Final answer:
To calculate how long it takes for the DDT concentration in a soil sample to decrease, we can use the half-life formula for first-order reactions. By substituting the given values into the formula, we can determine the total time required.
Step-by-step explanation:
The decomposition of DDT follows a first-order reaction with a half-life of 11.6 years. To determine how long it takes for the concentration of DDT in a soil sample to decrease from 294 ppbm to 19 ppbm, we can use the half-life formula for first-order reactions.
First, let's calculate the number of half-lives required:
Number of half-lives = ln(initial concentration / final concentration) / ln(2)
After determining the number of half-lives, multiply it by the half-life of DDT to get the total time:
Total time = Number of half-lives * Half-life of DDT
Substituting the given values, we get:
Total time = [(ln(294/19)) / ln(2)] * 11.6 years
Calculating this expression gives us the total time it takes for DDT in the soil sample to decrease from 294 ppbm to 19 ppbm.