, only 784 copies are sold. So, the revenue from sales is:

\[
\text{Revenue from sales} = 2.75 \times 784 = 2156
\]

Step 4: Desired Profit
The dealer wants a 10% profit on the total cost. The desired profit is:

\[
\text{Desired profit} = 10\% \times 2620 = 262
\]

Step 5: Total Amount Needed
The total amount needed to cover the total cost and desired profit is:

\[
\text{Total amount needed} = \text{Total Cost} + \text{Desired profit} = 2620 + 262 = 2882
\]

Step 6: Amount to be Obtained from Advertisements
The revenue from sales is Rs. 2156, and the total amount needed is Rs. 2882. The amount to be obtained from advertisements is the difference:

\[
\text{Amount from advertisements} = 2882 – 2156 = 726
\]

Final Answer:
The sum to be obtained from advertisements to give a profit of 10% on the cost is Rs. 726.

Answer: Option B
Solution:
Let the cost price of the goods be \( C \) per unit.

Step 1: Determine the selling price

The selling price is 30% above the cost price, so:

\[
\text{Selling Price} = C + 0.30C = 1.30C
\]

Step 2: Breakdown of stock sold

– Half of the stock is sold at the original selling price:
Selling price for half the stock = \( 1.30C \).

– One-quarter of the stock is sold at a 15% discount:
Discounted selling price = \( 1.30C \times (1 – 0.15) = 1.30C \times 0.85 = 1.105C \).

– The remaining one-quarter is sold at a 30% discount:
Discounted selling price = \( 1.30C \times (1 – 0.30) = 1.30C \times 0.70 = 0.91C \).

Step 3: Calculate total revenue

Let’s assume the total stock is 1 unit for simplicity. The quantities sold and their respective selling prices are:

– Half of the stock: \( 0.5 \times 1.30C = 0.65C \).
– One-quarter of the stock: \( 0.25 \times 1.105C = 0.27625C \).
– One-quarter of the stock: \( 0.25 \times 0.91C = 0.2275C \).

Total revenue = \( 0.65C + 0.27625C + 0.2275C = 1.15375C \).

Step 4: Calculate the total cost

The total cost for 1 unit of stock is \( C \).

Step 5: Calculate the gain

The total gain is the difference between total revenue and total cost:

\[
\text{Total Gain} = \text{Total Revenue} – \text{Total Cost} = 1.15375C – C = 0.15375C
\]

Step 6: Calculate the gain percentage

\[
\text{Gain Percentage} = \left( \frac{\text{Total Gain}}{\text{Total Cost}} \right) \times 100 = \left( \frac{0.15375C}{C} \right) \times 100 = 15.375\%
\]

Thus, the gain percentage altogether is 15.375%.

Answer: Option A
Solution:
Let’s break this problem down step by step:

Step 1: Understand the Cost Price (C.P.)
Let the cost price (C.P.) of 1 kg of goods for the dealer be \( C \) rupees.

Step 2: Markup and Discount

– The dealer marks up the price by 20%. The marked price (M.P.) is therefore:

\[
\text{Marked Price} = C + 0.20C = 1.20C
\]

– The dealer gives a discount of 10% on the marked price. So, the selling price (S.P.) after the discount is:

\[
\text{Selling Price} = 1.20C \times (1 – 0.10) = 1.20C \times 0.90 = 1.08C
\]

Step 3: Cheating by 100 grams

– When the dealer buys 1 kg, he receives 1 kg but only pays for 900 grams. Therefore, his effective cost price for 1 kg is based on receiving more goods for less money. The effective cost price is:

\[
\text{Effective Cost Price} = \frac{900}{1000} \times C = 0.9C
\]

– When the dealer sells 1 kg, he charges for 1 kg but only gives the customer 900 grams. So, the effective selling price for 900 grams is:

\[
\text{Effective Selling Price} = 1.08C
\]

Step 4: Calculate the Profit

The profit made by the shopkeeper is the difference between the effective selling price and the effective cost price:

\[
\text{Profit} = \text{Effective Selling Price} – \text{Effective Cost Price} = 1.08C – 0.9C = 0.18C
\]

Step 5: Calculate the Profit Percentage

The profit percentage is calculated by dividing the profit by the effective cost price and multiplying by 100:

\[
\text{Profit Percentage} = \left( \frac{\text{Profit}}{\text{Effective Cost Price}} \right) \times 100 = \left( \frac{0.18C}{0.9C} \right) \times 100 = 20\%
\]

Final Answer:
The shopkeeper earns a 20% profit.

Answer: Option C
Solution:
Let’s break down the problem step by step:

Step 1: Ajay’s Purchase and Sale to Vijay

– Ajay’s purchase price: Ajay bought the motorcycle for Rs. 50,000.

– Vijay’s purchase price: After 2 years, Ajay sold the motorcycle to Vijay at 10% less than the cost price.

\[
\text{Vijay’s price} = 50,000 – 0.10 \times 50,000 = 50,000 – 5,000 = 45,000
\]

Step 2: Vijay’s Maintenance Cost

Vijay spends 5% of the purchasing price (Rs. 45,000) on maintenance.

\[
\text{Maintenance cost} = 0.05 \times 45,000 = 2,250
\]

So, Vijay’s total cost after maintenance is:

\[
\text{Total cost for Vijay} = 45,000 + 2,250 = 47,250
\]

Step 3: Vijay’s Display Price

Vijay displays the sale price of the motorcycle as Rs. 50,000, which is higher than his total cost of Rs. 47,250.

Step 4: Chetan’s Discount

Vijay offers two successive discounts of 10% and 5% instead of a single 15% discount. Let’s calculate the actual discount availed by Chetan:

1. First discount (10%):

\[
\text{Price after first discount} = 50,000 – 0.10 \times 50,000 = 50,000 – 5,000 = 45,000
\]

2. Second discount (5%):

\[
\text{Price after second discount} = 45,000 – 0.05 \times 45,000 = 45,000 – 2,250 = 42,750
\]

Step 5: Calculate the Actual Discount

The actual discount Chetan receives is the difference between the displayed price (Rs. 50,000) and the final price (Rs. 42,750):

\[
\text{Actual Discount} = 50,000 – 42,750 = 7,250
\]

The percentage of the actual discount is:

\[
\text{Actual Discount Percentage} = \left( \frac{7,250}{50,000} \right) \times 100 = 14.5\%
\]

Final Answer:
The actual discount availed by Chetan is 14.5%.

Answer: Option C
Solution:
Let’s break this problem down step by step:

Step 1: Let the Cost Price (C.P.) of 1 kg be \( C \)

– The trader sells the goods at a profit of \( k\% \) over the cost price. Therefore, the selling price (S.P.) for 1 kg, with the profit included, is:

\[
\text{Selling Price} = C + \frac{k}{100} \times C = C \left( 1 + \frac{k}{100} \right)
\]

Step 2: The Cheating Aspect

– The trader cheats the customer by giving only 880 grams instead of 1 kg, but he charges the full price for 1 kg. Thus, for every 1 kg the customer is supposed to receive, the trader actually gives only 880 grams.

The trader’s cost for 880 grams is:

\[
\text{Cost Price for 880 grams} = \frac{880}{1000} \times C = 0.88C
\]

Step 3: Overall Profit Percentage

The trader’s selling price for 1 kg (i.e., 1000 grams) is \( C \left( 1 + \frac{k}{100} \right) \), but his cost for the 880 grams is \( 0.88C \).

The profit the trader makes is:

\[
\text{Profit} = \text{Selling Price} – \text{Cost Price for 880 grams} = C \left( 1 + \frac{k}{100} \right) – 0.88C
\]

This profit should be 25% of the actual cost price for 880 grams. Since the cost for 880 grams is \( 0.88C \), the profit is:

\[
\text{Profit} = 0.25 \times 0.88C = 0.22C
\]

Step 4: Set up the equation for profit

Now, equating the two expressions for profit:

\[
C \left( 1 + \frac{k}{100} \right) – 0.88C = 0.22C
\]

Simplifying the equation:

\[
C \left( 1 + \frac{k}{100} – 0.88 \right) = 0.22C
\]

\[
C \left( 0.12 + \frac{k}{100} \right) = 0.22C
\]

Dividing both sides by \( C \) (assuming \( C \neq 0 \)):

\[
0.12 + \frac{k}{100} = 0.22
\]

Step 5: Solve for \( k \)

Now, solve for \( k \):

\[
\frac{k}{100} = 0.22 – 0.12 = 0.10
\]

\[
k = 0.10 \times 100 = 10
\]

Final Answer:
The value of \( k \) is 10.

Answer: Option A
Solution:
Let’s break the problem into manageable steps:

Step 1: Define the Variables

Let the initial cost price of the item be \( C \).

– The initial selling price (S.P.) is based on a profit of 20% over the cost price. So, the initial selling price is:

\[
\text{Initial Selling Price} = C \times (1 + 0.20) = 1.20C
\]

– The initial profit is:

\[
\text{Initial Profit} = \text{Initial Selling Price} – \text{Cost Price} = 1.20C – C = 0.20C
\]

Step 2: New Selling Price

The retailer increases the selling price by 25%, so the new selling price is:

\[
\text{New Selling Price} = 1.20C \times (1 + 0.25) = 1.20C \times 1.25 = 1.50C
\]

– The new profit is 25%, so the new profit is:

\[
\text{New Profit} = \text{New Selling Price} – \text{New Cost Price}
\]

Since the new profit is 25% of the new cost price, we can express it as:

\[
\text{New Profit} = 0.25 \times \text{New Cost Price}
\]

Step 3: Set up the equation for the New Cost Price

The new selling price is 1.50C, and the profit is:

\[
\text{New Profit} = 1.50C – \text{New Cost Price}
\]

Equating the two expressions for the new profit:

\[
1.50C – \text{New Cost Price} = 0.25 \times \text{New Cost Price}
\]

Simplifying:

\[
1.50C = 1.25 \times \text{New Cost Price}
\]

\[
\text{New Cost Price} = \frac{1.50C}{1.25} = 1.20C
\]

Step 4: Calculate the Percentage Increase in Cost Price

The initial cost price was \( C \), and the new cost price is \( 1.20C \). The percentage increase in the cost price is:

\[
\text{Percentage Increase in Cost Price} = \left( \frac{1.20C – C}{C} \right) \times 100 = \left( \frac{0.20C}{C} \right) \times 100 = 20\%
\]

Final Answer:
The percentage increase in the cost price is 20%.

Answer: Option B
Solution:
Let’s calculate the selling price of the watch.

Step 1: Determine the loss percentage

The loss is 15% of the cost price. So, the amount of loss is:

\[
\text{Loss} = 15\% \times 120 = 0.15 \times 120 = 18
\]

Step 2: Calculate the selling price

The selling price is the cost price minus the loss:

\[
\text{Selling Price} = \text{Cost Price} – \text{Loss} = 120 – 18 = 102
\]

Final Answer:
The watch was sold for Rs. 102.

Answer: Option D
Solution:
Let’s break down the problem step by step to find the money obtained from advertising.

Step 1: Calculate the Total Costs

– Setting up cost: Rs. 2800 (fixed cost).

– Cost of paper and ink: Rs. 80 per 100 copies. Since 2000 copies were printed, the total cost for paper and ink is:

\[
\text{Cost of paper and ink} = \frac{2000}{100} \times 80 = 20 \times 80 = 1600
\]

– Printing cost: Rs. 160 per 100 copies. The total printing cost for 2000 copies is:

\[
\text{Printing cost} = \frac{2000}{100} \times 160 = 20 \times 160 = 3200
\]

The total cost to produce 2000 copies is:

\[
\text{Total Cost} = 2800 + 1600 + 3200 = 7600
\]

Step 2: Calculate the Revenue from Sales

– Selling price: Rs. 5 per copy. Since 1500 copies were sold, the revenue from sales is:

\[
\text{Revenue from sales} = 1500 \times 5 = 7500
\]

Step 3: Calculate the Profit

The problem states that a 25% profit on the sale price was realized. The total sale price from selling 1500 copies is Rs. 7500, and the profit is 25% of the sale price:

\[
\text{Profit from sales} = 0.25 \times 7500 = 1875
\]

Step 4: Calculate the Advertising Revenue

The total profit (Rs. 1875) is the sum of the profit from the sale and the advertising revenue. The total cost to produce 2000 copies was Rs. 7600, and the revenue from the sale of 1500 copies was Rs. 7500, so the advertising revenue must make up the difference between the total cost, the revenue from sales, and the total profit.

\[
\text{Advertising Revenue} = \text{Total Cost} + \text{Profit} – \text{Revenue from Sales}
\]

\[
\text{Advertising Revenue} = 7600 + 1875 – 7500 = 975
\]

Final Answer:
The sum of money obtained from advertising in the magazine is Rs. 975.

Answer: Option B
Solution:
Let’s solve this problem step by step.

Step 1: Define the variables

– Let the total quantity of rice be \( x \) quintals.
– The cost price of the rice is Rs. 150 per quintal, so the total cost price for \( x \) quintals is:

\[
\text{Total Cost Price} = 150 \times x
\]

Step 2: Account for the spoiled rice

– 10% of the rice was spoiled, so the remaining rice is 90% of the total quantity. Therefore, the remaining rice is:

\[
\text{Remaining Rice} = 0.90 \times x
\]

Step 3: Calculate the selling price needed to earn 20% profit

– The person wants to earn a 20% profit on the total cost price. So, the total selling price required to earn a 20% profit is:

\[
\text{Required Selling Price} = \text{Total Cost Price} \times (1 + 0.20) = 150 \times x \times 1.20 = 180 \times x
\]

Step 4: Determine the selling price per quintal

– The selling price per quintal of the remaining rice is the total required selling price divided by the quantity of the remaining rice:

\[
\text{Selling Price per Quintal} = \frac{\text{Required Selling Price}}{\text{Remaining Rice}} = \frac{180 \times x}{0.90 \times x}
\]

Simplifying the equation:

\[
\text{Selling Price per Quintal} = \frac{180}{0.90} = 200
\]

Final Answer:
The person should sell the remaining rice at Rs. 200 per quintal to earn a 20% profit.

Answer: Option C
Solution:
Let’s break the problem into steps to find the price of Speed.

Step 1: Define the variables

– Let the price of Speed per litre be \( x \) (this is what we need to find).
– The price of Extra Premium is Rs. 48 per litre.

Step 2: Cost of the mixture

The trader mixes 12 litres of Extra Premium with 3 litres of Speed.

– The total cost of 12 litres of Extra Premium is:

\[
\text{Cost of Extra Premium} = 12 \times 48 = 576
\]

– The total cost of 3 litres of Speed is:

\[
\text{Cost of Speed} = 3 \times x
\]

Thus, the total cost of the mixture is:

\[
\text{Total Cost of Mixture} = 576 + 3x
\]

Step 3: Selling the mixture

The trader sells the mixture at the price of Extra Premium (Rs. 48 per litre). The total quantity of the mixture is:

\[
\text{Total Quantity of Mixture} = 12 + 3 = 15 \, \text{litres}
\]

The selling price of the mixture is:

\[
\text{Selling Price of Mixture} = 15 \times 48 = 720
\]

Step 4: Profit Calculation

The trader makes a profit of 9.09%. The profit is the difference between the selling price and the cost price:

\[
\text{Profit} = \text{Selling Price} – \text{Cost Price}
\]

The profit is 9.09% of the cost price, so:

\[
\text{Profit} = \frac{9.09}{100} \times \text{Cost Price} = \frac{9.09}{100} \times (576 + 3x)
\]

We know that the selling price minus the cost price is the profit:

\[
720 – (576 + 3x) = \frac{9.09}{100} \times (576 + 3x)
\]

Step 5: Solve the equation

Simplifying the equation:

\[
720 – 576 – 3x = \frac{9.09}{100} \times (576 + 3x)
\]

\[
144 – 3x = \frac{9.09}{100} \times (576 + 3x)
\]

Multiply both sides by 100 to eliminate the fraction:

\[
14400 – 300x = 9.09 \times (576 + 3x)
\]

Expand the right-hand side:

\[
14400 – 300x = 9.09 \times 576 + 9.09 \times 3x
\]

\[
14400 – 300x = 5234.64 + 27.27x
\]

Now, bring all terms involving \( x \) to one side and constants to the other side:

\[
14400 – 5234.64 = 300x + 27.27x
\]

\[
9165.36 = 327.27x
\]

Solve for \( x \):

\[
x = \frac{9165.36}{327.27} \approx 28
\]

Final Answer:
The price of Speed is Rs. 28 per litre.

Answer: Option C
Solution:
Let’s solve the problem step by step:

Step 1: Calculate the price after discounts

The original sale price of the house is Rs. 8,00,000.

– First discount (20%): Kamal gets a 20% discount as an early bird offer. The price after the first discount is:

\[
\text{Price after 20% discount} = 8,00,000 \times (1 – 0.20) = 8,00,000 \times 0.80 = 6,40,000
\]

– Second discount (10%)**: Kamal gets an additional 10% discount due to cash payment. The price after the second discount is:

\[
\text{Price after 10% discount} = 6,40,000 \times (1 – 0.10) = 6,40,000 \times 0.90 = 5,76,000
\]

Step 2: Calculate the cost of interior decoration and lawn

Kamal spends 10% of the cost price (after discounts) on interior decoration and lawn. The cost after discounts is Rs. 5,76,000, so the cost of interior decoration and lawn is:

\[
\text{Cost of decoration and lawn} = 5,76,000 \times 0.10 = 57,600
\]

So, the total cost incurred by Kamal, including the price of the house and decoration, is:

\[
\text{Total Cost} = 5,76,000 + 57,600 = 6,33,600
\]

Step 3: Calculate the selling price for 25% profit

Kamal wants to earn a 25% profit on his total cost. So, the selling price should be 25% more than the total cost. The required selling price is:

\[
\text{Selling Price} = \text{Total Cost} \times (1 + 0.25) = 6,33,600 \times 1.25 = 7,92,000
\]

Final Answer:
Kamal should sell the house for Rs. 7,92,000 to earn a 25% profit.