Answer:
It will take approximately 14.21 years before the investment is gone.
Step-by-step explanation:
This can be calculated using the formula for calculating the present value of an ordinary annuity as follows:
PV = P * ((1 - (1 / (1 + r))^n) / r) …………………………………. (1)
Where;
PV = Present value or investment value = $100,000
P = Annual withdrawal = $10,000
r = return rate = 5%, or 0.05
n = number of more years it will take before the investment is gone = ?
Substituting the values into equation (1) and solve for n, we have:
100,000 = 10,000 * ((1 - (1 / (1 + 0.05))^n) / 0.05)
100,000 / 10,000 = (1 - (1 / 1.05)^n) / 0.05
10 = (1 - (1 / 1.05)^n) / 0.05
10 * 0.05 = 1 - (1 / 1.05)^n
0.50 = 1 - (1 / 1.05)^n
(1 / 1.05)^n = 1 - 0.50
0.952380952380952^n = 0.50
Loglinearize both sides, we have:
n * log0.952380952380952 = log0.50
n = log0.50 / log0.952380952380952
n = -0.301029995663981 / -0.0211892990699382
n = 14.2066990828904
Approximating to 2 decimal places, we have:
n = 14.21
Therefore, it will take approximately 14.21 years before the investment is gone.