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→Electronic Countermeasures (ECM): replaced .png formula with <math> |
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The probability to jam a target with single jammer is: | The probability to jam a target with single jammer is: | ||
<math> \displaystyle\text{Chance to jam} = \frac{ \text{ECM strength} }{ \text{Sensor strength} } </math> | :<math> \displaystyle\text{Chance to jam} = \frac{ \text{ECM strength} }{ \text{Sensor strength} } </math> | ||
However with multiple jams, each possibly with different jam strength, the probability becomes a binomial distribution. See the [https://en.wikipedia.org/wiki/Binomial_distribution wikipedia article] to refresh your memory on how it is calculated. | However with multiple jams, each possibly with different jam strength, the probability becomes a binomial distribution. See the [https://en.wikipedia.org/wiki/Binomial_distribution wikipedia article] to refresh your memory on how it is calculated. | ||