5.18 Equations for Nuclear Physics

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Activity & The Decay Constant

Since radioactive decay is spontaneous and random, it is useful to consider the average number of nuclei which are expected to decay per unit time
- This is known as the average decay rate
As a result, each radioactive element can be assigned a decay constant
The decay constant λ is defined as:

The probability, per second, that a given nucleus will decay

When a sample is highly radioactive, this means the number of decays per unit time is very high
- This suggests it has a high level of activity

Activity, or the number of decays per unit time can be calculated using:

$A = \frac{Δ N}{Δ t} = - λ N$

Where:
- A = activity of the sample (Bq)
- ΔN = number of decayed nuclei
- Δt = time interval (s)
- λ = decay constant (s^-1)
- N = number of nuclei remaining in a sample

The activity of a sample is measured in Becquerels (Bq)
- An activity of 1 Bq is equal to one decay per second, or 1 s^-1
This equation shows:
- The greater the decay constant, the greater the activity of the sample
- The activity depends on the number of undecayed nuclei remaining in the sample
- The minus sign indicates that the number of nuclei remaining decreases with time - however, for calculations it can be omitted

Worked example

Americium-241 is an artificially produced radioactive element that emits α-particles. A sample of americium-241 of mass 5.1 μg is found to have an activity of 5.9 × 10⁵ Bq.

(a)

Determine the number of nuclei in the sample of americium-241.

(b)

Determine the decay constant of americium-241.

Part (a)

Step 1: Write down the known quantities

- Mass = 5.1 μg = 5.1 × 10^-6 g
- Molecular mass of americium = 241
- N_A = Avogadro constant

Step 2: Write down the equation relating number of nuclei, mass and molecular mass

$Number of nuclei = \frac{mass \times N_{A}}{molecular mass}$

Step 3: Calculate the number of nuclei

$n u m b e r o f n u c l e i = \frac{(5.1 \times 10^{- 6}) \times (6.02 \times 10^{23})}{241} = 1.27 \times 10^{16}$

Part (b)

Step 1: Write the equation for activity

Activity, A = λN

Step 2: Rearrange for decay constant λ and calculate the answer

$λ = \frac{A}{N} = \frac{5.9 \times 10^{5}}{1.27 \times 10^{16}} = 4.65 \times 10^{- 11} s^{- 1}$

Exponential Decay

In radioactive decay, the number of nuclei falls very rapidly, without ever reaching zero
- Such a model is known as exponential decay
The graph of number of undecayed nuclei and time has a very distinctive shape

Exponential Decay Graph, downloadable AS & A Level Physics revision notes

Radioactive decay follows an exponential pattern. The graph shows three different isotopes each with a different rate of decay

Radioactive Decay Equation

The number of undecayed nuclei N can be represented in exponential form by the equation:

N = N₀e^–λt

Where:
- N₀ = the initial number of undecayed nuclei (when t = 0)
- λ = decay constant (s^-1)
- t = time interval (s)

The exponential function e

The symbol e represents the exponential constant
- It is approximately equal to e = 2.718
On a calculator it is shown by the button e^x
The inverse function of e^x is ln(y), known as the natural logarithmic function
- This is because, if e^x = y, then x = ln(y)

Worked example

Strontium-90 decays with the emission of a β-particle to form Yttrium-90. The decay constant of Strontium-90 is 0.025 year^-1.

Determine the activity A of the sample after 5.0 years, expressing the answer as a fraction of the initial activity A₀

Step 1: Write out the known quantities

Decay constant, λ = 0.025 year^-1

Time interval, t = 5.0 years

Both quantities have the same unit, so there is no need for conversion

Step 2: Write the equation for activity in exponential form

A = A₀e^–λt

Step 3: Rearrange the equation for the ratio between A and A₀

The Exponential Nature of Radioactive Decay Worked Example equation 1

Step 4: Calculate the ratio A/A₀

The Exponential Nature of Radioactive Decay Worked Example equation 2

Therefore, the activity of Strontium-90 decreases by a factor of 0.88, or 12%, after 5 years

Half Life

Half-life is defined as:

The time taken for half the number of nuclei in a sample to decay

This means when a time equal to the half-life has passed, the activity of the sample will also half
This is because the activity is proportional to the number of undecayed nuclei, A ∝ N

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

When a time equal to the half-life passes, the activity falls by half, when two half-lives pass, the activity falls by another half (which is a quarter of the initial value)

To find an expression for half-life, start with the equation for exponential decay:

N = N₀e^–λt

Where:
- N = number of nuclei remaining in a sample
- N₀ = the initial number of undecayed nuclei (when t = 0)
- λ = decay constant (s^-1)
- t = time interval (s)

When time t is equal to the half-life t_½, the activity N of the sample will be half of its original value, so N = ½ N₀

Calculating Half-Life equation 1

The formula can then be derived as follows:

Calculating Half-Life equation 2

Calculating Half-Life equation 3

Calculating Half-Life equation 3a

Therefore, half-life t_½ can be calculated using the equation:

Calculating Half-Life equation 4

This equation shows that half-life t_½ and the radioactive decay rate constant λ are inversely proportional
- Therefore, the shorter the half-life, the larger the decay constant and the faster the decay

Worked example

Strontium-90 is a radioactive isotope with a half-life of 28.0 years.A sample of Strontium-90 has an activity of 6.4 × 10⁹ Bq. Calculate the decay constant λ, in s^–1, of Strontium-90.

Step 1: Convert the half-life into seconds

- t_½ = 28 years = 28 × 365 × 24 × 60 × 60 = 8.83 × 10⁸ s

Step 2: Write the equation for half-life

Step 3: Rearrange for λ and calculate

Exam Tip

Although you may not be expected to derive the half-life equation, make sure you're comfortable with how to use it in calculations such as that in the worked example.

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Edexcel International A Level Physics

Revision Notes

5.18 Equations for Nuclear Physics

Activity & The Decay Constant

Worked example

Exponential Decay

Worked example

Half Life

Worked example

Exam Tip

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Author: Katie M