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<table style="color: #006600; border: 4px solid #003300; float: none; text-align: left; vertical-align: top; width: 600px; height: 307px; background-image: url('http://www.insmilaifontanals.cat/none'); background-color: #ffffcc;" border="4" frame="box" rules="all" align="center"> <tbody> <tr> <td style="color: #ffcc00; text-align: center; border-style: none; width: 100%; background-image: url('http://www.insmilaifontanals.cat/none'); background-color: #003300;" align="center" valign="middle"><span style="font-size: large; color: #ffff99;" data-mce-mark="1">Bisectriu</span></td> <td rowspan="2" colspan="2"> <img 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" width="222" height="226" /> <p> </p> </td> </tr> <tr style="font-weight: bold;"> <td style="background-color: #ffffcc; background-image: none; color: #0000ff; text-align: center; vertical-align: top; border-style: none;" rowspan="1" align="center" valign="top" width="100%"> <p><span style="color: #003300;" data-mce-mark="1"><span style="font-size: small;" data-mce-mark="1">La bisectriu és el conjunt de punts</span> <span style="text-decoration: underline; font-size: medium;" data-mce-mark="1">equidistants </span></span></p> <p><span style="color: #003300;" data-mce-mark="1"><span style="font-size: small;" data-mce-mark="1">dels dos segments que determinen un angle</span>.</span></p> <p> </p> <p> </p> <p><strong><span style="color: #003300;" data-mce-mark="1"> </span><span style="color: #003300; font-size: small;" data-mce-mark="1">Divideix l'angle </span></strong></p> <p><strong><span style="color: #003300; font-size: small;" data-mce-mark="1">en dos angles iguals. </span></strong></p> <p> </p> <div><span style="color: #003300;" data-mce-mark="1"><span style="font-size: small;" data-mce-mark="1">Les 3 bisectrius </span></span></div> <div><span style="color: #003300;" data-mce-mark="1"><span style="font-size: small;" data-mce-mark="1">es tallen en un punt anomenat</span> </span><span style="text-decoration: underline; font-size: medium;" data-mce-mark="1"><span style="color: #ff6600; text-decoration: underline;" data-mce-mark="1">incentre</span></span><span style="font-size: medium;" data-mce-mark="1"><span style="color: #ff6600;" data-mce-mark="1"> </span></span><span style="font-size: medium;" data-mce-mark="1"><span style="color: #ff6600;" data-mce-mark="1"> </span></span><span style="font-size: small; color: #003300;" data-mce-mark="1"><span data-mce-mark="1"><em>(centre de la circumferència inscrita)</em></span></span>.</div> </td> </tr> </tbody> </table>
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