{"product_id":"p1000serie","title":"Kesselrohr Expander P1000 Serie","description":"\u003cdiv class=\"hytool-p1000-series\" lang=\"de\"\u003e\n\u003cstyle type=\"text\/css\"\u003e.hytool-p1000-series{--hy:#00b050;--hy-dark:#08743f;--txt:#1f2933;--muted:#5b6470;--line:#d7dce2;--soft:#f6f8f7;font-family:Arial,Helvetica,sans-serif;color:var(--txt);max-width:1200px;margin:0 auto;line-height:1.5;font-size:16px;}\n    .hytool-p1000-series *{box-sizing:border-box;}\n    .hytool-p1000-series h2,.hytool-p1000-series h3{color:var(--hy);margin:0 0 12px;line-height:1.2;font-weight:700;}\n    .hytool-p1000-series h2{font-size:clamp(24px,3vw,34px);}\n    .hytool-p1000-series h3{font-size:clamp(18px,2.1vw,24px);margin-top:24px;}\n    .hytool-p1000-series p{margin:0 0 14px;}\n    .hytool-p1000-series .hero{border:1px solid var(--line);border-radius:16px;padding:clamp(18px,3vw,34px);background:linear-gradient(135deg,#fff 0%,#fff 58%,var(--soft) 100%);margin-bottom:22px;}\n    .hytool-p1000-series .badges{display:flex;flex-wrap:wrap;gap:8px;margin-top:14px;}\n    .hytool-p1000-series .badge{border:1px solid rgba(0,176,80,.35);background:rgba(0,176,80,.08);color:#0f5f35;border-radius:999px;padding:6px 10px;font-size:14px;font-weight:700;}\n    .hytool-p1000-series .info-box{background:#fff;border:1px solid var(--line);border-radius:14px;padding:18px;margin:0 0 18px;}\n    .hytool-p1000-series .uses{margin:0 0 14px;padding-left:18px;}\n    .hytool-p1000-series .uses li{margin:6px 0;}\n    .hytool-p1000-series .facts{width:100%;border-collapse:collapse;table-layout:auto;margin-top:12px;font-size:14px;}\n    .hytool-p1000-series .graph-wrap{background:#fff;border:1px solid var(--line);border-radius:14px;padding:12px;margin:0 0 20px;text-align:center;}\n    .hytool-p1000-series .graph-img{width:100%;max-width:364px;height:auto;display:block;margin:0 auto;border-radius:10px;}\n    .hytool-p1000-series .table-wrap{width:100%;overflow-x:auto;-webkit-overflow-scrolling:touch;border:1px solid var(--line);border-radius:14px;background:#fff;margin:10px 0 18px;}\n    .hytool-p1000-series table{width:100%;border-collapse:collapse;table-layout:auto;}\n    .hytool-p1000-series th,.hytool-p1000-series td{border:1px solid var(--line);padding:5px 5px;text-align:center;vertical-align:middle;white-space:normal;overflow-wrap:anywhere;word-break:break-word;hyphens:auto;}\n    .hytool-p1000-series .data-table{font-size:clamp(8px,.8vw,11px);line-height:1.18;min-width:1120px;}\n    .hytool-p1000-series thead tr:first-child th{background:var(--hy-dark);color:#fff;}\n    .hytool-p1000-series thead tr:nth-child(2) th{background:var(--hy);color:#fff;}\n    .hytool-p1000-series tbody tr:nth-child(even) td{background:#fafafa;}\n    .hytool-p1000-series .note{font-size:13px;color:var(--muted);margin-top:10px;}\n    .hytool-p1000-series .seo-block{background:#f7fbf8;border-left:5px solid var(--hy);padding:16px 18px;border-radius:10px;margin-top:22px;}\n    .hytool-p1000-series .meta{font-size:14px;color:var(--muted);}\n    @media(max-width:760px){.hytool-p1000-series{font-size:15px;}.hytool-p1000-series th,.hytool-p1000-series td{padding:4px 3px;}.hytool-p1000-series .data-table{font-size:8px;}}\n\u003c\/style\u003e\n\u003csection class=\"hero\"\u003e\n\u003ch2\u003eP-1000 Serie Kesselrohraufweiter für beengte Einbauräume\u003c\/h2\u003e\n\n\u003cp\u003eDie P-1000 Serie ist ein kompakter Kesselrohraufweiter für Anwendungen mit begrenztem Zugang. Sie wurde für Wasserboxen, kleine Trommeldurchmesser und vergleichbare Einbausituationen entwickelt, in denen konventionelle Rohraufweiter nur eingeschränkt eingesetzt werden können.\u003c\/p\u003e\n\n\u003cp\u003eÜberlappende Rollen verhindern Riefen und Absätze am Rohr. Die 30°-Bördelgeometrie ermöglicht das kontrollierte Aufweiten und Anformen der Rohrenden in einem Arbeitsgang.\u003c\/p\u003e\n\n\u003cdiv class=\"badges\"\u003e\n\u003cspan class=\"badge\"\u003efür begrenzte Zugänglichkeit\u003c\/span\u003e \u003cspan class=\"badge\"\u003eRohr-O.D. 1\" bis 4.1\/2\"\u003c\/span\u003e \u003cspan class=\"badge\"\u003e30° Bördelwinkel\u003c\/span\u003e \u003cspan class=\"badge\"\u003eModelle P1079\/3 bis P1394\/11\u003c\/span\u003e\n\u003c\/div\u003e\n\u003c\/section\u003e\n\n\u003csection class=\"info-box\"\u003e\n\u003ch3\u003eEinsatzbereich und technische Merkmale\u003c\/h3\u003e\n\n\u003cul class=\"uses\"\u003e\n\t\u003cli\u003eüberlappende Rollen verhindern Riefenbildung am Rohr\u003c\/li\u003e\n\t\u003cli\u003eideal für Wasserboxen, kleine Trommeldurchmesser und andere beengte Einbauräume\u003c\/li\u003e\n\t\u003cli\u003egeeignet zum Aufweiten und Bördeln von Kesselrohren\u003c\/li\u003e\n\t\u003cli\u003ekompakte Bauform für schwer zugängliche Rohrböden\u003c\/li\u003e\n\u003c\/ul\u003e\n\n\u003ctable aria-label=\"Technische Eckdaten P-1000 Serie\" class=\"facts\"\u003e\n\t\u003ctbody\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003cth\u003eVerfügbare Größen\u003c\/th\u003e\n\t\t\t\u003ctd\u003e1\" O.D. 13 und 14 Gauge bis 4.1\/2\" O.D. 7–14 Gauge\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003cth\u003eVerfügbare Modelle\u003c\/th\u003e\n\t\t\t\u003ctd\u003eP1079\/3 bis P1394\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003cth\u003eBördelwinkel\u003c\/th\u003e\n\t\t\t\u003ctd\u003e30°\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003cth\u003eAnwendung\u003c\/th\u003e\n\t\t\t\u003ctd\u003eKesselrohre, Wasserboxen und kleine Trommeldurchmesser\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\u003c\/tbody\u003e\n\u003c\/table\u003e\n\u003c\/section\u003e\n\n\u003csection aria-label=\"P-1000 Serie technische Grafik\" class=\"graph-wrap\"\u003e\u003cimg alt=\"P-1000 Serie Kesselrohraufweiter mit Rohrbodenstärke, Überrollung, Rohrüberstand und 30 Grad Bördelwinkel\" class=\"graph-img\" loading=\"lazy\" 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\"\u003e\u003c\/section\u003e\n\n\u003csection\u003e\n\u003ch3\u003eAuswahltabelle P-1000 Serie – ausschließlich Seite 1\u003c\/h3\u003e\n\n\u003cp\u003eDie Tabelle enthält ausschließlich die Werkzeugauswahl. Die Ersatzteiltabelle senden wir Ihnen gerne auf Anfrage zu. \u003c\/p\u003e\n\n\u003cdiv class=\"table-wrap\"\u003e\n\u003ctable aria-label=\"P-1000 Serie Auswahltabelle Seite 1\" class=\"data-table\"\u003e\n\t\u003cthead\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003cth colspan=\"3\"\u003eRohr 1\u003c\/th\u003e\n\t\t\t\u003cth colspan=\"3\"\u003eRohr 2\u003c\/th\u003e\n\t\t\t\u003cth colspan=\"2\"\u003eMindest-I.D.\u003cbr\u003e\n\t\t\tWerkzeug tritt ein\u003c\/th\u003e\n\t\t\t\u003cth colspan=\"2\"\u003eMaximale Aufweitung\u003c\/th\u003e\n\t\t\t\u003cth colspan=\"5\"\u003eWerkzeugnummer nach Rohrbodenstärke\u003c\/th\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003cth\u003eO.D. inch\u003c\/th\u003e\n\t\t\t\u003cth\u003eBWG\u003c\/th\u003e\n\t\t\t\u003cth\u003eWand inch\u003c\/th\u003e\n\t\t\t\u003cth\u003eO.D. inch\u003c\/th\u003e\n\t\t\t\u003cth\u003eBWG\u003c\/th\u003e\n\t\t\t\u003cth\u003eWand inch\u003c\/th\u003e\n\t\t\t\u003cth\u003emm\u003c\/th\u003e\n\t\t\t\u003cth\u003einch\u003c\/th\u003e\n\t\t\t\u003cth\u003emm\u003c\/th\u003e\n\t\t\t\u003cth\u003einch\u003c\/th\u003e\n\t\t\t\u003cth\u003e1\/2\"–3\/4\"\u003c\/th\u003e\n\t\t\t\u003cth\u003e7\/8\"–1.1\/4\"\u003c\/th\u003e\n\t\t\t\u003cth\u003e1.3\/8\"–1.3\/4\"\u003c\/th\u003e\n\t\t\t\u003cth\u003e1.7\/8\"–2.1\/4\"\u003c\/th\u003e\n\t\t\t\u003cth\u003e2.3\/8\"–2.3\/4\"\u003c\/th\u003e\n\t\t\u003c\/tr\u003e\n\t\u003c\/thead\u003e\n\t\u003ctbody\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e1\u003c\/td\u003e\n\t\t\t\u003ctd\u003e13 \u0026amp; 14\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.095 \u0026amp; .083\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.1\/8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e9\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.148\u003c\/td\u003e\n\t\t\t\u003ctd\u003e19,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.775\u003c\/td\u003e\n\t\t\t\u003ctd\u003e23,4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.921\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1079\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1079\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e1\u003c\/td\u003e\n\t\t\t\u003ctd\u003e15 \u0026amp; 16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.072 \u0026amp; .065\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.1\/8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e10\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.134\u003c\/td\u003e\n\t\t\t\u003ctd\u003e20,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.814\u003c\/td\u003e\n\t\t\t\u003ctd\u003e24,4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.961\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1083\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1083\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e1.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.180\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.1\/8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e11 \u0026amp; 12\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.120 \u0026amp; .109\u003c\/td\u003e\n\t\t\t\u003ctd\u003e21,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.854\u003c\/td\u003e\n\t\t\t\u003ctd\u003e25,5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.004\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1087\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1087\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e1.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e8 \u0026amp; 9\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.165 \u0026amp; .148\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.1\/8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e13 \u0026amp; 14\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.095 \u0026amp; .083\u003c\/td\u003e\n\t\t\t\u003ctd\u003e22,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.893\u003c\/td\u003e\n\t\t\t\u003ctd\u003e26,5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.043\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1091\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1091\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e1.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e10\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.134\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.1\/8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e15 \u0026amp; 16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.072 \u0026amp; .065\u003c\/td\u003e\n\t\t\t\u003ctd\u003e23,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.933\u003c\/td\u003e\n\t\t\t\u003ctd\u003e28,1\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.105\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1095\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1095\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e1.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e11–13\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.120–.095\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.3\/8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.165\u003c\/td\u003e\n\t\t\t\u003ctd\u003e24,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.972\u003c\/td\u003e\n\t\t\t\u003ctd\u003e29,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.142\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1099\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1099\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e1.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e14 \u0026amp; 15\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.083 \u0026amp; .072\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.3\/8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e9\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.148\u003c\/td\u003e\n\t\t\t\u003ctd\u003e25,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.011\u003c\/td\u003e\n\t\t\t\u003ctd\u003e30,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.181\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1103\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1103\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e1.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.065\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.3\/8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e10\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.134\u003c\/td\u003e\n\t\t\t\u003ctd\u003e27,8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.094\u003c\/td\u003e\n\t\t\t\u003ctd\u003e33,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.299\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1111\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1111\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e1.1\/2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e10–12\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.134–.109\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.3\/8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e15 \u0026amp; 16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.072 \u0026amp; .065\u003c\/td\u003e\n\t\t\t\u003ctd\u003e30,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.208\u003c\/td\u003e\n\t\t\t\u003ctd\u003e35,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.378\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1118\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1118\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e1.1\/2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e13–16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.095–.065\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.3\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e6 \u0026amp; 7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.203 \u0026amp; .180\u003c\/td\u003e\n\t\t\t\u003ctd\u003e32,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.287\u003c\/td\u003e\n\t\t\t\u003ctd\u003e38,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.496\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1126\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1126\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.259\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.3\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e8 \u0026amp; 9\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.165 \u0026amp; .148\u003c\/td\u003e\n\t\t\t\u003ctd\u003e34,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.366\u003c\/td\u003e\n\t\t\t\u003ctd\u003e40,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.575\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1134\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1134\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1134\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1134\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1134\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4 \u0026amp; 5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.238 \u0026amp; .220\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.3\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e10–12\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.134–.109\u003c\/td\u003e\n\t\t\t\u003ctd\u003e36,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.444\u003c\/td\u003e\n\t\t\t\u003ctd\u003e42,5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.673\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1142\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1142\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1142\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1142\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1142\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e6\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.203\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.3\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e13–16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.096–.065\u003c\/td\u003e\n\t\t\t\u003ctd\u003e38,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.523\u003c\/td\u003e\n\t\t\t\u003ctd\u003e44,5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.752\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1150\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1150\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1150\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1150\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1150\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e7–9\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.180–.148\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.259\u003c\/td\u003e\n\t\t\t\u003ctd\u003e40,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.602\u003c\/td\u003e\n\t\t\t\u003ctd\u003e47,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.850\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1158\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1158\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1158\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1158\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1158\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e10–12\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.134–.109\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.238\u003c\/td\u003e\n\t\t\t\u003ctd\u003e42,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.681\u003c\/td\u003e\n\t\t\t\u003ctd\u003e49,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.929\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1166\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1166\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1166\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1166\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1166\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e13–15\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.095–.072\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e5 \u0026amp; 6\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.220 \u0026amp; .203\u003c\/td\u003e\n\t\t\t\u003ctd\u003e44,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.760\u003c\/td\u003e\n\t\t\t\u003ctd\u003e51,5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.027\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1174\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1174\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1174\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1174\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1174\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.065\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e7–9\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.180–.148\u003c\/td\u003e\n\t\t\t\u003ctd\u003e46,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.839\u003c\/td\u003e\n\t\t\t\u003ctd\u003e54,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.126\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1181\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1181\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1181\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1181\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1181\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2.1\/2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4 \u0026amp; 5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.238 \u0026amp; .220\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e10–13\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.134–.095\u003c\/td\u003e\n\t\t\t\u003ctd\u003e48,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.917\u003c\/td\u003e\n\t\t\t\u003ctd\u003e56,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.205\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1189\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1189\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1189\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1189\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1189\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2.1\/2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e6\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.203\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e14–16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.083–.065\u003c\/td\u003e\n\t\t\t\u003ctd\u003e50,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.996\u003c\/td\u003e\n\t\t\t\u003ctd\u003e60,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.362\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1197\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1197\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1197\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1197\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1197\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2.1\/2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e7–10\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.180–.134\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.3\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2 \u0026amp; 3\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.284 \u0026amp; .259\u003c\/td\u003e\n\t\t\t\u003ctd\u003e52,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.074\u003c\/td\u003e\n\t\t\t\u003ctd\u003e62,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.441\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1205\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1205\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1205\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1205\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1205\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2.1\/2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e11–13\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.120–.095\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.3\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4 \u0026amp; 5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.238 \u0026amp; .220\u003c\/td\u003e\n\t\t\t\u003ctd\u003e54,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.153\u003c\/td\u003e\n\t\t\t\u003ctd\u003e64,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.520\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1213\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1213\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1213\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1213\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1213\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e2.1\/2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e14–16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.083–.065\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.3\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e6–8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.203–.165\u003c\/td\u003e\n\t\t\t\u003ctd\u003e56,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.232\u003c\/td\u003e\n\t\t\t\u003ctd\u003e66,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.598\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1221\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1221\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1221\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1221\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1221\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e3\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.284\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.3\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e7–9\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.180–.148\u003c\/td\u003e\n\t\t\t\u003ctd\u003e58,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.311\u003c\/td\u003e\n\t\t\t\u003ctd\u003e68,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.677\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1229\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1229\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1229\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1229\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1229\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e3\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3 \u0026amp; 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14\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.095 \u0026amp; .083\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.238\u003c\/td\u003e\n\t\t\t\u003ctd\u003e68,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.704\u003c\/td\u003e\n\t\t\t\u003ctd\u003e78,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.071\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1268\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1268\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1268\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1268\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1268\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e3\u003c\/td\u003e\n\t\t\t\u003ctd\u003e15 \u0026amp; 16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.072 \u0026amp; .065\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e5 \u0026amp; 6\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.220 \u0026amp; .203\u003c\/td\u003e\n\t\t\t\u003ctd\u003e70,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.783\u003c\/td\u003e\n\t\t\t\u003ctd\u003e80,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.150\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1276\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1276\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1276\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1276\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1276\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e3.1\/2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2 \u0026amp; 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8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.180 \u0026amp; .165\u003c\/td\u003e\n\t\t\t\u003ctd\u003e94,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.728\u003c\/td\u003e\n\t\t\t\u003ctd\u003e106,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4.173\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1370\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1370\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1370\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1370\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1370\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e4.1\/2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.259\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e9–11\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.148–.120\u003c\/td\u003e\n\t\t\t\u003ctd\u003e96,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.807\u003c\/td\u003e\n\t\t\t\u003ctd\u003e108,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4.252\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1378\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1378\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1378\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1378\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1378\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e4.1\/2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4–6\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.259–.203\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e12–16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.109–.065\u003c\/td\u003e\n\t\t\t\u003ctd\u003e98,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.885\u003c\/td\u003e\n\t\t\t\u003ctd\u003e110,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4.331\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1386\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1386\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1386\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1386\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1386\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e4.1\/2\u003c\/td\u003e\n\t\t\t\u003ctd\u003e7–14\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.180–.083\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e–\u003c\/td\u003e\n\t\t\t\u003ctd\u003e100,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.964\u003c\/td\u003e\n\t\t\t\u003ctd\u003e111,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4.407\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1394\/3\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1394\/5\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1394\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1394\/9\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP1394\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\u003c\/tbody\u003e\n\u003c\/table\u003e\n\u003c\/div\u003e\n\n\u003cp class=\"note\"\u003e\u003cstrong\u003eHinweis:\u003c\/strong\u003e Für die Werkzeugauswahl werden Rohr-Außendurchmesser, Rohrwandstärke und Rohrbodenstärke benötigt. \u003c\/p\u003e\n\u003c\/section\u003e\n\n\u003csection class=\"seo-block\"\u003e\n\u003ch3\u003eKurzbeschreibung\u003c\/h3\u003e\n\n\u003cp\u003eDie P-1000 Serie Kesselrohraufweiter wurde für begrenzte Zugangsbereiche wie Wasserboxen und kleine Trommeldurchmesser entwickelt. Überlappende Rollen verhindern Riefenbildung, während die kompakte Bauform das zuverlässige Aufweiten und 30°-Bördeln von Kesselrohren mit Außendurchmessern von 1 bis 4.1\/2 Zoll ermöglicht.\u003c\/p\u003e\n\u003c\/section\u003e\n\u003c\/div\u003e\n","brand":"Powermaster","offers":[{"title":"Default Title","offer_id":56794956136774,"sku":"P 1000 Serie","price":0.0,"currency_code":"EUR","in_stock":true}],"thumbnail_url":"\/\/cdn.shopify.com\/s\/files\/1\/0947\/6456\/4806\/files\/p100seriepng-60754.png?v=1781602304","url":"https:\/\/hytool.de\/products\/p1000serie","provider":"hytool","version":"1.0","type":"link"}