According to statistics, a person will devote 36 years to sleeping and watching TV. The number of years sleeping will exceed the number of years watching TV by 20 . Over the lifetime, how many years will the person spend on each of these activities?
The person will spend years watching $T V$ and years sleeping.
(Type whole numbers.)
Final Answer: The person will spend \(\boxed{28}\) years sleeping and \(\boxed{8}\) years watching TV.
Step 1 :Let's denote the number of years spent sleeping as S and the number of years spent watching TV as T. From the problem, we know that:
Step 2 :1) \(S + T = 36\) (the total number of years spent on both activities is 36)
Step 3 :2) \(S = T + 20\) (the number of years spent sleeping exceeds the number of years watching TV by 20)
Step 4 :We can solve this system of equations to find the values of S and T.
Step 5 :Solution: \(S = 28\), \(T = 8\)
Step 6 :Final Answer: The person will spend \(\boxed{28}\) years sleeping and \(\boxed{8}\) years watching TV.