When investing money that is compounded annually, which option will earn the most interest?

To determine which option will earn the most interest, we need to calculate the compounded amount for each option and compare the final amounts.

Option A:
Principal amount = $1
Interest rate = 8.00% per annum
Number of years = 7

Compound amount = Principal amount * (1 + interest rate/100)^number of years
= $1 * (1 + 8.00%/100)^7
= $1 * (1 + 0.08)^7
= $1 * (1.08)^7
≈ $1.7182

Option B:
Principal amount = $1
Interest rate = 6.00% per annum
Number of years = 9

Compound amount = Principal amount * (1 + interest rate/100)^number of years
= $1 * (1 + 6.00%/100)^9
= $1 * (1 + 0.06)^9
= $1 * (1.06)^9
≈ $1.7125

Option C:
Principal amount = $1
Interest rate = 7.00% per annum
Number of years = 8

Compound amount = Principal amount * (1 + interest rate/100)^number of years
= $1 * (1 + 7.00%/100)^8
= $1 * (1 + 0.07)^8
= $1 * (1.07)^8
≈ $1.7187

Option D:
Principal amount = $1
Interest rate = 9.00% per annum
Number of years = 6

Compound amount = Principal amount * (1 + interest rate/100)^number of years
= $1 * (1 + 9.00%/100)^6
= $1 * (1 + 0.09)^6
= $1 * (1.09)^6
≈ $1.6334

Comparing the compound amounts, it can be observed that Option C with an interest rate of 7.00% per annum invested for 8 years will earn the most interest. The compound amount in Option C is approximately $1.7187, which is the highest among all the options provided.