Final answer:
The age of the ashes can be calculated using the carbon-14 decay count from the sample and comparing it to a living sample. After applying the radioactive decay formula, the age of the ashes is approximately 5936 years, which is closest to option C) 5970 years.
Step-by-step explanation:
To determine the age of the ashes using carbon-14 dating, we use the counts per minute per gram of carbon (expressed as disintegrations per minute, dpm) from the charcoal and compare it to the dpm from a modern sample. Given that the charcoal from the cave gave 7.4 dpm and wood from a living tree gives approximately 15.3 dpm, we can see that the charcoal has less than half the carbon-14 activity of the living sample, indicating it has gone through at least one half-life.
The half-life of carbon-14 is 5,700 years. Using the formula to calculate the age of a sample in a radioactive decay process, we can find the age as follows:
Age = (Half-life) * (log(N0/N) / log(2))
Where N0 is the disintegration rate of the modern sample, N is the disintegration rate of the ancient sample, and log is the logarithm base 2.
Calculating the age:
The calculated age is approximately 5936 years, making the closest option C) 5970 years.