Effective Annual Rate Calculator

How to Use This Calculator

1. Enter the nominal interest rate and select the compounding frequency to instantly see the EAR.
2. Use Compare Compounding to see EAR at all frequencies for the same nominal rate.
3. Use Continuous to find the theoretical maximum EAR.
4. The Professional tier adds fee-adjusted EAR, real rate after inflation, and equivalent nominal rate conversion.

Formula

Example

Frequently Asked Questions

• What is the difference between APR and EAR? ▼
  APR (Annual Percentage Rate) is the nominal rate before compounding effects. EAR (Effective Annual Rate) is the actual rate earned or paid after accounting for compounding within the year. For example, 6% APR compounded monthly = 6.168% EAR.
• Why does compounding frequency matter? ▼
  The more frequently interest compounds, the higher the effective rate. Daily compounding produces slightly more than monthly, which produces more than annual. For a 6% nominal rate: annual = 6.000%, monthly = 6.168%, daily = 6.183%.
• What is continuous compounding? ▼
  Continuous compounding is the theoretical limit of increasing compounding frequency to infinity. The EAR formula is e^r − 1. For a 6% nominal rate, continuously compounded EAR = 6.184%. It's used in options pricing and academic finance.
• When should I use EAR vs APR? ▼
  Use EAR when comparing products with different compounding frequencies — it gives an apples-to-apples comparison. APR is the legal disclosure standard in the US for loans. For savings accounts and CDs, look for APY (which equals EAR).
• How do fees affect EAR? ▼
  Fees increase the effective cost of borrowing. The Professional tier adds annual fees to the interest to show the true EAR including fees, which can be significantly higher than the stated APR for small loans with flat fees.

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