This is again taken from an example in the Xamarin Community Toolkit sample app. I managed to set the width / height of the tabView container using a bit. To achieve this, we can use the following code. SystemDialogInput get input through system dialog boxes (files, colors. Input, InputString get input from a simple dialog box. The default value requires that an id to be set for the .The function must be a pure function, meaning it should always return the same id for the same set of inputs. DialogNotebook create a custom dialog window. A function that takes an eventKey and type and returns a unique id for child tab s and s.CreateDialog put up a dialog, but let Wolfram Language evaluation continue. UPDATE 2: Moved the issue with the dataTable into a separate post as this is a problem in itself. DialogInput put up a dialog and return what is supplied to DialogReturn. The datatable will not inherit the height set this way. Finally, we investigate the existence of pan-orientable, pan-decomposable ( v, 4, λ = 2 μ)-BIBDs with a pan-orientable, pan-decomposable ( w, 4, λ = 2 μ)-BIBD as a subdesign here we obtain complete results for λ = 2, 4, but there remain several open cases for λ = 6 (mostly for v < 4 w), and the case λ = 12 still has to be investigated. Also setting the height using CSS (ui-tab-panels and ui-tabs-panel) doesn't really matter in the case of a datatable. One new corollary to this result is that there exists a ( v, 4, 2)-BIBD which is both super-simple and directable for all v ⡠1, 4 (mod 6), v > 4. When λ = 2 and v > 4, our designs are super-simple, that is they have no two blocks with more than two common points. For all μ, we are able to show that the necessary existence conditions are sufficient. In this paper, we continue the earlier investigations and complete the spectrum for ( v, 4, λ = 2 μ)-BIBDs which possess both the pan-orientable property and the pan-decomposable property first introduced by Granville et al. A ( v, k, λ = 2 μ)-BIBD is called pan-orientable if it is T-orientable for every possible k-tournament T. A ( v, k, λ = 2 μ)-BIBD is called T- orientable if for each of its blocks B, it is possible to replace B by a copy of T on the set B so that every ordered pair of distinct points appears in exactly μ k-tournaments. A tournament T of order k, briefly k-tournament, is a directed graph on k vertices in which there is exactly one directed edge between any two vertices. Wolfram Language & System Documentation Center.Let v, k, and μ be positive integers. "Panel." Wolfram Language & System Documentation Center. When showing a new tab, the events fire in the following order: hide.bs.tab (on the current active tab) show.bs.tab (on the to-be-shown tab) hidden.bs.tab (on the previous active tab, the same one as for the hide.bs.tab event) shown.bs.tab (on the newly-active just-shown tab, the same one as for the show.bs. Wolfram Research (2007), Panel, Wolfram Language function, (updated 2010).
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