# Partnership Questions, Tips and Tricks for MPSC CSAT Exam, Download PDF

By BYJU'S Exam Prep

Updated on: September 25th, 2023

We are discussing the basics of Partnership Problems and types of questions asked in previous year exams, and how to approach them. This will help you in clearing your basics and solving these partnership questions. Almost in all the bank exams, the candidates will face Partnership Problems so it’s better to clear the concept to solve them without wasting the time.

This topic is important for MPSC Rajyaseva, MPSC Combined, Maharashtra Police Bharti, Maharashtra Arogya Bharti, MPSC CDPO and other Maharashtra State exams.

Download BYJU’S Exam Prep App and prepare General Knowledge for Maharashtra State exams.

## Partnership Notes & Questions

When two or more people invest their money in a business, persons are called Partners, their relationship is Partnership and money is Capital.

• If they invest money for the same time, it is called a Simple partnership.
• If they invest money for a different time, it is called a Compound partnership.

### Partnership Problems

Profit is directly proportional to Time and Investments.

Profit ∝ Time  Profit ∝ Investments
Profit ∝ (Time × Investments)

### Example 1:

Three partners A, B, and C invest Rs.1500, Rs.1200, and Rs.1800 respectively in a company. How should they divide a profit of Rs.900?

Solution: Given, there is no time given, we can say profit is proportional to investment.
Ratio of profit = ratio of investment
Profit ratio  of A:B:C = 1500:1200:1800 =5:4:6
so, total profit is 5+4+6 = 15 i.e. equal to 900
profit of A = (5/15)× 900 = 300
profit of B = (4/15)× 900 = 240
profit of C = (6/15)× 900 = 360

### Example 2:

In a company, A invested Rs.1500 for 4 months and B invested Rs.1200 for 6 months and C invested Rs.3600 for 2 months. If a company has a profit of Rs.680. What will be the share of A, B, and C?

Solution:
Ratio of profit A:B:C = (1500 × 4):(1200 × 6):(3600 × 2)
= 60:72:72
= 5:6:6
total profit is 5+6+6 = 17 i.e. equal to 680.
we can say, 17 = 680
1 = 40
profit of A is 5, so 5× 40 = 200
profit of B is 6, so 6× 40 = 240
profit of C is 6, so 6 × 40 = 240
Note: Read questions carefully. If we can calculate capital invested and the time for which capital is invested. We can easily calculate shares in profit.

### Example 3:

A and B enter into a partnership with Rs.50000 and Rs.75000 respectively in a company for a year. After 7 months, C gets into a partnership with them with Rs.30000 and A withdraws his contribution after 9 months. How would they share their profit of Rs.2600 at the end of the year?

Solution: A, B, and C do business for 1 year but, A contributed Rs.50000 for 9 months, B contributed 75000 for 12 months and C invested Rs.30000 for 5 months, not for 7 months.
So the ratio of profit  A:B:C = 50×9: 75×12: 30×5
= 15 : 30 : 5
Hence total profit is (15+30+5) = 50 which is equal to 2600
So share of A = (15/50)× 2600 = 780
share of B = (30/50)× 2600 = 1560
share of C = (5/50) × 2600 = 260

### Example 4:

A, B and C started a company in which A invested (1/3)rd of the capital for (1/4)th of the time, B invested (1/2)nd of the capital for (1/6)th of the time and C invested the remaining capital for the whole of the time. If the profit at the end of the year is Rs.1200. How would they share it?

Solution:  A invested (1/3)rd of the capital and B invested (1/2)nd of the capital
So, remaining capital invested by C = 1-((1/3)+(1/2)) = 1/6
The ratio of profit A: B:C = (1/3)× (1/4): (1/2)× (1/6): (1/6)× 1
=  (1/12):(1/12):(1/6)
= 1 : 1 : 2
A’s share = (1/4)× 1200 = 300
B’s share = (1/4)× 1200 = 300
C’s share = (1/2)× 1200 = 600

### Example 5:

A and B rent a field for 11 months. A puts 100 bags for 9 months. How many bags can be put by B for 3 months if the ratio of their rent is 2:3?

Solution: Let B puts X bags.
the ratio of rent of A: B is 2: 3
so, (100×9) : (X × 3 ) = 2 : 3
X = 450 bags

### Example 6:

If A and B entered into a partnership and invested their capital in the ratio of 19:15. At the end of 19 months, B withdraws his capital. If they share profit in the ratio of 3:2, then for how many months A invested his ratio?

Solution: Let A invested for X months.
Ratio of profit A : B = X × 19 : 19 × 15
So, 19X : 19×15 = 3:2
X = 22(1/2) months

### Example 7:

Sandeep, Vineet and Shekhar are three partners. Sandeep receives 1/5 of the profit and Vineet and Shekhar share the remaining profit equally. If Vineet’s income is increased by Rs.650 when the profit rises from 10% to 15%. Find the capitals invested by Sandeep, Vineet and Shekhar and total capital invested.

Solution: As given, the profit share of Sandeep is 1/5, remaining profit (1-1/5) = 4/5 is shared between Vineet and Shekar equally.
So, the profit share of Vineet = 2/5 and profit share of Shekhar = 2/5
when profit % increases, Vineet’s income increase by Rs.650
(15%-10%) = 5% = 650
100% = 13000
So, Vineet’s capital = 13000
i.e (2/5) of total capital = 13000
total capital = 32500
and Shekhar’s capital = 13000
Sandeep’s capital i.e (1/5) of total capital or ½ of (Vineet or Shekhar’s Capital) = 6500

### Example 8:

A and B are partners in a business. They invest in the ratio 5: 6, at the end of 8 months B withdraws. If they receive profits at the end of the year in the ratio of 5: 9, find how long A’s investment was used? (SBI PO Pre 2016 Memory based)

Solution:  Let A’s investment used for X months.
Given, the ratio of invest (A: B) = 5: 6
ratio of time =  X : 8
the ratio of profit = 5X: 6×8 and given ratio of profit = 5: 9
so 5X/48 = 5/9
X = 48/9
X = 16/3 months

### Example 9:

A, B, and C started a business with their investments in the ratio 1: 2: 4. After 6 months A invested the half amount more as before and B invested the same amount as before while C withdrew (1/4)th of his investment after the 9 months. Find the ratio of their profits at the end of the year. (SBI Clerk Mains)

Solution: Ratio of investments A:B:C = 1:2:4, there are no changes in the investment of A and B up to 6 months and in the investment of C up to 9 months.
At the end of 6 months, A invested half the amount more as before so A’s investment = 1 +(1/2)
Similarly B invest the same amount more as before = 2 + 2 = 4
But, C withdraw the (1/4)th of the amount after 9 months = 4 – 1 = 3
ratio of profit = (1×6 + (3/2)× 6) : (2× 6 + 4× 6) : (4× 9+3× 3)
= 15 : 36 : 45
= 5 : 12 : 15

### Example 10:

A sum of money is divided amongst P, Q and R in the ratio of 3: 4: 5. Another amount is divided amongst A and B in the respective ratio of 2: 1. If B got Rs. 1050 less than Q, what is the amount received by R?

Solution: Let the sum of money divided amongst P, Q and R is 3x, 4x and 5x respectively and the sum of money divided amongst A and B is 2y and y respectively.
4x – y = 1050
another relation between x and y cannot be established. So, it cannot be determined.

Directions (12-15): In the following table, the investments and profit of three persons is given for different years in a joint business.

 Investments (In Rs.) Profit (In Rs.) Year A B C A B C 2010 15000 —– 23000 —– 82500 115000 2011 —– 6000 —- —- 15000 17500 2012 —– —— 18000 42000 27000 24000 2013 —– 17000 10000 —- —– 14000 2014 11000 20000 —- —- —- —-

Note:
1. Except for the year 2012, they invested the amounts for the same period.
2. Some values are missing. You have to calculate these values per given data.

### Example 11:

If the total profit in 2011 is 45000, then find the ratio of the investment of B in 2010 to the investment of A in 2011.

Solution: profit of A in 2011 is 45000-(15000+17500) = 12500
B makes the profit of 15000 by investing 6000
So, investment of A in 2011 = (6000/15000)× 12500 = 5000
In 2010, 23000 investment of C makes the profit of Rs.115000
So, investment of B = (23000/115000)× 82500 = 16500
required ratio of (B:A) is 16500:5000 = 33:10

### Example 12:

If the total investment in 2014 is 46000, then the ratio of profit in 2014 is?

Solution: investment of C is 46000 – (20000+11000) = 15000
The time period is the same, so the ratio of profit will be also the same as the ratio of investment = 11:20:15

### Example 13:

In the year 2012 total investment of A and B is 30000, A and B invested their amount for 4 months and 6 months respectively then find the number of months that C invested his amount?

Solution:  ratio of profit (A:B) = 42000: 27000
A× 4 : B× 6 = 42000 : 27000
A : B = 21 : 9 = 7 : 3
So, investment of A is 21000 and investment of B is 9000.
let C invest 18000 for X months.
So, (18000× X) : (21000 × 4) = 24000 : 42000
X = (8/3) months, Hence C invested for 8/3 months.

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