Question 1

The difference between compound interest and simple interest on ₹8,000 at 12.5% per annum for 2 years is:

Accepted Answer

Step 1: Calculate Simple Interest: SI = (8000 × 12.5 × 2)/100 = ₹2,000. Step 2: Calculate Compound Interest: A = 8000(1 + 12.5/100)^2 = 8000(1.125)^2 = 8000 × 1.265625 = ₹10,125. CI = 10125 - 8000 = ₹2,125. Step 3: Difference = CI - SI = 2125 - 2000 = ₹125. Therefore, the difference is ₹125.

Question 2

The difference between compound interest and simple interest on a sum for 2 years at 5% per annum is ₹50. What is the principal?

Accepted Answer

Step 1: For 2 years, CI - SI = P × r^2 / 100^2 (standard formula for 2 years). Step 2: 50 = P × 5^2 / 10000 = P × 25 / 10000. Step 3: 50 = P/400. Step 4: P = 50 × 400 = ₹20,000.

Question 3

A principal amount doubles itself in 5 years at compound interest. In how many years will it become 8 times at the same rate?

Accepted Answer

Step 1: If principal doubles in 5 years, then A = 2P when n = 5. Step 2: Using A = P(1 + r/100)^n, we have 2P = P(1 + r/100)^5, so (1 + r/100)^5 = 2. Step 3: For amount to be 8P: 8P = P(1 + r/100)^n, so (1 + r/100)^n = 8 = 2^3. Step 4: Since (1 + r/100)^5 = 2, we have [(1 + r/100)^5]^3 = 2^3 = 8. Step 5: Therefore (1 + r/100)^15 = 8, so n = 15 years.

Question 4

₹5,000 becomes ₹6,050 in 2 years at compound interest. What is the rate of interest per annum?

Accepted Answer

Step 1: Use A = P(1 + r/100)^n. Step 2: 6050 = 5000(1 + r/100)^2. Step 3: (1 + r/100)^2 = 6050/5000 = 1.21. Step 4: 1 + r/100 = √1.21 = 1.1. Step 5: r/100 = 0.1, so r = 10% per annum.

Question 5

A sum of ₹8,000 is invested at 10% per annum compound interest. What will be the amount after 2 years?

Accepted Answer

Step 1: Use the compound interest formula A = P(1 + r/100)^n. Step 2: A = 8000(1 + 10/100)^2 = 8000(1.1)^2 = 8000 × 1.21 = ₹9,680. Therefore, the amount after 2 years is ₹9,680.

Question 6

A sum of money becomes ₹2,420 in 2 years and ₹2,662 in 3 years at compound interest. What is the principal amount?

Accepted Answer

Step 1: Let principal = P and rate = r% per annum. Step 2: After 2 years: P(1 + r/100)^2 = 2420. Step 3: After 3 years: P(1 + r/100)^3 = 2662. Step 4: Divide equation 3 by equation 2: [P(1 + r/100)^3] / [P(1 + r/100)^2] = 2662/2420. Step 5: (1 + r/100) = 2662/2420 = 1.1, so r = 10%. Step 6: Substitute back: P(1.1)^2 = 2420, so P × 1.21 = 2420, thus P = 2420/1.21 = ₹2,000.

Question 7

A principal amount doubles itself in 5 years at compound interest. In how many years will it become 8 times at the same rate of interest?

Accepted Answer

Step 1: If principal doubles in 5 years, then A = 2P, so (1 + r/100)^5 = 2. Step 2: We need to find n such that (1 + r/100)^n = 8. Step 3: Note that 8 = 2³, so (1 + r/100)^n = [(1 + r/100)^5]³ = 2³. Step 4: This means (1 + r/100)^n = (1 + r/100)^15, so n = 15 years. Therefore, the principal becomes 8 times in 15 years.

Question 8

A man invests ₹4,000 at 5% per annum compound interest for 2 years, and ₹6,000 at 10% per annum compound interest for 2 years. What is the total compound interest earned?

Accepted Answer

Step 1: For ₹4,000 at 5% for 2 years: A₁ = 4000(1.05)² = 4000 × 1.1025 = ₹4,410. CI₁ = 4410 - 4000 = ₹410. Step 2: For ₹6,000 at 10% for 2 years: A₂ = 6000(1.1)² = 6000 × 1.21 = ₹7,260. CI₂ = 7260 - 6000 = ₹1,260. Step 3: Total CI = 410 + 1260 = ₹1,670. Therefore, the total compound interest is ₹1,670.

Question 9

A sum becomes ₹2,420 after 2 years and ₹2,662 after 3 years at compound interest. What is the rate of interest per annum?

Accepted Answer

Step 1: The amount grows from ₹2,420 to ₹2,662 in 1 year (from year 2 to year 3). Step 2: Interest earned in the 3rd year = 2662 - 2420 = ₹242. Step 3: This interest is earned on the principal of ₹2,420 (the amount at the end of year 2). Step 4: Rate = (242 / 2420) × 100 = 10% per annum. Therefore, the rate is 10%.

Question 10

The difference between compound interest and simple interest on a sum for 2 years at 12% per annum is ₹144. What is the principal?

Accepted Answer

Step 1: For 2 years, CI - SI = P × r² / 10000 (standard formula for 2-year difference). Step 2: Substitute: 144 = P × 12² / 10000 = P × 144 / 10000. Step 3: Solve for P: P = 144 × 10000 / 144 = 10,000. Therefore, the principal is ₹10,000.

Question 11

A principal of ₹5,000 is invested at 20% per annum compound interest, compounded half-yearly. What is the amount after 1.5 years?

Accepted Answer

Step 1: When interest is compounded half-yearly, the rate per half-year = 20/2 = 10% and number of periods = 1.5 × 2 = 3. Step 2: Use A = P(1 + r/100)^n = 5000(1 + 10/100)^3 = 5000(1.1)^3. Step 3: Calculate (1.1)^3 = 1.331. Step 4: A = 5000 × 1.331 = ₹6,655. Therefore, the amount is ₹6,655.

Question 12

A sum of money becomes ₹9,680 after 2 years at 10% per annum compound interest. What was the principal amount?

Accepted Answer

Step 1: Use the compound interest formula A = P(1 + r/100)^n. Step 2: Substitute values: 9680 = P(1 + 10/100)^2 = P(1.1)^2 = P(1.21). Step 3: Solve for P: P = 9680 ÷ 1.21 = 8000. Therefore, the principal is ₹8,000.

Question 13

A sum of ₹5,000 is invested at 10% per annum compound interest. What will be the amount after 2 years?

Accepted Answer

Step 1: Use the compound interest formula A = P(1 + r/100)^n. Step 2: A = 5000(1 + 10/100)^2 = 5000(1.1)^2 = 5000 × 1.21 = ₹6,050. Therefore, the amount after 2 years is ₹6,050.

Question 14

At what rate per annum will ₹2,000 amount to ₹2,420 in 2 years at compound interest?

Accepted Answer

Step 1: Use A = P(1 + r/100)^n. Step 2: 2420 = 2000(1 + r/100)^2. Step 3: 2420/2000 = (1 + r/100)^2 → 1.21 = (1 + r/100)^2. Step 4: Taking square root: 1.1 = 1 + r/100 → r/100 = 0.1 → r = 10%. Therefore, the rate is 10% per annum.

Question 15

A principal becomes ₹1,331 in 3 years at 10% per annum compound interest. What is the principal?

Accepted Answer

Step 1: Use A = P(1 + r/100)^n. Step 2: 1331 = P(1 + 10/100)^3 = P(1.1)^3 = P × 1.331. Step 3: P = 1331/1.331 = ₹1,000. Therefore, the principal is ₹1,000.

Question 16

The compound interest on ₹4,000 at 5% per annum for 2 years is:

Accepted Answer

Step 1: Calculate amount using A = P(1 + r/100)^n = 4000(1 + 5/100)^2 = 4000(1.05)^2 = 4000 × 1.1025 = ₹4,410. Step 2: Compound Interest = A - P = 4410 - 4000 = ₹410. Therefore, the compound interest is ₹410.

Question 17

A sum of ₹10,000 is invested at 20% per annum compound interest, compounded annually. What will be the amount after 1.5 years?

Accepted Answer

Step 1: For 1.5 years, calculate for 1 full year and 6 months separately. Step 2: After 1 year: A₁ = 10000(1.2)^1 = ₹12,000. Step 3: For remaining 6 months (0.5 years) at simple interest on ₹12,000: SI = (12000 × 20 × 0.5)/100 = ₹1,200. Step 4: Total amount = 12000 + 1200 = ₹13,200. Therefore, the amount after 1.5 years is ₹13,200.

SSC GD Constable Compound Interest

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60-Second Revision — Compound Interest