Create Presentation
Download Presentation

Download

Download Presentation

Do Now read page 43-44 Please open your books to show your half life graphs

99 Views
Download Presentation

Download Presentation
## Do Now read page 43-44 Please open your books to show your half life graphs

- - - - - - - - - - - - - - - - - - - - - - - - - - - E N D - - - - - - - - - - - - - - - - - - - - - - - - - - -

**Do Now read page 43-44**Please open your books to show your half life graphs**Today’s lesson**• Use the term half-life in simple calculations, including the use of information in tables or decay curves. • Give and explain examples of practical applications of isotopes. Title Half-life questions**½ - life**• This is the time it takes for half the nuclei present in any given sample to decay Number of nuclei undecayed A graph of the count rate against time will be the same shape time half-life (t½)**Different ½ - lives**• Different isotopes have different half-lives • The ½-life could be a few milliseconds or 5000 million years!half life applet Number of nuclei undecayed time half-life (t½)**Examples**• A sample of a radioactive isotope of half life 2 hours has a count rate of 30 000 counts per second. What will the count rate be after 8 hours?**Activity**The activity of a radioactive source is equal to the number of decays per second. Activity is measured in bequerels (Bq) 1 becquerel = 1 decay per second Half life Henri Becquerel discovered radioactivity in 1896**Question 1**At 10am in the morning a radioactive sample contains 80g of a radioactive isotope. If the isotope has a half-life of 20 minutes calculate the mass of the isotope remaining at 11am. 10am to 11am = 60 minutes = 3 x 20 minutes = 3 half-lives mass of isotope = ½ x ½ x ½ x 80g mass at 11 am = 10g**Question 2**Calculate the half-life of the radioactive isotope in a source if its mass decreases from 24g to 6g over a period of 60 days. 24g x ½ = 12g 12g x ½ = 6g therefore TWO half-lives occur in 60 days half-life = 30 days**Example 2 – The decay of source Z**Source Z decays with a half-life of three hours. At 9 am the source has an activity of 16000 Bq The activity halves every three hours. 16000 8000 4000 2000 1000 500 When will the activity have fallen to 125 Bq? 6 am**Example 3 – The decay of isotope X**Isotope X decays to Isotope Y with a half-life of 2 hours. At 2 pm there are 6400 nuclei of isotope X. 6400 0 3200 3200 1600 4800 800 5600 400 6000 200 6200 When will the nuclei of isotope X fallen to 25? 6 am**Question 3**A radioactive source has a half-life of 3 hours. At 8 am it has an activity of 600 Bq. What will be its activity at 2 pm? at 8 am activity = 600 Bq 2 pm is 6 hours later this is 2 half-lives later therefore the activity will halve twice that is: 600 300 150 activity at 2 pm = 150 Bq**Question 4 – The decay of substance P**Substance P decays to substance Q with a half-life of 15 minutes. At 9 am there are 1280 nuclei of substance P. Complete the table. 1280 0 640 640 320 960 160 1120 80 1200 40 1240 How many nuclei of substance X will be left at 11 am?**Question 5**A sample contains 8 billion nuclei of hydrogen 3 atoms. Hydrogen 3 has a half-life of 12 years. How many nuclei should remain after a period 48 years? 48 years = 4 x 12 years = FOUR half-lives nuclei left = ½ x ½ x ½ x ½ x 8 billion nuclei left = 500 million**Experiment Dicium 25**You need your graphs**Question 7**The mass of a radioactive substance over a 8 hour period is shown in the table below. Draw a graph of mass against time and use it to determine the half-life of the substance. The half-life should be about 2 hours:**Finding half-life from a graph**half-life The half-life in this example is about 30 seconds. A more accurate value can be obtained be repeating this method for a other initial nuclei numbers and then taking an average.**Question 6**half-life Estimate the half-life of the substance whose decay graph is shown opposite.**Do Now Copy and complete :**The ________ of a radioactive substance is the average time taken for half of the _______of the substance to decay. It is also equal to the average time taken for the ________ of the substance to halve. The half-life of carbon 14 is about _______ years. If today a sample of carbon 14 has an activity of 3400 Bq then in 5600 years time this should have fallen to ______ Bq. 11200 years later the activity should have fallen to ____ Bq. The number of carbon 14 nuclei would have also decreased by ______ times. half-life nuclei activity 5600 1700 425 eight WORD & NUMBER SELECTION: 5600 nuclei eight half-life 425 1700 activity**Half-Life - S-Cool section on half-life and uses of**radioactivity including an on-screen half-life calculation and an animation showing thickness control. BBC AQA GCSE Bitesize Revision: Detecting radiation Natural sources of background radiation Artificial radiation Half life Alpha Decay - PhET - Watch alpha particles escape from a Polonium nucleus, causing radioactive alpha decay. See how random decay times relate to the half life. Revision Simulations**Smoke detection**• Uses**Test!**Thursday 27th September 2012