Answer:
To determine whether Kristina's decision to invest her money in the bank with a 3.25% interest rate compounded annually is better than continuous compounding over 5 years, we need to calculate the future value under both scenarios.
First, let's calculate the future value with annual compounding.
The formula to calculate the future value (A) with annual compounding is:
A = P * (1 + r/n)^(n*t)
Where:
A = the future value including interest
P = the principal amount (initial deposit)
r = the interest rate (in decimal form)
n = the number of compounding periods per year
t = the number of years
In this case, Kristina's investment has an interest rate (r) of 3.25% (or 0.0325 in decimal form), and since the interest is calculated termly, there are 4 compounding periods per year (n = 4). The number of years (t) is 5.
Calculating the future value with annual compounding:
A = P * (1 + r/n)^(n*t)
= P * (1 + 0.0325/4)^(4 * 5)
= P * (1 + 0.008125)^20
Now, let's calculate the future value with continuous compounding, which we can use the formula mentioned in the previous answer:
A = P * e^(rt)
Calculating the future value with continuous compounding:
A = P * e^(rt)
= P * e^(0.0325 * 5)
To compare the two scenarios, we need to calculate the future value for both of them. Let's assume the principal amount (P) is $1 for simplicity.
Future value with annual compounding:
A = P * (1 + 0.008125)^20
Future value with continuous compounding:
A = P * e^(0.0325 * 5)
Calculating the future value with annual compounding:
A = 1 * (1 + 0.008125)^20
≈ 1.166363
Calculating the future value with continuous compounding:
A = 1 * e^(0.0325 * 5)
≈ 1.167972
After rounding to two decimal places, the future value of Kristina's investment with continuous compounding is approximately $1.17, while with annual compounding it's approximately $1.17 as well.
Therefore, both scenarios yield almost the same amount of money after 5 years, with a slight advantage to continuous compounding. Hence, Kristina was not entirely correct.