{"product_id":"p300-serie","title":"Kesselrohr Expander P3000 Serie","description":"\u003cdiv class=\"hytool-p3000-series\" lang=\"de\"\u003e\n\u003cstyle type=\"text\/css\"\u003e.hytool-p3000-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-p3000-series *{box-sizing:border-box;}\n    .hytool-p3000-series h2,.hytool-p3000-series h3{color:var(--hy);margin:0 0 12px;line-height:1.2;font-weight:700;}\n    .hytool-p3000-series h2{font-size:clamp(24px,3vw,34px);}\n    .hytool-p3000-series h3{font-size:clamp(18px,2.1vw,24px);margin-top:24px;}\n    .hytool-p3000-series p{margin:0 0 14px;}\n    .hytool-p3000-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-p3000-series .badges{display:flex;flex-wrap:wrap;gap:8px;margin-top:14px;}\n    .hytool-p3000-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-p3000-series .info-box{background:#fff;border:1px solid var(--line);border-radius:14px;padding:18px;margin:0 0 18px;}\n    .hytool-p3000-series .uses{margin:0 0 14px;padding-left:18px;}\n    .hytool-p3000-series .uses li{margin:6px 0;}\n    .hytool-p3000-series .facts{width:100%;border-collapse:collapse;table-layout:auto;margin-top:12px;font-size:14px;}\n    .hytool-p3000-series .graph-wrap{background:#fff;border:1px solid var(--line);border-radius:14px;padding:12px;margin:0 0 20px;text-align:center;}\n    .hytool-p3000-series .graph-img{width:100%;max-width:420px;height:auto;display:block;margin:0 auto;border-radius:10px;image-rendering:auto;}\n    .hytool-p3000-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-p3000-series table{width:100%;border-collapse:collapse;table-layout:auto;}\n    .hytool-p3000-series th,.hytool-p3000-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-p3000-series .data-table{font-size:clamp(8px,.8vw,11px);line-height:1.18;min-width:1080px;}\n    .hytool-p3000-series thead tr:first-child th{background:var(--hy-dark);color:#fff;}\n    .hytool-p3000-series thead tr:nth-child(2) th{background:var(--hy);color:#fff;}\n    .hytool-p3000-series tbody tr:nth-child(even) td{background:#fafafa;}\n    .hytool-p3000-series .note{font-size:13px;color:var(--muted);margin-top:10px;}\n    .hytool-p3000-series .seo-block{background:#f7fbf8;border-left:5px solid var(--hy);padding:16px 18px;border-radius:10px;margin-top:22px;}\n    .hytool-p3000-series .meta{font-size:14px;color:var(--muted);}\n    @media(max-width:760px){.hytool-p3000-series{font-size:15px;}.hytool-p3000-series th,.hytool-p3000-series td{padding:4px 3px;}.hytool-p3000-series .data-table{font-size:8px;}}\n\u003c\/style\u003e\n\u003csection class=\"hero\"\u003e\n\u003ch2\u003eP-3000 Serie Kesselrohraufweiter mit Kragen\u003c\/h2\u003e\n\n\u003cp\u003eDie P-3000 Serie ist ein Kesselrohraufweiter mit Kragen für kontrollierte und reproduzierbare Aufweitungen in dicken Rohrböden und Trommeln. Der Kragen ermöglicht eine genaue Positionierung des Werkzeugs im Verhältnis zur Trommel, wodurch konstante Aufweitergebnisse erzielt werden.\u003c\/p\u003e\n\n\u003cp\u003eDie Serie wird typischerweise in Kombination mit der P-1000 Serie eingesetzt und ist für Rohrbodenstärken und Trommeln über 2.3\/4\" beziehungsweise 70 mm ausgelegt.\u003c\/p\u003e\n\n\u003cdiv class=\"badges\"\u003e\n\u003cspan class=\"badge\"\u003emit Collar\u003c\/span\u003e \u003cspan class=\"badge\"\u003efür Rohrböden über 70 mm\u003c\/span\u003e \u003cspan class=\"badge\"\u003eRohr-O.D. 1.1\/4\" bis 4.1\/2\"\u003c\/span\u003e \u003cspan class=\"badge\"\u003eModelle P3111\/7 bis P3394\/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\u003eder Kragen ermöglicht eine genaue Positionierung des Rohraufweiters im Verhältnis zur Trommel für gleichmäßige und reproduzierbare Aufweitungen\u003c\/li\u003e\n\t\u003cli\u003egeeignet für Kesselrohrböden und Trommeln mit Stärken über 2.3\/4\" (70 mm)\u003c\/li\u003e\n\t\u003cli\u003ewird normalerweise in Verbindung mit der P-1000 Serie verwendet\u003c\/li\u003e\n\t\u003cli\u003efür das präzise Aufweiten von Kesselrohren bei dicken Rohrbodenanwendungen\u003c\/li\u003e\n\u003c\/ul\u003e\n\n\u003ctable aria-label=\"Technische Eckdaten P-3000 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\u003e1.1\/4\" O.D. 16G bis 4.1\/2\" O.D. 7–14G\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\u003eP3111\/7 bis P3394\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003cth\u003eEinsatz\u003c\/th\u003e\n\t\t\t\u003ctd\u003efür dicke Rohrböden und Trommeln über 70 mm\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003cth\u003eKombination\u003c\/th\u003e\n\t\t\t\u003ctd\u003enormalerweise zusammen mit der P-1000 Serie\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-3000 Serie technische Grafik\" class=\"graph-wrap\"\u003e\u003cimg alt=\"P-3000 Serie Kesselrohraufweiter mit Collar, Over Roll, Tube Sheet Thickness und Tube Projection\" class=\"graph-img\" loading=\"lazy\" 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\"\u003e\u003c\/section\u003e\n\n\u003csection\u003e\n\u003ch3\u003eAuswahltabelle P-3000 Serie – ausschließlich Seite 1\u003c\/h3\u003e\n\n\u003cp\u003eDie folgende Tabelle enthält nur die Werkzeugdaten der ersten PDF-Seite. Die Ersatzteiltabelle der zweiten Seite wurde bewusst nicht übernommen. Alle Inhalte sind als echte HTML-Tabelle umgesetzt und damit für Shopify-Übersetzungsapps lesbar.\u003c\/p\u003e\n\n\u003cdiv class=\"table-wrap\"\u003e\n\u003ctable aria-label=\"P-3000 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=\"2\"\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\u003e4.3\/8\"\u003c\/th\u003e\n\t\t\t\u003cth\u003e5.3\/8\"\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\u003e1.1\/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\u003eP3111\/7\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\u003e13–16\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.095–.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\u003eP3118\/7\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\u003e5–7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.220–.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\u003eP3126\/7\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\u003eP3134\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3134\/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\u003eP3142\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3142\/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.095–.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\u003eP3150\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3150\/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\u003eP3158\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3158\/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 \u0026amp; 5\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.238 \u0026amp; .220\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\u003eP3166\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3166\/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\u003e6 \u0026amp; 7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.203 \u0026amp; .180\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\u003eP3174\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3174\/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\u003e8 \u0026amp; 9\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.165 \u0026amp; .148\u003c\/td\u003e\n\t\t\t\u003ctd\u003e46,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e1.838\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\u003eP3181\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3181\/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–.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\u003eP3189\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3189\/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\u003eP3197\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3197\/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\u003eP3205\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3205\/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\u003eP3213\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3213\/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\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.203\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\u003eP3221\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3221\/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 \u0026amp; 3\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.284 \u0026amp; .259\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.203–.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\u003eP3229\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3229\/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\u003e4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.238\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.3\/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\u003e60,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.389\u003c\/td\u003e\n\t\t\t\u003ctd\u003e70,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e2.756\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3237\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3237\/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\u003e5 \u0026amp; 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4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.284 \u0026amp; .238\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.3\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e9–12\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.148–.109\u003c\/td\u003e\n\t\t\t\u003ctd\u003e84,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.334\u003c\/td\u003e\n\t\t\t\u003ctd\u003e96,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.780\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3331\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3331\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e4\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\u003e3.3\/4\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\u003e86,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.413\u003c\/td\u003e\n\t\t\t\u003ctd\u003e98,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.858\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3339\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3339\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e7 \u0026amp; 8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.180 \u0026amp; .165\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4.1\/4\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\u003e88,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.492\u003c\/td\u003e\n\t\t\t\u003ctd\u003e100,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.937\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3347\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3347\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e9–12\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.148–.109\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3 \u0026amp; 4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.284 \u0026amp; .238\u003c\/td\u003e\n\t\t\t\u003ctd\u003e90,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.570\u003c\/td\u003e\n\t\t\t\u003ctd\u003e102,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4.016\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3355\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3355\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e4\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\u003e4.1\/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\u003e92,7\u003c\/td\u003e\n\t\t\t\u003ctd\u003e3.649\u003c\/td\u003e\n\t\t\t\u003ctd\u003e104,0\u003c\/td\u003e\n\t\t\t\u003ctd\u003e4.094\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3363\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3363\/11\u003c\/td\u003e\n\t\t\u003c\/tr\u003e\n\t\t\u003ctr\u003e\n\t\t\t\u003ctd\u003e4\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\u003e4.1\/4\u003c\/td\u003e\n\t\t\t\u003ctd\u003e7 \u0026amp; 8\u003c\/td\u003e\n\t\t\t\u003ctd\u003e.203 \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\u003eP3370\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3370\/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\u003eP3378\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3378\/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.238–.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\u003eP3386\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3386\/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\u003eP3394\/7\u003c\/td\u003e\n\t\t\t\u003ctd\u003eP3394\/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 \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-3000 Serie Kesselrohraufweiter mit Collar ist für dicke Rohrböden und Trommeln über 70 mm ausgelegt. Der Collar ermöglicht eine exakte Positionierung des Werkzeugs für gleichmäßige Aufweitungen. Die Serie wird typischerweise zusammen mit der P-1000 Serie eingesetzt und deckt Größen von 1.1\/4 bis 4.1\/2 Zoll ab.\u003c\/p\u003e\n\u003c\/section\u003e\n\u003c\/div\u003e\n","brand":"Powermaster","offers":[{"title":"Default Title","offer_id":56842677190982,"sku":"P 3000 Serie","price":0.0,"currency_code":"EUR","in_stock":true}],"thumbnail_url":"\/\/cdn.shopify.com\/s\/files\/1\/0947\/6456\/4806\/files\/p3000png-60782.png?v=1782290968","url":"https:\/\/hytool.de\/products\/p300-serie","provider":"hytool","version":"1.0","type":"link"}