Final answer:
The solution to log₁₀(125) + log₁₀(8) is found by using the property of logarithms that allows addition to be turned into multiplication. The solution is log₁₀(1000), which corresponds to answer choice A.
Step-by-step explanation:
The solution to the problem log₁₀(125) + log₁₀(8) can be found by using the laws of logarithms. According to the property that states loga(m) + loga(n) = loga(mn), we multiply the two numbers inside the logarithms together. Therefore, log₁₀(125) + log₁₀(8) is equivalent to log₁₀(125\*8), which simplifies to log₁₀(1000) because 125 times 8 equals 1000. Hence, the solution is log₁₀(1000), which corresponds to answer choice A) log₁₀(1000).