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<table style="background-color: #ffffcc; background-image: url('http://www.insmilaifontanals.cat/none'); color: #0000ff; border: 4px solid #003300; float: none; text-align: left; vertical-align: top; width: 423px; height: 458px;" border="4" frame="box" rules="all" align="center"> <tbody> <tr align="center"> <td style="background-color: #003300; background-image: url('https://lcmates.eu/none'); color: #ffcc00; vertical-align: top; border-style: none; border-color: #003300; width: 50%; border-width: 1px;" rowspan="1" colspan="2" valign="top"><span style="font-weight: bold; font-size: large; color: #ffff99;">Triangles semblants</span><br /><br /></td> </tr> <tr align="justify"> <td valign="top" width="50%"><strong><span style="font-size: small;">Condició 1 (suficient): </span><br /><span style="font-size: small;">Dos triangles són semblants si tenen els 3 angles iguals.</span><br /></strong><img src="data:image/png;base64,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" width="215" height="205" /></td> <td style="background-image: url('https://lcmates.eu/none'); text-align: justify; vertical-align: top; border-style: solid;"><strong><span style="font-size: small;">Condició 2 (suficient): </span><br /><span style="font-size: small;">Dos triangles són semblants si tenen els costats proporcionals:</span><br /></strong><img src="data:image/png;base64,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" width="193" height="181" /></td> </tr> <tr align="center"> <td style="background-color: #003300; background-image: url('https://lcmates.eu/none'); color: #ffcc00; vertical-align: top; border-style: none; width: 50%;" rowspan="1" colspan="2" valign="top"><span style="font-size: large; color: #ffff99;"><span style="font-weight: bold;">Triangles en posició de Tales</span></span><br /><br /></td> </tr> <tr> <td rowspan="1" colspan="2" valign="top" width="50%"> <div align="justify"><span style="font-size: small;"><strong>Dos triangles estan en posició de Tales si tenen un angle en comú, i els costats oposats a aquest angle paral·lels:</strong></span></div> <div align="center"><img src="data:image/png;base64,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" width="238" height="163" /><br /><span style="font-size: small;"><strong>Si estan en posició de Tales, són semblants.</strong></span></div> </td> </tr> </tbody> </table>
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