<html>
<head>
</head>
<body class='hmmessage'><div dir='ltr'>


<style><!--
.hmmessage P
{
margin:0px;
padding:0px
}
body.hmmessage
{
font-size: 10pt;
font-family:Tahoma
}
--></style>
<div dir="ltr"><br>Hola a todos,<br><br>Estoy trabajando con polígonos tipo donut o polígono interno como los llama gvSIG en gvSIG 1.10 y OpenCadTools. El problema és que al intentar cortar el polígono en dos no lo hace correctamente, sinó que me rellena el interior del polígono. Mirar las imagenes de abajo con un ejemplo.<br><br>Polígono interno:<br><img src="data:image/png;base64,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" alt=""><br><br>Resultado cuando corto el polígono con la herramienta "Cortar polígono". Se me rellena el interior y se me queda seleccionado de una forma rara.<br><br><img src="data:image/png;base64,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" alt=""><br><br>Además la herramienta de explotar los polígonos no está activada.<br>Conozco la herramienta que permite hacerlo en Sextante, pero me interesa hacerlo individualmente para cada polígono mientras los voy dibujando, así que la herramienta de Sextante no me sirve.<br><br>Alguno havia detectado este error?<br><br>Cristina Lladó<br><br><br></div>
                                               </div></body>
</html>