Topologically example sentences
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Related (2): Manifold, Homeomorphism
"Topologically" Example Sentences
1. Topologically, this problem is equivalent to the one we solved last week.
2. The sphere and the torus are not topologically equivalent.
3. Topologically, a donut is the same as a coffee cup.
4. This space is topologically connected but not path-connected.
5. Topologically speaking, this graph is a tree.
6. The topology of this space is topologically non-trivial.
7. Topologically, a Klein bottle is a non-orientable surface.
8. These two surfaces are topologically equivalent.
9. Topologically, this manifold is equivalent to the real projective space.
10. Topologically, this graph is a complete bipartite graph.
11. The topologically dual of the graph is a planar graph.
12. Topologically, this surface can be embedded in three-dimensional space.
13. This surface is topologically non-trivial when viewed as an embedded submanifold.
14. Topologically, this knot is equivalent to a trefoil knot.
15. The topology of this space is topologically discrete.
16. Topologically, this surface is homeomorphic to a cylinder.
17. The topology of this manifold is topologically non-trivial.
18. Topologically, this graph is a directed acyclic graph.
19. This space is topologically equivalent to a solid ball.
20. Topologically, this knot is equivalent to a figure-eight knot.
21. The topology of this space is topologically trivial.
22. Topologically, this space is infinite-dimensional.
23. The topology of this manifold is topologically connected.
24. Topologically, this graph can be embedded in two-dimensional space.
25. This surface is topologically equivalent to a torus when viewed as an embedded submanifold.
26. Topologically, this graph is a cycle graph.
27. This space is topologically non-compact.
28. Topologically, this surface is homeomorphic to a Moebius strip.
29. The topology of this space is topologically Hausdorff.
30. Topologically, this manifold is equivalent to the complex projective plane.
Common Phases
1.
Topologically speaking;
2.
Topologically separated;
3.
Topologically isolated;
4.
Topologically distinct;
5.
Topologically closed;
6.
Topologically open;
7.
Topologically equivalent;
8.
Topologically compact;
9.
Topologically continuous;
10.
Topologically homeomorphic.
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