A hospital uses the radioactive isotope technetium-99m as a tracer - AQA - A-Level Physics - Question 1 - 2021 - Paper 5

Technetium-99m emits only gamma rays, which have high penetration power and can pass through the body without causing significant damage to tissues. This characteristic allows for clearer imaging without the adverse effects associated with other types of radiation. In addition, gamma rays are less ionizing compared to alpha and beta radiation, making them safer for diagnostic imaging purposes.

In the photomultiplier tube, the photocatode emits an electron when struck by a visible light photon released from the crystal scintillator. These emitted electrons are then accelerated towards the dynodes by applying a positive voltage. Each electron that collides with a dynode causes the release of more electrons, effectively amplifying the current. This process is repeated across multiple dynodes, leading to a significant increase in the total number of electrons collected, thus amplifying the current generated by the initial light photon.

To calculate the effective half-life considering decay, we use the decay formula:

t_{eff} = rac{t_{physical}}{1 + rac{t_{biological}}{t_{physical}}}

Given that the physical half-life of iodine-131 is 8 days and the biological half-life is 66 days, we find:

t_{eff} = rac{8}{1 + rac{66}{8}} = 1.1 ext{ days}

After 10 days, the number of half-lives passed is:

t = rac{10}{1.1} ext{ which is roughly } 9.1 ext{ half-lives}

The remaining activity would be:

decay = A_0 imes (0.5)^{n}

Where A_0 = 3.2 GBq, and n = 9.1:

decay = 3.2 imes (0.5)^{9.1} ext{ which is approximately } 1.11 ext{ GBq}.

Since 1.11 GBq > 1.1 GBq, the patient cannot be safely released after 10 days.