Between simple interest at 8% and compound interest at 9%, find the higher resulting balance after investing $500 for a period of 10 years. Round the answer to two decimal places.(1 point)

To find the higher resulting balance, we need to calculate the balance for both the simple interest and compound interest options.

For simple interest, the formula to calculate the balance after a period of time is:

Balance = Principal * (1 + (interest rate * time))

In this case, the principal is $500, the interest rate is 8% or 0.08, and the time is 10 years. Plug in these values into the formula:

Balance = $500 * (1 + (0.08 * 10))
Balance = $500 * (1 + 0.8)
Balance = $500 * 1.8
Balance = $900

Therefore, the balance after 10 years with simple interest is $900.

For compound interest, the formula to calculate the balance after a period of time is:

Balance = Principal * (1 + interest rate)^time

Using the same values, plug them into the formula:

Balance = $500 * (1 + 0.09)^10
Balance = $500 * (1.09)^10
Balance ≈ $500 * 1.94
Balance ≈ $970

Therefore, the balance after 10 years with compound interest is approximately $970.

Comparing the two balances, the higher resulting balance after investing $500 for a period of 10 years is $970.