**Format:**Turkish

# False Precision

**Language/s:**3-4 - How certain is the evidence?

**Target Audience:**2-7 All should be followed up

**Short Description:**

The use of p-values to indicate the probability of something occurring by chance may be misleading.

**Key Concepts addressed:**

## Details

Precise numbers and claims – as though there is no margin for error – are all around us. When someone tells you that 54.3% of people with some disease will have a particular outcome, they’re basically predicting the future of all groups of people based on what happened to another group of people in the past. Well, what are the chances of that, eh?

If our fortune teller was quoting the mean of a study here, it could be written like this: 67.5% (95% CI: 62%-73%). The CI stands for “confidence interval” and measures the range of the data. It’s showing us that 95 times out of 100, similar data sets to which the statistical test was applied would show a mean somewhere between 62% and 73%.

The chances of the result always being **precisely **67.5% can be pretty slim or very high, depending on lots of things. If there is a lot of data, the confidence interval will be narrow: the best case scenario and the worst case scenario will be close together (say, 66% to 69%).

*Cartoons and text copyright Hilda Bastian, usable under Creative Commons non-commercial license, CC BY-NC-ND 4.0.*