1. At what percent per annnum will Rs. 4000 amounts to 5234 Rs. in 3 years if the interest is compounded Annually?
a. 9%
b. 10%
c. 11%
d. 12%
Answer: b. 10%
Explanation:
Let \( P \) be the principal amount, \( A \) be the total amount, and \( n \) be the number of years.
According to the formula for Compound Interest:
\[ A = P \left(1 + \frac{r}{100}\right)^n \]
\[ \frac{3993}{3000} = \left(1 + \frac{r}{100}\right)^3 \]
\[ \frac{1331}{1000} = \left(1 + \frac{r}{100}\right)^3 \]
\[ \left(\frac{11}{10}\right)^3 = \left(1 + \frac{r}{100}\right)^3 \]
\[ \frac{11}{10} = 1 + \frac{r}{100} \]
\[ \frac{r}{100} = \frac{11}{10} – 1 = \frac{1}{10} \] Rate (r) = 10%
2. What will be the amount 25,000 Rs. will become after compound interest of 4% for 2 years ?
a. Rs. 27000
b. Rs. 27040
c. Rs. 28000
d. Rs. 28040
Answer : b. Rs. 27040
Explanation:
According to the question:
Formula used: \[ A = P \left(1 + \frac{r}{100}\right)^n \]
\[ A = 25000 \left(1 + \frac{4}{100}\right)^2 \]
\[ A = 25000 \left(\frac{104}{100}\right)^2 \]
\[ A = 25000 \left(\frac{104 \times 104}{100 \times 100}\right) \]
\[ A = \frac{250 \times 104 \times 104}{100} \]
\[ A = 2.5 \times 10816 \]
\[ A = 27040 \] Total Amount = 27,040
3. What would be the compound interest obtained on the amount of Rs. 12,000 at the rate of 10% per annum for 3 years ?
a. Rs. 3600
b. Rs. 3972
c. Rs 15,600
d. Rs. 15,927
Answer : b. Rs. 3972
Solution:
According to the question:
Formula used: \[ A = P \left(1 + \frac{r}{100}\right)^n \]
\[ A = 12000 \left(1 + \frac{10}{100}\right)^3 \]
\[ A = 12000 \left(\frac{110}{100}\right)^3 \]
\[ A = 12000 \times \frac{11 \times 11 \times 11}{10 \times 10 \times 10} \]
\[ A = 12 \times 1331 \]
\[ A = 15972 \]
4. The difference between Simple Interest and compound Interest on the 5000 Rs. in 2 years at 5% per Annum?
a. Rs. 7.5
b. Rs. 10
c. Rs. 12.5
d. Rs. 15
Answer : c. Rs. 12.5
Explanation:
Formula used for difference (D) between C.I. and S.I. for 2 years:
\[ \text{Difference} = P \left(\frac{R}{100}\right)^2 \]
Where \( P \) is the principal amount, \( R \) is the rate of interest, and \( n = 2 \) years.
Calculation:
\[ \text{Difference} = 5000 \left(\frac{5}{100}\right)^2 \]
\[ \text{Difference} = \frac{5000 \times 5 \times 5}{100 \times 100} \]
\[ \text{Difference} = \frac{5 \times 25}{10} = \frac{125}{10} \]
\[ \text{Difference} = 12.5 \]
The difference between C.I. and S.I. is 12.5.
5. In how many years Rs. 2000 will amount to 2420 Rs. at 10% per annum of compound Interest?
a. 1 years
b. 2 years
c. 2.5 years
d. 3 years
Answer : b. 2 years
Explanation:
Let \( n \) be the number of years.
Formula used: \[ A = P \left(1 + \frac{r}{100}\right)^n \]
Given: Amount (\( A \)) = 2420, Principal (\( P \)) = 2000, Rate (\( r \)) = 10%
\[ 2420 = 2000 \left(1 + \frac{10}{100}\right)^n \]
\[ \frac{2420}{2000} = \left(\frac{110}{100}\right)^n \]
\[ \frac{121}{100} = \left(\frac{11}{10}\right)^n \]
\[ \left(\frac{11}{10}\right)^2 = \left(\frac{11}{10}\right)^n \]
Comparing the powers: n = 2 years
6. A person deposited a sum of Rs. 6,000 in a bank at 5% per annum simple interest and on another bank he deposited Rs. 5000 at 8% per annum of compound interest. After two years the difference between simple and compound interest will be?
a. 132
b. 232
c. 265
d. 554
Answer : b. 232
Solution: 1. For Bank A (Simple Interest):
Principal (\( P_1 \)) = 6000, Rate (\( R_1 \)) = 5%, Time (\( T \)) = 2 years
\[ S.I. = \frac{6000 \times 5 \times 2}{100} = 600 \]
2. For Bank B (Compound Interest):
Principal (\( P_2 \)) = 5000, Rate (\( R_2 \)) = 8%, Time (\( n \)) = 2 years
Formula: \[ A = P \left(1 + \frac{r}{100}\right)^n \]
\[ A = 5000 \left(1 + \frac{8}{100}\right)^2 \]
\[ A = 5000 \left(\frac{108}{100}\right) \times \left(\frac{108}{100}\right) = 5832 \]
\[ C.I. = 5832 – 5000 = 832 \]
3. Final Difference:
Difference = \( C.I. – S.I. \)
\[ \text{Difference} = 832 – 600 = 232 \]
The difference between the interests is Rs. 232.
7. If a sum of money double itself in 10 years at compount interest, then in how many years it will become 16 times of itself at the same rate?
a. 20 years
b. 30 years
c. 40 years
d. 50 years
Answer : c. 40 years
Explanation: Short Trick Method:
If a sum of money becomes \( x \) times in \( T \) years, then it will become \( x^n \) times in \( n \times T \) years.
According to the question:
Money becomes 2 times (\( x = 2 \)) in 10 years (\( T = 10 \)).
To become 16 times, we can write 16 as \( 2^4 \) (where \( n = 4 \)).
Time required = \( n \times T \)
Time required = \( 4 \times 10 = 40 \) years.
The money will become 16 times in 40 years.
8. A certain amount of money at r% compounded annually after two and three years the amount becomes Rs. 1440 and Rs. 1728 respectively the r% is ?
a. 5 %
b. 10%
c. 15%
d. 20%
Answer : d. 20%
Solution:
Let \( P \) be the principal and \( r \) be the rate of interest.
Formula used: \[ A = P \left(1 + \frac{r}{100}\right)^n \]
According to the question:
\[ 1440 = P \left(1 + \frac{r}{100}\right)^2 \quad \text{—(eq 1)} \]
\[ 1728 = P \left(1 + \frac{r}{100}\right)^3 \quad \text{—(eq 2)} \]
9. At what rate per annum would a sum of Rs. 16000 becomes Rs. 18522 in 3 years at compound interest?
a. 5 %
b. 10%
c. 15%
d. 20%
Answer : a. 5 %
Explanation:
Let \( P \) be the principal, \( A \) be the amount, and \( r \) be the rate of interest.
Given: \( P = 16000 \), \( A = 18522 \), and \( n = 3 \) years.
Taking the cube root on both sides:
\[ \frac{21}{20} = 1 + \frac{r}{100} \]
\[ \frac{r}{100} = \frac{21}{20} – 1 \]
\[ \frac{r}{100} = \frac{1}{20} \]
\[ r = \frac{100}{20} = 5 \] Rate (r) = 5% per annum
10. A lends an amount of Rs 10,000 to B at 10% per annum compound interest for 4 years, compounded annually. What is the compound interest for the 3rd year?
a. Rs. 1111
b. Rs. 1221
c. Rs. 1331
d. Rs. 1441
Answer : c. Rs. 1331
Explanation:
To find the interest for the 4th year specifically, we find the difference between the Amount after 4 years and the Amount after 3 years.
3. Interest for the 4th year:
\[ \text{Interest} = A_4 – A_3 \]
\[ \text{Interest} = 14641 – 13310 = 1331 \]
The compound interest for the 4th year is 1,331.
11. A sum become Rs. 1352 in 2 years at 4 % per annum compounded annually? The sum is ?
a. Rs. 1125
b. Rs. 1345
c. Rs. 1250
d. Rs. 1111
Answer : c. Rs. 1250
Explanation:
Let \( P \) be the principal amount.
Given: Amount (\( A \)) = 1352, Rate (\( r \)) = 4%, Time (\( n \)) = 2 years.
Formula used: \[ A = P \left(1 + \frac{r}{100}\right)^n \]
\[ 1352 = P \left(1 + \frac{4}{100}\right)^2 \]
\[ 1352 = P \left(\frac{104}{100}\right)^2 \]
\[ 1352 = P \left(\frac{26}{25}\right)^2 \]
Solving for \( P \):
\[ P = 1352 \times \frac{25}{26} \times \frac{25}{26} \]
\[ P = 2 \times 25 \times 25 \]
\[ P = 1250 \]
The principal amount is Rs. 1,250.
12. In what time Rs. 1000 becomes Rs. 1331 at 10% per annum compounded annually?
a. 1 year
b. 2 years
c. 3 years
d. 4 years
Answer : c. 3 years
Explanation:
Let \( P \) be the principal, \( A \) be the amount, and \( n \) be the number of years.
Given: \( P = 1000 \), \( A = 1331 \), and \( r = 10\% \).
Since \( 1331 = 11^3 \) and \( 1000 = 10^3 \):
\[ \left(\frac{11}{10}\right)^3 = \left(\frac{11}{10}\right)^n \]
Comparing the powers on both sides: n = 3 years
13. In the difference between the simple and compound interest on a sum of money for 2 years at 4% per annum is Rs. 80. the sum is ?
a. Rs. 20,000
b. Rs. 30,000
c. Rs. 40,000
d. Rs. 50,000
Answer : d. Rs. 50,000
Explanation:
Let \( P \) be the principal amount and \( R \) be the rate of interest.
Given: Difference (\( CI – SI \)) = 80, Rate (\( R \)) = 4%, Time (\( n \)) = 2 years.
Formula used for 2 years: \[ CI – SI = P \left(\frac{R}{100}\right)^2 \]
\[ 80 = P \left(\frac{4}{100}\right)^2 \]
\[ 80 = P \left(\frac{1}{25}\right)^2 \]
Solving for \( P \):
\[ P = 80 \times 25 \times 25 \]
\[ P = 80 \times 625 \]
\[ P = 50000 \]
The principal amount is Rs. 50,000.
14. Arjun Investes Rs. 12,000 at 5% per annum for one year at compound interest? If the interest is compounded half yearly what will be the amount he will recieve at the end of one year?
a. Rs. 12,105.5
b. Rs. 12,600
c. Rs. 12,607.5
d. Rs. 12,907.5
Answer : d. Rs. 50,000
Explanation:
When interest is compounded half-yearly, the rate is halved and the time is doubled.
Given: \( P = 12000 \), \( r = 5\% \) per annum, \( n = 1 \) year.
New Rate (\( R \)) = \( \frac{5}{2} = 2.5\% \)
New Time (\( T \)) = \( 1 \times 2 = 2 \) half-years.
Formula used: \[ A = P \left(1 + \frac{r}{200}\right)^{2n} \]
\[ A = 12000 \left(1 + \frac{5}{200}\right)^2 \]
\[ A = 12000 \left(1 + \frac{1}{40}\right)^2 \]
\[ A = 12000 \left(\frac{41}{40}\right)^2 \]
\[ A = 12000 \times \frac{41 \times 41}{40 \times 40} \]
\[ A = 12000 \times \frac{1681}{1600} \]
\[ A = 7.5 \times 1681 \] Amount = 12607.5
15. A borrowed a sum of ₹6,000 from B at 10% rate of compound interest per annum, compounded annually. Find the total amount paid by A after 2 years ?
a. Rs. 6860
b. Rs. 7200
c. Rs. 7260
d. Rs. 8302
Answer : c. Rs. 7260
Solution:
Let \( P \) be the principal, \( r \) be the rate, and \( n \) be the time in years.
Given: \( P = 6000 \), \( r = 10\% \), \( n = 2 \).
Formula: \[ A = P \left(1 + \frac{r}{100}\right)^n \]
\[ A = 6000 \left(1 + \frac{10}{100}\right)^2 \]
\[ A = 6000 \left(\frac{11}{10}\right)^2 \]
\[ A = 6000 \times \frac{11 \times 11}{10 \times 10} \]
\[ A = 60 \times 121 \] Amount (A) = 7260
16. The principal amount which will reach to Rs. 270.40 in 2 years at the rate of 4% per annum of compound interest is?
a. Rs. 200
b. Rs. 225
c. Rs. 250
d. Rs. 275
Answer : c. Rs. 250
Explanation:
Let \( P \) be the principal amount.
Given: Amount (\( A \)) = 270.40, Rate (\( r \)) = 4%, Time (\( n \)) = 2 years.
Formula used: \[ A = P \left(1 + \frac{r}{100}\right)^n \]
\[ 270.40 = P \left(1 + \frac{4}{100}\right)^2 \]
\[ 270.40 = P \left(\frac{104}{100}\right)^2 \]
Solving for \( P \):
\[ P = 270.40 \times \frac{100}{104} \times \frac{100}{104} \]
\[ P = \frac{27040}{100} \times \frac{100}{104} \times \frac{100}{104} \]
\[ P = \frac{27040 \times 100}{104 \times 104} \]
\[ P = 250 \]
The principal amount is Rs. 250.
17. In how many years will the sum of Rs. 800 at 10% per annum compounded semi annually become Rs. 926.10 ?
a. 1.5 Years
b. 2 year
c. 3 year
d. 3.5 years
Answer: a. 1.5 Years
Explanation:
When interest is compounded half-yearly, the rate is halved and the time is doubled (\( 2n \)).
Given: Principal (\( P \)) = 800, Amount (\( A \)) = 926.1, Rate (\( r \)) = 10%.
Formula used: \[ A = P \left(1 + \frac{r}{200}\right)^{2n} \]
\[ 926.1 = 800 \left(1 + \frac{10}{200}\right)^{2n} \]
\[ \frac{926.1}{800} = \left(\frac{21}{20}\right)^{2n} \]
\[ \frac{9261}{8000} = \left(\frac{21}{20}\right)^{2n} \]
Recognizing the cubes (\( 21^3 = 9261 \) and \( 20^3 = 8000 \)):
\[ \left(\frac{21}{20}\right)^3 = \left(\frac{21}{20}\right)^{2n} \]
Comparing the exponents:
\[ 2n = 3 \]
\[ n = \frac{3}{2} = 1.5 \] Time = 1.5 years (or 1 year 6 months)
18. Find the difference between the Simple Interest and Compound Interest on Rs.10000 for 3 years at the rate of 3% per annum?
a. Rs. 25.27
b. Rs. 26.36
c. Rs. 27.27
d. Rs. 28.36
Answer: c. Rs. 27.27
Explanation:
: Simple interest at 10,000 for 3 years will be 900
Compound interest will be 927.27
Difference between both of them will be 927.27-900 = 27.27
19. A sum of money at compound interest becomes twice the principal amount in 3 years. In how many years will it become 64 times of its original amount ?
a. 12 years
b. 15 years
c. 18 years
d. 20 years
Answer: c. 18 years
Explanation: Short Trick Method:
If a sum of money becomes \( x \) times in \( T \) years, then it will become \( x^n \) times in \( n \times T \) years.
According to the question:
The money becomes 2 times (\( x = 2 \)) in 3 years (\( T = 3 \)).
To become 64 times, we can write 64 as \( 2^6 \) (where \( n = 6 \)).
Time required = \( n \times T \)
Time required = \( 6 \times 3 = 18 \) years.
The money will become 64 times in 18 years.
20. In what time the amount Rs. 64000 will become Rs. 68,921 at 5% per annum and the interest is being compounded half yearly?
a. 1 year
b. 1.5 year
c. 2 years
d. 3.5 years
Answer: b. 1.5 year
Explanation:
When interest is compounded half-yearly, the rate is halved and the time is doubled (\( 2n \)).
Given: Principal (\( P \)) = 64000, Amount (\( A \)) = 68921, Rate (\( r \)) = 5%.
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