Compound Interest
- Let Principal = P, Rate = R% per annum, Time = n years.
- When interest is compound Annually:
|
Amount = P |
|
1 + |
R |
|
n |
|
100 |
- When interest is compounded Half-yearly:
|
Amount = P |
|
1 + |
(R/2) |
|
2n |
|
100 |
- When interest is compounded Quarterly:
|
Amount = P |
|
1 + |
(R/4) |
|
4n |
|
100 |
- When interest is compounded Annually but time is in fraction, say 3
years.
|
Amount = P |
|
1 + |
R |
|
3 |
x |
|
1 + |
|
|
|
100 |
100 |
R
- When Rates are different for different years, say R1%, R2%, R3% for 1st, 2nd and 3rd year respectively.
|
Then, Amount = P |
|
1 + |
R1 |
|
|
1 + |
R2 |
|
|
1 + |
R3 |
|
. |
|
100 |
100 |
100 |
- Present worth of Rs. x due n years hence is given by:
|
Present Worth = |
x |
. |
|||
|
Questions:
Level-I:
|
1. |
A bank offers 5% compound interest calculated on half-yearly basis. A customer deposits Rs. 1600 each on 1stJanuary and 1st July of a year. At the end of the year, the amount he would have gained by way of interest is: |
|||||||
|
|
2. |
The difference between simple and compound interests compounded annually on a certain sum of money for 2 years at 4% per annum is Re. 1. The sum (in Rs.) is: |
|||||||
|
|
3. |
There is 60% increase in an amount in 6 years at simple interest. What will be the compound interest of Rs. 12,000 after 3 years at the same rate? |
|||||||||
|
|
4. |
What is the difference between the compound interests on Rs. 5000 for 1 |
|||||||
|
years at 4% per annum compounded yearly and half-yearly?
|
5. |
The compound interest on Rs. 30,000 at 7% per annum is Rs. 4347. The period (in years) is: |
||||||||||
|
|||||||||||
|
6. |
What will be the compound interest on a sum of Rs. 25,000 after 3 years at the rate of 12 p.c.p.a.? |
||||||||||
|
|
7. |
At what rate of compound interest per annum will a sum of Rs. 1200 become Rs. 1348.32 in 2 years? |
|||||||
|
|
8. |
The least number of complete years in which a sum of money put out at 20% compound interest will be more than doubled is: |
|||||||
|
|
9. |
Albert invested an amount of Rs. 8000 in a fixed deposit scheme for 2 years at compound interest rate 5 p.c.p.a. How much amount will Albert get on maturity of the fixed deposit? |
|||||||
|
|
10. |
The effective annual rate of interest corresponding to a nominal rate of 6% per annum payable half-yearly is: |
|||||||
|
||||||||
|
11. |
Level-II:
Simple interest on a certain sum of money for 3 years at 8% per annum is half the compound interest on Rs. 4000 for 2 years at 10% per annum. The sum placed on simple interest is: |
|||||||
|
|
12. |
If the simple interest on a sum of money for 2 years at 5% per annum is Rs. 50, what is the compound interest on the same at the same rate and for the same time? |
|||||||
|
|
13. |
The difference between simple interest and compound on Rs. 1200 for one year at 10% per annum reckoned half-yearly is: |
|||||||||
|
|
14. |
The difference between compound interest and simple interest on an amount of Rs. 15,000 for 2 years is Rs. 96. What is the rate of interest per annum? |
|||||||||
|
|
15. |
The compound interest on a certain sum for 2 years at 10% per annum is Rs. 525. The simple interest on the same sum for double the time at half the rate percent per annum is: |
|||||||||
|
||||||||||
|
16. |
|
|||||||||
|
||||||||||
|
17. |
|
|||||||||
|
||||||||||
|
18. |
|
|||||||||
|
||||||||||
Answers:
Level-I:
Answer:1 Option B
Explanation:
|
Amount |
|
||||||||||||||||
|
|
|
||||||||||||||||
|
|
|
||||||||||||||||
|
|
|
||||||||||||||||
|
|
= Rs. 3321. |
- C.I. = Rs. (3321 – 3200) = Rs. 121
Answer:2 Option A
Explanation:
Let the sum be Rs. x. Then,
|
C.I. = |
|
x |
|
1 + |
4 |
|
2 |
– x |
|
= |
|
676 |
x |
– x |
|
= |
51 |
x. |
|
100 |
625 |
625 |
|
S.I. = |
|
x x 4 x 2 |
|
= |
2x |
. |
|
100 |
25 |
|
|
51x |
– |
2x |
= 1 |
|
625 |
25 |
- x = 625.
Answer:3 Option C
Explanation:
Let P = Rs. 100. Then, S.I. Rs. 60 and T = 6 years.
|
|
|
100 x 60 |
|
= 10% p.a. |
|
100 x 6 |
R =
Now, P = Rs. 12000. T = 3 years and R = 10% p.a.
|
|
|
|||||||||||||
|
|
|
|||||||||||||
|
|
= 3972. |
C.I.
Answer:4 Option A
Explanation:
|
C.I. when interest |
|
|||||||||||||||
|
|
|
|||||||||||||||
|
|
= Rs. 5304. |
x 4
|
C.I. when interest is |
|
||||||||||||
|
|
|
||||||||||||
|
|
= Rs. 5306.04 |
Difference = Rs. (5306.04 – 5304) = Rs. 2.04
Answer:5 Option A
Explanation:
Amount = Rs. (30000 + 4347) = Rs. 34347.
Let the time be n years.
|
Then, 30000 |
|
1 + |
7 |
|
n |
= 34347 |
|
100 |
|
|
|
107 |
|
n |
= |
34347 |
= |
11449 |
= |
|
107 |
|
2 |
|
100 |
30000 |
10000 |
100 |
n = 2 years.
Answer:6 Option C
Explanation:
|
Amount |
|
||||||||||||
|
|
|
||||||||||||
|
|
= Rs. 35123.20 |
C.I. = Rs. (35123.20 – 25000) = Rs. 10123.20
Answer:7 Option A
Explanation:
Let the rate be R% p.a.
|
Then, 1200 x |
|
1 + |
R |
|
2 |
= 1348.32 |
|
100 |
|
|
|
1 + |
R |
|
2 |
= |
134832 |
= |
11236 |
|
100 |
120000 |
10000 |
|
|
|
1 + |
R |
|
2 |
= |
|
106 |
|
2 |
|
100 |
100 |
|
|
R |
= |
106 |
|
100 |
100 |
1 +
R = 6%
Answer:8 Option B
Explanation:
|
P |
|
1 + |
20 |
|
n |
> 2P |
|
|
6 |
|
n |
> 2. |
|
100 |
5 |
|
Now, |
|
6 |
x |
6 |
x |
6 |
x |
6 |
|
> 2. |
|
5 |
5 |
5 |
5 |
So, n = 4 years.
Answer:9 Option C
Explanation:
|
Amount |
|
||||||||||
|
|
|
||||||||||
|
|
= Rs. 8820. |
Answer:10 Option D
Explanation:
|
Amount of Rs. 100 for 1 year |
|
= Rs. |
|
100 x |
|
1 + |
3 |
|
2 |
|
= Rs. 106.09 |
|
100 |
Effective rate = (106.09 – 100)% = 6.09%
Answer:11 Option C
Explanation:
|
C.I. |
|
|||||||||||
|
|
|
|||||||||||
|
|
= Rs. 840. |
|
|
|
420 x 100 |
|
= Rs. 1750. |
|
3 x 8 |
Sum = Rs.
Answer:12 Option A
Explanation:
|
Sum = Rs. |
|
50 x 100 |
|
= Rs. 500. |
|
2 x 5 |
|
Amount |
|
||||||||||
|
|
|
||||||||||
|
|
= Rs. 551.25 |
- C.I. = Rs. (551.25 – 500) = Rs. 51.25
Difference = Rs. (123 – 120) = Rs. 3.
15000
15000
R
R = 8.
Rate = 8%.
P =
Sum = Rs . 2500.
C.I. =
Correct answer is (D).
Correct answer is (C).
Difference between C.I. and S.I. may be obtained.