Difference between revisions of "FAQ"
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− | So, for example, if ''σ''=0.5MOA then 99% of shots should stay within a circle of radius 1.5MOA. | + | So, for example, if ''σ''=0.5MOA then 99% of shots should stay within a circle of radius 3''σ''=1.5MOA. |
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+ | ''σ'' also tells us what to expect from other precision measures. For example, [[Range_Statistics#Example_1|on average a five-shot group has an extreme spread of 3''σ'']]. So if ''σ''=0.5SMOA and we are shooting at a 100-yard target we would expect the extreme spread of an average 5-shot group to be 1.5". | ||
== How many shots do I need to sight in? == | == How many shots do I need to sight in? == | ||
== How do I tell whether ''A'' is more accurate than ''B''? == | == How do I tell whether ''A'' is more accurate than ''B''? == |
Revision as of 20:17, 24 May 2014
What is sigma (σ) and what does it mean?
σ ("sigma") is a single number that characterizes precision. In statistics σ represents standard deviation, which is a measure of dispersion, and which is a parameter for the normal distribution.
The most convenient statistical model for shooting precision uses a bivariate normal distribution to characterize the point of impact of shots on a target. In this model the same σ that characterizes the dispersion along each axis is also the parameter for the Rayleigh distribution, which describes how far we expect shots to fall from the center of impact on a target.
Shooting precision is described using angular units, so typical values of σ are things like 0.1mil or 0.5MOA.
With respect to shooting precision the meaning of σ has an analog to the "68-95-99.7 rule" for standard deviation: The 39-86-99 rule. I.e., we expect 39% of shots to fall within 1σ of center, 86% within 2σ, and 99% within 3σ. Other common values are listed in the following table:
Name | Multiple of σ | Shots Covered |
---|---|---|
1 | 39% | |
CEP | 1.18 | 50% |
MR | 1.25 | 54% |
2 | 86% | |
3 | 99% |
So, for example, if σ=0.5MOA then 99% of shots should stay within a circle of radius 3σ=1.5MOA.
σ also tells us what to expect from other precision measures. For example, on average a five-shot group has an extreme spread of 3σ. So if σ=0.5SMOA and we are shooting at a 100-yard target we would expect the extreme spread of an average 5-shot group to be 1.5".