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| Groups | Results 1 - 10 of about 231 for "angle-preserving". |
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Michael1 kuratows...@aol.com sci math prove or disprove? if there is a basis x_1,x_2,...,x_n of R^n (as a normed vector space with euclidean norm) and ... http://groups.google.com/g/2757fef6/t/.../d/f497d1d00bca413e?hl=en&ie... |
If so, I just need to point out that this sort of angle is -not- the angle in "angle preserving"; Like you say: the arc-length on the Riemann Sphere is not preserved ... http://groups.google.com/g/aba7fef0/t/.../d/3efe8e669155689c?hl=en&ie... |
You transforms the points for the surface/object with 4x4 Matrix X. What do you transform the normals by? If your transform is length and angle preserving< /b> ( just a ... http://groups.google.com/g/3d57ff02/t/.../d/2b279aff44ab6fc8?hl=en&ie... |
Thats right, rectilinear lenses are not angle preserving. Angle preserving lenses are called fish eye lenses. And they have exactly the kind of distorsion you have ... http://groups.google.com/g/8797fefd/t/.../d/79183be0107fbc2?hl=en&ie... |
... Stereographic - Gnomic - Orthographic - Area preserving azimuthal - Angle preserving conical (new) Options exist for zooming, rotating, adding grid lines and ... http://groups.google.com/g/34c7ff0b/t/.../d/a57bce9df182d180?hl=en&ie... |
Rep RC-17659 Superquadratics and angle preserving transformations. by: AHBarr If you know of a way of getting ahold of either of these -- please let me know. http://groups.google.com/g/f867fef8/t/.../d/abd9a698baa4b591?hl=en&ie... |
... this is useful for star hopping in my opinion. On the other hand, it is not conformal (angle preserving,) as is the stereographic; unfortunately we can't have both. http://groups.google.com/g/68a7feec/t/.../d/6c787e1f59330c27?hl=en&ie... |
If the scale does not vary with direction, we say that the chart is "confo rmal" or angle preserving. It is often convenient to reexpress a line element such as (1) in ... http://groups.google.com/g/b517ff08/t/.../d/51684543eb50ddf2?hl=en... |
... is a conformal (ie, differentiable and locally angle preserving</ b>) bijection between two simply connected regions of the plane (which are not the entire plane). http://groups.google.com/g/2757fef6/t/.../d/846300d22ca8d8f7?hl=en...8... |
Hmm... come to think of it, is is possible that you are confusing "volume preserving" charts with conformal charts ("angle preserving")? This is exactly what it is. http://groups.google.com/g/aba7fef0/t/.../d/37735e8611d3c01b?hl=en...8... |
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