Difference between revisions of "System"
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A system <math>S</math> can be defined as a tuple: <math>\{T, R\}</math>, | A system <math>S</math> can be defined as a tuple: <math>\{T, R\}</math>, | ||
where | where | ||
<math>T</math> is a collection of things, <math>T = </math><math>\{ | <math>T</math> is a collection of things, <math>T = </math><math>\{t, R\}</math> and | ||
<math>R</math> is a set of relations that relates two things <math>t \in T</math>. | <math>R</math> is a set of relations that relates two things <math>t \in T</math>. | ||
Revision as of 08:51, 7 September 2021
A system is defined to be a collection of things that are related to each other. Therefore, all systems can be defined as a tuple of set of things, and a set of relations.
A system can be defined as a tuple: ,
where
is a collection of things, and is a set of relations that relates two things .
