Compound Interest Calculator (2026) – CI Formula, Examples & Year-wise Table

🕐 Updated: April 2026 🔒 Free & Instant 📈 Daily / Monthly / Quarterly / Annual Compounding
📈 Supports All Compounding Frequencies – Daily to Annual
Compound Interest Calculator
Select Compounding Frequency
Principal Amount ₹1,00,000
Annual Interest Rate 10%
Time Period (Years) 5 Years
Maturity Amount (A)
₹1,63,862
Principal (P)₹1,00,000
Compound Interest Earned₹63,862
Simple Interest (same period)₹50,000
Extra Earned over SI₹13,862
Compounding FrequencyQuarterly (4x/yr)
Effective Annual Rate10.38%
Maturity Amount₹1,63,862
💡 Compounding earns you ₹13,862 extra compared to simple interest over 5 years.
Principal vs Compound Interest
Principal
Interest
Year-wise Compound Interest Growth Table

See how your principal grows each year through compounding. Notice how the interest earned increases each year — that is the power of compound interest.

YearOpening BalanceInterest EarnedClosing BalanceTotal CI EarnedSI (same period)

What is Compound Interest & How to Use This Calculator

Compound Interest (CI) is interest calculated not just on the original principal but also on all previously accumulated interest. In simple terms — your interest earns interest. This creates an exponential growth effect that becomes dramatically more powerful over longer time periods. Albert Einstein is often credited with calling compound interest the “eighth wonder of the world,” though the quote is disputed, the math behind it is undeniable.

The key difference between simple interest and compound interest is that in simple interest, only the original principal earns interest throughout the tenure. In compound interest, the interest earned each period is added to the principal, and the next period’s interest is calculated on this larger balance. Over long periods, this snowball effect creates significantly more wealth than simple interest.

How to Use This Calculator

  • Compounding Frequency: Select how often interest is compounded — Daily (365x), Monthly (12x), Quarterly (4x), Half-Yearly (2x), or Annually (1x). More frequent compounding = more interest earned.
  • Principal Amount: The initial amount you are investing or borrowing. Enter between ₹1,000 and ₹1 crore.
  • Annual Interest Rate: The nominal annual interest rate (% p.a.). Most Indian bank FDs offer 6.5%–8.5% p.a. for quarterly compounding.
  • Time Period: Duration of investment or loan in years. The longer the period, the more dramatic the compounding effect.
  • Click Calculate CI: Get maturity amount, total interest earned, comparison with simple interest, effective annual rate, and a complete year-wise growth table.

Compound Interest Formula Explained with Examples

The compound interest formula is the cornerstone of finance — it is used to calculate returns on fixed deposits, recurring deposits, PPF, NSC, and the growth of any investment where interest is reinvested.

Standard Compound Interest Formula

A = P × (1 + r/n)^(n × t)

A = Maturity Amount (Principal + Interest)
P = Principal (original amount)
r = Annual interest rate in decimal (e.g. 10% = 0.10)
n = Number of times interest is compounded per year
t = Time in years

Compound Interest (CI) = A – P

Example 1: ₹1,00,000 at 10% p.a., Quarterly compounding, 5 years
A = 1,00,000 × (1 + 0.10/4)^(4×5) = 1,00,000 × (1.025)^20 = ₹1,63,862
CI = ₹1,63,862 – ₹1,00,000 = ₹63,862

Monthly Compounding Formula

A = P × (1 + r/12)^(12 × t)

Example 2: ₹1,00,000 at 12% p.a., Monthly compounding, 3 years
A = 1,00,000 × (1 + 0.12/12)^(12×3) = 1,00,000 × (1.01)^36
A = 1,00,000 × 1.43077 = ₹1,43,077
CI = ₹43,077  |  SI (same period) = ₹36,000

Effective Annual Rate (EAR)

The Effective Annual Rate shows the actual yearly return when compounding is more frequent than annual. It helps compare investments with different compounding frequencies on an equal basis.

EAR = (1 + r/n)^n – 1

Example: 10% p.a. with quarterly compounding
EAR = (1 + 0.10/4)^4 – 1 = (1.025)^4 – 1 = 0.1038 = 10.38%

This means 10% quarterly compounding gives the same result as 10.38% annual simple interest.
💡 Key insight: When a bank advertises “10% p.a. with quarterly compounding,” the effective annual yield is actually 10.38% — not 10%. This is why comparing nominal rates across different compounding frequencies is misleading. Always compare using EAR (Effective Annual Rate) for an apples-to-apples comparison.

Impact of Compounding Frequency on Returns

All else being equal, more frequent compounding gives higher returns. The difference increases significantly over longer periods and higher interest rates. Here is a concrete comparison of how compounding frequency affects the same investment.

₹1,00,000 at 10% p.a. for 5 Years – Different Frequencies

Compounding Frequencyn (times/year)Maturity AmountInterest EarnedEffective Annual Rate
Annual1₹1,61,051₹61,05110.00%
Half-Yearly2₹1,62,889₹62,88910.25%
Quarterly4₹1,63,862₹63,86210.38%
Monthly12₹1,64,531₹64,53110.47%
Daily365₹1,64,861₹64,86110.52%

₹1,00,000 at 10% p.a. for 20 Years – Frequency Impact Magnified

CompoundingMaturity AmountTotal Interestvs Annual
Annual₹6,72,750₹5,72,750
Half-Yearly₹6,85,064₹5,85,064+₹12,314
Quarterly₹6,91,861₹5,91,861+₹19,111
Monthly₹6,96,769₹5,96,769+₹24,019
Daily₹7,38,906₹6,38,906+₹66,156

*All calculations at 10% p.a. nominal rate. Over 20 years, daily compounding earns ₹66,156 more than annual compounding — purely due to higher compounding frequency, same rate.

💬 Why do Indian banks use quarterly compounding? The Reserve Bank of India (RBI) and Indian Banks Association (IBA) guidelines specify that interest on Fixed Deposits must be compounded at least quarterly. This is why most bank FDs in India quote rates with quarterly compounding. Post Office schemes like NSC use annual compounding, while PPF uses annual compounding but with a different calculation method based on monthly balances.

Compound Interest Ready Reference Tables

Use these tables to quickly check the maturity amount for common principal amounts at different interest rates and time periods, without using the calculator.

Quarterly Compounding – Maturity Amount for ₹1 Lakh Principal

Rate (p.a.)1 Year2 Years3 Years5 Years10 Years15 Years
6%₹1,06,136₹1,12,649₹1,19,562₹1,34,686₹1,81,402₹2,44,322
7%₹1,07,186₹1,14,888₹1,23,144₹1,41,478₹2,00,160₹2,83,182
7.5%₹1,07,714₹1,16,015₹1,24,929₹1,44,995₹2,10,232₹3,04,800
8%₹1,08,243₹1,17,166₹1,26,824₹1,48,594₹2,20,804₹3,28,103
9%₹1,09,308₹1,19,486₹1,30,696₹1,56,308₹2,44,322₹3,82,234
10%₹1,10,381₹1,21,840₹1,34,489₹1,63,862₹2,68,506₹4,39,980
12%₹1,12,551₹1,26,677₹1,42,576₹1,80,611₹3,26,204₹5,89,160

Compound Interest on Different Principal Amounts at 8% p.a. (Quarterly) – 5 Years

PrincipalMaturity AmountInterest EarnedSI (same period)Extra via CI
₹10,000₹14,859₹4,859₹4,000₹859
₹25,000₹37,149₹12,149₹10,000₹2,149
₹50,000₹74,297₹24,297₹20,000₹4,297
₹1,00,000₹1,48,594₹48,594₹40,000₹8,594
₹5,00,000₹7,42,970₹2,42,970₹2,00,000₹42,970
₹10,00,000₹14,85,940₹4,85,940₹4,00,000₹85,940

Simple Interest vs Compound Interest – Complete Comparison

Understanding the difference between simple and compound interest is fundamental to making good financial decisions — whether you are investing, taking a loan, or evaluating a financial product.

Formula Comparison

FeatureSimple Interest (SI)Compound Interest (CI)
FormulaSI = P × r × tA = P × (1 + r/n)^(n×t)
Interest BasisAlways on original principal onlyOn principal + accumulated interest
Growth PatternLinear (straight line)Exponential (curve, accelerates over time)
Short-term (1–2 years)Very similar to CISlightly higher than SI
Long-term (10+ years)Much lower returnsSignificantly higher returns
Where UsedVehicle loans (flat rate), some personal loansFD, RD, PPF, NSC, home loans (reducing balance)

Numerical Comparison: ₹1,00,000 at 10% p.a.

YearsSimple Interest (SI)Compound Interest (CI Annual)CI QuarterlyAdvantage of CI over SI
1₹1,10,000₹1,10,000₹1,10,381₹381
3₹1,30,000₹1,33,100₹1,34,489₹4,489
5₹1,50,000₹1,61,051₹1,63,862₹13,862
10₹2,00,000₹2,59,374₹2,68,506₹68,506
20₹3,00,000₹6,72,750₹6,91,861₹3,91,861
30₹4,00,000₹17,44,940₹18,11,362₹14,11,362
💥 The 30-year lesson: ₹1 lakh at 10% p.a. for 30 years gives ₹4 lakhs in simple interest but ₹17.45 lakhs in annual compound interest — more than 4 times the SI amount. Quarterly compounding gives ₹18.11 lakhs. This is why starting to invest early with compound interest instruments (FD, PPF, mutual funds) is the most powerful financial decision a young person can make.

When is Simple Interest Used in India?

Simple interest is relatively rare in formal banking and finance. It appears in: (1) Flat rate vehicle loans from some dealers — these appear to have a lower rate but the effective reducing balance rate is nearly double; (2) Pawn shop loans and informal lending; (3) Some short-term corporate loans. Always check whether a loan uses flat rate or reducing balance — the difference can be enormous. A 5% flat rate vehicle loan has an effective reducing balance cost of approximately 9%–10% p.a.

Rule of 72 – How Fast Does Your Money Double?

The Rule of 72 is a simple mental math shortcut that tells you approximately how many years it takes to double your money at a given compound interest rate. Divide 72 by the annual interest rate to get the approximate doubling time.

Years to Double = 72 ÷ Annual Interest Rate (%)

Examples:
At 6% p.a.: Money doubles in 72 ÷ 6 = 12 years
At 8% p.a.: Money doubles in 72 ÷ 8 = 9 years
At 9% p.a.: Money doubles in 72 ÷ 9 = 8 years
At 12% p.a.: Money doubles in 72 ÷ 12 = 6 years
At 15% p.a.: Money doubles in 72 ÷ 15 = 4.8 years
At 18% p.a.: Money doubles in 72 ÷ 18 = 4 years

Doubling Time for Common Indian Investments

InvestmentTypical RateYears to Double (Rule of 72)Actual Years
Post Office RD (5 yr)6.70% p.a.~10.7 years~10.9 years
PPF7.10% p.a.~10.1 years~10.2 years
Bank FD (SBI)7.25% p.a.~9.9 years~9.9 years
Bank FD (Small Finance Bank)8.50% p.a.~8.5 years~8.5 years
Nifty 50 Index Fund (hist.)~12% p.a. (CAGR)~6 years~6 years
Mid-cap Equity Fund (hist.)~15% p.a. (CAGR)~4.8 years~4.9 years

*Investment returns are historical estimates. Equity returns are market-linked and not guaranteed. FD/PPF/RD rates are current as of April 2026 and subject to change.

💡 Reverse Rule of 72 — Inflation’s impact: The Rule of 72 also tells you how fast inflation halves the purchasing power of your money. At 6% inflation, your money’s purchasing power halves in 72 ÷ 6 = 12 years. This means ₹1 lakh today will buy the same goods as ₹50,000 does in 12 years. This is why keeping all savings in low-return instruments (savings account at 3%) is actually losing money in real terms.

Which Indian Investments Use Compound Interest?

Understanding how compounding works in different Indian investment instruments helps you make smarter choices. Here is a complete breakdown:

1. Fixed Deposits (FD) – Quarterly Compounding

Bank FDs in India compound interest quarterly. The interest is calculated every quarter and added to the principal for the next quarter’s calculation. This is why the effective yield is slightly higher than the stated rate. For example, SBI’s 7.25% p.a. FD has an effective annual yield of approximately 7.45% when compounded quarterly. Senior citizens typically get 0.25%–0.50% extra on FD rates.

2. PPF (Public Provident Fund) – Annual Compounding

PPF compounds annually at the rate declared by the Government (currently 7.10% p.a. for FY 2026). However, the interest is calculated monthly on the lowest balance between the 5th and last day of each month, but credited annually. This means deposits made before the 5th of each month earn interest for that month. The 15-year lock-in with tax-free returns makes PPF one of India’s best long-term compounding instruments for conservative investors.

3. NSC (National Savings Certificate) – Annual Compounding

NSC compounds annually at 7.70% p.a. (current rate). Over the 5-year tenure, the compounding works on all 5 years of accumulated interest. NSC interest is eligible for Section 80C deduction in Years 1–4 (since it is reinvested and compounded), making the effective post-tax return significantly higher for taxpayers in higher brackets.

4. EPF (Employees Provident Fund) – Monthly Compounding in Practice

EPF interest is declared annually (currently 8.25% for FY 2025-26) but calculated monthly on the running balance. The annual declared interest is therefore an effective annual rate, not a nominal rate. EPF’s combination of employer contribution, tax deduction, and tax-free maturity makes the effective compounding return significantly higher than the stated rate for most salaried employees.

5. Mutual Funds – Daily NAV Compounding

Equity and debt mutual funds effectively compound daily through NAV (Net Asset Value) changes. Unlike bank FDs with a fixed rate, mutual fund returns are market-linked. However, staying invested long-term in equity funds harnesses the power of compounding through business growth — the same mathematical mechanism. A systematic investment through SIP combines rupee cost averaging with the compounding of returns.

6. Savings Account Interest – Quarterly Credited

Most banks credit savings account interest quarterly (at 2.7%–4% p.a. for major banks, up to 7% for some small finance banks). While the rate is low, the interest compounds quarterly. For large balances, even this small compounding effect adds up. Sweep-in FDs linked to savings accounts automatically move excess balances into higher-yielding FDs, effectively getting you better compounding on idle funds.

7. Home Loans – Compound Interest on Reducing Balance

Home loans use compound interest calculated on the reducing monthly balance. Each month, interest is charged only on the outstanding principal — as you repay principal, the interest amount in future EMIs decreases. This is technically compound interest working in the lender’s favour. Understanding this helps you realise why part-prepayment in the early years of a home loan saves dramatically more interest than in later years.

💬 Key takeaway for Indian investors: The best compounding outcomes come from combining three factors — a reasonable interest rate (equity funds historically at 12%+), a long time horizon (15–30 years), and regular contributions (SIP). A 9% FD and a 12% equity SIP look similar over 3 years but produce dramatically different outcomes over 20 years due to the exponential nature of compounding.

Frequently Asked Questions – Compound Interest

The compound interest formula is A = P × (1 + r/n)^(n×t), where A is the maturity amount, P is the principal, r is the annual interest rate as a decimal (e.g. 10% = 0.10), n is the number of compounding periods per year (1 for annual, 4 for quarterly, 12 for monthly, 365 for daily), and t is the time in years. Compound Interest = A – P. The calculator above applies this formula automatically for all compounding frequencies.
Simple Interest (SI) = P × r × t — interest is always calculated on the original principal only. Compound Interest (CI) adds interest to the principal each period, so future interest is calculated on a growing base. For ₹1 lakh at 10% for 10 years: SI = ₹1,00,000 (total amount ₹2 lakhs). CI with annual compounding = ₹1,59,374 (total ₹2,59,374). Compound interest earns ₹59,374 more than simple interest over the same period and rate — purely due to interest-on-interest.
Higher compounding frequency = higher maturity amount for the same nominal rate and tenure. For ₹1 lakh at 10% for 5 years: Annual compounding gives ₹1,61,051; Quarterly gives ₹1,63,862; Monthly gives ₹1,64,531; Daily gives ₹1,64,861. The difference grows significantly over longer periods. Most Indian bank FDs use quarterly compounding. This is why the Effective Annual Rate (EAR) is a better metric than the nominal rate for comparing products with different compounding frequencies.
The Rule of 72 estimates how many years it takes to double your money: Doubling Time = 72 ÷ Annual Interest Rate. At 8%: 9 years. At 9%: 8 years. At 12%: 6 years. At 15%: 4.8 years. The rule works best for rates between 6% and 15%. You can also use it in reverse to understand inflation’s impact — at 6% inflation, purchasing power halves in 12 years. This is a powerful mental model for evaluating long-term financial decisions quickly.
Investments with quarterly compounding in India include: all major bank Fixed Deposits (SBI, HDFC, ICICI, Axis, Kotak etc.), Post Office Time Deposits (1, 2, 3, 5-year), and Recurring Deposits. PPF and NSC use annual compounding. Savings accounts pay quarterly credited interest (though the rate is lower). All these instruments compound at least quarterly as per RBI guidelines, which means the effective annual yield is higher than the stated nominal rate.
For a bank FD with quarterly compounding, use: A = P × (1 + r/4)^(4×t). Example: ₹5,00,000 FD at 7.5% p.a. for 3 years with quarterly compounding: A = 5,00,000 × (1 + 0.075/4)^(4×3) = 5,00,000 × (1.01875)^12 = 5,00,000 × 1.24964 = ₹6,24,820. Interest earned = ₹1,24,820. Use the calculator above for any combination of principal, rate, and tenure.