Question

To subtract 4.5% from 320,000.00 repeatedly, you first need to calculate 4.5% of the number and then subtract it from the current total.

1. Calculate 4.5% of 320,000.00:
\[
0.045 \times 320,000.00 = 14,400.00
\]

2. Subtract that from the original number:
\[
320,000.00 - 14,400.00 = 305,600.00
\]

3. Repeat the process with the new number, 305,600.00:
\[
0.045 \times 305,600.00 = 13,752.00
\]
\[
305,600.00 - 13,752.00 = 291,848.00
\]

4. Continue with 291,848.00:
\[
0.045 \times 291,848.00 = 13,136.16
\]
\[
291,848.00 - 13,136.16 = 278,711.84
\]

5. Next, with 278,711.84:
\[
0.045 \times 278,711.84 = 12,541.03
\]
\[
278,711.84 - 12,541.03 = 266,170.81
\]

6. Then with 266,170.81:
\[
0.045 \times 266,170.81 = 11,973.68
\]
\[
266,170.81 - 11,973.68 = 254,197.13
\]

7. Next, with 254,197.13:
\[
0.045 \times 254,197.13 = 11,439.87
\]
\[
254,197.13 - 11,439.87 = 242,757.26
\]

8. Continue with 242,757.26:
\[
0.045 \times 242,757.26 = 10,944.57
\]
\[
242,757.26 - 10,944.57 = 231,812.69
\]

9. For 231,812.69:
\[
0.045 \times 231,812.69 = 10,566.57
\]
\[
231,812.69 - 10,566.57 = 221,246.12
\]

10. Continue with 221,246.12:
\[
0.045 \times 221,246.12 = 9,949.08
\]
\[
221,246.12 - 9,949.08 = 211,297.04
\]

You can keep repeating this process as needed. The values calculated show how the number approaches zero with each subtraction of 4.5%. Would you like me to continue this process, or do you have a specific number of iterations in mind?