| 11. | The unit interval is a subset of the real numbers \ mathbb { R }.
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| 12. | The invariant measure for " x " is the uniform density over the unit interval.
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| 13. | A point on the graph of ? has coordinates for some in the unit interval.
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| 14. | A linear function on the unit interval has no critical points; its bounds are extrema.
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| 15. | For one thing, does the arcsine distribution even integrate to one over the unit interval?
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| 16. | They are also equidistributed over the unit interval.
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| 17. | Here is the construction : take the Cartesian product of a surface with the unit interval.
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| 18. | The degrees are assumed to be real numbers from the unit interval [ 0, 1 ].
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| 19. | In this topology, a set U is a homeomorphic to the unit interval [ 0, 1 ].
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| 20. | The inverse hyperbolic tangent has the unit interval for its range, and so the interval maps onto.
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