Find the compound interest on rs. 8000 at 20% per annum for 1 years 6 months, compounded annually.

P = Rs 8, 000T = 9 months = 3 quartersR = 20 % per annum = 5 % per quarter\[A = 8, 000 \left( 1 + \frac{5}{100} \right)^3 \]\[ = 8, 000 \left( 1 . 05 \right)^3 \] = 9, 261The required amount is Rs 9, 261.Now, CI = A - P= Rs 9, 261 - Rs 8, 000

= Rs 1, 261

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The power of compounding grows your savings faster

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The sooner you start to save, the more you'll earn with compound interest.

Compound interest is the interest you get on:

• the money you initially deposited, called the principal
• the interest you've already earned

For example, if you have a savings account, you'll earn interest on your initial savings and on the interest you've already earned. You get interest on your interest.

This is different to simple interest. Simple interest is paid only on the principal at the end of the period. A term deposit usually earns simple interest.

Save more with compound interest

The power of compounding helps you to save more money. The longer you save, the more interest you earn. So start as soon as you can and save regularly. You'll earn a lot more than if you try to catch up later.

For example, if you put $10,000 into a savings account with 3% interest compounded monthly:

• After five years, you'd have $11,616. You'd earn $1,616 in interest.
• After 10 years you'd have $13,494. You'd earn $3,494 in interest.
• After 20 years you'd have $18,208. You'd earn $8,208 in interest.

Compound interest formula

To calculate compound interest, use the formula:

A = P x (1 + r)n

A = ending balanceP = starting balance (or principal)r = interest rate per period as a decimal (for example, 2% becomes 0.02)

n = the number of time periods

How to calculate compound interest

To calculate how much $2,000 will earn over two years at an interest rate of 5% per year, compounded monthly:

1. Divide the annual interest rate of 5% by 12 (as interest compounds monthly) = 0.0042

2. Calculate the number of time periods (n) in months you'll be earning interest for (2 years x 12 months per year) = 24

3. Use the compound interest formula

A = $2,000 x (1+ 0.0042)24A = $2,000 x 1.106

A = $2,211.64

Lorenzo and Sophia compare the compounding effect

Lorenzo and Sophia both decide to invest $10,000 at a 5% interest rate for five years. Sophia earns interest monthly, and Lorenzo earns interest at the end of the five-year term.

After five years:

• Sophia has $12,834.
• Lorenzo has $12,500.

Sophia and Lorenzo both started with the same amount. But Sophia gets $334 more interest than Lorenzo because of the compounding effect. Because Sophia is paid interest each month, the following month she earns interest on interest.

Find the compound interest on Rs. 8000 for 9 months at 20% per annum compounded quarterly.

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[∵ Simple interest = P×T×R×100 Amount after first quarter = Rs. 8000 + Rs. 400 = Rs. 8400 Or principal for the second year = Rs. 8400

∴ Interest for the second quarter

∴ Interest for the third quarter

What is the compound interest on ₹ 8000 at 20% per annum for 9 months compounded quarterly?

At what rate percent per annum compound interest will 8000 amount to 8820 in 6 months the interest being compounded quarterly?

What will be the compound interest on Rs 8000 at 16% per annum for 6 months when interest is compounded quarterly?

How do you calculate CI for 6 months?