An annuity is a financial arrangement involving regular, equal payments combined with compound interest. There are two main types:
| Type | Description | Recurrence relation |
|---|---|---|
| Investment annuity (savings) | Regular deposits + interest earned | \(V_{n+1} = R \cdot V_n + d\) |
| Annuity (pension/drawdown) | Regular withdrawals from invested funds | \(V_{n+1} = R \cdot V_n - d\) |
Where \(R = 1 + \frac{r}{100}\) and \(d\) = payment per period.
| Term | Definition |
|---|---|
| Future value (FV) | The value of the annuity at the end of \(n\) periods |
| Present value (PV) | The amount needed now to achieve a given future outcome |
If you invest \(d\) per period at interest rate \(r\%\) per period for \(n\) periods:
(In VCE, use technology/recurrence rather than memorising this formula.)
Problem: \$200 invested each month for 3 years at 6% p.a. compounded monthly. Find the future value.
Recurrence: \(V_{n+1} = 1.005 \times V_n + 200, \quad V_0 = 0\)
Using CAS/TVM solver: FV = \$7856.40 (approximately)
Problem: \$200,000 invested at 4.8% p.a. compounded monthly. Monthly withdrawal of \$1200.
Recurrence: \(V_{n+1} = 1.004 \times V_n - 1200, \quad V_0 = 200000\)
Use CAS to find when \(V_n \leq 0\).
A perpetuity is a special annuity where the balance never decreases — the interest earned exactly equals the withdrawal.
Rearranged: \$\(V_0 = \frac{d \times 100}{r} = \frac{d}{r/100}\)\$
Example: To maintain a \$500/month payment indefinitely at 3% p.a. monthly compounding:
Monthly rate = 0.25%
\(V_0 = \frac{500}{0.0025} = \$200,000\)
Present value answers: “How much do I need now to fund a given plan?”
Use TVM solver with \(FV = 0\) (loan fully paid) or solve the recurrence relation backwards.
KEY TAKEAWAY: An annuity combines compound interest with regular payments. A perpetuity is the special case where interest = withdrawal, keeping the balance constant forever.
EXAM TIP: For annuity problems, set up the recurrence relation first: identify \(R\), \(d\), and \(V_0\). Then use CAS to find the required quantity. Always state whether \(d\) is positive (deposit) or negative (withdrawal).
COMMON MISTAKE: Not converting the annual interest rate to the correct compounding period. Monthly compounding requires a monthly rate.
