Profit and Loss - MathsTips.com

Cost Price: The price at which an article is bought or purchased is called its cost price. (C.P.)

Selling Price: The price at which an article is sold is called its selling price. (S.P.)

Profit: When an article is sold for more than what it costs, we say that there is a ‘profit’ or gain.

Loss: When an article is sold for less than what it costs , we say that there is a ‘loss’.

When the selling price is equal to the cost price, then there is neither profit nor loss.

We recall a few important facts below:

Profit = Selling Price – Cost Price
Loss = Cost Price – Selling Price
Cost Price = Selling Price – Profit or, Selling Price + Loss
Selling Price = Cost Price + Profit or, Cost Price – Loss
Profit or Loss per cent = $\dfrac{Total \hspace{1mm} profit/loss}{cost \hspace{1mm} price} \times 100$

Caution: Profit or loss per cent is never calculated on the number of items sold, but on the cost prices of the items.

In calculating any percentage change, the increase or decrease is expressed as a percentage of the first value. Buying comes before selling , thus, profit or loss is expressed as a percentage of the buying price ( i.e., the cost price ) and not of the selling price.

Overheads – If there are some additional expenses incurred on the transportation , repair etc of an article purchased, they are included in the C.P. of the article and are called ‘overheads’.

3 Major Type of Profit and Loss Problems

Type 1 : Find Profit or Loss Percent.

Example 1: What is the profit per cent if a table bought for $Rs \hspace{1mm} 65$ is sold for $Rs \hspace{1mm} 70$ ?

Solution: A table is bought for $Rs \hspace{1mm} 65$ and sold for $Rs \hspace{1mm} 70$ .

Total profit $=Rs \hspace{1mm} 70 -Rs \hspace{1mm} 65= Rs \hspace{1mm} 5$

Profit % $= \dfrac{Profit}{C.P.} \times 100 = \dfrac{100}{13} \%$

Example 2: Arun buys a T.V. for $Rs \hspace{1mm} 16000$ . The transportation charges are $Rs \hspace{1mm} 200$ and the installation charges are $Rs \hspace{1mm} 800$ . He then sells it to his friend for $Rs \hspace{1mm} 15300$ . Find the loss per cent.

Solution: $C.P.= Rs \hspace{1mm} 1600 + Rs \hspace{1mm} 200 + Rs \hspace{1mm} 800 = Rs \hspace{1mm} 17000$ .

Here transportation and installation charges fall under overhead costs.

$S.P. = Rs \hspace{1mm} 15300$

$Loss=S.P-C.P.=Rs \hspace{1mm} 17000 -Rs \hspace{1mm} 15300= Rs \hspace{1mm} 1700$

$Loss \% = \dfrac{Loss}{C.P.} \time 100 = \dfrac{1700}{17000} \times 100 \% = 10 \%$

More results on S.P. and C.P.:

1. If there is a profit of $r\%$ then,

$S.P. = C.P. + Profit = C.P. + r\% \hspace{1mm} of \hspace{1mm} C.P. = C.P. + \dfrac{r}{100} \hspace{1mm} of \hspace{1mm} C.P.$

$= (1 +\dfrac{r}{100}) of C.P. = \dfrac{(100 + r)}{100} \hspace{1mm} of \hspace{1mm} C.P.$

2. If there is a loss of $r\%$ then,

$S.P. = C.P. -Loss = C.P. - r\% \hspace{1mm} of \hspace{1mm} C.P. = C.P. - \dfrac{r}{100} \hspace{1mm} of \hspace{1mm} C.P.$

$= (1 -\dfrac{r}{100}) of C.P. = \dfrac{(100 - r)}{100} \hspace{1mm} of \hspace{1mm} C.P.$

From 1 and 2 , we derive that :

3. $C.P. = \dfrac{S.P. \times 100}{100 + r}$ , when there is a profit of $r\%$

4. $C.P. = \dfrac{S.P. \times 100}{100 - r}$ , when there is a loss of $r\%$

Type 2 : Find S.P. when C.P. and Profit (or loss) Percent Given

Example 1: A man bought a T.V. set for $Rs \: 3500$ and he sold it at a profit of $20\%$ . Find the selling price.

Solution: Let the cost price be $Rs \: 100$

Then, S.P. at a profit of $20\% = Rs \: 120$

When C.P. is $Rs \: 100$ S.P. is $Rs \: 120$

Then, When $C.P. =Rs \: 3500, S.P. = Rs \: (\dfrac{120}{100} \times 350) = Rs \: 4200$

Alternative Method:

$S.P. = \dfrac{ 100 + r}{100} \times C.P.$ where $r =20$ and $C.P. = Rs \: 3500$

$\therefore$ $= Rs \: (\dfrac{120}{100} \times 3500) = Rs \: 4200$

Example 2: A man buys a cycle for $Rs \: 350$ and sells it at a loss of $15\%$ . Find the selling price of the cycle.

Solution: Let the C.P. be $Rs \: 100$

Then, S.P. at a loss of $15\% = Rs \: 100- (15\% \hspace{1mm} of \hspace{1mm} Rs 100)=Rs \: (100-15)=Rs \: 85$

When $C.P.= Rs\: 100, S.P. = Rs \: 85$

Then, when $C.P. =Rs \: 350 , S.P. = Rs \: (\dfrac{85}{100} \times 350) = Rs \: 297.50$

Alternative Method:

$S.P.=\dfrac{100-r}{100} \times C.P.$ where $r=15\%$ loss and $C.P.= Rs \: 350$

$\therefore$ $S.P.=\dfrac{85}{100} \times 350=Rs \: 297.50$

Type 3 : Find Cost Price.

Example 1: Find the cost price of an article which is sold at a profit of $8\%$ for $Rs \: 2160$ .

Solution: $S.P.=Rs \: 2160$ , Profit % $= 8$

If $S.P.=Rs \: 108$ , then $C.P. = Rs \: 100$

If $S.P.=Re \: 1$ , then $C.P. = Rs \: \dfrac{100}{108}$

If $S.P.=Rs \: 2160$ , then $C.P.= Rs \: (\dfrac{100}{108} \times 2160) = Rs \: 2000$

Alternative Method:

$C.P. = \dfrac {S.P. \times 100}{100+r}$ where $r =8, S.P. =Rs \: 2160$

$\therefore$ $C.P.=\dfrac{Rs \: (2160 \times 100)}{108}=Rs \: 2000$

A few harder problems on profit and loss:

Example 1: By selling a plot of land for $Rs \: 45000$ a person loses $10\%$ . At what price should he sell it so as to gain $15\%$ ?

Solution: On selling the plot for $Rs \: 45000$ , he loses $10\%$

$\therefore$ $C.P.=S.P. \times \dfrac{100}{100-r}=Rs \: 45000 \times \dfrac{100}{90}= Rs \: 50,000$

He now wants a profit of of $15\%$

$\therefore$ $S.P. = \dfrac{100+r}{100 \times C.P.}= Rs \: (\dfrac{115}{100} \times 50000) = Rs 57,500.$

Example 2: A man sells two watches at $Rs \: 99$ each. On one he gains $10\%$ and on the other he loses $10\%$ . What is his gain or loss per cent on the whole transaction ?

Solution: S.P. of the first watch $=Rs \: 99$ , gain $=10\%$

C.P. of first watch $= \dfrac{S.P. \times 100}{100+r} = Rs \: 99 \times \dfrac{100}{110} = Rs \: 90$

Similarly, C.P. of the second watch on which he loses $10\% =\dfrac{S.P. \times 100}{100-r}=Rs. 99 \times \dfrac{100}{90}=Rs \: 110$

$\therefore$ total C.P. of the two watches $= Rs \: 110 + Rs \: 90 = Rs \: 200$

And total S.P. of the two watches $= Rs \: 99 + Rs \: 99 = Rs \: 198$

$\therefore$ net loss $= Rs 2$

$Loss \% = \dfrac{Loss}{C.P. \times 100}= \dfrac{2}{200 \times 100}= 1\%$

Discount

Marked Price: The price printed on an article or on a tag tied to it or the advertised price or the listed price is called the marked price , or, M.P. of the article.

Sometimes to dispose of the old , damaged or perishable goods the retailers offer these goods at reduced prices. The retailers also reduce prices to increase the sale by reducing the marked prices of the articles. The amount deducted from the original marked prices is called ‘Retailer’s discount’ or simply ‘retail discount’ which is generally expressed as per cent or a fraction of the marked or original price.

Net Price (Selling Price): The price of an article after deducting discount from the marked price is called the net price of the article.

NOTE: Discount is always calculated on the marked price.

In solving the problems on discount, the following formula are generally used:

1. $S.P. = M.P. - Discount$

2. $Discount\% = \dfrac{Discount}{M.P. \times 100}$

3. If discount is $d\%$ , then,

$S.P.= M.P. - Discount$

$= M.P. - d\% \hspace{1mm} of \hspace{1mm} M.P.$

$= M.P.-(\dfrac{d}{100} \times M.P.)$

$=(1-\dfrac{d}{100}) \times M.P.$

$= (\dfrac{100-d}{100}) \times M.P.$

Example 1: The marked price of a pair of shoes is $Rs \: 720$ . The shopkeeper allows an off season discount of $20\%$ on it. Calculate – i) the discount and ii) the selling price.

Solution: $M.P.= Rs \: 720$ and $rate \hspace{1mm} of \hspace{1mm} discount$ $= 20\%$

i) $Discount= 20\% \hspace{1mm} of \hspace{1mm} M.P. = Rs \: (\dfrac{20}{100} \times 720) = Rs \: 144$

ii) $S.P. = M.P. - Discount =Rs \: 720 -Rs \: 144 =Rs \: 576$

Example 2: The marked price of an article is marked $20\%$ above the C.P. and then it is sold at a discount of $15\%$ . What is the net gain per cent ?

Solution: Let the $C.P.$ of the article be $Rs 100$

$Marked Price = 20\%$ more than the $C.P. = C.P. + 20\% \hspace{1mm} of \hspace{1mm} C.P. = Rs \: 100 + Rs \: 20 = Rs \: 120$

$Discount = 15\% \hspace{1mm} of \hspace{1mm} M.P.=Rs \: (\dfrac{15}{100} \times 120) = Rs \: 18$

$S.P. = M.P. - Discount = Rs \: 120 - Rs \: 18 = Rs \: 102$

$Profit = S.P. - C.P. = Rs \: 102 - Rs \: 100 = Rs \: 2$

$Profit\% = \dfrac{Profit}{C.P.} \times 100 = \dfrac{2}{100} \times 100 = 2\%$

Exercise

A cloth merchant on selling $33 \hspace{1mm} metres$ of cloth obtains a profit equal to the selling price of $11 \hspace{1mm} metres$ of cloth. Find his profit per cent.
An article was sold at a loss of $4\%$ . Had it been sold for $Rs \hspace{1mm} 26$ more, there would have been a profit of $9\%$ . Find the cost price.
A shopkeeper allows $25\%$ off on the marked price of an article and still gets a profit of $20\%$ . What is the marked price of the article when it’s cost price is $Rs \hspace{1mm} 300$ ?
By selling $36$ bananas, a vendor loses the selling price of $4$ bananas. Find his loss per cent.
A tradesman allows a discount of $5\%$ on the marked price of goods. How much above the cost price must he mark his goods to make a profit of $14\%$ ?

Comments

gk questions says

January 20, 2018 at 12:40 am

Thank you for sharing such valuable info.

Roshni says

June 17, 2020 at 6:23 pm

Neither gain nor loss condition?

Jesse says

July 30, 2020 at 8:37 am

Nice enough

Anthony says

August 27, 2020 at 10:00 am

A farmer buys a cow a farmer for 40000 naira and sells it 33000 naira what is the percentage loss answered his question immediately now now now did you get what I’m saying and send it 2 this email that I am sending you now thanks for using your brain

Kamal says

December 21, 2020 at 1:48 am

A house is purchased for Rs. 50,00,000. After spending some amount for its maintenance it is sold for Rs 60,50,000 in order to make a profit of 10%, find the maintenance cost.

3 Major Type of Profit and Loss Problems

Type 1 : Find Profit or Loss Percent.

Type 2 : Find S.P. when C.P. and Profit (or loss) Percent Given

Type 3 : Find Cost Price.

Discount

Exercise

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