How much interest will I pay on a loan?

For a fixed-rate amortising loan, total interest = (monthly payment × number of months) − principal. Monthly payment = P × r_m × (1 + r_m)^n / ((1 + r_m)^n − 1), where r_m is the monthly rate and n is the total number of months. For example, a $20,000 loan at 8% over 5 years has a monthly payment of $405.53 and total interest of $4,331.80.

How does compounding frequency affect interest?

More frequent compounding means interest is added to the principal more often, so subsequent interest is calculated on a larger amount. For a 5% annual rate on $10,000 for one year: annually gives $500; monthly gives $511.62; daily gives $512.67. The difference grows with time and rate. For savings, prefer more frequent compounding; for loans, less frequent is cheaper.

What is the Rule of 72?

The Rule of 72 is a quick way to estimate how long it takes to double your money. Divide 72 by the annual interest rate. At 6% per year, money doubles in 72 ÷ 6 = 12 years. At 9%, it doubles in 8 years. This rule works reasonably well for rates between 2% and 20% and is based on the mathematics of compound growth.

Interest Calculator

Q: How do I calculate compound interest?

Compound interest is calculated using A = P(1 + r/n)^(nt), where P is the principal, r is the annual interest rate as a decimal, n is the number of compounding periods per year, and t is the time in years. The interest earned is A minus the original principal. More frequent compounding (daily vs annually) produces slightly more interest for the same stated rate.

How much interest will you earn — or pay? Calculate compound savings growth, loan interest costs, and compare rates side by side.

Currency

All amounts displayed in selected currency

Deposit / starting balance

Initial lump sum you are saving or investing

Annual interest rate

Annual rate as a percentage (e.g. 4.5 for 4.5%)

Term (years)

How long you will save

Term unit

Compounding frequency

More frequent compounding = slightly more interest

Monthly contribution (optional)

Regular amount added each month (0 = lump sum only)

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Estimates only. Results are before tax. Consult a financial adviser for personalised guidance.

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How to Use This Calculator

Tab "Earn Interest"

Enter your deposit amount, annual rate, term, and choose a compounding frequency. Add an optional monthly contribution to model regular saving. The result shows total interest earned, final balance, and a bar chart of growth over time.

Tab "Pay Interest"

Enter the loan amount, annual rate, and term. The calculator shows total interest paid, monthly payment, and effective cost as a percentage of the loan — the true price of borrowing.

Tab "Compare"

Enter a principal and term, then set three different rates. The side-by-side table shows interest earned and final balance for each scenario — useful for comparing savings accounts, bonds, or investment options.

The Formulas

Simple interest:
I = P × r × t
where P = principal, r = annual rate (decimal), t = time (years)

Compound interest:
A = P × (1 + r/n)^(n × t)
Interest = A − P
where n = compounding periods per year

With regular contributions:
A = P(1 + r/n)^(nt) + PMT × [((1 + r/n)^(nt) − 1) / (r/n)]
where PMT = monthly contribution × 12/n

Loan monthly payment (amortisation):
PMT = P × r_m × (1 + r_m)^n / ((1 + r_m)^n − 1)
where r_m = annual rate / 12, n = total months

Total loan interest:
Total interest = (PMT × n) − P

All calculations use standard financial mathematics. No country-specific tax rates are applied. Results are pre-tax estimates.

Worked Examples

Example 1 — Savings: $5,000 at 4.5% for 3 years (monthly compounding)

A saver deposits $5,000 in a high-yield account at 4.5% annual rate, compounding monthly (n = 12).

Principal (P)$5,000.00

Rate (r)4.5% = 0.045

Term (t)3 years

Compounding (n)12 ×/year

Final balance A$5,718.79

Interest earned$718.79

Calculation: A = 5000 × (1 + 0.045/12)^(12×3) = 5000 × (1.00375)^36 = $5,718.79. The extra $718.79 is pure compound growth — no contributions required.

Example 2 — Loan: $20,000 at 8% for 5 years

A borrower takes a $20,000 personal loan at 8% annual rate, repaid over 60 months.

Loan amount (P)$20,000.00

Annual rate8%

Term5 years (60 months)

Monthly payment$405.53

Total paid$24,331.80

Total interest$4,331.80

The monthly payment is ~$405.53. Over 60 months, total interest is $4,331.80 — equivalent to 21.7% of the original loan amount as the true cost of borrowing.

Example 3 — Compare: 3.5% vs 5.0% vs 7.0% on $10,000 over 10 years

Comparing three savings or investment accounts with different annual rates, monthly compounding.

Rate	Interest earned	Final balance
3.5%	$4,179.79	$14,179.79
5.0%	$6,470.09	$16,470.09
7.0% ★	$10,070.43	$20,070.43

An extra 3.5 percentage points of rate (3.5% to 7%) more than doubles the interest earned over 10 years — from $4,180 to $10,070. This is the power of compounding: small rate differences compound into large outcome differences over time.

Understanding Interest: Key Concepts

Simple vs Compound Interest

Simple interest is calculated only on the original principal. If you deposit $1,000 at 5% for 3 years, you earn $150 total (3 × $50). It's linear — the same amount each year. Simple interest is common in short-term deposits and some bonds.

Compound interest earns interest on both the principal and previously accumulated interest. The same $1,000 at 5% compounded annually grows to $1,157.63 over 3 years — $7.63 more than simple, and the gap widens dramatically over longer periods. Albert Einstein reportedly called compound interest "the eighth wonder of the world."

Compounding Frequency

The more often interest is compounded, the more you earn (or pay). For a 6% annual rate on $10,000 for one year:

Frequency	Periods/year	Balance after 1 year	Interest
Annually	1	$10,600.00	$600.00
Quarterly	4	$10,613.64	$613.64
Monthly	12	$10,616.78	$616.78
Daily	365	$10,618.31	$618.31

The difference within a year is modest, but over decades it becomes meaningful. For savings, choose accounts that compound daily or monthly. For loans, a monthly-compounding loan costs slightly more than an annually-compounding one at the same stated rate.

The Rule of 72

A fast mental shortcut: divide 72 by the annual interest rate to estimate how many years it takes to double your money. At 6%, money doubles in 72 ÷ 6 = 12 years. At 9%, in 8 years. At 3%, in 24 years. This rule assumes annual compounding and works best for rates between 2% and 20%.

Effective Annual Rate (EAR)

The nominal rate is the stated rate (e.g. 6%). The effective annual rate accounts for compounding and represents the true yearly return: EAR = (1 + r/n)^n − 1. A 6% nominal rate compounded monthly gives an EAR of 6.168%. When comparing savings accounts with different compounding frequencies, always compare EAR — not the nominal rate.

Loan Amortisation

Most consumer loans (mortgages, auto loans, personal loans) use an amortising structure: fixed monthly payments where early payments are mostly interest, and later payments are mostly principal. This is why overpaying in the early years saves disproportionately more interest — you reduce the principal faster, shrinking the interest base for all future payments.

Frequently Asked Questions

How do I calculate compound interest?▼

Use the formula A = P(1 + r/n)^(nt), where P is principal, r is the annual rate as a decimal, n is compounding periods per year, and t is years. Interest earned = A − P. For example: $5,000 at 4.5% monthly compounding for 3 years gives A = 5000 × (1.00375)^36 = $5,718.79, so interest = $718.79.

What is the difference between simple and compound interest?▼

Simple interest is calculated only on the original principal each period. Compound interest is calculated on principal plus accumulated interest, so each period's base grows. Over time compound interest produces significantly more — on $10,000 at 5% over 20 years, simple interest gives $10,000 extra while compound (annual) gives $16,533.

How much interest will I pay on a $20,000 loan at 8% for 5 years?▼

Monthly payment = $405.53. Over 60 months total paid = $24,331.80, so total interest = $4,331.80. This is 21.7% of the loan amount. The "Pay Interest" tab of this calculator gives the exact figures for any amount, rate, and term you enter.

How does compounding frequency affect how much I earn?▼

More frequent compounding means interest is added to the principal sooner, so subsequent interest is calculated on a slightly larger base. For a 6% rate on $10,000: annual compounding gives $600 after one year; monthly gives $616.78; daily gives $618.31. The effect is small year-to-year but compounds significantly over decades.

Does this calculator account for taxes on interest?▼

No — this is a universal pre-tax calculator. Interest earned on savings is typically taxable income in most countries, and the tax rate varies by country, account type, and individual circumstances. Use the "Calculate for your country" links below for country-specific tax calculators, or consult a tax adviser in your jurisdiction.

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