Interest Rate Calculator

Convert nominal APR to effective annual APY yields. Generate an equivalent rate matrix across daily, weekly, monthly, and continuous compounding.

Effective Annual Percentage Yield (APY)

4.5940%

Equivalent to Nominal APR: 4.5% compounded monthly

Simulated Principal$10,000

1-Year Earnings$459

Maturity Balance$10,459

Interest Rate Details

Stated Interest Rate (%)

Interest Rate Type

Nominal APREffective APY

Stated Compounding Frequency

Simulation Principal ($)

Compounding Information

APR vs. APYAPR (Annual Percentage Rate) represents the simple interest over a year. APY (Annual Percentage Yield) represents the true rate of return or cost because it accounts for compound interest. The higher the compounding frequency, the higher the APY relative to its APR.

Equivalent Interest Rate Matrix

Compounding Frequency	Equivalent Nominal APR	Periodic Interest Rate	Effective APY Yield	1-Year Earnings on $10,000
Annual (1/Year)	4.5940%	4.5940%	4.5940%	$459
Semi-Annual (2/Year)	4.5424%	2.2712%	4.5940%	$459
Quarterly (4/Year)	4.5169%	1.1292%	4.5940%	$459
Monthly (12/Year)	4.5000%	0.3750%	4.5940%	$459
Semi-Monthly (24/Year)	4.4958%	0.1873%	4.5940%	$459
Bi-Weekly (26/Year)	4.4955%	0.1729%	4.5940%	$459
Weekly (52/Year)	4.4935%	0.0864%	4.5940%	$459
Daily (365/Year)	4.4919%	0.0123%	4.5940%	$459
Continuous Compounding	4.4916%	4.4916%	4.5940%	$459

How Interest Rates are Compounded

When banks or financial institutions advertise interest rates, they often present the nominal Annual Percentage Rate (APR). However, because interest compounds periodically, the actual annual yield you pay or receive is higher.

The Compounding Mathematical Formulas

To convert a nominal interest rate (APR) to the effective rate (APY), we use the following equation:

APY = (1 + APR / m)^m - 1

Where m is the compounding frequency (e.g. 12 for monthly, 365 for daily). To convert back from APY to APR, we rearrange:

APR = m · [(1 + APY)^(1/m) - 1]

Comparing Equivalent Nominals

If an investment pays 6% APR compounded monthly, what is the equivalent rate if it compounded daily? By standardizing to the same target APY, our calculator computes the exact equivalent nominal rate for each compounding frequency, making it easy to compare CD offers, bond yields, and mortgage options side-by-side.

Frequently Asked Questions About Interest Rates

What is the difference between APR and APY?

APR (Annual Percentage Rate) does not account for compounding interest within the year; it is simply the periodic interest rate multiplied by the number of periods in a year. APY (Annual Percentage Yield) is the actual return rate reflecting compounding interest over a full year.

How does compounding frequency impact APY?

The more frequently interest is compounded, the higher the APY. For example, a 5.0% APR compounded daily yields a 5.13% APY, whereas the same 5.0% APR compounded monthly yields a 5.12% APY.

What is continuous compounding?

Continuous compounding is the mathematical limit of compounding interest as the compounding frequency becomes infinitely large. Its equation employs the mathematical constant 'e': APY = e^r - 1.

Can this convert between APR and APY?

Yes. Convert nominal APR to effective APY under variable compounding frequencies.

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