| 21. | Is it actually Gaussian curvature 2 ? 23px13 : 47, 15 May 2006 ( UTC)
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| 22. | The boundary case of equality is attained precisely when the metric is of constant Gaussian curvature.
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| 23. | Take a hyperbolic plane whose Gaussian curvature is-\ frac1 { k ^ 2 }.
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| 24. | There exist various pseudospheres in Euclidean space that have a finite area of constant negative Gaussian curvature.
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| 25. | For hyperbolic points, where the Gaussian curvature is negative, the intersection will form a hyperbola.
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| 26. | The less Gaussian curvature of the surface is the higher the accuracy of the plane mapping is.
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| 27. | The pleated board is roughly isometric to a flat plane, which has a Gaussian curvature of 0.
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| 28. | In the mid nineteenth century, the Gauss� Bonnet theorem linked the Euler characteristic to the Gaussian curvature.
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| 29. | Saddle surfaces have negative Gaussian curvature which distinguish them from convex / elliptical surfaces which have positive Gaussian curvature.
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| 30. | Saddle surfaces have negative Gaussian curvature which distinguish them from convex / elliptical surfaces which have positive Gaussian curvature.
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