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<table style="background-image: none; color: #003300; border: 4px solid #003300; float: none; text-align: left; vertical-align: top; margin-left: auto; margin-right: auto; background-color: #ffffcc; width: 438px; height: 527px;" border="4" frame="void" rules="none"> <tbody> <tr style="font-weight: bold;" align="center"> <td style="background-color: #003300; background-image: none; color: #ffffcc; border-color: #003300; border-width: 4px; vertical-align: top; border-style: solid;" colspan="2" valign="top" width="NaNpx"><span style="font-size: large;" data-mce-mark="1">Funció exponencial</span> </td> </tr> <tr style="font-weight: bold;" align="justify"> <td colspan="2" valign="top" width="NaNpx"> <p><span style="color: #003300; font-size: small;" data-mce-mark="1">La funció exponencial és una aplicació que fa correspondre al nombre real x el nombre real a<sup>x</sup>, on a és un nombre real positiu, anomenat base. <br /></span></p> <p><span style="color: #003300; font-size: small;" data-mce-mark="1">El seu gràfic depèn de si la base és més petita o més gran que 1.</span></p> </td> </tr> <tr style="font-weight: bold;" align="justify"> <td style="border: 1px solid #336600;" colspan="2" align="center"> <p><span style="color: #ff0000; font-size: medium;" data-mce-mark="1"><span style="color: #0000ff;">base més petita que 1</span> - <span style="color: #ff0000;" data-mce-mark="1">base més gran que 1</span></span></p> <img alt="" 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" width="276" height="359" /> <p> </p> </td> </tr> </tbody> </table>
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