PSA Doubling Time Calculator

Calculate PSA Doubling Time





Formula

To calculate the PSA Doubling Time:

\[ DT = \frac{t \times \log(2)}{\log(\frac{P2}{P1})} \]

Where:

What is a PSA Doubling Time?

PSA Doubling Time refers to the period it takes for the level of Prostate-Specific Antigen (PSA) in a man’s blood to double. PSA is a protein produced by both normal and malignant cells in the prostate gland. The PSA Doubling Time is often used as an indicator of the aggressiveness of prostate cancer and the effectiveness of treatment. A short PSA Doubling Time (less than three months) is associated with a more aggressive disease and a poorer prognosis, while a longer PSA Doubling Time (more than 12 months) is associated with a less aggressive disease and a better prognosis. It is calculated by measuring the PSA levels at different points in time and using a mathematical formula to determine how long it takes for the PSA level to double.

Example Calculation 1

Let's assume the following values:

Using the formula:

\[ DT = \frac{180 \times \log(2)}{\log(\frac{5.0}{2.5})} \approx \frac{180 \times 0.693}{\log(2)} \approx \frac{124.74}{0.693} \approx 180 \, \text{days} \]

The PSA Doubling Time is approximately 180 days.

Example Calculation 2

Let's assume the following values:

Using the formula:

\[ DT = \frac{365 \times \log(2)}{\log(\frac{2.0}{1.0})} \approx \frac{365 \times 0.693}{\log(2)} \approx \frac{252.645}{0.693} \approx 365 \, \text{days} \]

The PSA Doubling Time is approximately 365 days.