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Let the Cost price of apple be RS. a

According to PROBLEM statement

⇒ a(1 - 15/100) = 170

⇒ a = 170/0.85 = 200

Profit can be given as 230 – 200 = Rs. 30

Profit PERCENTAGE = profit × 100/200 = 30/2 = 15%

∴ The profit percentage is 15%

Let the initial marked price be Rs. 100

First discount = 10%

New SELLING price = Rs. 90

Successive discount = 15%

New selling price = 90 - (15/100) × 90 = Rs. 76.5

Additional discount = 5%

Final selling price = 76.5 - (5/100) × 76.5 = 72.675

Let, cost PRICE of each chair = Rs. X

Selling price of each chair = Rs. y

According to problem,

⇒ 200y - 200X = 40y

⇒ 160y = 200x

⇒ y = 5x/4

∴ Profit percentage,

$( \Rightarrow \FRAC{{\frac{{5x}}{4} - x}}{x} \times 100\% )$ 

⇒ ¼ × 100%

⇒ 25%

Given, 3,000 is divided among A, B and C, so that A receives 1/3 as much as B and C together receive and B receives 2/3 as much as A and C together receive

$(\Rightarrow {\rm{A}} = \FRAC{1}{3}{\rm{\;}}\left( {{\rm{\;B}} + {\rm{C}}} \right))$

⇒ 3A = B + C……….(1)

$(\Rightarrow {\rm{B}} = \frac{2}{3}{\rm{\;}}\left( {{\rm{\;A}} + {\rm{C}}} \right))$

⇒ 3B = 2A + 2C…………(2)

⇒ PUTTING the value of C from (1) into (2), we get,

⇒ 3B = 2 A + 2 (3A – B)

⇒ 8A = 5B …………….(3)

⇒ Similarly, we can solve and will get relation between B and C.

⇒ 7B = 8C …………….. (4)

⇒ Multiplying (3) with 7 and (4) with 5, we get,

⇒ 56A = 35B = 40C

$(\Rightarrow \frac{{56{\rm{A}}}}{{280}} = \frac{{35{\rm{B}}}}{{280}} = \frac{{40{\rm{C}}}}{{280}})$

$(\Rightarrow \frac{{\rm{A}}}{5} = \frac{{\rm{B}}}{8} = \frac{{\rm{C}}}{7})$

⇒ A : B : C = 5 : 8: 7

$(\Rightarrow {\rm{Share\;of\;C}} = \frac{7}{{20}} \times 3000 = 1050)$

LET the Cost Price (C.P) of chair_1 be ‘x’ and that of chair_2 be (2400 - x)

Selling Price (S.P) in the FIRST case = 1.25x + 0.9 × (2,400 - x)

S.P in the second case = 0.8x + 1.3 × (2,400 - x)

ACCORDING to the given condition,

0.8x + 1.3(2,400 - x) = 300 + 1.25x + 0.9 (2,400 - x)

∴ 0.4 × (2,400 - x) = 0.45x + 300

∴ 960 – 300 = 0.45x + 0.4x

∴ 660 = 0.85x

∴ x ≈ 776

∴ Difference in C.P of chair_1 and chair_2 = (2,400 – x) - x = 2,400 – 2X = 2,400 – 1552 = 848

We know that Selling Price = (1 - DISCOUNT %) × Marked Price

Given Discount = 28%

⇒ Selling Price = (1 - 28%) × 1400

⇒ Selling Price = (1 - 0.28) × 1400

⇒ Selling Price = 0.72 × 1400

⇒ Selling Price = 1008

Profit = (SP - CP) = (1008 - 700) = Rs. 308

Atul bought an article, paying 5% less than the ORIGINAL PRICE.

Let the original price of the article be x

Then, Cost price for Atul = x – (5% of x) = 0.95x

Now, Atul sold it with a 20% PROFIT on the price he had paid.

Selling price = 0.95x + (20% of 0.95x) = 1.14x

Let, the marked PRICE = RS. x

According to PROBLEM,

⇒ x - x × 40/100 = 600 + 600 × 20/100

⇒ 0.6x = 720

⇒ x = 1200

∴ Marked price of the WATCH = Rs. 1200

Let Cost PRICE of 100 g milk was 100 UNITS,

Let’s ASSUME that X grams of milk are mixed with (100 – x) grams of WATER.

x + 5% of x = 100

⇒ x + 0.05x = 100

⇒ 1.05x = 100

⇒ x = 100/1.05 = 2000/21
Water = 100 – (2000/21) = 100/21

Let the price of land = K.

Then price of land after FIRST MIDDLEMAN = k + 20% of k

= k + 0.2k = 1.2 k

Price of land after second middle man = 1.2k + 20% of 1.2k

= 1.2k + 0.24k

= 1.44 k

Price of land after third middle man = 1.44k + 20% of 1.44 k

= 1.44k + 0.288k

= 1.728k

Hence, we have 1.728k = RS 345600

⇒ k = 345600/1.728

MARKED PRICE/selling price = 11/10

⇒ Selling price/Marked price = 10/11

Discount offered on first Rs.25000 = 12% of 25000 = Rs. 3000

Discount offered on next Rs. 15000 = 5% of 15000 = Rs. 750

Total Discount offered = 10% of 42000 = Rs. 4200

⇒ Discount offered on LAST Rs. 2000 = 4200 – 3000 – 750 = Rs. 450

Discount Percentage = (450/2000) × 100 = 22.5%

Let the Total weight of the groundnut = 100 kgs

Total cost = 100 × (20 + 5) = Rs. 2500

AMOUNT that should be received after 20% PROFIT = 2500 × 1.2 = Rs. 3000

Since 80% of the weight of groundnut is left and SOLD as cattle feed for Rs. 12.5/kg;

Amount received after SELLING the waste = 100 × 0.8 × 12.5 = Rs. 1000

∴ Remaining amount to be received by selling oil = 3000 – 1000 = Rs. 2000

Since weight of oil = 100 × 0.2 = 20 litres

TOTAL COST PRICE = 10 × 180 = Rs. 1800

Total SELLING price = 10 × 12 × 19.5 = Rs. 2340

SP of one HELMET = 1232

SP of two helmets = 1232 × 2 = 2464

CP of FIRST helmet = 1232 × 100/112 = 1100

CP of second helmet = 1232 × 100/88 = 1400

Total CP of two helmets = 1100 + 1400 = 2500

As we know, loss = CP - SP

Let the required number be x

⇒ 40 = $(\left( {\FRAC{{7\; \TIMES \;1}}{{x\; \times \;1\;}} - \;1} \RIGHT))$ × 100

⇒ 2/5 = 7/x - 1

⇒ 2/5 + 1 = 7/x = 7/5 = 7/x

⇒ x = 5

∴ He has to sell 5 pair of clips for a rupee to get PROFIT of 40%

SUPPOSE he mixes T kg of brick powder in 5 kg of chili powder.

Cost price of 5 kg of chili powder = Rs. 3000 × 5 = Rs. 15000

After mixing, total amount of mixture = (5 + T) kg

Selling price of 1 kg of mixture = 3000 – 3000 × (5/100) = Rs. 2850

Selling price of (5 + T) kg of mixture = Rs. 2850 × (5 + T) = Rs. (14250 + 2850T)

We know, Selling Price = Cost Price × (1 + (Profit Percentage)/100)

(14250 + 2850T) = 15000 × (1+ 12/100)

14250 + 2850T = 16800

T = 2550/2850 = 0.895

USING the formula,

(100 + G)/100 = TRUE weight/False weight, where G is the GAIN percentage

⇒ (100 + G)/100 = 1000/920

⇒ 100 + G = 108.7

∴ Gain Percent = 8.7%

Selling price of article = Rs. 660

Profit = 10%

Profit% = (SP - CP)/CP × 100

10 = (660-CP)/CP × 100

⇒CP = 660 × 100/110 = Rs. 600

Discount% = (MP - CP)/MP × 100

Let the marked price be Rs. X and discount is 25%

25 = (X - 600)/X × 100

(X - 600) = X/4

⇒ X = Rs. 800

RATIO of their share in profit = Ratio of their investments

⇒ 60000 × 6 + 64000 × 2 + 66000 × 8 ? 72000 × 2 + 78000 × 8 ? 92000 × 8

Thus, ratio of their investments = 1016000 ? 768000 ? 736000 = 1016 ? 768 ? 736 = 127 ? 96 ? 92

Profit earned after a year = Rs. 1,89,000

A’s share = (127/315) × 189000 = Rs. 76200

C’s share = (92/315) × 189000 = Rs. 55200

Thus, A’s share is Rs. 76,200 and C’s share is Rs. 55,200.

LET the total number of ITEMS = 12 (L.C.M of 4 and 3 is 12)

Let COST Price of each item = Rs.x

⇒ Total Cost Price = 12x

Marked Price of each item = 1.25x

As, one third of the stock is sold at the marked price,

S.P₁ = (1/3) × 12 × 1.25x = 5x

As, one quarter of the stock is sold at a discount of 10% on the marked price,

S.P₂ = (1/4) × 12 × 0.9 × 1.25x = 3.375x

As, the rest of the stock is sold at a discount of 30% on the marked price,

S.P₃ = 5 × 0.7 × 1.25x = 4.375x

Total S.P = S.P₁ + S.P₂ + S.P₃

⇒ S.P = 5x + 3.375x + 4.375x = 12.75x

Total C.P = 12x

Total S.P = 12.75x

Profit = 0.75x

CHARAN‘s share = 4/(7 + 5 + 4) = 4/16

LET the initial MARKED price be RS. ‘x’.

⇒ REDUCTION in price = 0.11x

⇒ Selling price = x – 0.11x = 0.89x

⇒ Profit GAINED = 0.14 × 810 = Rs. 113.4

⇒ Selling price = 810 + 113.4 = Rs. 923.4

⇒ 0.89x = 923.4

X invested Rs. 12000 for 4 months

⇒ X’s TOTAL capital investment = 12000 × 4 = 48000

Y invested Rs. 9000 for 12 months

⇒ Y’s total capital investment = 9000 × 12 = 108000

Z invested Rs. 18000 for 12 - 4 = 8 months

⇒ Z’s total capital investment = 18000 × 8 = 144000

? Ratio of profit SHARE = Ratio of total capital investment

⇒ Ratio of profit share = 48000 ? 108000 ? 144000 = 4 ? 9 ? 12

Sum of ratios = 4 + 9 + 12 = 25

Now, total profit = Rs. 12500

Let, marked PRICE = x

After first discount of 20%, price = x - x × 20/100 = 0.8x

After second discount of 25%, price = 0.8x - 0.8x × 25/100 = 0.6x

After third discount of 15%, price = 0.6x - 0.6x × 15/100 = 0.51x

∴ Net discount percentage,

$(\RIGHTARROW \frac{{x - 0.51x}}{x} \times 100\%)$

COST of 10 pencils = RS. 100

Cost of 100 pencils = 100 × 100/10 = Rs. 1000

Profit percentage = 12%

As per the given DATA,

Cost PRICE of goods = selling price of goods

Let the selling price of the goods be Rs.100

Given that 20% less goods, he is giving

∴ Actual selling price of goods = Rs.80 Let the x be the profit

⇒ 80 + (x/100 × 80) = 100

⇒ 80x/100 = 20

⇒ x = 2000/80 = 25%

∴ Profit percent is 25%

Let the CP of the horse be k

Then SP of the horse = k + 15% of k

= k + 0.15k

= 1.15k

If he WOULD have BOUGHT it for 25% LESS, CP = k – 25% of k

= k – 0.25k

= 0.75k

SP = 1.15k – 600

Profit = SP – CP

= 1.15k – 600 – 0.75k

= 0.4k – 600

Profit% = (Profit/CP) × 100

⇒ 32 = (0.4k – 600) × 100/0.75k

⇒ 24K = 40k – 60000

⇒ 16k = 60000

⇒ k = 60000/16

LET the MARKED price of article be Rs.4700

After giving two successive discounts of 10% and 15%, the selling price will be,

$( \Rightarrow S.P = \;4700 \TIMES \frac{{\left( {100 - 10} \RIGHT)}}{{100}} \times \frac{{\left( {100 - 15} \right)}}{{100}})$

$( \Rightarrow S.P = \;4700 \times \frac{{\left( {90} \right)}}{{100}} \times \frac{{\left( {85} \right)}}{{100}})$

⇒ S.P = 3595.5

Hence, the marked price of an article = Rs. 3595.5

Let the C.P of 40 ARTICLES be x, hence the selling price of 25 articles is x.

The C.P of each ARTICLE = x/40

And the selling price of each article = x/25

Now, S.P = C.P + profit

⇒ x/25 = x/40 + profit

Hence, profit = x/25 – x/40

Profit = 3x/200

For a C.P of x/40, profit is 3x/200

Let profit % = y%

Hence, y% of x/40 = 3x/200

y/100 × x/40 = 3x/200

y = 3 × 40 × 100 /200 = 60% 

LET, x be the LABELLED price of the wrist watch

∴ Price at which he brought the watch $(= \;x - \;\frac{{30}}{{100}}x = \left( {1 - 0.3} \right)x = 0.7x)$

Again, Price at which he sold the watch = $(\;0.7x + \frac{{40}}{{100}} \times 0.7x)$

$(= \left( {1 + \;\frac{{40}}{{100}}} \right) \times 0.7x = 0.98x)$

Let the COST PRICE of a COCONUT is Rs. ‘x’

Cost price - loss = selling price

⇒ x - 20% of x = 24

⇒ x - 0.2x = 24

⇒ 0.8x = 24

⇒ x = 24/0.8 = Rs. 30

Cost price of a coconut = Rs. 30

When the selling price is Rs. 36,

∴ PROFIT % = [(36 - 30)/30] × 100 = 20%

Let the COST price of 5 mangoes be RS.x

So, the cost price of 1 mangoes = Rs.(x/5)

The SELLING price of 8 mangoes is EQUAL to the cost price of 5 mangoes.

Then, the selling price of 8 mangoes = Rs.x

So, the selling price of 1 mangoes = Rs.(x/8)

Loss = Cost price – Selling price = Rs.(x/5) – (x/8) = Rs. 3x/40

Let the discounted price be Rs. ‘x’

Customer pays Rs. 3,402 as the price including the sales tax and charges a sales tax of 8% on the discounted price.

Therefore,

108% of discounted price = 3402

⇒ (108/100) × x = 3402

⇒x = (3402 ×100)/108

⇒x = Rs.3150

Shopkeeper ALLOWS a DISCOUNT of 10% on the marked price.

Therefore,

90% of M.P = discounted price

$(\RIGHTARROW \frac{{90}}{{100}} \TIMES M.P = 3150)$

⇒ $(M.P = \frac{{3150 \times 100}}{{90}})$

A successive discount of 20%, 30% and 50% means that a discount of 20% is APPLIED on original marked price to obtain REVISED price. Then, 30% discount is applied on this revised price to obtain a NEW revised price. Then, 50% discount is applied on this new revised price to obtain final selling price.

Here, Marked price = Rs. 2000

So, Revised Price = Marked Price × (1 – (Discount Percentage)/100)

⇒ Revised Price = 2000 × (1 – 20/100) = 2000 × 0.8 = 1600

⇒ New Revised Price = Revised Price × (1 – 30/100) = 1600 × 0.7 = 1120

⇒ Final Selling Price = New Revised Price × (1 – 50/100) = 1120 × 0.5 = 560

LET the cost price at which A bought be x.

A sold it to B with a profit of 16%

∴ SP1 = 116x/100

B sold it to C at a loss of 10%

∴ SP2 = 90 SP1/100 = 4698

4698 = (116x/100) × (90/100)

∴ x = RS. 4,500

To get a profit of 20% A should sell at a price = (120/100) × 4500 = Rs. 5400

? Cost PRICE + Profit = Selling price

⇒Profit = Cost price – Selling price = RS. 575

⇒23% of Cost price = 575

⇒Cost price = 575/0.23 = Rs. 2500

Price of PRODUCT after TWO successive selling

⇒ (100 + 6)% of (100 + 8)% of 2500

⇒ 1.06 × 1.08 × 2500

LET the investment of JALAL, Amit and Feroz be x, y and z

Given that invests 4 times as much as Amit and Amit invests ¾ of what Feroz invests.

⇒ x = 4y and y = 3/4 z

Given that total profit at the END of year is Rs.19000

⇒ x + y + z = 19000

⇒ 4y + y + 4y/3 = 19,000

⇒ 12Y + 3y + 4y = 57,000

⇒ 19y = 57,000

⇒ y = 3,000

Jalal investment (x) = 4y = 4 (3, 000) = Rs.12,000

Marked Price (MP) = (10/7) Cost Price (CP)----(1)

Selling Price (SP) = (4/5) Marked Price (MP)----(2)

SUBSTITUTING MP from EQUATION 1 in Equation 2, we get SP = (4/5) × (10/7) × CP = (8/7) CP

Profit PERCENTAGE = [(SP – CP)/CP] × 100 = [(8/7CP - CP)/CP] × 100 = (1/7) × 100 = 14.28%

GAIN% = (SP - CP)/CP × 100

Let the Cost PRICE of article be x

Gain = 10%

Selling price of article = x + (10/100) × x = 1.1x

Now the article is SOLD at loss

Loss = 10%

Selling price of article = x - (10/100) × x = 0.9x

The DIFFERENCE between the selling prices is Rs. 20

1.1x - 0.9x = 20

0.2x = 20 ⇒ x = Rs. 100

Cost price of article is Rs. 100

SELLING price of pen after first discount = Rs. 16 × (88/100) = Rs. 14.08

A second discount is given bringing the price down to Rs. 10.56.

So, price drop in second discount = Rs. 14.08 - 10.56 = Rs. 3.52

We know that,

Amount of PROFIT share is the product of amount and time invested.

⇒ Profit of Yash ? Profit of MOHIT = (55000 × 6) ? (20000 × 3) = 11 ? 2

Profit share of Mohit = [2/(11 + 2) ] × 26000 = Rs. 4000

∴ Profit share of Mohit = Rs. 4000

According to the given condition ,

90% of M.P = 125% of CP

∴ M.P = (1.25 × 600)/0.9 = 833.33

Let the cost price of the flour be Rs. x PER kg and the amount of flour that the shopkeeper actually gave to the man be ‘y’ kg

Selling price of 1 kg flour = (100 + 5)% of x = Rs. 1.05x

Amount PAID by man = Selling price of 4 kg flour = 4 × 1.05x = Rs. 4.2x

Actual cost of flour taken by man = Rs. xy

Hence, profit EARNED by the shopkeeper = 4.2x – xy = x(4.2 – y)

⇒ 10% of xy = x(4.2 – y)

⇒ 0.1y = 4.2 – y

⇒ 1.1y = 4.2

⇒ y = 4.2/1.1 = 3.82 kg

$(CP\; = \;\frac{{SP}}{{1\; + \;profit\% }})$

SP = CP(1 + Profit%)

Where, CP = cost price

SP = Selling Price

For DIVYA, CP = 35 × 1.25 = Rs. 43.75, Profit = 15%

∴ SP = 43.75 (1 + 0.15) = 43.75 × 1.15 = Rs. 50.3125 for 35 apples

For Meha, CP = Rs. 50.3125 for 35 apples

She eats 7 apples.

∴ She has 28 apples now.

Profit % = 20%

∴ SP = 50.3125(1 + 0.2) = Rs. 60.375 for 28 apples.