| 1. | This includes the standard set operations, such as union, intersection, and complement.
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| 2. | As in logic, basic set operations can be represented visually using R-diagrams:
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| 3. | This module includes a number of set operations for Lua tables.
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| 4. | So these set operations don't work quite like the numerical equivalents, after all.
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| 5. | Then apply the desired set operations on the faces and regenerate your merged polygons.
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| 6. | Sets can be heterogeneous, nested, and support the usual set operations : union, intersection, etc.
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| 7. | An example of this is the power set operation.
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| 8. | It is not fixed in size and supports set operations and bit operations, including, unusually, shift operations.
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| 9. | We do this with the set operation applied on instance k ( refer to Figure 4 ).
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| 10. | Unlike conventional logic gate diagrams in which inputs and outputs hold the set operations of Boolean logic.
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