| 1. | See the history of unit interval for examples of each of these.
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| 2. | So the union cannot contain the unit interval, which has measure 1.
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| 3. | In the case of the number he started with, the unit interval.
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| 4. | The unit interval is a complete metric space, locally path connected.
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| 5. | Here I denotes the unit interval [ 0, 1 ] with its standard topology.
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| 6. | Consider a simpler situation; for instance, that of the topology of the unit interval.
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| 7. | Each unit interval is referred to as one of the hedgehog's " spines ."
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| 8. | MTL-algebras on the real unit interval [ 0, 1 ].
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| 9. | Another simple example is provided by the unit interval together with its usual multiplication.
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| 10. | We will consider a thought experiment that involves throwing two darts at the unit interval.
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