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You want to have $2.5 million in real dollars in an account when you retire in 40 years. The nominal return on your investment is 10.3 percent and the inflation rate is 3.7 percent.

What real amount must you deposit each year to achieve your goal?


Sagot :

To find out the real amount you need to deposit annually in order to have [tex]$2.5 million in real dollars in 40 years given a nominal return rate of 10.3% and an inflation rate of 3.7%, follow these steps: ### Step 1: Calculate the Real Return Rate The real return rate can be found using the formula for the real interest rate, which accounts for inflation: \[ \text{Real Return} = \left( \frac{1 + \text{Nominal Return}}{1 + \text{Inflation Rate}} \right) - 1 \] Given: - Nominal Return = 10.3% (0.103) - Inflation Rate = 3.7% (0.037) So, the real return rate is: \[ \text{Real Return} = \left( \frac{1 + 0.103}{1 + 0.037} \right) - 1 = 0.06364513018322082 \] ### Step 2: Use the Future Value of an Annuity Formula You need to determine the annual deposit (P) using the future value of an annuity formula: \[ FV = P \times \left( \frac{(1 + r)^n - 1}{r} \right) \] Where: - FV (Future Value) = $[/tex]2.5 million
- r (Real Return) = 0.06364513018322082
- n (Number of Years) = 40

Rearrange this formula to solve for P (annual deposit):
[tex]\[ P = \frac{FV \times r}{(1 + r)^n - 1} \][/tex]

### Step 3: Substitute the Given Values
Now plug in the values:
[tex]\[ P = \frac{2,500,000 \times 0.06364513018322082}{(1 + 0.06364513018322082)^{40} - 1} \][/tex]

### Step 4: Calculate the Annual Deposit
After substituting and calculating, the result for the annual deposit is:
[tex]\[ P = 14,733.105101594416 \][/tex]

### Conclusion
To achieve your goal of having [tex]$2.5 million in real dollars in an account in 40 years with a nominal return of 10.3% and an inflation rate of 3.7%, you must deposit approximately \$[/tex]14,733.11 each year.