Template:Laptop-frame: Difference between revisions
(Created page with '<includeonly><div style="width: 90%; margin:auto"> <div class="laptop"><div class="lpleft_side"><div class="lpright_side"><div class="lptop_side"><div class="lpbottom_side"><div …') |
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<includeonly><div style="width: | <includeonly><div style="margin: auto; width: {{{width|70%}}}; max-width: {{{max-width|100em}}}"> | ||
<div class="laptop"><div class=" | <div class="laptop"><div class="lptop_side"><div class="lpbottom_side"><div class="lpleft_side"><div class="lpright_side"><div class="lptop_left"><div class="lptop_right"><div class="lpbottom_left"><div class="lpbottom_right"> | ||
<div class="lptop_center"> | <div class="lptop_center"> | ||
<div class="lpscreen"> | <div class="lpscreen"> | ||
{{{screen_content|}}} | {{{screen_content|}}} | ||
</div> | </div> | ||
<div class="lpbottom_c_long"><div class="lpbottom_c_center"><div class="lpbottom_c_left"><div class="lpbottom_c_right"></div></div></div></div> | <div class="lpbottom_c_long"><div class="lpbottom_c_center"><div class="lpbottom_c_left"><div class="lpbottom_c_right"></div></div></div></div>{{#if: {{{stickers|}}} |{{{stickers|}}}}} | ||
</div> | </div> | ||
</div></div></div></div></div></div></div></div></div> | </div></div></div></div></div></div></div></div></div> | ||
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==Usage== | ==Usage== | ||
<pre>{{laptop-frame|screen_content=Your content Here}}</pre> | <pre>{{laptop-frame|width=Your width|max-width=maximium_width|screen_content=Your content Here|stickers=}}</pre> | ||
==Examples== | ==Examples== | ||
{{laptop-frame|width=60% | |||
|screen_content= | |||
{{{!}} style="width: 100%;" border=1 | |||
{{!}}- | |||
{{!}}Hello there | |||
{{!}}} | |||
}} | |||
{{laptop-frame|screen_content={{CharacterListHead}} | {{laptop-frame|screen_content={{CharacterListHead}} | ||
| Line 72: | Line 80: | ||
}} | }} | ||
{{ | |||
{{laptop-frame|screen_content= | |||
<p>Stuff</p> | |||
<p>If two triangles have two sides equal to two sides respectively, and have the angles contained by the equal straight lines equal, then they also have the base equal to the base, the triangle equals the triangle, and the remaining angles equal the remaining angles respectively, namely those opposite the equal sides. Let ABC and DEF be two triangles having the two sides AB and AC equal to the two sides DE and DF respectively, namely AB equal to DE and AC equal to DF, and the angle BAC equal to the angle EDF. | |||
{{br}} | |||
[[Ikari Shinji| Internal Link]] | |||
{{br}} | |||
[http://evageeks.org External Link] | |||
{{br}} | |||
[[Shinji| Internal Link]] | |||
{{br}} | |||
[http://google.org External Link] | |||
{{br}} | |||
[[Ikariii Shinji| Internal Link]] | |||
{{br}} | |||
I say that the base BC also <a href="http://google.com">equals the base</a> EF, the triangle ABC equals the triangle DEF, and the remaining angles equal the remaining angles respectively, namely those opposite the equal sides, that is, the angle ABC equals the angle DEF, and the angle ACB equals the angle DFE. If the triangle ABC is superposed on the triangle DEF, and if the point A is placed on the point D and the straight line AB on DE, then the point B also coincides with E, because AB equals DE. Again, AB coinciding with DE, the straight line AC also coincides with DF, because the angle BAC equals the angle EDF. Hence the point C also coincides with the point F, because AC again equals DF. But B also coincides with E, hence the base BC coincides with the base EF and equals it. C.N.4 Thus the whole triangle ABC coincides with the whole triangle DEF and equals it. C.N.4 And the remaining angles also coincide with the remaining angles and equal them, the angle ABC equals the angle DEF, and the angle ACB equals the angle DFE. Therefore if two triangles have two sides equal to two sides respectively, and have the angles contained by the equal straight lines equal, then they also have the base equal to the base, the triangle equals the triangle, and the remaining angles equal the remaining angles respectively, namely those opposite the equal sides. | |||
</p> }} | |||
[[Category:Templates]] | [[Category:Templates]] | ||
</noinclude> | </noinclude> | ||
Latest revision as of 00:21, 30 March 2010
Wraps content in a image frame border designed to look like the Class 2-A laptops.
Note this template is designed for wrapping large amounts of content and will not work appropriately on very small payloads.
Usage
{{laptop-frame|width=Your width|max-width=maximium_width|screen_content=Your content Here|stickers=}}
Examples
| Hello there |
| Image | Name | Age | Seiyū | Description |
|---|---|---|---|---|
|
Shinji Ikari 碇 シンジ |
14 | Megumi Ogata | The central protagonist of Evangelion, and the main pilot of Evangelion Unit-01. Defeating the Angel's and saving the world are the least of Shinji's worries as he struggles to overcome his own inner demons. |
|
Misato Katsuragi 葛城 ミサト |
29 | Kotono Mitsuishi | |
|
Rei Ayanami 綾波レイ |
14 | Megumi Hayashibara | |
|
Asuka Langley Soryu 惣流・アスカ・ラングレー |
14 | Yuko Miyamura | |
|
Ritsuko Akagi 赤木 リツコ |
30 | Yuriko Yamaguchi | |
|
Gendo Ikari 碇 ゲンドウ |
48 | Fumihiko Tachiki |
Stuff
If two triangles have two sides equal to two sides respectively, and have the angles contained by the equal straight lines equal, then they also have the base equal to the base, the triangle equals the triangle, and the remaining angles equal the remaining angles respectively, namely those opposite the equal sides. Let ABC and DEF be two triangles having the two sides AB and AC equal to the two sides DE and DF respectively, namely AB equal to DE and AC equal to DF, and the angle BAC equal to the angle EDF.
Internal Link
External Link
Internal Link
External Link
Internal Link
I say that the base BC also <a href="http://google.com">equals the base</a> EF, the triangle ABC equals the triangle DEF, and the remaining angles equal the remaining angles respectively, namely those opposite the equal sides, that is, the angle ABC equals the angle DEF, and the angle ACB equals the angle DFE. If the triangle ABC is superposed on the triangle DEF, and if the point A is placed on the point D and the straight line AB on DE, then the point B also coincides with E, because AB equals DE. Again, AB coinciding with DE, the straight line AC also coincides with DF, because the angle BAC equals the angle EDF. Hence the point C also coincides with the point F, because AC again equals DF. But B also coincides with E, hence the base BC coincides with the base EF and equals it. C.N.4 Thus the whole triangle ABC coincides with the whole triangle DEF and equals it. C.N.4 And the remaining angles also coincide with the remaining angles and equal them, the angle ABC equals the angle DEF, and the angle ACB equals the angle DFE. Therefore if two triangles have two sides equal to two sides respectively, and have the angles contained by the equal straight lines equal, then they also have the base equal to the base, the triangle equals the triangle, and the remaining angles equal the remaining angles respectively, namely those opposite the equal sides.
