| 1. | Isometrically isomorphic normed vector spaces are identical for all practical purposes.
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| 2. | As geometries, these planes are isomorphic to the Fano plane.
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| 3. | These graphs are always isospectral but are often non-isomorphic.
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| 4. | Nassi & ndash; Shneiderman diagrams are almost isomorphic with flowcharts.
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| 5. | Taubes has shown that it is isomorphic to embedded contact homology.
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| 6. | That is, is isometrically isomorphic to the weighted dense in.
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| 7. | This means in particular that they have isomorphic homology and cohomology groups
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| 8. | Then the quotient ring is isomorphic to the ring of tessarines.
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| 9. | All n-dimensional real inner product spaces are mutually isomorphic.
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| 10. | Hence Example 5 is isomorphic to a proper subalgebra of itself!
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