Half-Life (Edexcel IGCSE Science (Double Award))

Revision Note

Ashika

Author

Ashika

Last updated

Did this video help you?

Half life

  • It is impossible to know when a particular unstable nucleus will decay

  • It is possible to find out the rate at which the activity of a sample decreases

    • This is known as the half-life

  • Half-life is defined as:

    The time it takes for the number of nuclei of a sample of radioactive isotopes to decrease by half

  • In other words, the time it takes for the activity of a sample to fall to half its original level

  • Different isotopes have different half-lives and half-lives can vary from a fraction of a second to billions of years in length

Measuring half life

  • To determine the half-life of a sample, the procedure is:

    • Measure the initial activity A0 of the sample

    • Determine the half-life of this original activity

    • Measure how the activity changes with time

  • The time taken for the activity to decrease to half its original value is the half-life

Half life calculations

  • Scientists can measure the half-lives of different isotopes accurately

  • Uranium-235 has a half-life of 704 million years

    • This means it would take 704 million years for the activity of a uranium-235 sample to decrease to half its original amount

  • Carbon-14 has a half-life of 5700 years

    • So after 5700 years, there would be 50% of the original amount of carbon-14 remaining

    • After two half-lives or 11 400 years, there would be just 25% of the carbon-14 remaining

  • With each half-life, the amount remaining decreases by half

A graph can be used to make half-life calculations

Half-life Graph, downloadable IGCSE & GCSE Physics revision notes

The graph shows how the activity of a radioactive sample changes over time. Each time the original activity halves, another half-life has passed

  • The time it takes for the activity of the sample to decrease from 100% to 50% is the half-life

  • It is the same length of time as it would take to decrease from 50% activity to 25% activity

  • The half-life is constant for a particular isotope

  • The following table shows that as the number of half-life increases, the proportion of the isotope remaining halves

Half life calculation table

number of half lives

proportion of isotope remaining

0

1 or 100%

1

1 half or 50%

2

1 fourth or 25%

3

1 over 8 or 12.5%

4

1 over 16 or 6.25%

Worked Example

The activity of a particular radioactive sample is 880 Bq. After a year, the activity has dropped to 220 Bq.

What is the half-life of this material?

Answer:

Step 1: Calculate how many times the activity has halved

  • Initially, the activity was 880 Bq

  • After 1 half-life the activity would be 440 Bq

  • After 2 half-lives, the activity would be 220 Bq

  • Therefore, 2 half-lives have passed

Step 2: Divide the time period by the number of half-lives

  • The time period is a year

  • The number of half-lives is 2

1 space year space rightwards arrow with 1 space half space life on top space 6 space months space rightwards arrow with 2 space half space lives on top space 3 space months

  • 1 year divided by 4 (22) is a quarter of a year or 3 months

  • Therefore, the half-life of the sample is 3 months

Worked Example

The radioisotope technetium is used extensively in medicine. The graph below shows how the activity of a sample varies with time.

Worked Example - Half Life Curve, downloadable AS & A Level Physics revision notes

Determine the half-life of this material.

Answer:

Step 1: Draw lines on the graph to determine the time it takes for technetium to drop to half of its original activity

Worked Example - Half Life Curve Ans a, downloadable AS & A Level Physics revision notes

Step 2: Read the half-life from the graph

  • In the diagram above the initial activity, A0, is 8 × 107 Bq

  • The time taken to decrease to 4 × 107 Bq, or ½ A0, is 6 hours

  • Therefore, the half-life of this isotope is 6 hours

You've read 0 of your 5 free revision notes this week

Sign up now. It’s free!

Join the 100,000+ Students that ❤️ Save My Exams

the (exam) results speak for themselves:

Did this page help you?

Ashika

Author: Ashika

Expertise: Physics Project Lead

Ashika graduated with a first-class Physics degree from Manchester University and, having worked as a software engineer, focused on Physics education, creating engaging content to help students across all levels. Now an experienced GCSE and A Level Physics and Maths tutor, Ashika helps to grow and improve our Physics resources.