9. A student measures the activity of a sample every 10 minutes and records: 480 Bq, 240 Bq, 120 Bq, 60 Bq. State the half-life and justify your answer. [2]
Mark Scheme
1. The time taken for the activity of a radioactive source [1] to fall to half its initial value (or for the number of undecayed nuclei to halve) [1] [2]
2. Activity is the number of nuclear decays per second [1]; unit: becquerel (Bq) [1] [2]
3. It cannot be predicted when a particular nucleus will decay [1]; it is not affected by external factors such as temperature, pressure or chemical state [1] [2]
4. 10 years = 2 half-lives: $400 \rightarrow 200 \rightarrow 100$ nuclei [2]
5. 6 hours = 3 half-lives: $800 \rightarrow 400 \rightarrow 200 \rightarrow 100\,\text{Bq}$ [2]
6. $6400 \rightarrow 3200 \rightarrow 1600 \rightarrow 800 \rightarrow 400 \rightarrow 200$ — 5 half-lives [1]; $t_{1/2} = 40/5 = 8\,\text{days}$ [2] [3]
7. 12 hours ago = 4 half-lives before now; activity then was $960 \times 2^4 = 960 \times 16 = 15\,360\,\text{Bq}$ [3]
8. Exponential decay curve [1]; starting at a high value, decreasing rapidly at first then more slowly, approaching but never reaching zero [1] [2]
9. Activity halves every 10 minutes [1]; so the half-life = 10 minutes [1] [2]
10. There will always be some undecayed nuclei remaining [1]; since each nucleus decays independently and randomly, there is always a small (but non-zero) chance a nucleus has not yet decayed [1] [2]