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1 Clip. 2 Radioactivity An unstable atomic nucleus emits a form of radiation (alpha, beta, or gamma) to become stable. In other words, the nucleus decays.

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Presentation on theme: "1 Clip. 2 Radioactivity An unstable atomic nucleus emits a form of radiation (alpha, beta, or gamma) to become stable. In other words, the nucleus decays."— Presentation transcript:

1 1 Clip

2 2 Radioactivity An unstable atomic nucleus emits a form of radiation (alpha, beta, or gamma) to become stable. In other words, the nucleus decays into a different atom.

3 3 Radioactivity Alpha Particle – Helium nucleus Beta Particle – electron Gamma Ray – high-energy photon, y-ray

4 4 Half-Life Amount of time it takes for one half of a sample of radioactive atoms to decay

5 5 Medical Applications of Half-Life NuclideHalf-LifeArea of Body I–1318.1 daysThyroid Fe–5945.1 daysRed Blood Cells Sr–872.8 hoursBones Tc–996.0 hoursHeart Na–2414.8 hoursCirculatory System

6 The grid below represents a quantity of C 14. Each time you click, one half-life goes by. Try it! C 14 – blue N 14 - red As we begin notice that no time has gone by and that 100% of the material is C 14 Half lives % C 14 %N 14 Ratio of C 14 to N 14 0100%0%no ratio Age = 0 half lives (5700 x 0 = 0 yrs)

7 The grid below represents a quantity of C 14. Each time you click, one half-life goes by. Try it! C 14 – blue N 14 - red Half lives % C 14 %N 14 Ratio of C 14 to N 14 0100%0%no ratio 150% 1:1 After 1 half-life (5700 years), 50% of the C 14 has decayed into N 14. The ratio of C 14 to N 14 is 1:1. There are equal amounts of the 2 elements. Age = 1 half lives (5700 x 1 = 5700 yrs)

8 The grid below represents a quantity of C 14. Each time you click, one half-life goes by. Try it! C 14 – blue N 14 - red Half lives % C 14 %N 14 Ratio of C 14 to N 14 0100%0%no ratio 150% 1:1 225%75%1:3 Now 2 half-lives have gone by for a total of 11,400 years. Half of the C 14 that was present at the end of half-life #1 has now decayed to N 14. Notice the C:N ratio. It will be useful later. Age = 2 half lives (5700 x 2 = 11,400 yrs)

9 The grid below represents a quantity of C 14. Each time you click, one half-life goes by. Try it! C 14 – blue N 14 - red Half lives % C 14 %N 14 Ratio of C 14 to N 14 0100%0%no ratio 150% 1:1 225%75%1:3 312.5%87.5%1:7 After 3 half-lives (17,100 years) only 12.5% of the original C 14 remains. For each half-life period half of the material present decays. And again, notice the ratio, 1:7 Age = 3 half lives (5700 x 3 = 17,100 yrs)

10 10 Half-Life Calculation #1 You have 400 mg of a radioisotope with a half-life of 5 minutes. How much will be left after 30 minutes?

11 11 Answers to Half-Life Calculations Half-Life Calculation #1 – 6.25 mg STEP 1 divide 30 by 5. You get 6. This means it is going to divide 6 times

12 STEP 2 Divide 400 6 times 400 / 2 = 200 200 / 2 = 100 100 / 2 = 50 50 / 2 = 25 25 / 2 = 12.5 12.5 / 2 = 6.25 mg 12

13 Regents question may involve graphs like this one. The most common questions are: "What is the half-life of this element?" Just remember that at the end of one half-life, 50% of the element will remain. Find 50% on the vertical axis, Follow the blue line over to the red curve and drop straight down to find the answer: The half-life of this element is 1 million years.

14 Another common question is: "What percent of the material originally present will remain after 2 million years?" Find 2 million years on the bottom, horizontal axis. Then follow the green line up to the red curve. Go to the left and find the answer. After 2 million years 25% of the original material will remain.

15 15 Half-Life Calculation #2 Suppose you have a 100 mg sample of Au-191, which has a half-life of 3.4 hours. How much will remain after 10.2 hours?

16 16 Answers to Half-Life Calculations Half-Life Calculation #2 – 12.5 mg

17 17 Half-Life Calculation # 3 Cobalt-60 is a radioactive isotope used in cancer treatment. Co-60 has a half-life of 5 years. If a hospital starts with a 1000 mg supply, how many mg will need to be purchased after 10 years to replenish the original supply?

18 18 Answers to Half-Life Calculations Half-Life Calculation #3 – 750 mg

19 19 Half-Life Calculation # 4 A radioisotope has a half-life of 1 hour. If you began with a 100 g sample of the element at noon, how much remains at 3 PM? At 6 PM? At 10 PM?

20 20 Answers to Half-Life Calculations Half-Life Calculation #4 – 12.5 g, 1.5625 g, 0.09765625 g

21 21 Half-Life Calculation # 5 How many half-lives have passed if 255 g of Co-60 remain from a sample of 8160 g?

22 22 Answers to Half-Life Calculations Half-Life Calculation #5 – 5 half-lives

23 23 Half-Life Calculation # 6 Suppose you have a sample containing 400 nuclei of a radioisotope. If only 25 nuclei remain after one hour, what is the half-life of the isotope?

24 24 Answers to Half-Life Calculations Half-Life Calculation #6 – 15 minutes

25 25 Half-Life Calculation # 7 If a radioactive element has diminished by 7/8 of its original amount in 30 seconds, what is its half-life?

26 26 Answers to Half-Life Calculations Half-Life Calculation #7 – 10 seconds


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