## Maths in a minute: The prosecutor's fallacy

Submitted by Marianne on October 11, 2016A woman's DNA matches that of a sample found at a crime scene. The chances of a DNA match are just one in two million, so the woman must be guilty, right?

Wrong. But it's a common mistake to make, known as the
*prosecutor's fallacy*. It mistakes the one in two million
for the probability of the woman's innocence. In order to
assess the woman's guilt properly, we need to need to take
the fact that she matched the sample as a given, and see
how much more likely this makes her to be guilty
than she was before the DNA evidence came to light.

A result called *Bayes' theorem* is useful in this context. The matching probability
above implies that the woman's DNA is two million times
more likely to match the sample if she is guilty, than if she
is innocent. Bayes' theorem now says that:

Odds of guilt after DNA evidence = 2,000,000 x Odds of guilt before DNA evidence.

If our woman comes from a city of 500,000 people, and we think each of them is equally likely to have committed the crime, then her odds of guilt before the DNA evidence are about 1 in 500,000. Therefore:

Odds of guilt after DNA evidence = 2,000,000 × 1/500,000 = 4.

These are odds as we're used to them from the races. Translating the result into probabilities, this gives an 80% chance of guilt. Definitely not beyond reasonable doubt!

### Further reading

Read more about the prosecutor's fallacy in *It's a match!*, which explores DNA evidence, and *Beyond reasonable doubt*, which explores a miscarriage of justice based on the fallacy.