Future Value of Annuity Calculator

Q: What is the FVA formula?

For an ordinary annuity (payments at end of period): FVA = PMT × [(1+r)^n − 1] / r. For an annuity-due (payments at beginning of period): FVA = PMT × [(1+r)^n − 1] / r × (1+r). Here PMT is the payment per period, r is the interest rate per period, and n is the total number of periods. For monthly payments at 6%/year: r = 0.06/12 = 0.005.

Q: How is FVA different from compound interest?

Compound interest (future value of a lump sum) applies a growth rate to a single initial deposit: FV = PV × (1+r)^n. The future value of an annuity applies growth to a series of payments - each payment compounds for a different number of periods (the first payment compounds the longest, the last payment doesn't compound at all for an ordinary annuity). The FVA formula sums all these individual future values.

Find the future accumulated value of any series of equal periodic payments.

📈 What is Future Value of an Annuity?

The future value of an annuity (FVA) is the total accumulated value of a series of equal periodic payments, grown at a constant interest rate over a specified number of periods. It answers the essential savings question: "If I invest $500 every month at 7% per year for 20 years, how much will I accumulate?" The answer accounts for both the total amount deposited and the compound interest earned on each deposit over the time it remains invested.

FVA is distinct from simple compound interest (future value of a lump sum) because each payment earns interest for a different number of periods. The first payment earns interest for all n periods; the last payment earns interest for just one period (in an ordinary annuity) or zero periods. The FVA formula mathematically sums all these individual compounded payments into a single formula.

This calculation underpins retirement planning, savings goals, 401k projections, and SIP (systematic investment plan) calculations. Understanding FVA helps you determine whether you're on track for a savings goal, how much to increase contributions to hit a target by a certain date, and how dramatically higher interest rates or extended time horizons amplify the final result.

📐 Future Value of Annuity Formula

FVA (ordinary) = PMT × [(1+r)ⁿ − 1] / r

FVA (annuity-due) = PMT × [(1+r)ⁿ − 1] / r × (1+r)

PMT = Payment per period

r = Interest rate per period (annual rate / periods per year)

n = Total periods (years × periods per year)

FVA = Future value (total accumulated amount)

For monthly payments at 7% annual rate over 20 years: r = 7/12/100 = 0.005833; n = 240. FVA = PMT × [(1.005833)²⁴⁰ − 1] / 0.005833. The annuity-due version multiplies the result by (1+r) = 1.005833, reflecting one extra compounding period for each payment since they occur at the beginning rather than the end of each period.

📖 How to Use This Calculator

Steps

Enter the periodic payment - the equal amount you contribute each period (monthly contribution to a 401k, annual IRA contribution, etc.).

Enter the annual interest rate - use the expected portfolio return, savings rate, or annuity crediting rate.

Set years and frequency - select monthly, quarterly, semi-annual, or annual. The calculator adjusts the rate and period count automatically.

Click Calculate to see the future value, total amount paid, and interest earned.

💡 Example Calculations

Example 1 - Monthly $500 at 7% for 20 Years

PMT = $500/month | Rate = 7% | 20 years | Ordinary Annuity

r = 7/12/100 = 0.005833; n = 240 periods

FVA = $500 × [(1.005833)²⁴⁰ − 1] / 0.005833 = $500 × 521.4 = $260,700

Total paid = $500 × 240 = $120,000 | Interest earned = $140,700

Try this example →

Example 2 - Annual $6,000 IRA at 8% for 30 Years

PMT = $6,000/year | Rate = 8% | 30 years | Ordinary Annuity

r = 8% = 0.08; n = 30 periods

FVA = $6,000 × [(1.08)³⁰ − 1] / 0.08 = $679,685 | Total paid = $180,000

Try this example →

❓ Frequently Asked Questions

What is the future value of an annuity?+

The future value of an annuity (FVA) is the total accumulated value of a series of equal periodic payments, grown at a constant interest rate. It answers: "If I invest $X per month at Y% for Z years, how much will I have?" FVA accounts for both payments made and compound interest earned on each payment over its remaining time invested.

What is the FVA formula?+

For an ordinary annuity: FVA = PMT × [(1+r)^n − 1] / r. For an annuity-due: FVA = PMT × [(1+r)^n − 1] / r × (1+r). PMT is the payment per period, r is the interest rate per period, and n is the total number of periods. For monthly payments at 6%/year: r = 0.06/12 = 0.005.

How is FVA different from compound interest?+

Compound interest (FV of a lump sum) applies growth to a single deposit: FV = PV × (1+r)^n. FVA applies growth to a series of payments - each payment compounds for a different number of periods. The FVA formula sums all these individual compounded values. The key difference is that FVA involves recurring payments while compound interest involves a single deposit.

What payment frequency should I use?+

Match the frequency to your actual payment schedule. For monthly savings (401k contributions), use monthly: divide the annual rate by 12 and multiply years by 12. For annual IRA contributions, use annual. For bi-weekly payroll, use 26 periods/year. More frequent compounding slightly increases the future value.