{"id":15042,"date":"2024-11-07T11:42:47","date_gmt":"2024-11-07T11:42:47","guid":{"rendered":"https:\/\/www.plastitaliaspa.com\/?page_id=15042"},"modified":"2024-11-29T08:33:12","modified_gmt":"2024-11-29T08:33:12","slug":"calcolatore-pressione-collaudo","status":"publish","type":"page","link":"https:\/\/www.plastitaliaspa.com\/it\/calcolatore-pressione-collaudo\/","title":{"rendered":"Calcolatore Pressione di Collaudo"},"content":{"rendered":"\t\t<div data-elementor-type=\"wp-page\" data-elementor-id=\"15042\" class=\"elementor elementor-15042\" data-elementor-post-type=\"page\">\n\t\t\t\t<div class=\"elementor-element elementor-element-322f074 e-con-full e-flex e-con e-parent\" data-id=\"322f074\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t<div class=\"elementor-element elementor-element-1be43b7 elementor-widget elementor-widget-shortcode\" data-id=\"1be43b7\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"shortcode.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t<div class=\"elementor-shortcode\">\t\t<div data-elementor-type=\"container\" data-elementor-id=\"7384\" class=\"elementor elementor-7384\" data-elementor-post-type=\"elementor_library\">\n\t\t\t\t<div class=\"elementor-element elementor-element-400b2179 e-flex e-con-boxed e-con e-parent\" data-id=\"400b2179\" data-element_type=\"container\" data-e-type=\"container\" data-settings=\"{&quot;background_background&quot;:&quot;classic&quot;}\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t<div class=\"elementor-element elementor-element-792b9c5a e-con-full e-flex e-con e-child\" data-id=\"792b9c5a\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t<div class=\"elementor-element elementor-element-0634882 elementor-widget elementor-widget-heading\" data-id=\"0634882\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Calcolatore Pressione di Collaudo<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-c0877c7 e-flex e-con-boxed e-con e-parent\" data-id=\"c0877c7\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t<div class=\"elementor-element elementor-element-d44f8e1 e-flex e-con-boxed e-con e-child\" data-id=\"d44f8e1\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-4f05f45 elementor-widget elementor-widget-heading\" data-id=\"4f05f45\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\"><span style=\"font-family: Poppins, Arial, sans-serif;text-align: var(--text-align);background-color: var( --e-global-color-29919f1 )\">Calcolatore Pressione di Collaudo<\/span><\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-fc282a0 elementor-widget elementor-widget-text-editor\" data-id=\"fc282a0\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Il Calcolatore di Pressione di Collaudo permette di calcolare la pressione di collaudo per impianti realizzati con tubazioni in polietilene. Calcola anche la relazione tra pressione e quantit\u00e0 di acqua da spillare per la verifica della presenza di aria nella tubazione. Suggerisce la massima quantit\u00e0 di acqua da immettere nel sistema per permettere l&#8217;evacuazione dell&#8217;aria prima del collaudo. E&#8217; sufficiente selezionare il diametro del tubo, il valore di SDR, il modulo elastico, la lunghezza del tubo sotto collaudo e la pressione di esercizio.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-230ad4e e-con-full e-flex e-con e-parent\" data-id=\"230ad4e\" data-element_type=\"container\" data-e-type=\"container\" data-settings=\"{&quot;background_background&quot;:&quot;classic&quot;}\">\n\t\t\t\t<div class=\"elementor-element elementor-element-6196345 elementor-widget elementor-widget-shortcode\" data-id=\"6196345\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"shortcode.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t<div class=\"elementor-shortcode\"><head>\r\n    <script src=\"https:\/\/unpkg.com\/@popperjs\/core@2\/dist\/umd\/popper.min.js\"><\/script>\r\n    <script src=\"https:\/\/unpkg.com\/tippy.js@6\/dist\/tippy-bundle.umd.js\"><\/script>\r\n<script src=\"https:\/\/cdn.jsdelivr.net\/npm\/chart.js\"><\/script>\r\n<script src=\"https:\/\/cdnjs.cloudflare.com\/ajax\/libs\/jspdf\/2.4.0\/jspdf.umd.min.js\"><\/script>\r\n<script src=\"https:\/\/cdnjs.cloudflare.com\/ajax\/libs\/html2canvas\/1.4.1\/html2canvas.min.js\"><\/script>\r\n<\/head>\r\n\r\n<style>\r\n\/* Popup styles *\/\r\n.popup {\r\n    display: none;\r\n    position: fixed;\r\n    top: 0;\r\n    left: 0;\r\n    width: 100%;\r\n    height: 100%;\r\n    background-color: rgba(0, 0, 0, 0.5);\r\n    z-index: 9999;\r\n}\r\n\r\n        #chartContainer {\r\n            max-width: 600px;\r\n            width: 100%;\r\n\r\n            height: 400px;\r\n            margin-top: 20px;\r\n            \r\n        }\r\n\r\n        \/* Nascondi i moduli all'inizio *\/\r\n        #form-yes, #form-no {\r\n            display: none;\r\n        }\r\n\r\n\r\n#converted-value::placeholder {\r\n    color: #242424;\r\n}\r\n\r\ninput[type=number]::-webkit-outer-spin-button,\r\ninput[type=number]::-webkit-inner-spin-button {\r\n    -webkit-appearance: none;\r\n    margin: 0;\r\n}\r\ninput[type=number] {\r\n    -moz-appearance: textfield;\r\n}\r\n@media (max-width: 768px) {\r\n    #container {\r\n        flex-direction: column; \/* Cambia il layout a colonna su schermi piccoli *\/\r\n    }\r\n\r\n    #form-container {\r\n        order: 1; \/* Imposta l'ordine del contenitore per i parametri di inserimento *\/\r\n        width: 100%; \/* Assicura che il contenitore occupi tutta la larghezza *\/\r\n    }\r\n\r\n    #result-container {\r\n        order: 2; \/* Imposta l'ordine del contenitore per i risultati *\/\r\n        width: 100%; \/* Assicura che il contenitore occupi tutta la larghezza *\/\r\n        margin-top: 20px; \/* Aggiungi uno spazio sopra ai risultati *\/\r\n    }\r\n}\r\n\r\n.popup-content {\r\n    position: absolute;\r\n    top: 50%;\r\n    left: 50%;\r\n    transform: translate(-50%, -50%);\r\n    background-color: black;\r\n    padding: 20px;\r\n    border-radius: 10px;\r\n    max-width: 80%;\r\n    text-align: center;\r\n    color: white;\r\n}\r\n\r\n\/* Main container for form and results *\/\r\n#container {\r\n    display: flex;\r\n    justify-content: space-between;\r\n    align-items: flex-start;\r\n    width: 100%;\r\n    padding: 0 5%;\r\n    gap: 10%;\r\n    margin-top: 20px;\r\n    background-color: black;\r\n}\r\n\r\n.calculator-container #form-container,\r\n.calculator-container #result-container {\r\n    flex: 1 1 45%;\r\n    padding: 20px;\r\n    box-sizing: border-box;\r\n    color: white;\r\n}\r\n\r\n.calculator-container #result-container {\r\n    text-align: left;\r\n}\r\n\r\n\/* Label and input styles *\/\r\n.calculator-container label {\r\n    display: block;\r\n    margin-bottom: 10px;\r\n}\r\n\r\n.calculator-container input, \r\n.calculator-container select {\r\n    color: white;\r\n    border-radius: 25px;\r\n    border: 0 solid #FFF200;\r\n    width: 100%;\r\n    padding: 8px;\r\n    background-color: #242424;\r\n    margin-bottom: 15px;\r\n    height: 48px;\r\n}\r\n\r\n.calculator-container button {\r\n    border: 1px solid #fff;\r\n    border-radius: 40px;\r\n    padding: 10px 20px;\r\n    transition: all 0.5s ease;\r\n    margin: 0 5px;\r\n    background-color: black;\r\n    color: white;\r\n}\r\n\r\n.calculator-container button:hover {\r\n    color: black;\r\n    background-color: yellow;\r\n}\r\n\r\n.calculator-container #result {\r\n    margin-top: 20px;\r\n    color: white !important;\r\n}\r\n\r\n\/* Global styles *\/\r\n.calculator-container * {\r\n    box-sizing: border-box;\r\n    margin: 0;\r\n    padding: 0;\r\n}\r\n\r\n.calculator-container a {\r\n    text-decoration: none;\r\n    color: inherit;\r\n}\r\n\r\n.calculator-container .hr-text {\r\n    border: 0;\r\n    font-size: 14px;\r\n    height: 1.5em;\r\n    line-height: 1em;\r\n    position: relative;\r\n    text-align: center;\r\n}\r\n\r\n.calculator-container .hr-text::before {\r\n    content: \"\";\r\n    background: #FFF800;\r\n    position: absolute;\r\n    left: 0;\r\n    top: 50%;\r\n    width: 100%;\r\n    height: 1px;\r\n}\r\n\r\n.calculator-container .hr-text::after {\r\n    background: black;\r\n    color: #FFF800;\r\n    content: attr(data-content);\r\n    line-height: 1.5em;\r\n    padding: 0 7px;\r\n    position: relative;\r\n}\r\n\r\n\/* Stile per il bottone \"Superata\" *\/\r\n.result-button.superata {\r\n    display: inline-block;\r\n    padding: 10px 20px;\r\n    border: 2px solid green;\r\n    color: green;\r\n    background-color: transparent;\r\n    text-align: center;\r\n    font-weight: bold;\r\n    border-radius: 0; \/* Bordo rettangolare *\/\r\n    cursor: default;\r\n}\r\n\r\n\/* Stile per il bottone \"Non Superata\" *\/\r\n.result-button.non-superata {\r\n    display: inline-block;\r\n    padding: 10px 20px;\r\n    border: 2px solid red;\r\n    color: red;\r\n    background-color: transparent;\r\n    text-align: center;\r\n    font-weight: bold;\r\n    border-radius: 0; \/* Bordo rettangolare *\/\r\n    cursor: default;\r\n}\r\n<\/style>\r\n\r\n<head>\r\n    <script src=\"https:\/\/unpkg.com\/@popperjs\/core@2\/dist\/umd\/popper.min.js\"><\/script>\r\n    <script src=\"https:\/\/unpkg.com\/tippy.js@6\/dist\/tippy-bundle.umd.js\"><\/script>\r\n<script src=\"https:\/\/cdn.jsdelivr.net\/npm\/chart.js\"><\/script>\r\n<script src=\"https:\/\/cdnjs.cloudflare.com\/ajax\/libs\/jspdf\/2.4.0\/jspdf.umd.min.js\"><\/script>\r\n<script src=\"https:\/\/cdnjs.cloudflare.com\/ajax\/libs\/html2canvas\/1.4.1\/html2canvas.min.js\"><\/script>\r\n<\/head>\r\n\r\n<div class=\"popup\" id=\"popup\">\r\n    <div class=\"popup-content\">\r\n        <h2>ATTENZIONE<\/h2>\r\n        <p>La rappresentazione dei risultati degli strumenti di calcolo qui proposti ha quale esclusivo scopo quello di fornire informazioni generali. Plastitalia S.p.A. non fornisce alcuna garanzia sia espressa che implicita circa i risultati forniti dai predetti strumenti di calcolo.<\/p>\r\n        <p><input name=\"disclaimer\" style=\"height:15px; width: 2%;\" type=\"radio\" value=\"accetta\" \/> Accetta la liberatoria di limitazione di responsabilit\u00e0<\/p>\r\n        <p><input name=\"disclaimer\" style=\"height:15px; width: 2%;\" type=\"radio\" value=\"rifiuta\" \/> Rifiuta<\/p>\r\n    <\/div>\r\n<\/div>\r\n\r\n<!-- Contenitore principale per domanda e risultati -->\r\n<div id=\"container\" class=\"calculator-container\">\r\n    <!-- Colonna di sinistra per la domanda o il modulo -->\r\n    <div id=\"form-container\">\r\n        <div id=\"question-container\"><center>\r\n            <p>Desideri calcolare la Pressione di Collaudo dell\u2019Impianto in Polietilene fornendo il dato della Massima Pressione di Progetto compresa del Colpo d\u2019Ariete calcolato?<\/p><br>\r\n            <button onclick=\"showForm('yes')\">Si (MDPc)<\/button>\r\n            <button onclick=\"showForm('no')\">No (MDPa)<\/button><br><br>\r\n            <p>Nota: la pressione MDPa dovrebbe avere un valore comprensivo di 200 kPa relativo al Colpo d\u2019Ariete.\r\n            <\/p>\r\n            <\/center>\r\n        <\/div>\r\n\r\n         <!-- Modulo per la scelta \"SI\" -->\r\n        <div id=\"form-yes\">\r\n            <label for=\"diameter\">Diametro del Tubo (mm):<\/label>\r\n            <select id=\"diameter\">\r\n                <!-- Opzioni del diametro -->\r\n<option value=\"25\">25<\/option>\r\n                <option value=\"32\">32<\/option>\r\n                <option value=\"40\">40<\/option>\r\n                <option value=\"50\">50<\/option>\r\n                <option value=\"63\">63<\/option>\r\n                <option value=\"75\">75<\/option>\r\n                <option value=\"90\">90<\/option>\r\n                <option value=\"110\">110<\/option>\r\n                <option value=\"125\">125<\/option>\r\n                <option value=\"140\">140<\/option>\r\n                <option value=\"160\">160<\/option>\r\n                <option value=\"180\">180<\/option>\r\n                <option value=\"200\">200<\/option>\r\n                <option value=\"225\">225<\/option>\r\n                <option value=\"250\">250<\/option>\r\n                <option value=\"280\">280<\/option>\r\n                <option value=\"315\">315<\/option>\r\n                <option value=\"355\">355<\/option>\r\n                <option value=\"400\">400<\/option>\r\n                <option value=\"450\">450<\/option>\r\n                <option value=\"500\">500<\/option>\r\n                <option value=\"560\">560<\/option>\r\n                <option value=\"630\">630<\/option>\r\n                <option value=\"710\">710<\/option>\r\n                <option value=\"800\">800<\/option>\r\n                <option value=\"900\">900<\/option>\r\n                <option value=\"1000\">1000<\/option>\r\n                <option value=\"1200\">1200<\/option>\r\n                <option value=\"1400\">1400<\/option>\r\n                <option value=\"1600\">1600<\/option>\r\n                <option value=\"1800\">1800<\/option>\r\n                <option value=\"2000\">2000<\/option>\r\n                <option value=\"2250\">2250<\/option>\r\n                <option value=\"2500\">2500<\/option>\r\n                <option value=\"2800\">2800<\/option>\r\n                <option value=\"3000\">3000<\/option>\r\n            <\/select>\r\n\r\n            <label for=\"sdr\">SDR:<\/label>\r\n            <select id=\"sdr\">\r\n                <!-- Opzioni per SDR -->\r\n<option value=\"6\">6<\/option>\r\n                <option value=\"7.4\">7.4<\/option>\r\n                <option value=\"9\">9<\/option>\r\n                <option value=\"11\">11<\/option>\r\n                <option value=\"13.6\">13.6<\/option>\r\n                <option value=\"17\">17<\/option>\r\n                <option value=\"21\">21<\/option>\r\n                <option value=\"26\">26<\/option>\r\n                <option value=\"33\">33<\/option>\r\n                <option value=\"41\">41<\/option>\r\n            <\/select>\r\n\r\n            <label for=\"modulo-elastico\">Modulo Elastico E (MPa) <span style=\"color: #FFF800;\" id=\"info-icon-modulo-elastico\" class=\"fas fa-info-circle\">&nbsp;<\/span>:<\/label>\r\n            <select id=\"modulo-elastico\">\r\n                <!-- Opzioni per Modulo Elastico -->\r\n                    <option value=\"800\">800<\/option>\r\n        <option value=\"900\">900<\/option>\r\n        <option value=\"1000\">1000<\/option>\r\n        <option value=\"1100\">1100<\/option>\r\n        <option value=\"1200\">1200<\/option>\r\n            <\/select>\r\n\r\n            <label for=\"tube-length\">Lunghezza del Tubo sotto Collaudo (m):<\/label>\r\n            <input type=\"number\" id=\"tube-length\" min=\"0\" step=\"0.01\"  required>\r\n\r\n            <label for=\"pressione-esercizio\">Pressione di Esercizio - MDPc - (bar):<\/label>\r\n            <select id=\"pressione-esercizio\">\r\n                <!-- Opzioni della pressione di esercizio -->\r\n    <option value=\"0\">0<\/option>\r\n    <option value=\"0.5\">0,5<\/option>\r\n    <option value=\"1\">1<\/option>\r\n    <option value=\"2\">2<\/option>\r\n    <option value=\"2.5\">2,5<\/option>\r\n    <option value=\"3\">3<\/option>\r\n    <option value=\"3.5\">3,5<\/option>\r\n    <option value=\"4\">4<\/option>\r\n    <option value=\"4.5\">4,5<\/option>\r\n    <option value=\"5\">5<\/option>\r\n    <option value=\"5.5\">5,5<\/option>\r\n    <option value=\"6\">6<\/option>\r\n    <option value=\"6.5\">6,5<\/option>\r\n    <option value=\"7\">7<\/option>\r\n    <option value=\"7.5\">7,5<\/option>\r\n    <option value=\"8\">8<\/option>\r\n    <option value=\"8.5\">8,5<\/option>\r\n    <option value=\"9\">9<\/option>\r\n    <option value=\"9.5\">9,5<\/option>\r\n    <option value=\"10\">10<\/option>\r\n    <option value=\"10.5\">10,5<\/option>\r\n    <option value=\"11\">11<\/option>\r\n    <option value=\"11.5\">11,5<\/option>\r\n    <option value=\"12\">12<\/option>\r\n    <option value=\"12.5\">12,5<\/option>\r\n    <option value=\"13\">13<\/option>\r\n    <option value=\"13.5\">13,5<\/option>\r\n    <option value=\"14\">14<\/option>\r\n    <option value=\"14.5\">14,5<\/option>\r\n    <option value=\"15\">15<\/option>\r\n    <option value=\"15.5\">15,5<\/option>\r\n    <option value=\"16\">16<\/option>\r\n    <option value=\"16.5\">16,5<\/option>\r\n    <option value=\"17\">17<\/option>\r\n    <option value=\"17.5\">17,5<\/option>\r\n    <option value=\"18\">18<\/option>\r\n    <option value=\"18.5\">18,5<\/option>\r\n    <option value=\"19\">19<\/option>\r\n    <option value=\"19.5\">19,5<\/option>\r\n    <option value=\"20\">20<\/option>\r\n    <option value=\"20.5\">20,5<\/option>\r\n    <option value=\"21\">21<\/option>\r\n    <option value=\"21.5\">21,5<\/option>\r\n    <option value=\"22\">22<\/option>\r\n    <option value=\"22.5\">22,5<\/option>\r\n    <option value=\"23\">23<\/option>\r\n    <option value=\"23.5\">23,5<\/option>\r\n    <option value=\"24\">24<\/option>\r\n    <option value=\"24.5\">24,5<\/option>\r\n    <option value=\"25\">25<\/option>\r\n            <\/select>\r\n\r\n            <label for=\"delta-p\">\u0394p (bar) <span style=\"color:#FFF800;\" id=\"info-icon\" class=\"fas fa-info-circle\" title=\"\">&nbsp;<\/span>:<\/label>\r\n            <div style=\"display: flex; align-items: center;\">\r\n                <input type=\"number\" id=\"delta-p\" min=\"0\" step=\"0.01\" required>\r\n\r\n            <\/div>\r\n             <button type=\"button\" onclick=\"goBack()\">Indietro<\/button>\r\n            <button onclick=\"calculatesi()\">Calcola<\/button>\r\n            <button type=\"button\" onclick=\"resetCalculator()\">Reset<\/button>\r\n\r\n        <\/div>\r\n\r\n        <!-- Modulo per la scelta \"NO\" -->\r\n        <div id=\"form-no\">\r\n            <label for=\"diameter1\">Diametro del Tubo (mm):<\/label>\r\n            <select id=\"diameter1\">\r\n                <!-- Opzioni del diametro -->\r\n<option value=\"25\">25<\/option>\r\n                <option value=\"32\">32<\/option>\r\n                <option value=\"40\">40<\/option>\r\n                <option value=\"50\">50<\/option>\r\n                <option value=\"63\">63<\/option>\r\n                <option value=\"75\">75<\/option>\r\n                <option value=\"90\">90<\/option>\r\n                <option value=\"110\">110<\/option>\r\n                <option value=\"125\">125<\/option>\r\n                <option value=\"140\">140<\/option>\r\n                <option value=\"160\">160<\/option>\r\n                <option value=\"180\">180<\/option>\r\n                <option value=\"200\">200<\/option>\r\n                <option value=\"225\">225<\/option>\r\n                <option value=\"250\">250<\/option>\r\n                <option value=\"280\">280<\/option>\r\n                <option value=\"315\">315<\/option>\r\n                <option value=\"355\">355<\/option>\r\n                <option value=\"400\">400<\/option>\r\n                <option value=\"450\">450<\/option>\r\n                <option value=\"500\">500<\/option>\r\n                <option value=\"560\">560<\/option>\r\n                <option value=\"630\">630<\/option>\r\n                <option value=\"710\">710<\/option>\r\n                <option value=\"800\">800<\/option>\r\n                <option value=\"900\">900<\/option>\r\n                <option value=\"1000\">1000<\/option>\r\n                <option value=\"1200\">1200<\/option>\r\n                <option value=\"1400\">1400<\/option>\r\n                <option value=\"1600\">1600<\/option>\r\n                <option value=\"1800\">1800<\/option>\r\n                <option value=\"2000\">2000<\/option>\r\n                <option value=\"2250\">2250<\/option>\r\n                <option value=\"2500\">2500<\/option>\r\n                <option value=\"2800\">2800<\/option>\r\n                <option value=\"3000\">3000<\/option>\r\n            <\/select>\r\n\r\n            <label for=\"sdr1\">SDR:<\/label>\r\n            <select id=\"sdr1\">\r\n                <!-- Opzioni per SDR -->\r\n<option value=\"6\">6<\/option>\r\n                <option value=\"7.4\">7.4<\/option>\r\n                <option value=\"9\">9<\/option>\r\n                <option value=\"11\">11<\/option>\r\n                <option value=\"13.6\">13.6<\/option>\r\n                <option value=\"17\">17<\/option>\r\n                <option value=\"21\">21<\/option>\r\n                <option value=\"26\">26<\/option>\r\n                <option value=\"33\">33<\/option>\r\n                <option value=\"41\">41<\/option>\r\n            <\/select>\r\n\r\n            <label for=\"modulo-elastico1\">Modulo Elastico E (MPa) <span style=\"color: #FFF800;\" id=\"info-icon-modulo-elastico\" class=\"fas fa-info-circle\">&nbsp;<\/span>:<\/label>\r\n            <select id=\"modulo-elastico1\">\r\n                <!-- Opzioni per Modulo Elastico -->\r\n                    <option value=\"800\">800<\/option>\r\n        <option value=\"900\">900<\/option>\r\n        <option value=\"1000\">1000<\/option>\r\n        <option value=\"1100\">1100<\/option>\r\n        <option value=\"1200\">1200<\/option>\r\n            <\/select>\r\n\r\n            <label for=\"tube-length1\">Lunghezza del Tubo sotto Collaudo (m):<\/label>\r\n            <input type=\"number\" id=\"tube-length1\" min=\"0\" step=\"0.01\"  required>\r\n\r\n            <label for=\"pressione-esercizio1\">Pressione di Esercizio - MDPa - (bar):<\/label>\r\n            <select id=\"pressione-esercizio1\">\r\n                <!-- Opzioni della pressione di esercizio -->\r\n    <option value=\"0\">0<\/option>\r\n    <option value=\"0.5\">0,5<\/option>\r\n    <option value=\"1\">1<\/option>\r\n    <option value=\"2\">2<\/option>\r\n    <option value=\"2.5\">2,5<\/option>\r\n    <option value=\"3\">3<\/option>\r\n    <option value=\"3.5\">3,5<\/option>\r\n    <option value=\"4\">4<\/option>\r\n    <option value=\"4.5\">4,5<\/option>\r\n    <option value=\"5\">5<\/option>\r\n    <option value=\"5.5\">5,5<\/option>\r\n    <option value=\"6\">6<\/option>\r\n    <option value=\"6.5\">6,5<\/option>\r\n    <option value=\"7\">7<\/option>\r\n    <option value=\"7.5\">7,5<\/option>\r\n    <option value=\"8\">8<\/option>\r\n    <option value=\"8.5\">8,5<\/option>\r\n    <option value=\"9\">9<\/option>\r\n    <option value=\"9.5\">9,5<\/option>\r\n    <option value=\"10\">10<\/option>\r\n    <option value=\"10.5\">10,5<\/option>\r\n    <option value=\"11\">11<\/option>\r\n    <option value=\"11.5\">11,5<\/option>\r\n    <option value=\"12\">12<\/option>\r\n    <option value=\"12.5\">12,5<\/option>\r\n    <option value=\"13\">13<\/option>\r\n    <option value=\"13.5\">13,5<\/option>\r\n    <option value=\"14\">14<\/option>\r\n    <option value=\"14.5\">14,5<\/option>\r\n    <option value=\"15\">15<\/option>\r\n    <option value=\"15.5\">15,5<\/option>\r\n    <option value=\"16\">16<\/option>\r\n    <option value=\"16.5\">16,5<\/option>\r\n    <option value=\"17\">17<\/option>\r\n    <option value=\"17.5\">17,5<\/option>\r\n    <option value=\"18\">18<\/option>\r\n    <option value=\"18.5\">18,5<\/option>\r\n    <option value=\"19\">19<\/option>\r\n    <option value=\"19.5\">19,5<\/option>\r\n    <option value=\"20\">20<\/option>\r\n    <option value=\"20.5\">20,5<\/option>\r\n    <option value=\"21\">21<\/option>\r\n    <option value=\"21.5\">21,5<\/option>\r\n    <option value=\"22\">22<\/option>\r\n    <option value=\"22.5\">22,5<\/option>\r\n    <option value=\"23\">23<\/option>\r\n    <option value=\"23.5\">23,5<\/option>\r\n    <option value=\"24\">24<\/option>\r\n    <option value=\"24.5\">24,5<\/option>\r\n    <option value=\"25\">25<\/option>\r\n            <\/select>\r\n\r\n\r\n             <button type=\"button\" onclick=\"goBack()\">Indietro<\/button>\r\n            <button onclick=\"calculateno()\">Calcola<\/button>\r\n            <button type=\"button\" onclick=\"resetCalculator()\">Reset<\/button>\r\n        <\/div>\r\n    <\/div>\r\n\r\n<div id=\"result-container\">\r\n    <h2 style=\"color:#FFF103;\">Risultati:<br><\/h2>\r\n    <div id=\"result\"><\/div>\r\n    <div id=\"result1\"><\/div>\r\n            <div id=\"chartContainer\">\r\n<h3 id=\"chartTitle\" style=\"display: none; color:#FFF103;\">Grafico relazione aria\/acqua\/pressione<\/h3><br>\r\n    <canvas id=\"chart\" width=\"400\" height=\"200\"><\/canvas><br><center>\r\n    <!-- Bottone Stampa per Sezione \"SI\" -->\r\n<button id=\"stampa-button\" style=\"display: none;\" onclick=\"generaPDF()\">Genera Report PDF<\/button>\r\n\r\n<!-- Bottone Stampa per Sezione \"NO\" -->\r\n<button id=\"stampa-button1\" style=\"display: none;\" onclick=\"generaPDF()\">Genera Report PDF<\/button><\/center>\r\n\r\n    <\/div>\r\n<\/div>\r\n\r\n<\/div>\r\n<script>\r\n \r\n    \r\n    function showForm(choice) {\r\n        \/\/ Nascondi la domanda e mostra il modulo corretto\r\n        document.getElementById('question-container').style.display = 'none';\r\n\r\n        if (choice === 'yes') {\r\n            document.getElementById('form-yes').style.display = 'block';\r\n        } else if (choice === 'no') {\r\n            document.getElementById('form-no').style.display = 'block';\r\n        }\r\n    }\r\n\r\n\r\nfunction calculatesi() {\r\n    \/\/ Ottieni i valori di input\r\n    const deltaP = parseFloat(document.getElementById('delta-p').value);\r\n    const sdr = parseInt(document.getElementById('sdr').value);\r\n    const diameter = parseFloat(document.getElementById('diameter').value);\r\n    const elasticModulus = parseFloat(document.getElementById('modulo-elastico').value); \r\n    const pipeLength = parseFloat(document.getElementById('tube-length').value);\r\n    const pressioneEsercizio = parseFloat(document.getElementById('pressione-esercizio').value); \r\n\r\n\r\n    \/\/ Calcolo della pressione di prova\r\n    const pressioneDiProva = (deltaP + pressioneEsercizio)+1;\r\n    const pressioneInterruzione = pressioneDiProva - (pressioneDiProva * 0.3);\r\n\r\n    \/\/ Tabella completa dei dati\r\n    const dataTable = [\r\n[25, 0.03, 0.02, 0.02, 0.03, 0.03, 0.04],\r\n        [32, 0.04, 0.03, 0.03, 0.04, 0.04, 0.06],\r\n        [40, 0.06, 0.04, 0.05, 0.05, 0.07, 0.09],\r\n        [50, 0.08, 0.05, 0.06, 0.07, 0.09, 0.12],\r\n        [63, 0.13, 0.09, 0.1, 0.12, 0.14, 0.18],\r\n        [75, 0.17, 0.11, 0.13, 0.15, 0.19, 0.23],\r\n        [90, 0.26, 0.17, 0.2, 0.23, 0.29, 0.38],\r\n        [110, 0.42, 0.28, 0.33, 0.37, 0.47, 0.62],\r\n        [125, 0.5, 0.33, 0.39, 0.44, 0.55, 0.72],\r\n        [140, 0.7, 0.47, 0.54, 0.62, 0.78, 1.01],\r\n        [160, 0.85, 0.57, 0.66, 0.76, 0.96, 1.23],\r\n        [180, 1.1, 0.73, 0.86, 0.98, 1.22, 1.59],\r\n        [200, 1.25, 0.83, 0.97, 1.11, 1.39, 1.81],\r\n        [225, 1.7, 1.13, 1.32, 1.51, 1.89, 2.46],\r\n        [250, 2.22, 1.48, 1.73, 1.97, 2.47, 3.11],\r\n        [280, 2.8, 1.87, 2.18, 2.49, 3.11, 3.9],\r\n        [315, 3.33, 2.22, 2.59, 2.96, 3.7, 4.7],\r\n        [355, 3.9, 2.6, 3.03, 3.47, 4.33, 5.58],\r\n        [400, 4.7, 3.13, 3.66, 4.18, 5.22, 6.72],\r\n        [450, 6.1, 4.07, 4.74, 5.42, 6.78, 8.75],\r\n        [500, 7.8, 5.2, 6.07, 6.93, 8.67, 11.27],\r\n        [560, 9.5, 6.33, 7.39, 8.44, 10.95, 13.89],\r\n        [630, 12.5, 8.33, 9.72, 11.11, 13.89, 17.5],\r\n        [710, 15.3, 10.2, 11.9, 13.6, 17, 22.18],\r\n        [800, 19.5, 13, 15.67, 17.93, 22.31, 28.17],\r\n        [900, 25, 16.67, 19.44, 22.22, 27.78, 36.11],\r\n        [1000, 30.5, 20.33, 23.72, 27.11, 33.89, 43.06],\r\n        [1200, 42, 28, 32.67, 37.33, 46.67, 59.44],\r\n        [1400, 62, 41.33, 48.22, 55.11, 68.89, 87.5],\r\n        [1600, 78, 52, 60.67, 69.33, 86.67, 112.5],\r\n        [1800, 97, 64.67, 75.44, 86.22, 107.78, 140.28],\r\n        [2000, 117, 78, 91, 104, 130, 169.44],\r\n        [2250, 153, 102, 119, 136, 170, 211],\r\n        [2500, 190, 126.67, 147.78, 168.89, 211.11, 264.44],\r\n        [2800, 230, 153.33, 178.89, 204.44, 255.56, 322.22],\r\n        [3000, 280, 186.67, 217.78, 248.89, 311.11, 374.44]\r\n    ];\r\n\r\n    \/\/ Funzione per eseguire la ricerca nella tabella\r\n    function cercaVert(diameter, columnIndex) {\r\n        for (let i = 0; i < dataTable.length; i++) {\r\n            if (dataTable[i][0] === diameter) {\r\n                return dataTable[i][columnIndex];\r\n            }\r\n        }\r\n        return null; \/\/ Se il valore non \u00e8 trovato\r\n    }\r\n\r\n    \/\/ Calcolo della portata massima di riempimento\r\n    let portataMassima;\r\n    if (sdr === 6) {\r\n        portataMassima = cercaVert(diameter, 2); \/\/ Colonna 3 (indice 2)\r\n    } else if (sdr === 7) {\r\n        portataMassima = 4; \/\/ Numero fisso\r\n    } else if (sdr === 9) {\r\n        portataMassima = cercaVert(diameter, 4); \/\/ Colonna 5 (indice 4)\r\n    } else if (sdr === 11) {\r\n        portataMassima = cercaVert(diameter, 1); \/\/ Colonna 2 (indice 1)\r\n    } else if (sdr === 17) {\r\n        portataMassima = cercaVert(diameter, 5); \/\/ Colonna 6 (indice 5)\r\n    } else if (sdr > 18) {\r\n        portataMassima = cercaVert(diameter, 6); \/\/ Colonna 7 (indice 6)\r\n    } else {\r\n        portataMassima = \"N\/A\"; \/\/ Valore non disponibile\r\n    }\r\n\r\n    \/\/ Calcoli per il \"Test massimi per lunghezza della condotta (m)\"\r\n    let testMassimi;\r\n    let volumeAdjusted;\r\n    const volume = diameter \/ 1000;\r\n    if (diameter < 1001) {\r\n        \/\/ 1) Calcolo del Volume\r\n\r\n        \/\/ 2) Calcolo: Volume - (Volume \/ SDR) * 2\r\n        volumeAdjusted = volume - (volume \/ sdr) * 2;\r\n        \/\/ 3) Calcolo: (Volume Adjusted)^2 * (3.14 \/ 4)\r\n        const calcolo3 = Math.pow(volumeAdjusted, 2) * (3.14 \/ 4);\r\n        \/\/ 4) Calcolo: 30 \/ Calcolo 3\r\n        const calcolo4 = 30 \/ calcolo3;\r\n        \/\/ 5) Verifica se Calcolo 4 \u00e8 maggiore di 501\r\n        testMassimi = calcolo4 > 501 ? 500 : Math.ceil(calcolo4);\r\n    } else {\r\n        testMassimi = \"\"; \/\/ Stringa vuota se il diametro \u00e8 maggiore o uguale a 1001\r\n    }\r\n    \r\n  \/\/ Perform additional calculations for the graph\r\n    const N2 = ((volumeAdjusted \/ 2) ** 2 * 3.14) * pipeLength;\r\n    const L4 = 1 \/ 2200000;\r\n    const L5 = diameter \/ sdr;\r\n    const L6 = elasticModulus * 1000;\r\n    const L7 = 1.2 * N2;\r\n    const L8 = L5 * L6;\r\n    const L9 = volume \/ L8;\r\n    const L10 = L4 + L9;\r\n    const L11 = L7 * L10;\r\n    const L12 = L11 * 1000;\r\n    \r\n    \/\/ Prepare data for the graph\r\n    const pValues = [10, 20, 30, 40, 50, 60, 70, 80, 90, 100, 110, 120, 130, 140, 150, 160, 170, 180, 190, 200, 250, 300, 400, 500, 600, 700, 750];\r\nconst qValues = pValues.map(() => L12); \/\/ Q values are dynamically set to L12\r\n\r\n\/\/ Prepare data for the graph using values from the uploaded table image\r\n    const rValues = [0.1, 0.2, 0.3, 0.4, 0.5, 0.6, 0.7, 0.8, 0.9, 1.0, 1.1, 1.2, 1.3, 1.4, 1.5, 1.6, 1.7, 1.8, 1.9, 2.0, 2.5, 3.0, 4.0, 5.0, 6.0, 7.0, 7.5];\r\nconst sValues = pValues.map((p, index) => p * qValues[index]); \/\/ S values are calculated as P * Q\r\n\r\n  \/\/ Crea le etichette combinate di r e s su due righe\r\nconst combinedLabels = rValues.map((r, index) => [`${r}`, `${sValues[index].toFixed(2)}`]);\r\n\r\n\/\/ Disegna il grafico usando Chart.js\r\nconst ctx = document.getElementById('chart').getContext('2d');\r\nif (window.myChart) {\r\n    window.myChart.destroy(); \/\/ Distruggi l'istanza precedente\r\n}\r\nwindow.myChart = new Chart(ctx, {\r\n    type: 'line',\r\n    data: {\r\n        labels: combinedLabels, \/\/ Usa le etichette multi-linea\r\n        datasets: [{\r\n            label: 'Relazione tra Riduzione di Pressione e Acqua Spillata ',\r\n            data: sValues,\r\n            borderColor: 'blue',\r\n            fill: false\r\n        }]\r\n    },\r\n    options: {\r\n        responsive: true,\r\n        plugins: {\r\n            legend: {\r\n                labels: {\r\n                    color: 'white' \/\/ Colore bianco per il testo della legenda\r\n                }\r\n            }\r\n        },\r\n        scales: {\r\n            x: {\r\n                title: {\r\n                    display: true,\r\n                    text: 'Riduzione della pressione (bar), Acqua spillata (l)',\r\n                    color: 'white' \/\/ Colore bianco per il titolo dell'asse x\r\n                },\r\n                ticks: {\r\n                    color: 'white', \/\/ Colore bianco per le etichette dell'asse x\r\n                    callback: function(value, index) {\r\n                        return combinedLabels[index]; \/\/ Mostra le etichette multi-linea\r\n                    }\r\n                }\r\n            },\r\n            y: {\r\n                title: {\r\n                    display: true,\r\n                    text: 'Acqua spillata (l)',\r\n                    color: 'white' \/\/ Colore bianco per il titolo dell'asse y\r\n                },\r\n                ticks: {\r\n                    color: 'white' \/\/ Colore bianco per le etichette dell'asse y\r\n                }\r\n            }\r\n        }\r\n    }\r\n});\r\n    document.getElementById('chartTitle').style.display = 'block';\r\n    \r\n    \r\n\r\n    \/\/ Mostra i risultati nella sezione dei risultati\r\n    document.getElementById('result').innerHTML = `\r\n        <p>Pressione di prova (bar): ${pressioneDiProva.toFixed(2)}<\/p>\r\n        <p>Durata prova (h): 1,5<\/p>\r\n        <p>Interrompere il processo se la pressione di collaudo scende al di sotto di: ${pressioneInterruzione.toFixed(2)} bar<\/p>\r\n        <p>Portata massima di riempimento (l\/s): ${portataMassima !== null ? portataMassima : \"N\/A\"}<\/p>\r\n        <p>Lunghezza massima della tubazione da porre in prova (m): ${testMassimi}<\/p>\r\n    `;\r\n    \r\n        \/\/ Mostra il bottone \"Stampa Risultati\"\r\n    document.getElementById('stampa-button').style.display = 'block';\r\n}\r\n\r\n\r\n\r\nfunction calculateno() {\r\n    \/\/ Ottieni i valori di input\r\n    const mdpa = parseFloat(document.getElementById('pressione-esercizio1').value);\r\n    const sdr = parseFloat(document.getElementById('sdr1').value);\r\n    const diameter = parseFloat(document.getElementById('diameter1').value);\r\n    const elasticModulus = parseFloat(document.getElementById('modulo-elastico1').value);\r\n    const pipeLength = parseFloat(document.getElementById('tube-length1').value);\r\n\r\n    \/\/ 1) Calcolo della pressione di prova: Pprova = MDPa * 1.5\r\n    const pProva = mdpa * 1.5;\r\n\r\n    \/\/ 2) Calcolo: Pprova - MDPa\r\n    const m15 = mdpa + 5;\r\n\r\n    \/\/ 3) Condizione: Se M15 \u00e8 minore o uguale a 4,9, restituisci M15\r\n    \/\/ Altrimenti, restituisci il valore di MDPa aumentato di 5\r\n    const pressioneDiProva1 = pProva <= m15 ? pProva : m15;\r\n\r\n    \/\/ Calcolo della pressione al di sotto della quale il processo deve essere interrotto\r\n    const pressioneInterruzione1 = pressioneDiProva1 - (pressioneDiProva1 * 0.3);\r\n\r\n    \/\/ Tabella completa dei dati\r\n    const dataTable = [\r\n        [25, 0.03, 0.02, 0.02, 0.03, 0.03, 0.04],\r\n        [32, 0.04, 0.03, 0.03, 0.04, 0.04, 0.06],\r\n        [40, 0.06, 0.04, 0.05, 0.05, 0.07, 0.09],\r\n        [50, 0.08, 0.05, 0.06, 0.07, 0.09, 0.12],\r\n        [63, 0.13, 0.09, 0.1, 0.12, 0.14, 0.18],\r\n        [75, 0.17, 0.11, 0.13, 0.15, 0.19, 0.23],\r\n        [90, 0.26, 0.17, 0.2, 0.23, 0.29, 0.38],\r\n        [110, 0.42, 0.28, 0.33, 0.37, 0.47, 0.62],\r\n        [125, 0.5, 0.33, 0.39, 0.44, 0.55, 0.72],\r\n        [140, 0.7, 0.47, 0.54, 0.62, 0.78, 1.01],\r\n        [160, 0.85, 0.57, 0.66, 0.76, 0.96, 1.23],\r\n        [180, 1.1, 0.73, 0.86, 0.98, 1.22, 1.59],\r\n        [200, 1.25, 0.83, 0.97, 1.11, 1.39, 1.81],\r\n        [225, 1.7, 1.13, 1.32, 1.51, 1.89, 2.46],\r\n        [250, 2.22, 1.48, 1.73, 1.97, 2.47, 3.11],\r\n        [280, 2.8, 1.87, 2.18, 2.49, 3.11, 3.9],\r\n        [315, 3.33, 2.22, 2.59, 2.96, 3.7, 4.7],\r\n        [355, 3.9, 2.6, 3.03, 3.47, 4.33, 5.58],\r\n        [400, 4.7, 3.13, 3.66, 4.18, 5.22, 6.72],\r\n        [450, 6.1, 4.07, 4.74, 5.42, 6.78, 8.75],\r\n        [500, 7.8, 5.2, 6.07, 6.93, 8.67, 11.27],\r\n        [560, 9.5, 6.33, 7.39, 8.44, 10.95, 13.89],\r\n        [630, 12.5, 8.33, 9.72, 11.11, 13.89, 17.5],\r\n        [710, 15.3, 10.2, 11.9, 13.6, 17, 22.18],\r\n        [800, 19.5, 13, 15.67, 17.93, 22.31, 28.17],\r\n        [900, 25, 16.67, 19.44, 22.22, 27.78, 36.11],\r\n        [1000, 30.5, 20.33, 23.72, 27.11, 33.89, 43.06],\r\n        [1200, 42, 28, 32.67, 37.33, 46.67, 59.44],\r\n        [1400, 62, 41.33, 48.22, 55.11, 68.89, 87.5],\r\n        [1600, 78, 52, 60.67, 69.33, 86.67, 112.5],\r\n        [1800, 97, 64.67, 75.44, 86.22, 107.78, 140.28],\r\n        [2000, 117, 78, 91, 104, 130, 169.44],\r\n        [2250, 153, 102, 119, 136, 170, 211],\r\n        [2500, 190, 126.67, 147.78, 168.89, 211.11, 264.44],\r\n        [2800, 230, 153.33, 178.89, 204.44, 255.56, 322.22],\r\n        [3000, 280, 186.67, 217.78, 248.89, 311.11, 374.44]\r\n    ];\r\n\r\n    \/\/ Funzione per eseguire la ricerca nella tabella\r\n    function cercaVert(diameter, columnIndex) {\r\n        for (let i = 0; i < dataTable.length; i++) {\r\n            if (dataTable[i][0] === diameter) {\r\n                return dataTable[i][columnIndex];\r\n            }\r\n        }\r\n        return null; \/\/ Se il valore non \u00e8 trovato\r\n    }\r\n\r\n    \/\/ Calcolo della portata massima di riempimento\r\n    let portataMassima;\r\n    if (sdr === 6) {\r\n        portataMassima = cercaVert(diameter, 2); \/\/ Colonna 3 (indice 2)\r\n    } else if (sdr === 7) {\r\n        portataMassima = 4; \/\/ Numero fisso\r\n    } else if (sdr === 9) {\r\n        portataMassima = cercaVert(diameter, 4); \/\/ Colonna 5 (indice 4)\r\n    } else if (sdr === 11) {\r\n        portataMassima = cercaVert(diameter, 1); \/\/ Colonna 2 (indice 1)\r\n    } else if (sdr === 17) {\r\n        portataMassima = cercaVert(diameter, 5); \/\/ Colonna 6 (indice 5)\r\n    } else if (sdr > 18) {\r\n        portataMassima = cercaVert(diameter, 6); \/\/ Colonna 7 (indice 6)\r\n    } else {\r\n        portataMassima = \"N\/A\"; \/\/ Valore non disponibile\r\n    }\r\n\r\n    \/\/ Calcoli per il \"Test massimi per lunghezza della condotta (m)\"\r\n    let testMassimi;\r\n  \tlet volumeAdjusted;\r\n    const volume = diameter \/ 1000;\r\n    if (diameter < 1001) {\r\n        \/\/ 1) Calcolo del Volume\r\n        \/\/ 2) Calcolo: Volume - (Volume \/ SDR) * 2\r\n        volumeAdjusted = volume - (volume \/ sdr) * 2;\r\n        \/\/ 3) Calcolo: (Volume Adjusted)^2 * (3.14 \/ 4)\r\n        const calcolo3 = Math.pow(volumeAdjusted, 2) * (3.14 \/ 4);\r\n        \/\/ 4) Calcolo: 30 \/ Calcolo 3\r\n        const calcolo4 = 30 \/ calcolo3;\r\n        \/\/ 5) Verifica se Calcolo 4 \u00e8 maggiore di 501\r\n        testMassimi = calcolo4 > 501 ? 500 : Math.ceil(calcolo4);\r\n    } else {\r\n        testMassimi = \"\"; \/\/ Stringa vuota se il diametro \u00e8 maggiore o uguale a 1001\r\n    }\r\n    \r\n  \r\n    \/\/ Perform additional calculations for the graph\r\n    const N2 = ((volumeAdjusted \/ 2) ** 2 * 3.14) * pipeLength;\r\n    const L4 = 1 \/ 2200000;\r\n    const L5 = diameter \/ sdr;\r\n    const L6 = elasticModulus * 1000;\r\n    const L7 = 1.2 * N2;\r\n    const L8 = L5 * L6;\r\n    const L9 = volume \/ L8;\r\n    const L10 = L4 + L9;\r\n    const L11 = L7 * L10;\r\n    const L12 = L11 * 1000; \/\/ Assicurati che L12 sia valido\r\n\r\n\r\n\r\n    \/\/ Prepare data for the graph\r\n    const pValues = [10, 20, 30, 40, 50, 60, 70, 80, 90, 100, 110, 120, 130, 140, 150, 160, 170, 180, 190, 200, 250, 300, 400, 500, 600, 700, 750];\r\n    const qValues = pValues.map(() => L12); \/\/ Q values are dynamically set to L12\r\n\/\/ Prepare data for the graph using values from the uploaded table image\r\n    const rValues = [0.1, 0.2, 0.3, 0.4, 0.5, 0.6, 0.7, 0.8, 0.9, 1.0, 1.1, 1.2, 1.3, 1.4, 1.5, 1.6, 1.7, 1.8, 1.9, 2.0, 2.5, 3.0, 4.0, 5.0, 6.0, 7.0, 7.5];\r\n    \/\/ Calcola S values\r\n    const sValues = pValues.map((p, index) => p * qValues[index]);\r\n\r\n\r\n     \/\/ Crea le etichette combinate di r e s su due righe\r\nconst combinedLabels = rValues.map((r, index) => [`${r}`, `${sValues[index].toFixed(2)}`]);\r\n\r\n\/\/ Disegna il grafico usando Chart.js\r\nconst ctx = document.getElementById('chart').getContext('2d');\r\nif (window.myChart) {\r\n    window.myChart.destroy(); \/\/ Distruggi l'istanza precedente\r\n}\r\nwindow.myChart = new Chart(ctx, {\r\n    type: 'line',\r\n    data: {\r\n        labels: combinedLabels, \/\/ Usa le etichette multi-linea\r\n        datasets: [{\r\n            label: 'Riduzione della Pressione e Acqua Spillata',\r\n            data: sValues,\r\n            borderColor: 'blue',\r\n            fill: false\r\n        }]\r\n    },\r\n    options: {\r\n        responsive: true,\r\n        plugins: {\r\n            legend: {\r\n                labels: {\r\n                    color: 'white' \/\/ Colore bianco per il testo della legenda\r\n                }\r\n            }\r\n        },\r\n        scales: {\r\n            x: {\r\n                title: {\r\n                    display: true,\r\n                    text: 'Riduzione della pressione (bar), Acqua spillata (l)',\r\n                    color: 'white' \/\/ Colore bianco per il titolo dell'asse x\r\n                },\r\n                ticks: {\r\n                    color: 'white', \/\/ Colore bianco per le etichette dell'asse x\r\n                    callback: function(value, index) {\r\n                        return combinedLabels[index]; \/\/ Mostra le etichette multi-linea\r\n                    }\r\n                }\r\n            },\r\n            y: {\r\n                title: {\r\n                    display: true,\r\n                    text: 'Acqua spillata (l)',\r\n                    color: 'white' \/\/ Colore bianco per il titolo dell'asse y\r\n                },\r\n                ticks: {\r\n                    color: 'white' \/\/ Colore bianco per le etichette dell'asse y\r\n                }\r\n            }\r\n        }\r\n    }\r\n});\r\n    document.getElementById('chartTitle').style.display = 'block';\r\n\r\n    \/\/ Mostra i risultati nella sezione dei risultati specifica per il modulo \"NO\"\r\n    document.getElementById('result1').innerHTML = `\r\n        <p>Pressione di prova (bar): ${pressioneDiProva1.toFixed(2)}<\/p>\r\n        <p>Durata prova (h): 1,5<\/p>\r\n        <p>Interrompere il processo se la pressione di collaudo scende al di sotto di: ${pressioneInterruzione1.toFixed(2)} bar<\/p>\r\n        <p>Portata massima di riempimento (l\/s): ${portataMassima !== null ? portataMassima : \"N\/A\"}<\/p>\r\n        <p>Lunghezza massima della tubazione da porre in prova (m): ${testMassimi}<\/p>\r\n    `;\r\n        \/\/ Mostra il bottone \"Stampa Risultati\"\r\n    document.getElementById('stampa-button1').style.display = 'block';\r\n  \r\n}\r\n\r\n\r\n\r\n\r\n\r\n    \/\/ Inizializza tippy.js per l'informativa\r\n    document.addEventListener('DOMContentLoaded', function () {\r\n        tippy('#info-icon', {\r\n            content: 'Utilizza il <a href=\"https:\/\/www.plastitaliaspa.com\/it\/calcolatore-colpo-ariete\/\" target=\"_blank\" style=\"color: #FFF800; text-decoration: underline;\">Calcolatore del Colpo d\\'Ariete<\/a> per ottenere questo valore.',\r\n            placement: 'top',\r\n            interactive: true,\r\n            allowHTML: true\r\n        });\r\n    });\r\n    \r\n    \tdocument.addEventListener('DOMContentLoaded', function () {\r\n    tippy('#info-icon-modulo-elastico', {\r\n        content: \"800 = PE63<br>900 = PE80<br>1000 = PE100 \u2013 PE100RC<br>1100 = PE100 \u2013 PE100RC\",\r\n        placement: 'top',\r\n        interactive: true,\r\n        allowHTML: true \r\n    });\r\n});\r\n    \r\n    function resetCalculator() {\r\n    \/\/ Azzera i campi nei form\r\n    document.getElementById('delta-p').value = '';\r\n    document.getElementById('sdr').value = '';\r\n    document.getElementById('diameter').value = '';\r\n    document.getElementById('pressione-esercizio1').value = '';\r\n    document.getElementById('pressione-esercizio').value = '';\r\n    document.getElementById('modulo-elastico').value = '';\r\n    document.getElementById('modulo-elastico1').value = '';\r\n    document.getElementById('sdr1').value = '';\r\n    document.getElementById('diameter1').value = '';\r\n    document.getElementById('tube-length1').value = '';\r\n    document.getElementById('tube-length').value = '';\r\n\r\n    \/\/ Azzera i risultati\r\n    document.getElementById('result').innerHTML = '';\r\n    document.getElementById('result1').innerHTML = '';\r\n    \r\n        document.getElementById('stampa-button').style.display = 'none';\r\n    document.getElementById('stampa-button1').style.display = 'none';\r\n    \r\n    if (window.myChart) {\r\n        window.myChart.destroy(); \/\/ Destroy the chart instance\r\n    }\r\n\r\n}\r\n    \r\n        function goBack() {\r\n        document.getElementById('form-yes').style.display = 'none';\r\n        document.getElementById('form-no').style.display = 'none';\r\n        document.getElementById('question-container').style.display = 'block';\r\n        \r\n            \/\/ Azzera i campi nei form \"SI\"\r\n    document.getElementById('delta-p').value = '';\r\n    document.getElementById('sdr').value = '';\r\n    document.getElementById('diameter').value = '';\r\n    document.getElementById('tube-length').value = '';\r\n    document.getElementById('pressione-esercizio').value = '';\r\n\r\n    \/\/ Azzera i campi nei form \"NO\"\r\n    document.getElementById('sdr1').value = '';\r\n    document.getElementById('diameter1').value = '';\r\n    document.getElementById('tube-length1').value = '';\r\n    document.getElementById('pressione-esercizio1').value = '';\r\n\r\n    \/\/ Azzera i risultati\r\n    document.getElementById('result').innerHTML = '';\r\n    document.getElementById('result1').innerHTML = '';\r\n    \r\n        document.getElementById('stampa-button').style.display = 'none';\r\n    document.getElementById('stampa-button1').style.display = 'none';\r\n    \r\n        if (window.myChart) {\r\n        window.myChart.destroy(); \/\/ Destroy the chart instance\r\n    }\r\n    \r\n    }\r\n    \r\n    document.addEventListener('DOMContentLoaded', function () {\r\n    var popup = document.getElementById('popup');\r\n    var disclaimerAccepted = getCookie('disclaimerAccepted');\r\n    if (disclaimerAccepted) {\r\n        popup.style.display = 'none';\r\n    } else {\r\n        popup.style.display = 'block';\r\n    }\r\n    var disclaimerInputs = document.querySelectorAll('input[name=\"disclaimer\"]');\r\n    disclaimerInputs[0].addEventListener('change', function () {\r\n        if (this.checked) {\r\n            popup.style.display = 'none';\r\n            setCookie('disclaimerAccepted', true, 365);\r\n        }\r\n    });\r\n    disclaimerInputs[1].addEventListener('change', function () {\r\n        if (this.checked) {\r\n            window.location.href = 'https:\/\/www.plastitaliaspa.it';\r\n        }\r\n    });\r\n});\r\n\r\nfunction setCookie(name, value, days) {\r\n    var expires = '';\r\n    if (days) {\r\n        var date = new Date();\r\n        date.setTime(date.getTime() + (days * 24 * 60 * 60 * 1000));\r\n        expires = '; expires=' + date.toUTCString();\r\n    }\r\n    document.cookie = name + '=' + (value || '') + expires + '; path=\/';\r\n}\r\n\r\nfunction getCookie(name) {\r\n    var nameEQ = name + '=';\r\n    var cookies = document.cookie.split(';');\r\n    for (var i = 0; i < cookies.length; i++) {\r\n        var cookie = cookies[i];\r\n        while (cookie.charAt(0) === ' ') {\r\n            cookie = cookie.substring(1, cookie.length);\r\n        }\r\n        if (cookie.indexOf(nameEQ) === 0) {\r\n            return cookie.substring(nameEQ.length, cookie.length);\r\n        }\r\n    }\r\n    return null;\r\n}\r\n\r\n\r\nfunction generaPDF() {\r\n    const { jsPDF } = window.jspdf;\r\n    const pdf = new jsPDF();\r\n\r\n    \/\/ Disegna la barra blu in alto\r\n    pdf.setFillColor(3, 58, 143); \/\/ Colore blu (033A8F)\r\n    pdf.rect(0, 0, 210, 10, 'F'); \/\/ Rettangolo blu (pagina A4 \u00e8 larga 210mm)\r\n\r\n    \/\/ Aggiungi il logo sopra il titolo\r\n    const logoBase64 = 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\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NJi1NqZvAOExZkA8iJZHUHStrufSfvfOuT8750vlzmY5H\/84++9K2F81oPVmA4oSpqlgg7QCHyjtWAi7GcJn1YUPyQ8CvZWmI8WWwa+UyhVPNzhZfXHX\/y6JliR4ziXhZInyNot7k8tlEo9bJdKcwuCYlSNmxm1sUzYdFk4akQ3l3aQjYYehZ0Ng6\/8ckHvlIbPoWat8k9Ddr5Nox4+txcmFPSexsFYdnMZuNyqTRYyDsFn0WRrKgadrSbx+oA8rnUOFDT\/Go4L9WVx95A5SGc89E5t0fut\/W6R+\/5xumyNd9w62A11aD0k2mI1glTWG0MLxU5otMDVpHp+RUUeM4Po4Rv4Im6zPfX7nq6Z+hsqwWKVXqwx8YZJjLmGUnwSyfFvAVNA\/c8fuf3CpnysBUOA3PkW75n54LYseEkCcCeFCPBGNJSSj+42Q0ryEOytshm4qJrDZQ72+pPlMF9n8+ML8J27JSYPzAUt6niYqroGNdftVKkkR348eEMkAQOeHIZLcS\/AVkIVi\/r2NLUILo2b+2+m3lCIeaDMrsgE84Prtv4TAbcMFyRJSBZgUgKQbKGaugWUGhv8bAfb6m\/+J4yEVHeDOeqJXhqjmlR\/IG0dHbvPX5rsWyiRiI1h2TfUSNDrtFyvspcMbkoyc+yGUauwmjRgs7TtyzremndCy8+QL1EQQip63FCU0dRhATqUBFL0rjz24gEIGHV3bX35D1rVs\/bNTViuvJVWokvuszRCEqe879upoVz3pFXnAd0KU08OefKzTznjBmv9Bvmit648tm9pt18Bg6EBVQc09I1auBwgaIBAPUfQVuGhSx7zhlhdB4xrLnTmhAxQVlfk9NrXmw8v1GOm3FN7BRTp2AftLYpUyLx1ET1Ud6ezBZZoxTOcRqveM2WghEUy\/FXs5kfqf5\/f\/i3f3e2WoHGT4daTnpf0YfYD2DHw6sfkB5O0ipSCZXJMLg\/lSW1PKgonkLpAkYEz5qT2bL9yGvw8ZWU\/iu285p0xjW+CaBP5p\/85d4fqtScupjyTvCS3HlJP8j384kB6Nlj6dkQrnrLqUZ33b74uROH5y06c6hyW62G9FI4+SQBmVx4lbFAT4scJnR8yntIMxz9aotTPUNNMDxuB6\/+sQnUVrikpHbvO3qPH5iOND+hcsIpqzhhMHZSOkvZFrzS5HEFR2L7aIiQjhNeeG+g+obHHv\/aPQuNU+PtlidvM3a893de+va\/fOXFn4Rp0UDXJVHjlpMRnj8sWSOoLiYecLUOsR0cw3RGoJ3E+Fe9EmBWWXfjpj0PWuZ9Fx2bP\/OO+\/8BhVrU4gZ7WM5G\/IXIZoo3UVYXmXITu5izHHw\/dnefaPuLDzb\/6dBzO354oOK4pNMF4gNArZR5ReU8JAWslGHP\/sRHLMYUwJ7IwPWLkvK4AbZaQHU6W+tPv\/fdS9+3dOHSQwzIcxry\/vQRpLtTGmgn6p0lxYDOs2BqAgwlQijX2bkFJAJd+biquTpSh4AuMqUfnOsFPO\/+HY1GdaAU\/3YFOiiXIBRuQgo1GFwpHrWbyINBZI5zPEsAmnkXQZQakhQz3YOi5ezpPR2vbDrxUOjl60y3VQIXJnOwOmlbQ3XwgVvrv\/c7\/\/We\/9BSEIMNsBGRp21heFvQnZECiHqKMO9Y6JaCkiYGFX8Of\/QIaAodpLhkVswxwD07vuN0Nc5+\/dnq\/X1DISxKVSdAJVBShqkDSEErLBSrq1UZxpMlnSSQDC4Y4841Xc93djtLtm87frfFCrZcQ9Bo2sYoDazWdCj9NgbEiMEABS3gHg0oJxDMmVc3HHzikdVLt+E2067ojE8yF5x1VWNzkvec7p9N2zOdPCW6duw9sTIAl4MJiuQaIJUcM8qpnTBdSceTWshknQsQ1OcLGGO1kn\/ryrvX3nVb+7c\/GZX+YxyByQ\/jCRdQ8pCJ9XRQprOUVN+s6QNHIocnFk3ft7Mvr9vx+A+\/bd4\/TbcQZ\/P1Z7zSL4VrzzvgBPOO+0F+QRiBMYYL9Nh1NnFMhCiyEoHpJ5ftOirMtnFv7rO5Ay\/R9vF7BFKc9\/kXSgRM+AISFX1sUOO+Zl3eiJEg9t1nvn\/H1z\/3rc3vwnaBdEZg9Dhp4QVk50kPMzaY1ISTKICEDULmnialF2goSM8uNoswzOR27jh6\/1AYf7zBuryFPYV9Om2L5BS2UV6KkfdXN+x8NIzy9QaUONLcKvgDBaqKCakFVBnK8sBmTe9uhAUamRj9q5a5O\/cu6tzzsjgE3XAsdGHUw8I+s5McjRo0PcJJaMBloECGXi63dt3up598\/ep\/5dWv5hmJEX3fn21chCRbpIW6AgYtsWWyzcTSoNphAuNRzyiTDuWhPP\/pAbgEPKo1a\/XK5WtPDsX2vIbxjZ3ucmx843uVL37pX5\/7kZpARbCkAq0B2k8w8kNuVJyZ7MjgbeItZcGsFIOdUGmaLGAFn\/rhw2cWI1x9buOSRrY2O5OFOQR9UXzSsapVrwJIaNyCWcYFkrUIJINosljK9GypoDKhO5WVD2gX+HZFPo9EVmAzCNwxSB6BENzyxUg6Iz3M+I+xHqzxKPxJ3GH8Nxh7Zhr2P5dR6sIiVudfvakgAfITOVLnUXUojk\/bfjHMREjvzhVE+SrUVfoyy4M9Gb\/YaHW1iVPIVUoH7USuyrYNT+RhgOLyX1q3\/Y1Vz0GVO3jmMUZU3khiTXKKyXENiweDKEAEwEHECou4zI2xonKwaknjhoZ8NCCL0bHaLiEWjEGl643MkYDrF6leVcA5XdRhkba6VNxcUfKMunUbtj8U\/\/TSv5xI22\/Cc8e9715P2WBeGP\/45Z7XlstmvZNvRvQY\/QzHiAzscxdA56tclbHKGxPGaURCF\/CGzdUrul5duVxsz9hhEZmsWMjGsO9SH5E6Hy17VRBURZ64FkvqFjh9nczWrYfuKdeQlT\/1sLHrKd4pvffkXBRT2oRxXMxqP2VbS\/ea8TzqNfIHY2cC91Y6t0JJJTe313WWbkcofmgcV77JT0mL\/4wWAJICkQk08Mgg0U1hdyHdtBryOCUGumfjx3\/sdX9j214tgoJk0H1FE5PsSggVyzLicptRPPFqgqsqvdKTBdcWYRsI+yX9TYrEfObwkb4VzE+9TDOkmjPOZt5Qp8Hj23r42NkVkQEyAUCqfLJmjIn2S+z7GGWYD89EbRdIESZrdrQ0nOlsFb3LFnXsy7LkCAw1FU6VPn55rZEkUamuoe\/ojKHLFJs\/lQM305xbt3HPI4nT+6rlOzRUbIbSL6l5YjJHkTsdHmmOGpOKBdskK9OyyiOfVz2zZJqB0uKiMNdwsSIKhXo\/n7WK41X42fAOGK+33prblgF208B9A0mVCUgGlWYJ7eHfvC9lRHmAQEAWc5LeUGLwAZkh3h+tjVyzVIqbh4vACE3xAUis65V6XK8MHQyRDekTRj6wTCyWWH6Kjyw7KQUrFS\/Vn3gqKGqYY\/iKfUi2J1PmSA0Z2LevArA+roecgnk6ChvgHc8tNDiuNkzoJATr7UoxLvi1XF21xjyYyy1FV7q0IerrWnzbzLGw9TXbi+le2bBp30Om0yRhXVTKQMsgI1SE6qjIlaLz9bD+SnCFpMclA1Y5rsvGA0u6xN7Vy5s3hCFqCdDVStlLJy5jRWq94ACiHQMMlVo\/GCOSLFMwwiPL2bX38GrMB9IXTeUxBWNqKptzc1wLe7K9du3mJ9xss0nnKyP6YymV1T6SrJNjhrpLwgNMKgdUCSuXtW+a0yoG2poLp7C8InOFhAnnym+k7swIdIgQVhUGI5Pa6e5Sx\/HjYv7NIfXJPeU1W2gm17zkV3EjiOEXHLLiOSdZjEvu9VK1U6o\/1xI4GzGmSKeHc8xFgH\/kJus5u6qmzpAfj8s7oAraKFz0CPJWevgVJzkV\/gq8qyiW5WA7mFBUqL3JCO6+R2xraS10myiGFIbwIkr8PjYDCSmh5c9mJtV7peJECjiG1pUxonDICn5CJQaLiTvQ57dLneraH+OS6bVv1ugdd+4q31YsBnURGEakcTyqoZ\/XrBT0zBwL8PxIcsggWLJg3mHAK8OF89sOuKCIsZNKW5deJLBgsxotvIUMxTKhlXjdQ4e7F57oFnOmQhZV38sEkQ80OaEnwA0jUTZCQTCXibxyI8HYIne9VMD5YoEuxbWucKCkjYUKjrxkwiUm2qbmJjHsunYYYNB5yF1gFWqPYxfFZ2QtVDJNycgJWW3UPJLVVCXrDZPg0W7pdSe\/ipMZGBTNE23Dlc7vzBtVcEAP1+ftsg1FiwmY0k5P55A0SNiLfB8dxtJQYnoCEnZrSNj3wYgmWbPI1AqdDwyk16DC5ZV59a\/0\/On3ic13WXjPeK91qfMwtlC4ts5wCx2AE9crh8VkD\/QJ0masShBkJEPhNTqOnxFzj544u9iyCrij4uJPKvuOAJwUPSuxZHTVKnpFP8CWinTmBZ3NR7raRQ8iQQeytlHkeCNdrSQFkDgwtc67MBS4LjAiRkgek4ANYr3xsNxbzg4UO\/buGVx1jR57Mre5Zn0ymcbNpN+Uwdq8e++B1ZZdQB4RfO\/Q+o2Eejttp9I3+Fe6o6gsmghei4ZCprpgvjiK\/SdY1NVxGAumSveTekECJBx54MQXQayhpIJVSeaEgHq+lduw4dhjgJdeDx1hJnXJJdsyK5R+w+oApmfeAVN0nqRSIfct6blS9E9U+mnlEZ\/Ic4SYcwTpdlNNBTYrOnSijeQAGFWy1YRUqdKUJxQ6FMsy3YJhZgsTDYkjqVO0ze\/qOOVmzGrkK4+QggarsvZM8FI44zSxR\/HJ0ytJ\/m\/VLuUhQtkjJPMiZlcx6rHHzIpxO9G+uJrzAXly1q\/b+EQAD5os5s11UXrneKRyvdBuIQGI3Jgh4pUrlu7ijOqaXziGDRvJHKn7kYtu6qk51\/lLPC80YmEgWsBNv4akUNQIKLy6bt\/rr+Z5RjYK00TR28DAi5khkq7SgHIKo0SGhlmoSir8NCyp8MsXq0OrAktl5L5mC02iVPbzW7adery7NLHNACQmQaGA5FSsL8Qry4rRPqQEqjCEk8+NfMjYFTc2hqIQzYKnHwWBlRLOcR7aJhA02cHwktbYpERWqsWWVxnIGZBTDPgF5WID0mRJT0hq1DMkztapqTOChUe2RGyBPQbGiUn3Gr7zQ1j5mVxK\/DSpNo3rRxI2PqZa3Lh+dO5Jo8weIyMmwRBM4mLj+Anr5pZMkSkj8llEHsxk8fxyVqIrakZkehhOw1xwr9HxEhKRAYHI+bCMaagqIzXhSE+CO4pdhZAKYn\/UmOH6nXWt6pJFcw515oxac50odna0Hs8h2ZdjnOs0xxzzXJD4LnH+fFdUtvw9\/w02Ni77NMYjM\/Pq+o2P+dVzwLrXSAoTus31dPikhsdUGiBymZqQBK5w8rFjlUXd3X2tNa4aEorDKPCYJkvIY+rpH3MxJrMjaaatqaF7fqc4Q6NgxdIFezEmsZgpSNDIIQvlJQUiEycGKz3T6UTCD64kppW1nn9x7ZNQ\/rSOcIk+mz2CMdqORXHraUJOlKefg4uOu2RU0CPBAitxyxkhWk4ZRtu00h5N5YS5ntca5W5PlTmlGMjNFP\/ysPrXwtCu1Gr5UxOsoLioS3TPbW87nkWGKDJxlcMeXM0mFCcq8epysuyG8kpCqUoLCKkViXh+ZcVzQ\/F9Rgx8WZvjMjKb0sXsevbNRO5d9URmz77uW6E7ZDwshCGZOIh\/l6xICjIlF9Ck0JQq8ERjmQwsJjZzr7Z0UfNOsm7PbxVnC3nRY1tAZvGAnqy8gSmxumLsl5ejB9yr4Pe2pK8MwADjunXG5i1HHgCd2VWtL7w+rllDC+EnN0EJCKOel0TD2WbeSyXzjnqwU9gK3UT09vv0OGEDcvP1zr987mvvhaI1IeUKOYlBY97sz4NPBXEvFIEhH\/0AsPKo8hsVhQsPuRsDswxYtYMq1Q7+zfPwme\/EtbjBReg66keibAlPUJR1pyccbrjCQIAomEUdOznHJ9c6ZonsL5SFSYpn0VhRxhDoPnE1fq\/mG4tpSXpRGE4OcP3EeNfAE4ksUhKUTvtBR92U3ISQxKR67tSaVOe2DjkZmAygS0WCqwG35Fj43ESfQxpYWOBA0iP9VhP9\/WTOB\/ba2rT56EOmmQcrUToSxxryNN5HPbGS\/p+1KfCfA4Ue7LyV9s46ONZkOQpr\/pz6ow0FuyTXaQaD6b+hAY55IY1dUG7hl7KpXJOYIa0Y2qComQVr+67uO4drUwrxmUrlmM2+Jv0ymb6cKb8ZrsTWgUNnbxkaFo01ULwaWEdsMIcJf1DuP9JTPwIvVEXm0v3HJoTUjL22tvzJ5npRBPEYPP2thwE5RRGKMc4J9qq0Gwj5Ucq\/NAAASSQckfBh0icIkAZv23XsDjRDe\/ovMUCualO+poPOaTuRa1h8GCoFiSnUYEJ4mlOSNURKRfpg6kv1jcs2C9E4biaDa\/oM1+5mE7DkUw+umpwMkamiTaBhhAeQFVdDeP5sN6zOvXJRrHOeMIBO1F7X3BeVQzOTRUZ\/nBdhlcpbgyhDhXIyDTKsTKo4E15TFv1JoUayMiU9A\/QMAWLEw0KmfqXWR2eRjuKcN5Z6+0Xz9p19twO+7lDhzdUzkao\/CduzgiE9eaRKJfQHBpfEwcNDzuqvDLeHPaX77mx4ERRkEWnn77h73nrDBuKWCn\/EJDwVdbES4mXSZwZYbAndcjAPa0jiIM97gM2+WPZzL7547LGr3TC5ONUV6odRzQFtwEYSonIo6MjdTB6QM45NbABhRtgBkgzxDipD2c6RDQHjx84jARjKR99wxeovBe0f+fjBXzs0GI8bV9\/pGt4tCxvXm4MHTs8vDO1rtU8dbrZPnam3T5xsdnrOtpnlHrx6m52+wSa3Z7jBHRxucMrFBiuqNVlesS7uGWi0us822adONmUHT4KdZRCw+ylVJOgxjhCRK4FW3sO8JdcRaB9heDAnRhWSIgQqsFAfA8ZHjP3UBt1kxisgGQDygx3AooeEZwE4BcaVJhrYDuyHqVagzhm1MoCngJqTPhRbj4IkqhoCIP9VfoRpObKwm1A4wQvByKQqJJ8b+ZrYTUlh6YBvH+XbFCZm2g929fPPn3gD6qAnCpnKSZE6lXSw0OxnjpUEr9FqRg2GvKgM+iArLQAm1yfuumfZC71+bAMuF9x7x4Lnh3oOh\/kMoE6sxxIAzmYB5gfjMg8j3YoKwo7UdDMBI\/MR\/YoxFh0k83rV+obvre17YxVB3Wl\/cH2DVAJTPzfgkXnmW7vebtvz602ZvzQgguJJYTcypwPFBNn3IVI3sI\/IOYPq02rMofQs8P+2kwlWr56zA0ak3QFWiTtunbduuNznBozkJhFmmeuH9R2lq6SzgutZiHHmZhhVKsI5OSyL2HlhgzFQKsxdt6V4P9nsdLdfKIGrACRea3Hmh4Ro6Ifvb3QnGjN8pZfBzENJqetDqYRxMUdc6yeYmfcbMaEVVIH85jKsS5Yd7qhyLyLEd8LNB+IDVTmJ\/ECaGELDCmuMyzCzn0pIUhSMHyn8vlr7yS4ykjjKRpH2i0WWeAphE5cv+DP1i9qEn\/za\/2DnTnGr72XrTBTIkWUNkUMBih0slKoSolz90J0AfiSyZbod+1bJvLXJ6W+qE3DNgKYQRAjz5tUfMi1WUatvoBIgIwUcCGTtYZKf7At+pri4TTDAMHyv3DEoSlUx248eFYvwwcHJSoOVl\/\/wHw6dYvUwFFOSbDR0FpIlhLSvITyVDue9xEar2APpRdlOmbWAzwIUGHZQAK61rUucOnOg9f9+7Au\/Vtf4k\/3dcfwRoLLHpWj9+q+88\/d++Zfe+T7qPKhkmsMtYxQFrgCK6qBWWBZjXOJ6Um+tLHqXBEXQZhPeKx8wodrwQK3h1q7xU4aOV24KykSFF\/z5cjIpDv4UKseH5PQKLXhL5NwCOilA1ISbKOYciOAVll96zgDVgGKmjMTxtuAqzrtKnn6OS\/lEMjRpyrw\/pildRYsu+1NSeaq4EpVi+h6uVl+V+BkyD05bm8c+0IGDYvnQsNNGRineGTNErg8qOqIqs6h\/cwARJKGir+TZR5kysDzZtY72uhOtjhEMIwS7dGHbXtvwfPplZE1gWf4Zgx\/RI9bvcKDoSZAgqxqDZ1QRcRC2QcYr1PiIsk2bdoq7EBV8AQ6HiW8y09XR+rrjlgBqszl79\/fQ0+\/GeazNGeYvYX8HiYElKZ3TCtakciU8J+lmjivmgwHYv3x5156Unri9vf5Uc1N9ud8X2ZQkQUWauaaNQoHl\/kOqWDJIwaCMOeawDxlx1t6z7\/SdD929\/GW1IeljrARmkdIPt7PheJaZH4MtGH0U1PqDVZmBWZlB3B1LqD7GIQEVIuPufi7tnfxIvuTmr\/CeE96UoIwYlaCaY0g3NpnkWVSbAhZ\/y0I3SQURVyfeWS4GClaUhv6UusrzFXMEmBsJ8yFpy7VQR8Yhv5lxCjZf6\/f+YP2bqn5QsO06UUOfhQT1A4culzypqHOFvLC9gEJC\/r6YN7\/zVGOTgGEtRLNtBJ\/6ammrYa4lFYyUvYKBXeR5pTNFwbCI7ZcKL0IxFdQZ2rS5fF9vEB9pRT2nyUpq2ZLOLaCjrNTiShN4hqRCEbK6M9zQ0sM9sqarhFqpBEqlWyqBIluPCqCDw\/D2l0VTwxxRrva2ffBD\/\/y7J068dum+\/viPVjQbcCRc\/rhlsdF9sTPOVGOrc+7Enm24NGDWF5pmw\/p0rebYVN9nwuvUlfr\/It9P5T2m+vkv+Tj9YBn91GeGHq9UUJAYldGlJ39kWadifqFjlDA6mVOFzcCHF7+lo26wqysjDfl6fPjK3nizRYo1OnCYk82QEQ5i+wPw+18JSwdvrvHiSwfffP99S6mgTXqdmEQfjucnU9nP47nfrDznxCkx79jx0wvDqANjCkYi9vGQXJ2INl7ArS5NwNTCJewHiAK\/Et26etWr6cO3tZn9La0Nvb0nai1kgLrsQYcPrE2Xnipgegghg6nqrF+\/85Gfevvyj+K3GhVwngBnUfjDrQorP2SY+eGLOXJMMJbYZv0wihiDsxiYA32MTwIjCTY8XboJlYdwZHLKpNtJxcmoy5\/pPTsHlIAWPftU9hEZx4IAhZ8hPvKBn2eIyyI5ySt9AHoLmETGajSOY0jylPE93JSddc025sm0GHA3d+vW3fdg0SuoGgj0oimv\/IUb+ai+KZlmiPMGI8eihfOO5DLgmUyOJUvzu02TGboJJpOfnzcKpEddKgQM40LpJzsHOZRhSZSrtdz6DZtfK2uqXMWxYllub10hLIaAKsXA0TuAEIUskgWlwgQ7hEo4TKoyJWMpNVglrh3CyefqwTNej3EHiJDbapzuCeZ+9vMv\/Jv\/8Udf\/ou1+4OVJ8uyLOmEj87sxBR+3mCWKPyytycsEP2DyUpAOjEn++Px\/o5O15df2fwU6Hxdia9PDPpL\/p7OgmQnJdYrhNLf3tF0qrVFjBjKXfPFqVzWwkJOOCajRQw7Yc\/gxB+TOD4Kg0qHlUrIBK1wZuPm7Q+McHGP92H0eTNCAgNBbL386q4nkUtmZ3N5iRLwqxgOsps5pFUkdvRQ+0+aZybL7cRetGSxuS8pzYM1UhTndDQjb4SRSV7ocmoq4USq7g\/jvLJqL46dO4\/eNjQk6meEkGZYI2aT0o+Yc2HQMuqK4GsfHUjSkwn4gSjAu1APT2XdgGG06iTecQ40ekf5Gt3h1ZBQipOCTKhQ\/8Q9\/aT4P3LqzMJqEGapCFq02hlVQNiPXiZDcnIpJT9V3qSXX2ocyuyQ7eD\/YfeJAFlpamwYlPU8rv0xY5Wg7h7RdrpnGIXrALIlmwHwJ\/S4qIxRxc2uQvZK3iNKMf7NwlxGVKstX9K1N110eU57u+gtIHsVQKEEHqS86LyMWrBT4yHZ3OndkfFWpbuA2CS\/Y9f+266QdH3FXpw3R\/Qs6qo\/GoS9VWI3LSZPYhOBUwfkXTAAEgMxHZ0qOqVeZH+iARsgHzmXawbkKSPO9Hii0LAIvqC5bZ\/+\/OZ3\/ezPf+SbH\/vH07+ypy9u75lgovoVG69P0BKYQRIoo\/gplKE7kGgvoXiM8I2uChc2VM5ksvKgoCKgF1gHav6CrvajIAUbcarRUTCns\/mMZQYho4YKM8S1gev92GU6gf6ddxsW\/zpxsnsBqGwbZpCodFPGKQGyZX7nuXVPIz+PXhiZHyap4+h4GqGNTtVMbiApcoB7CfgWEQrqaK0bamsSA4Rz8rZ0VS1ZMndvBuDJFGaY7jvnNks5tejkkiUgpAMKygHonM+cqXUeU\/BSfZwngVmj9BtGB7SOun7LaBhAdUsMFyYbUcngE3GA5aHAFPrAzy8hCjfrkXHHj8Rlwqcsa50eiWfYJDuKDMEpGjelxk18qBxGWe5T3f1dKMQCvBWgGYjGyOqkTLhEn\/GVXpetUB5+hS9VKHR1T\/I8C3CeR1HVm9\/VeZSn3az9e\/5zA9pjbtvRfT+g63VU+un1oADJmSHJEEe8bWlxrXTzZUSHckX2lBV6q1Yu2jw26AJvS2Xu\/JZT8NtQvT53jIxpBD379AbyPT1k34H\/5eTJ3sUozX5VfP1zHKP24P0rn2vIB\/0iLKoaD7w+cwxJDZgYjKPPqYwaVWyIBpCyIj0P+GKnDgp\/hxiqGOIsOBKzDcutvuKcxb\/\/vs+8\/61v\/+i6\/\/vxE\/9xfynWyoeeXDecBFgx9cAhsfxM9\/AcEKiriuhSd1cK+kgdB\/nkClgpD3r7CadDjhdw096KVQt2jhUO5lq8atnCPVYc1JBCLXV+Kv38DQtjjGwtcq9WSt\/IZ7gLMyMGS7Wm3Xv770Di5VQ4c6Zjb5iOa94QY4xpuZu3H7jNC61cCWxhcs9Bv1tkV5G5YBwDo0Es5SxKvf3UL2r+iqXz9489KQSQe8WK+ZuFyRKfF0dCph3CEWyZKDENw1TqMpLxB0lUXj6\/fuOR1\/dNzZi6IfoqfYiJa3LX9fHrQd1SP2SQ4WvM+sDkIHj6PcNsAPa2cFMr\/RPvngTXnyjZKWUmr5Mq\/mrxn9h6fAr40S9+be\/PFKtGA5kiwhDVfZE8aMT1eNXh2k3wCKAGQLooJBEHlZQ46v2XGw4WChtmA\/y7taWL5+8bR1bxtIfKJy7n6fkFADjWS6\/ufIK825wH9K4xiU7SWkpE7ZgpLg085leM4T9G1CUHfsmVK3I76p3RFRbsm97KFXO3GoZfSyslX0yohPZISlUJ66E7kP+moycjhsthw7oNZx7tCyaFDhsR2NNveOBzXfPqTlhGpRKgCJBlgVoSC3vsJzSNMpIxaiRKkJqMSoDtaXhItLQ2SjrRYrkEpi9gmd2CKCECHTmN4mzREnMW3SeGay2L\/tcffuoDP\/Wzf\/+Nv\/r8iXft7otbpqfHZs1Vr5Wic9PM1cv0\/LTLmhQK6zcefB1qTLglZF5a4KKNx8CdmU91sVxiUvTIKr0oipfJhJXVqxZuHFtZgUr\/rbcu24KE\/ppApXWuBzJPC74CQ87JURV\/RH0bw9fOoG3JizJr1+1+HVidZ1GO4ayZx9Pa0C3b4zWDcJRUWXyQFeaw\/pus1SAdQcmaPJJThhEgPf2qCKd0KkaV6u23r1iPoNOIggEkb3TL6rb1AlVWpNNxZHYkBuqYJ+J9SOXMfDJ5IH8wYMjZbMy\/8Py2p6820jytwrtOF59lSn9uCNCeEmnFVLVNJTV6\/SPUSwFzTz88\/Zq5Z0KDaWzYVQbRJCRCVTsdmW1Y2t0JbUyn+0T757\/23Z8K4pxrGKj8GIAVJKDlD8I7GAEmKeMkPZzigB\/FZiee\/nTBkPhQeI3oRQKzdEdHwzGyiE7oEW\/gk1ELxdq268RdVd8C6x89LCyvhe6SiyrdHoptJ42ipBRoFIlMkybPPJhl5s8Rkns7PRDCD+bPbz6MzRwQHxX1Ud50NUZGEnwTpZ+\/kwYAVnNydJhOFouv7W7ffvghRCGgpU\/+eOL2ul0L5jbuzli1IkD6stInvZUcNDR0JLQnsSvSqrhplKq9oxWh3hMwQMCVn3fEcKUoUAFVuCAlKoFdxK3LitN9Z8Vw1RB1LYvtPQdKD\/7m73z4w7\/0Hz762T\/75M7\/cNqLsz0VVgHUxzRIYEJryjjuL2Nb4zjvpjuFOtiuPSfviIysUwLOxwGdVOoAkMIYExFUJdoUnM+2EZnleoKK2BkUpZg3L3O0lWVUk6PZNcCr3r4PVOugZ6Pfnr\/F\/8viXOd1RUK\/mP42poEAfEjVF4Wdu0\/egeKLmNQz6tAG6RW6Y+3GnU\/GdmMGBD7CoUOFBh\/7Hp1psTvH5nUkwF25V6hRgvHlVVctn79JlhdJjqa8ES9eLA65Dh1OHEPpfpOeMaq2EknGqJWEq9FZyP2HjkJRb27feexWOsVm1IiaAY2ZZUo\/KDkzzb1xpBYiOXIkAxhACDV7WGQ6TiheOn2MTwLK8h4xpaWyn6xzyQLNKYfKiVYQwzU0zmPjyXjeRz++8dcPHO5bxeTJgBz8FrjeaZyRdhEQFOhdChIilTU1qWV+ASBHKsdAtcOBhs+wMSqOgg++VnnwvqXfGUEcjbM9N\/Jpx0+KOfuPdC9H8B386tStwVVcBdYHSVWqouHYKa76OsW9892x4nD1ioWHU7q0VFZcP1csn7PVMlCUijo2FnMLi6uNTZpJer6H2inw6JCGVb0zjQrKAX5InG4N9H4xqjN87\/nNT0JvuGoj7dd+5Wd\/3xHlUnPBCivdJ+G5h8FI7kzmh8PQyWYRNcJ4YgE3HuTwD5ADUoKynwWNnOOC2YFVZ2G7mqAy9eC5NEBQ7xu9YAEeRHJwCaWzqogyFUwn01W\/bXf5oT\/50y\/+wVt\/+K9f+sRnD\/z80eEZD\/vRyu7snOjXpN+g5+eefQ6J9U5eOFlU2IIlnmLuU7rOi4nPAUzDq5Th5TeCxkant61ZXFAD5667ml4KgzJWbLhoMe+tDGg6yZuaQv5GlP0Lcf1WBnV3UFpi89YDt2Pqak\/\/xcfwNRkjE50+cIbknn956xvrmuaheCc87ApdI51OaW5XWliTO7rc1xllTmxGVtn0awPGmhX5zWD5PIdlpw7w0vb2\/GDWJSE\/jAPsOawDw\/i1ZKZLDheRKB+VKQ3g+A0WbKSCgXcPUNdq1a5\/9vtH3jzR57rRz59dSn8MSk6RH0TCf8BwpDzwJi084eC7LHj6s1rpn9CoTSdQ4sGVzD08lEFgwquayTcGXuhecqz0oiLf6XKcPY5F4JPfGX76P\/\/W\/\/vExz7x1V92Mm1Q4ZNiL7iiSgxWGfaySIfMGWABofTSVBpTzmj1EDFov1j8CVTrwZz2+t7FC8QRRBA1DRdkg2JM5vY93h0V30bRYzAn0KMvvWuQIRZKBdWSYBfMEbXojjJ2sNgW9F1LlOfNazlOfX3ssCEd34IFDQdkpUNE7rnwBgjZJ7W5pMJwMS533oNc8SEUcsxTe3g4bj5xQiyY0JC8yMlLwRLyb971to8M9R8OFi1pQyUpkHQNDsAIQSyiWhPDyAT0wNRDHDGNAMqBir9iH1LjjUWpJPc4XymeGd9Luljmt8jRiYEm6pC+3JKrxXObTvbmV\/3BH3\/mA2\/\/yQ9\/7wOf2PPLuwfj5qt9Fv17LYFrKQFg5Y29+8QtZS9bHwKGoWiSWdX6fB07XYfVniAjsFDiGRVAgmSAdeIE\/nkBSQb0dq+lqVAkE5iCbKilRCZ1XrQ8sooi0OET4FyuXWFQKGzfBr7+2uSYtK6lPK\/xvWakwk8ZYLnNHDrWu6y\/6BcirPeyWCIUbo4D7iZ0yDDarCLNozllkiacDkZ809FaGGysFwP5MdEjXhuOpnDevKYTqO8Dyn\/sPfASsu4DNyDuPXwpx2+CSJB7nXIUEurJehNYy+29e07fhnyW2aXnTvMAm2WWteMBEgIYj1vFwCEwfCSYC55+aCZZQHtcrRBOZtDIJF7lzJfIOSqJ+K+vd1DYcwqZoyeHVjx3MF5anxFFOFCzgEo3FAfDxtKQ3\/yJfzq9eOvOXQ+s37Lt3hO9wwsNp97NFRa5FcB5ZIVHOR0TZUsqYewitXeY+F7eL4H4qEmrNhx+loELujTYLea0WIO3rV64Ddn+XsMEkpUnI4rZ8htG37\/\/0qYfKHtWQxZwGg+gWGLqse5Kxg2Ftx\/7NKOeNgXhYhTFL992y9KNJFManU3qNwsXipONjbliqSdso5c\/oocFCzAyf0dCqmOLE8lbcdzINZ9VnTNiqFjLbtriPXC6FB+fUzDI0TqpY2GTUT4yGP\/1c9\/f9PSJ\/lP3et39dXNW3CYGBgE7yBLuh02H4wajqYpIRxB6YOxhLgmVengg1SAcecldQBqcjIjwc5b1Ai0sNpEAm4aB6BQAZWLgTDHf0X6rOHZm+K7\/8SdffP+\/fLX1J\/\/PVw5\/+A1PLfpie0aUOidYpXpSD69\/NNMkMKtgH0RAPP\/y8bdUaplG0t1ydlJhOrfgycX1oiBAzW4U\/IvjwdrqlbfsxFS7wKmWdYW\/sKvz+OnhgYVeHCGHngsA1x4V+ZNH6nBIFD5+JIleiMl2WWHbKDz3\/I4ffOS+W8nXP9ljxirIk32gMb+bUWNusBqbm\/ZES091D7dWgwbkcykEJBn2ZHYI9yFZUAdrqay\/o7xKjAePRp8jsWBe24nGOgEPzrkHmKDCVcsX7Hpp075HsY9J2BcVfzqabORn0asfIVorIwojqWgJ0bh0AtOt47jrNux\/qOo\/yN9Peu+Zgr6bUZeYXUp\/TIXerci4PAdQoqYoKAijALmi4TTdyBN\/GgdP6hUexc9xUe5YuEhUij11H\/q\/\/\/g7H\/iLnv8ZVIIs3MoB6n96uVzBqwzF+Wy+CT5n0x6sWrD422Dp10MBNVAUCdVQEadT24liikBiqORsiOnpJ54\/AqMPPaxSIbswUcfG7I\/pbfYGq2966tHPIO9UW+3JKGDtmw2bdz0A6JUZY9ENkAFlYzEkJIp1DSTpkZwolCHkzfUx3XSlp4UrqRfftnr+2osVPAME3lu0oPPI2f7BhSivbobcodOcDyjSYUTcZroXKe9guslLrD2quwaBW3jlle1v\/uG33vPZqx28ixqN4Zd3x\/\/mHT\/5u9+ZN38+jMHTdV4Z6r6r4ARU7ZVXkt4mByQSuH9YUQo\/h5fEKdMiUgqHxP8DKigFI91S4JhVJihepAG2RNv8uaJ\/oA9nZEVd3ZLstt0nH\/yt3\/3YbY98c807f+QtD\/4zKon+IyqJXpxi4mofWP9+shLQe8AYyckk3nX7Hg+DrBsRLokyNpJVMS2IkrC2qUlyLgRHwueAvQA5T7hy5aJtSbm\/c\/qFXtllS+bv37Cn\/z4sCkzW4iqR8PSnXC0X60qsU3LeZcG+EuU2bNjzcBTferXru+778c2aq5ITg6ivvLL16Zg5ew7qb8LBF\/jwycKZZ9lkhCOhg9xw1EuuvlT8FQ0412g4afxFCzsOArVzgULOYNSKVV3bTLHHdwExIyyI145A3pAe3OPogFIjjAYGnIz8Kynyyb8P7D++8ky36MDHR8cnlhv\/rKudYNdYQgQkQ7mPofRTkaFSI+Fj9G46LMQ2UlzoGjdsVt\/OgAaUen4lRIThMcmmI0RPX5+oAX4zWBZtftzUYOUWu0Zucb4UtjUNVBs7gkxXXX+t0Djg1ReM7Dzhmy1ioD9A3r0pGju6pAKVJoJSLaPCPwKtSJJ01L3HinA0vBxUS6Iu6\/qdLYXexx\/t\/E5n\/eS9xbO6ky7S+FOnRfvJMwOLYguUZcyTgFeb0BUbqyllzuSmczZyKWQlaGniMVQAon549A\/X2xdSvVLFX7Z88V5CJNPbq+iBKsh1zrX5xxj4UCircjmg+avPbNq85\/6pYlFYOFec\/MK\/\/M8nc0bvKX\/4eNDRlBU5cPcLePYZ\/pVUgUgos8AeVASlEYLBaFhCDZtENzjenBAwIEAdqPiYwH+KGLpKWAdIQhNeDXjGLMxUW5w9exI5w6j4WA8MA\/J5TWcegh6rG15+KfyB3\/rNL\/7de37uk1\/csC9efqONLf08N44EeoZE8\/5DZ1bFJggVyK5FBQrjPsKacanqKyohVyVJ0iBGBCxauKh9T\/r5WOmwOPaypYt2w55ALQ3SNmIXuQA6lOaOSbVM\/lxFBqH54c8IuV8nTw4sAmKv8caR\/Ix9kqtS+GXfYYt5+dVtjxo2lH4q5Qm0lABJUmzT2w9kjtoiWLwxKZ4ioZQS9YX\/Q3GHpUu69nP8nC8paUgunbeNONV0v5FjkaMHa3xAohHJD5vCNVWjOJ6U4q+iu0NDZtOB\/cHqiob4jIh4lin9Np0WpHEJz4UKUlF14MoE\/Ecf45aApM1Kp\/952MsRJxCLamXyYDxBNqbRCMWnAa8WlG5tFZ7RIioolOZZdcCXO2Kwgsx5OyfybXOQLNYgBvuHEpgO8eOKeV8l7hJjzncy93BTGestVhRdEt4jvQKRKA71xe\/8sR\/+RD47WjF23A95g54IpKO5ZfPBhyt+XEAGr0pgYlQEGzQXWKmUA2eTwCvVYpnmS4wJsbe3t5YaGsTQxcTEnlm2ZOFOLLIhQ6u0ISQvP9kRpKEtr6qUfXntsTkZCldpWnlx6lRf+5FjV4\/r593mNxq1JfPF0T\/9w\/\/yC\/fctnhTrTLgV8sDIp91RHNjA9pBNhBEIRBFYnKx8v4wYVwp\/\/TuWygRb0jWKDzASH5JUlFURqQA9SHcBxGmbFM94D6xqCCsAi5qXKcOxpUyDmx3kbtu69ATb3\/X+55539\/s\/W+nq3H+THmC3LYzd3zOKDjBzBXTlLRs2mQ9CO1+x66eewcGvBbTzGNJ4BxlpBVrcJJePwq9P1cdkPtDwsbS0Jivzu0UpxoN6wKFkVCMZUs6t8GBgPhuouTJJN7kepcLhMlq67gAIm7lSlTYsWvgrvLkCsBPSUfoi4xPAhVAfA8dOrW45huOhyRe7g0OvPsO9QWOGSj8ET3\/GG8keFD1VFKFn0OD+4cZrVy1dBPt0PPvWgBscu489xgitxKjGmH\/SZV\/3otXNSWek2s1f57QNksKcKoZhHVS02jMbFy\/+\/Vc3cf3ZDf+WbNM6WeH2BhJZpgyA6SYZSxOXKJu+jB7zRvhVRz36B0ZBCP5LirEy8kkGWEAk4jgGQ3hKap4YH7wc7C0m2AENIgI33vMDcu5wgU4jzCdcn8fsvKroq65eWThNzAZDRblIvshcf6MAgPaw7nI2Zh6nmWjxzAKZQDXWLli6bEfffuK\/4d8Uj1xk14FZN968aWXH6eSy5ePHdyBeySGcRUh+VlGV1JvfCpT6fsYnSLU0VevXLEHeRIXrWDNdXrZ8oYtgAtJjZ8xGyZQpXR8qedFLrIjo00lbKnketTzxWobBmZm7Sv7nxr3gLzCiR15I\/jhJ7Lf+43\/8s5fW7K442AIzFexNCAtRXr7fRSJscHu4+br0Q568bkRQOEHTp9YfUJ6LNSNkBEm2pEWIKV2H1492LlQ6sMGQYk1hGUGWDJiR8GLGpbBilRjvgK3jxq2nH4YwiXEpTvrSvHSJX\/0V5\/\/\/ff+xy9++uAZsWyqnvMmuc5sm9NX7SW9lv1KL9mmTTseqXlmhgUSA4xfZq+YLKUqnyRd\/dOq3Vx\/Rx8x3Wc753ScbWsXmCAXHqzv0bVAHEYipy2dAWT64lKdJPSO\/uIS2zPWL0YFPZ\/rxLrXsaj4JGQ0q\/plEs83Y34yFMTGxo3+XcjXqiMTn8zhwmCS5A7oOa6RdD4xsTelbR0tukmAj3IeYW21li5DfZhL5EUhwXe4o6213wUPf4AaEOk9RqPNadQoGVcpcYU0MFRqp2nkcq+s3fZYDUnHM0aA17khs0vpV3xP8ANYskfPWUJo2uljrATGvZkmgVz1W8luokQpvcRQICVMBN5R1yE+H9g9WtqwLUJM9GppWFFwQdGrlUGehMlp19XDWHBEcTjJzxkxJug75ouKmOJXj9BtEfDmMg4AY8AKc8IOssJFEzIRCN7N4Z73vOtN\/6elWfR1FIzrEcmZkZsJaO6y23f03Im6FUhrJkwF2S6EueCg158ePX4oGXvSTVwqv\/RWk9UGEjdq5SWLm3YhLH\/R5Hdi1bvmiuPZLKacLLoC\/DteWPNRDZf+8NFFV\/Hi81Y07Hgf0rOF0utuuHl749ZDj0z19Hz0AfHyR\/7qh970Q0+v+XxLvjTgxINRHnjSPOhEbMALvKJC+6U1INJIB83iKDGIFHMP8x1wLpR8QfSYifQgDDXC0cqDQ4AP1YtGRK\/yWXj9yWCETY01pmlvDcAYqMH4NQsLcs+8uOvpX\/rPf\/uZf\/hu79t7rm0lyHHP9anugxl4vRk5X6+XnBCgcvfvH1hNtp4IY1warVzbYcxKxQtKm2TSkTAJKFYyCkCDnRzrdND4wF5Xg44W51QWvoVLPUdLo+h3LZIz48AaT3ifzOJKUYC4h4V7MU7Aj0ZgRbi+Sfw31n8\/sNztu7rvqJH0XR8zVgJV9M+6rQdfVwvq6m3oBBY0fTjt0V7sO4TeyMJsFqL9KJqF3D0Qc8pnQY63dLow2mpjLDpmtTKnXZy+1INmwcY5t7PhJKrDq4UcOVcCSAJAvCUzVGpQqDytZN+hisB8QQnvwQoeZ+29+08tgx9Ij6lE0LNL6R8dHXphn4IlIS1mITGehGfAoWtgMsI\/KxdnCye4qHBnIkyXB046YpUlKFUZswxFCPSIogRmB1j4yKI3\/apw4WVmKqTBbFsWQMLGIsu5U\/Ek\/i55yfsyZIeJ6bswGuowQZF4KYI6kY\/bRbZaEG4JACKrNvyjb779M29\/S\/Mnm8AZNwWPfMNcYuseserYydxqUWsUlgfmGvSaD9Ya7uCkWeVSK\/sVNJV+rQTRA8OOxNrYB1sSYCo2NP1Mtla8bWX9Br946aI4C7vEMdccGMxk0atg7qkEWGyh\/EKRh3Ghqu\/KEln09GBRtwMYhjDcuOiGFop0OviNYWde3njkNYeG48ap7IBmeBjvW2Ac\/tCfvPbdv\/Mfn\/7dFvv0QafWW2vEs8UsUYw20miVPgJwAHhGUVTjogjwd+xAKSHtG+RiQC4GHEEY7RiveMH4tKHw8OWiem8IC6dS8uDxZ00CfA8yiQhRK24qhl0D139FlGU+Ypdz6ET9He\/742c+\/KG\/O\/obUPyvNVGCVv6ncoBdm2txL5u2\/axUFPWvvtz9OhnwMgdlNDBk4STCMOS8hQImYXtIeLeKcs4yWhuB1Yp5LjaUKCfuK957x5y1LId3KZG0goFl2YK2Q\/X5jEf4tAdrw8wjEkwYp4TUYY3CemGTcpHFm6j4U1GEYycPD08U+ogiZ8TOff5dJ0DWdm1EP2vuMm3jY1ISwPL3zPO7f9B3u5qDgEo8lXwalEzkxT4DxTzCGlmD3kDOldgoSygZC3PmkLIRVyJR71Qrt9\/SvBVE4Jfc17MYJnev6XjZqx4t0WFT84E2QKFPD1DiCI6uDLn58QAm9h0rxPotNyM4bYyShJqyDSXkFgaiufD953ufLmpcv+zu2aX0M+MULmaDWsv5jTfQ8\/q4CgmkybQKRz9iOUt3vEr8onuGYTtm0cfw0Mjaq8SQY0aTm1lW8WWsT55PPDWUJMBzuFPUALuoIdmSl7NBDp9FgRgXkKAQxkIFEQIXm1AWymp1qFdY\/oBY0GEOLplv7HzvTz\/4Fwuajf6reLCp+OmMWnQH4EXetqdyrx82AaSrFrvUmS+7S2oRKlzPPdcA9lEaWeyeJErj+WC+jSrGsgVNuzsukxwNXSFa0FV3BIxnoYWiVtJzg2Q9kCcrtk4mbTFfI\/HkSU8OpiLTeOk9VEEd5HsUjZZDh8WSqeiM86\/RmTXKP\/uu1R\/+6Id\/\/Yff8Njir3nlAyUr6sWYHBD1GGPkGvfL8M5bGHMYdwHGbsUbwubBzYEtZS0JQs7ITULvJjcyFT1ReSUk76SHNB0GKh+F35AtSEKAJC90HpGNRnH0VNzxzW\/v+tFP\/NOJX5yO573ENbXCr5zI+kgkgHXC2L1L3Fat5gt0hkYxHDqcr4To0eMv1+yExUtGu+jl5\/pOrwznBBiwuL7HtXjh\/JaDjBFeSrisz7eoq\/lA4JdAEMTFANWWsC\/QgFAUzErxV7la3ErUCiHrM2IP4KpFvv6aV1e3bae4p39ykbIZtU5P8UCcMWO7vyQaTpytdA2VuSTS3ZToDFJvSCP5WHdlci8diao6M9U3Ewp7DlFYMyrWVizu3H25MQVjNF7c1bDbMoaqDpyNHCOkYGZiuYHxGoM9Lt33JBObHLm8n4osyJUbAyyMXRcVn++VZQP0McuUftlp4IYyIpPKJo8UtqxCPRetBKK7+RISSBN5RxJnyVs+MmnJU84XQnQsWASrOUB4jS\/k7oClB+TMeJeTCkoPkizkv1XipOLL5atUHKbPWeQKWZEtwHuEm5bByDNcHBTl4TIgQ81Q9htQa6kfytlp0CJ2Awy4e+Cu+9x\/\/du\/e\/cP377C2Kc78FwJVCHkV9dteCJEaepR+E4SUTnnVJUkLUP5\/Bxzhj2E0gdywSzkXH\/RfPfw5eTLK9x+6+LNIhosOlYZI6KITwbRjfAaMiqUwAUudY00r6BcLpvrNx17HRMLp6M\/mxwjWL5S7P2rD\/3AO\/\/wj3\/s55cuq2zIud2DYaVf2MDv50AlmxPt8N4jHI2xaqOWXyaDjYRWCfJLQD0nXwrSQIWeiglzE2DkAPYTmVX1zr\/5uYSjqQThGNGPiAoUpGsDf+r7htiy\/cDtn\/zHr\/zb72wevG\/Qn55nng456mveUBIwX3jp4FtrtVrWgqIVsmQqxi2L19G\/OoK3lmtDAr1M2a5Spit6UWHarlq+cLNE\/VzioI6\/5rZF6wKvP0DldHh2oKAFVcwJRdWsIEPKGZFQOsi22KQaJn0PK307NpR+P\/vyKxufgtqmnXjTNxQnvQb3gCFhz97olv7+\/iYq4Krg4+ghve0jWXpQw2UxLW44qhI8ocOk+wzCcnjnHWte5Ki75JjCsrpmddd6UwxHGasSWSb3HvVyLKzHcNqMHDBYVbHIZF2WX6gcNsCRnXXrtzwM8MG1jrxOXw9exZVnl6dfBPRXMJPwvNQPdraPlcyXRRz0MX4JSMpC+Up\/k3LmUHmnOGGxY8MgDCKih4j4SyaBQZGU75zQzN7hO7z1oy\/8FB\/nkNzruICeAPJTqwzjvSqpdbN5G0pnVtiATpigAmitF\/DKDlRamnqPvOtd9\/7Df\/pPP\/DbyzuMS+L9xv+EN96ZpZLI79y9\/3Ym746tdJguv\/ReJ6nR0rNPaA8PGc6H1z+DSAsx6fPndZwGXhKYoEsfHBd3rFm1LvIqoYEQPBdWjgoLCgQhYGoB4f+n+8jYZGHp08OiS6iR5axft+W1NE2mq0c6M4bfiWpjP\/rW+Z\/+1Cd+8al\/94tPfaCtqXyytc4ruQgx12Bo+oCNuYiOOPDKB1VESBLPPutF8AXsEpqXUHxKaBowohLjz7AxX8rjpJ6Z\/gcqUHxXj2VgcDOB2I9z9vHTlSX\/+8\/+4X\/0FWclDeG09dN09f+Y6063x3e6rz8lIiKiYuPGzQ+C6Qu1jKD0s1BdknAZgdlKJulKJS2dv6niryJcVNgtKHWFQs5bvFAckR9d4oBA4jVrFrwchoBrAoINfD8UPkKxxyqF6j7KABhVPRQrmGqHF0b21u277wICSWOwp2QUTO1FSBD30ovr3oIQjcVoPQ9F3DBmSkhUI3UKqmvYK7AfpVFT6GlyXEVh1Vy1snnz5Tz9GdBIY9wdx3YFT2+IVZaQY0UogRhUkhiS7HUJjl\/V\/iFJA5vAzQ\/LM\/as\/QdOLD3dI\/n6b\/pjllk+JOev5bDxkoIjrfmQQBcA+NJKfzqgU3N7XAM8rZA3Om1Ta1kBG2S+PUN0CXAk9VsaKroi8XNGEnlJDXdlROA3wIHXgDWPPShMwJMW6qDoA09N\/HkViZZ1gFwUgPIZ6N3jrVhev\/O\/\/def\/B9vfv3Cr7doDP8l++7kKW9ub99gWxg1iwjKu2IqUBj+EcSeTNwjZIscyQrew6q6AvkaMm3O8OPlSxftgw13SZwuG8BLrlg8b7sZuq4Bm9tFCN6AkRew4i8hXldItZCUbVA2Cm4+s2\/fkdXDRVGHyw6Na2BO8iQkIFMQ\/cDU\/+Fbnl71T5\/85Nr\/9KWvrnu7CLItmezcbKlEOdSLloYWMVwZlN4qVRF6VAGSxeNI+4ZnVKRgchfBGxMcuVVRtoQAqQ3NRk4KjZuqR0UH3lS7EXC2qP6Ftdtf87kvb3r3YBB\/sNHW7GKT7FL9s0lIoLdfNB89enopwPWYs3TcMCLFBH5snxy3dNQguVat4vTGqiFOmCbcNBLWBqx2PG9eyxH4Z6pgYby00o\/fdnWJwwjmVitRsWAaGQXgkXOKye\/ywsrGkFS5yt6gws\/IG6ORPqi+HHzYc3aws7tHtAGeVEYu16wwsCbRPdfrJ1drzBsvvLThMcept2sgaFU6wdgjqfSOPpbMq4T0cFgRAsr+Z0EtRIjzOavW3ibOXIq5J71iPdjC2xo7isOnXdtBLYcIzhoWSjSZJICxi8IpSahAEZCQRGJ0wGCPwt7HCFexIup27SreCVz\/8bqbfEzNLk+\/QXJIZPvEMPzkQFJuQ0XzWgN2pEKF4mY\/JjSpR0tiU2yqHikP6S2mjSUroDEWDGUxLkPWRSg5Q3gV8e8y3oGVhmKPygmYiHhnVVgohHy3+IKHvxGlXdtB79CUQ6SgPCQq\/Wdl4m9LnVFpcMp9d65qfOmDf\/4b\/+aZr\/3Ga971hkVfmYEK\/4zZeM4C67p56\/5HvMjMyAJYKTf+aKhG7qZpAp1k6CCBHjn7mdyEMumBBzBmVPNXrOjaWnCuoLXjUnPmitMNdVlkaXFRhe0GBcHm2IARoMK5yUbO5X0MW5DKL+BGz8XZEr39pZa9e2urhkn\/cw2OdoBJH1lkHPhfv\/3gr37lc7\/80E\/\/5B0fKbgnT2TMXr\/ghKIy2I3nqEE6xDojuZFFhRKYw7n1I9j9qeKfevrVM6d5EqSnYxQlBHsV6wNErDKKytTNnavdv\/27L\/77I6fFvGvwyNdErtfgOfQtrlICTFrcvmPw3mLVz8EpizwWXJDe\/hEdjUw6VJgST6ksL6EUNgnJkUYviQFKlTW3LNhM138Cw794y7AJk2JxbnvLGShk8Moy+k5jWiXtKu++8jCkbFpyx5FBM+KumXOkYD7VWpjbsePI\/Wjz7NJPrrLPZsPPe3pFK\/n5ETyyPE+R6Z3j5U+iRtKoZB4HEQKwFmnYyd4HrBTGZDhvTvvJXA4KxBUODo3FixccZvVeZYxylGLvQbIICRUknJj7DHNSmHcl668kyDDujWSw42\/MOueVV3e+kdGvK93zRv9+lgkA8B2jlkXIPSM3ZfZmqnPQGBDVfOx3z7LoxfUcYgp3rwpmJZjwxGusJhjAcFDiHEyojAmmHnMY2OgBJOL0i4LRJwowAHJQ+nNY1XOYeeqdL9jjWMD5boDxxwHBvhvWArNa9s1KyW\/PO70P3rpqy9vf9Ojn\/uHD\/\/ZtH\/vID\/7AO95a\/y9R9eLUkZOQ0A2r\/JBv+PsvbH1DEDtZ5lIoCKWySVJgjUSayD5VL8LoVVif\/wbcBoo\/4LPmipXt668k2ybbCBvbRH9LZ+6k6XhQ18HEAEWZSoEhWXLPt4dSBVldmUuujWTXcgXKcOw6a9ftfmo6IT4Xex5Sj86bM3ziv\/\/WA\/\/5Y3\/\/c0\/\/7LtX\/lVH27GDIthZtq1ToY2xbBnDeFUIMJCwJVU4TvH7c5GhxqMKzIy+eJYsXsRCNDBwZSBF0l4R5gMGCyj9VmZO7sCJ4vKvf2vrT\/ShoNqV5K2\/v2klMKWOBQ\/T\/ZVXtr8RNFtIv8eoRjK7g3yTlOM8rWivgDyja4WUvqTzreDcEsZxqXbr7YteIQtjw2UiVY0o2QumXG9h15ITUPBCLklU9NJDKv3JKy3mp\/YcgA7xJqv4AhrHXafiGfmX1+58HAFCvZeny+gMmRbrNp592PedXM1DFBRedKnwywDmeR7\/xHlio8YPPe2S2EO+0KmO6S1bvmQfCAEVFedlDqZLrVwzb6udqcDbWMLeAxw\/IgU+9jALYeqRA3qLTCiW9yUANYGRwacFoBnamc+\/umHXa5BGCOfwzX3MrklFhV+UG8AvnqcHQR50DkiPPypGiWodcLfs8Yvyjt9EXT1upZcLvqxmLZWZVIlTRgDl6kCJQaFFKHjDRcsolqEYhVbso0ip5HuHuZ0nsB+\/5lWkJS6XdjUBo6hjbutgY2NheMH8zqNLly3cuWxp1+ZFi8TeuXPEqSZUggU6JWgY9TZrWs4rDFJgXd1tO47e6cfNmYi5FMkxklCVeOxGv1DxG0WogURTFWsF5aprzkdBnfHMCeZp1zc39Jou0ux8z06ZKBklVZqK8r+MTMjzNgAy3Az01URTvi67c9fxeyNxZ2JljufuU3POHLMh3ZV29ATxbz712D2ff+757W\/9f\/\/ytZ\/2Rb4xjgr1kApEk4efE8W7ZJSLXiRubmOXlFG9nVjWDIrTVZGTEiLfQWr9TGyGdkPK1AA71pGjvaJrwW3hV5554R2INHwIT3PZHIqpeVp9lZtdAqiNmN2+89idwso69PIz+mSD+DwCixqTKqkcycraI64CSEzCbpR3XilyXI4Da\/7Cjr1Q+i9rsDJBHxpc3N46r9cSZ5DXnla8Tn6GNqRrFOdNulYQ1oMES5lv5MATAaYIML2J7K6dJ26fZJGuce99N\/sYmejzn6nE2fd\/cO1jTrbZZAmebB6FOgO1nI2N3dIOUGguECZgj0J\/qv0h6RnsB8Hc+fOOX6o+zNh2UZGbs2DeQXgeEVyGAg9l32QNCOSL2KRkhhdGOrmSgDU4XmQkQG1L3PlIMALoGFJBDxw6vXhgSDThm6SA0EQlcGOcP7uUflEGp1d\/q2F6cFjIeGHi7Yc3OhMARNu9UGTACaWPcUmAk4UTKJKLPJUbKiyK6UVhlRGWA6wnrHXX\/st\/+sk\/vO\/ulu8QwpO1Qi9nOzXJ+AZGTizmYIU0I9DmBqzumsmIWi4jPOh6vovP5JRPnKWMz9ArNK4G6pMukMD2HdGa4ZLR5jOtKfE+X05M+XxeDPZ0i5a2ZlSt7Yf0AyycVbF00eKjjc0CpWfVQXo\/aQ8kf8vtXvpUhDngiexdDzy69pXNX3pNBaGGemDhPeRoGIgcRCO5HEnEiGNoTPeyo1mgq1DfBFabWn7duv0PDpckrn\/genVvuy053V7k65XD8Yf\/\/INf\/oPnntvwhO101FcqfmOEgGKhvgN4fw9c\/\/ViCAnoLmLRHiBpxKTmsNnVqj7k6AkPz4\/tCF2B3AUmqckqlFyXFFQh29ApegZOZAzRP2\/73uqas7V4c1tG15yYpr7XCl8i2O6zon37zuOryrVm16AyTcWHCj8O6VXH2KRSxmJcI7yHY+Z\/2j+ETyxcKA7QOugDZEjxsChqHTh74UaQweK4VEEAGARv99zzwHe\/9q09bxscwCRv7ECeSxKFTNcEmf\/FGyn\/TgTNPo\/E9xIWmRzaSQa4KHTtI8eGlh47Jrpwyt5pGiv6shOUAEqUhIwyF0txs5PJizLzly4wBbniy3rMEnrKMdfU1CR6zwISLGucAL7l1axbbl32QhWG5BmEnqmwAdJ7QaTrNMYbKRRW3TbnlWIlcKuwPDmesjBe6VAhHSxf5096Na7ZMDgsoYBUhgeFVdeKDa3gvvDSsTef9eOPtTnXpdDnBCU+PafPMqW\/UgC8oKAKSDEmqIRCblZT1ODlL6JnKwV8NDg94rrBripDYckEkTOHIRPi9\/lv8I9Dxi4KqOTrncHlixp33Xub2DTXtS5ZlfEGk86Me5zeKLb\/\/pMn7\/W8TDbADiur1UuDLfHcyRanlrBajYeKQ3KbJrKWbAv0ugOIFfpgyXju++JNf\/OvA+D9rFhf+BogLrACuZTGrJBseMjbRcaGAWU3bjKPHB9ek61rx3oOmlZ48WpwH0rgCwM8I3R\/KupG\/0rq+VEc9swnoPUXG1Uvk9+zT6zCT9fOBAEvnCOO\/\/mf\/OB7duz6wZUf\/PDn\/+Dll\/c+arnNzQN9R13DqhcVYAzIfmTAyHJsFOqCRx8UiHgiENlmgYkGhn\/sdkVYnFKkGFSGF1PKNAOaWjO\/98DxO+5atXwbnltHtGZC58+cNkwptGcIytJXn4nvDKNCNpI0ygrGSYiarDeRosyogEuIzbl5KlKTo7cW60ZdfaG2YZN4jRFVYzMaclwnDOA0gBFrxaD+9IHZDtxMHQpXm80oCR7u2tX7sG0W7Ib6egUbkkUYlY9HEQ1w0RilAeInknsdZ7NCANtp2Xnh1bz8zl2luxFB2N9Iond9XHcJnDgt5g9D4Y\/JfMYcMYaAx0Z1xxh2KdyHzqFSmefaGB456BNZEvwh3+TEQ9VqI1ZQwikj8x++0qd0dzofjQCfhPGXvtEtanHB6O03O027Oa5vaBKVGvJTODhRKLECdJCF3KnUWSWHV\/JiEjF3vRryC608SvqyqGRo5\/bsOXGXaS6Y0vl23Ttmgg2YZUr\/cHMUDRfA9D7iKZDjRA69EqKSQx2GKIH88aY+JuTtkgmfY\/D8UlVMkm64IZSH+kWmoWTkrUptrluvFf7rOLQAHbeBS3xd1UNJXAAisTIqN0eq+KdtS0PpeGfl3Qie6QAxdGzX8LwgccIrWWfPnu56\/5\/985+Xh4YbLKDaLTAhs0AmlAJoubUgMitBYIUOqtbapl3vFSvZ+lKZbhWy11BJQP1ayZyQVEiXxiMboIwQeTBqRLsE0AK4wKXzuxq4hZfXnngrIguvzgRmjnnZEYVi9\/6h+Gc\/94WD7\/m7j33lVx2n0GXamVzvICpQu6gjQWpZoNls7Fg1RDvo8kRwSyr\/MpFMziNKhfAIfkawA9MZAakCQxWYLjLrN+x69CfeuvxT0zSEJjTvp6kN+rIzQALQh5yXX9rxA0GQr4efAFV2kzR0CcBk2skYWA+CXiaUfgnzlG4enqyYVwjRObj3ZPsH\/uzLf13sP1UIQ1Rkdy2Py4TvR04264CYrReMbLkqGLHqMnWtPtamXG9\/2XVzTVD2yoCAINXuPJ39XM4BQOGQ8yVDwfyPyb+EzFXdwksvb3367W99+LMTFKmeBxMU2HhOByTS\/vp3yvcPDgWNsdEAeA2cGYzznO+\/SJyGCsLFqChq\/BBGBmx\/FTifKjLJvepA9l8+99WfM6Na5JUzrbKCO2o\/y53MYPYIcscs7EG4huXUIfjTaPSfDnOZRlyLyjyv7aJaNOFqGDpqTCtDVcHVaLFi\/NIogdKfgbPLw6iNA8tav3Hfw17tIXKN3rS6zKxR+uO4G\/35QlMYD9UbgkU\/6LFQ\/as8FWV4IEvNtmbwUbrHhVGvi8\/tBMd5wZeJN4g4cAegftNEapg+rqsEiiVR2LH9yN0B+eThcfexmDoJHIuK\/6gnTVXJJXyLfmYqq2WAfFn12IDH3ckUhAMfy9HjA53ZTDOYl3KyjLms1yAAj2NJdQtF1RDU8aHgo\/BaxoaRUWiuh8HA6r+wPjAuTIsL+KhIJJaTloNceBMlGAYkK3M6DNsDVwmqT3fdut1PhGI+T7isx\/tEb9zU0IhscRXUG93M+VzMTca6zvAuzQy15I+w+EoEKX9QHRb50mCtcdGC7LErdd7yBmQuCvHBL7wUbPyDP\/6Hvzly\/MTqjNPsgqwUSogH55IpMjlkQEP2JqIhrGosaVDlhkO4hPpceTbTPQWc0jaMrmomv3Pn4Vsphiu1Q3+vJXA1EijXRHbL1gP3h2EORju95yncgVcdxdMrBUmmOar5mnD2A6wJJUoS+4rmOUtEd0+11fcKGN8wXiOAK6DAFas1kYnijA8vfVCxG4YrMB48kOs7WVHXAKc\/IDtxsay8stymFd5DOgQUs4tKiGdkjIq+AfpQzhsPSloM720U5bKbtx68t+w\/zISa8eTBaGX\/agbNFX7LgNG69dveUK6ZdSF48B147UuIcsq0spQIJI0yc+VNWeXYp74Hquc6GAqI4sBRVGhoFwNDp5prlaqVtTuxCwDtyaKIHIlmgIW0hoUUNN9YS2twuoRgCsw2dMgxEgdYX0kkYYJMTkaUue6y8aoqvYy0pmNcEjGkdLHYh\/D3kSMDXSdOivn4Yvc0imtGX3rWKP1AEAI9XmrAAKgXYBCRPczOlroFPRXYr8PhBlsUm+O41zSMVr25XnHoJRV4k3DuiFolQ2MKm2zAS6mKE82qAonTsQFcV6MHIXtj\/XaxoLu3PMc052LEY+oiqcnAIkr\/nJwDssqN8jyzL1OebBbiAYseKI3pnia8xwQuvxEnQJ\/G75GUgZ9h0eU7FVcuoCx7DoXWxkIbwvkfEKvvDwkfXm6u6SGMAR912LM5XEdOwiRiNAIv4uBTyYKECVCRoPJhmg3i0KEzy7v7BaB4ovtSQ7Qfvp6\/+dtv\/sqhI0Mrw7geycM56AmSLQJvKDdk1sAfWoMdUSFqGBpKDpwh5ITNOWbswB7BEoBlvpAJSzmnWtp7KH7\/yiXGkStOCZzwI4\/YL790MH7be37+A1872e2vMiyAogA5YJIYmXpsVjjG1X2yUSRuSxaE4fOyeAxLTBDiI80fuFktJLtEcd4+dfJsF1juuLvd7EQD4+mGqznnus7VCTZ8yteqnrOi4\/Sp4oIAylQMw11SZEq9iDSanC309I9u\/dxKpQWeFvWTCr\/CS4eYt4xyFfJtKKyIOY\/1QkYZYa+XoXzlsmDQhvFP6ltGtnzcLMAaUY1QCA\/nc80ZiQDKJqiiTXxoEl2FSf0X0t1KgwTzB1MMymFBnD59uuvEKQGtcHyEAxOU+3hOl6ZK8hrP+TfsOfC\/25u37b0b67AVAOqY5xioQOdidecL\/BgUmeLN90lwQN8O1kCyoTHo21Bow8pctaxMPox8VvxUpAnyoJ4h8TpkkDJFU32DGMY+U6iDOxeOK9KECyKM4ZQKGcICQ1ocMdNEKfjKqOTymtRppXMMOWUuHC\/c62q+k9+6tfhINY73Zm9S2NhsUvqzIizXx1EZmP0L13Raf4D+NGSiagNcl3wuRSKrj0tKQLIeJd4dGRHjmdJq5ySCooJ\/VeDgr3pxFoWGGIObDceUb6Iz4aHZVes3bH5dGDpg7cECJvtJafeq1gJZmFSdBYUrV60mrZmqtUBPGouigWkGEB8mWHlIRBUZLsos0oNQKhR\/KMtQWvE5q\/2SkhNrp2TiUBQJ8OS5IpsBTz+8MCiErrL6LnNQOZA6OT17uBhKg4q+wTONu3afuQtfPHOpnw4jMfC7L2x7as\/+gVuDuCkTxmDWNxwTzUAIGNl\/hq8Uf6gXcpeIUAwiKjhmWADmiEWzCFSoBlbUW2lpDHp+4Iee\/hjuNS6ln21qbRXdH\/rQr\/\/Ye3\/hL77Z03e2K5tbCESPg7kAWk9ZnAyYfmSse3JTU5znUpmBsm9BbihfrJQaeC4jaVAR4uPW9Q+IZk6rmTCmbsA2zCZlf9rEv2P78QfL1bgQx1DI5ao+xsZkFEoy36UF6dJmqIJzjJkpuJqKFlZqRcSsANPAElGpwetK\/D2dC8gNonbuVVm7Ay4IeP8zSJokusOAB5iu\/DwrK2G+yAMXlcYF5whehGPQsy9zgqSyxrVLavvwDMPIAJOW55m5TZv3P4oTDk+bsG6+C09qfzx2XMw\/fqJnnmHMQ59hXCV6A6NB59Z3VH2Z0ngyEEouVxnkwRgJBsuiD+MlAj83CFks2wINJ8cn1Auk3are4CCCk4kcaB4gQV7ZE0MhiihyH8HaCuZZLPEJtp90oDRqU25+OZaSISe5k9kA6Ib4zMIKbpr1mVfXbX\/DO976EGGWV6QMvRGHxyxS+oE\/iP1MGJVzCnc+5sU1BSwzcVwroIPrMGBmlVv6eg4sZVRjoWfCpVT86R+WDP1SxI5bB65xHwDuXNiLmZ5UO72eTb7W905H2rW+7zn3A1mM++JLax+3nKwZoEadLLIjuTQYlk8BLty0xyJmInjbMC\/Qv46rFmoni2SqHKiKIw+sGa6omIOSltL2ofDTKw0IDr39XHTJgBCSwQn3Cai4SsUWK2URSVSsrIiF1nFVRc\/RI13wR5cWyb+NxTmErh5jw\/BRZGDTlq2P4DeXVPoRPfaGa0gmiBrrPdHseKIB3qGc9D4yfBsSi0xYACA34I2S45WGjfIiUvGukGrWRkGyguEVB4FMmBCGc1WjUT0SxXvf9KYHv\/Dpz7363iBErhCrmsp6B\/B+lgFlAFY0htKvCnmp+3OjQtVwKDUK2CBLHUkm3Ay8TfVRb6\/oGAjiU6h\/oBXU6zqjbsyb9wP09tu\/+8XHfR\/JN8y\/ge9LKkUjj3tuAFxSd8o1XzH8pBCcGIY\/KZydPOY\/NobIhfKOPZZjP6yVhNnQIOk\/jRBzALAewixoWsQy6o4ESjC7pBTQkiVORpPTAmCYJ\/JDfMoIIhwMIYs6wkFhuhYq8xLmwQiBa77w4suvA2vQP4Ld5XpE7mfE2j8TRurGTQdeW6p4OSrXDmqQlJGvYdDwk0eK1EzWfjnYCC+FOk+vO8ahj\/GQy7cIH8ABwwGphNOMsVRCvwMixBUd16WRmrj5oa4zMoB8KKyfObcZxiX+jT0sQHGvCM6qkQiCVAZTeJqkTkjiDhz0+JJOGUQlyLTmSHpY09q+be9dpdJD5Ou\/KZV+BbydFQdZeYrAEnjZEVN1zLYpQzpRmQw+LcD33\/QFGMbXpZyYiqpT4ixBnkVvryxKJCEKeHGRB1NbFFLDHIOrHt8NZvRZchwlLnHiB2MoksyNpUdBVqaEMmlGLqAiqEpDcPx1PIjT3bbnyG0mMLMBGWMkewI9GcleKDdUKr3K3lWsHNjOubES1oP\/1eB146LJz2rVGF4UeEkYb8XCyM99KKs+3onBD6BdIyEQyzHYeqhUwyAgi42LBVTVdrBFQ2NT4hWkGDlelJorQ60JxkiOK4oOCnqINTYyqoQRWLsP9t1yvAZV\/BIHHIDQp91MEOcdPy6gbXmo09g88EKwFpeDARDVQ6FuRHsb8W9gRqVmr85BOTj5Hpou4gEBUwomDKlZhNDJD\/3Qwx9rbMpWitVBeC1LeCwYTth8BHIbIrwE7ik9VCar+kIZkh5UVdhL8VRLpmjJXpHJ1ofFYdGkQhP6SNYTbfxM4VBgEu\/WHSdvq8IYBsJNedMlL7\/y7MviRcmyJ4N3kgFM4aLVXFUuH\/kVfou6HMILqsDwD2KOYXy7WBSCYShoMAKYRUn2W9IAY92oIoKIKJyw8+D2cQl9o52NiBujhxLWI9EX6v4ymgwng1Tu0CZievgpnAi4K+Y7257P7Nhx6jYWJByniCY4lhQchHsdioujREBS7JCPDn0CLcBDQEOd4FXH2dZxnUakFV+RzFDiHk1Zqj4cqc0yriudc9KE9rJuGJLbdh+\/L4xzOUIawbwp\/PIwFHeucWiVbJNyCqmxRZ0CfU9nErz7XPtQnRHSRAQIe0yI8cQ6hR4cTB72Gg+yDjCWyL3PSJJyEGFbQqeUy3DgAJrjcXwQdsxQLwMBWF8t2rVJBCkd09IpNPbpcK2MC9UR\/LIcX1UkjR8\/09M6VBP54RANuAmP2bP5eGfbK0NHlgA1CMuP\/YcBJr2P2FIxlgp10B+i4czw4IF7wNjJELo+riCBCApJYFegGNHgxaLMZM6wID2nMTFzNrzADO7WPNNBKT1WNr2hhCpDzbRl4NG2oBD\/\/+x9B2Ac1bX2nbq9SKtqyXKvuNt0ML0FQiC0QEglpOcl70\/v7aWSHkgjjVASCAFCb6a7996bZPWyfXdmdsr\/nTu7smzLtmwLbEDz3kZYmp25c+bec0\/5zneULCtIRBxHxr7CZBS4irqqqELIJBKc4\/XsiYIjzl+eOCPHysKJAjplKiZI02B8YjckvKSFlCffRFHgS44Kpc5Fgr5zqk56PCg7HVhIFD\/ZkgkFSrUAuIIDH1kA2ZWAbA6nUsP7R9pUQGRekDz4Nwp8FRTwwfGjayDJwHLZHuheHan3NBQ1ejhQMAXzyJLov6nol7fZcVP4VLgFZwFuExR4CmlZHfOtmxUUm81f3HFx0kAW\/yAHiEI8HgH9sghVVsRrElWv5KRw3QxTCadJXUYdFNMK4IAWE\/ik8DxUf0IbBOGSfCiglVjAG7Y4OchRHJMmso0o3tW8QVCkKlSUTJAHGFGIPgkWyovMKJ4VG5vUibRYG+5NEVHyHKGP8HsZNoNRSOJhZJZIJHzUep5ezVEMZegrQxI4rAS2NbGRO1uk8Xlqj6gikIG1StFPNEHkHxcKSHz4ZDTC+QeURobx5FFVrFNENpCNg8UNWx57gAEYn4SifwQaVOgA3jwLlftyMMAkja4JezgfZ5EyGF8EzYEBx7C2DVqTHorwIjNAOgC2lUxNk2Agct+b6l3IwCY9gaylF3pLgSVJXa0L5Fh4YfbDmjRQk9DeHhi1aSObeNgHP6oTyOAnvQXHBjVMeFyYE1R7hDFj35Mcy7Z1D+9neLwOcszwrtDi2GVWUog6mLO2UcEqvcPXf2T02p57YfM7TKfcT304C9DlXmDsbexFeN14v9gvYTegrooPxoE8uR6EbGkfRa9m8OSHmJ5oZyB1gmNHxj9F3YHElFHEK\/mhu\/18vwF4FKQPXsxJ93eyBx080fxQCXiQXc4jb0WwoAILQJ+KmG80p2mOkXNJ+xBopvnH6qWIwj6g4+\/wQchJEXFvxPGEp+fveqdGZV9vw+N4zucjE7fTM0wUuito4+cQZXLneOl48RFI4WBCiEIPCn96hjlO19vyhR6JUIn6ijxyi1Pvk1KG8cKjPgTAow6jkLVr5zugeTsqo+lIxjOI5w7w3ZdgGS6+lBvPRb+GLkBFmURGYxiGD4GC4waFo+jdlh1d0zKG7KcuvBKaQUkUceGwHkrfu0w97looQn6K+DfCnlPUXsamroC6k5pIuZkC2vVhoIP3GDssz4Ka2PCJ1pPoPUuffCrFTN7Fk5pRwegGTVp5LAw2hQDLasBj0hzCBk0\/wbzgGrzFGgMObuG7FqrAAHAX4BiYgLNTBDKnB6PrN7EpB3vn2GkdmcKKvLakmNHg\/Pe0GRdQOIhrUh0CrsidAcrUIotA\/01GBTERkbPgQddGUVBlTbO8aIw1wHmxd1TwH8RYeaTLIriDo+H5qTiZ+oLgvhS95Nkg0kVwxvhGV0o1U2QCo4OsVQ91kETeQXF7XMQUTjc2dAxJYFAl0AWMxJr19hzNDgcFqjfBfHXzlm6XXTKO+LoghU6BDvyn14vMGZr15XIpHoFV4dj60GGR6lWCYOAxoXxAmMJ1g41qTkxj6Ax8Ec40fRT08Uh1ZXgfCyrqp+isBSYfg\/D\/4Ean9UtF7hSZdRl7ikXuRb1B4+FZ1WIhJxXAU+aZdAoFMmyrzLdxY2JO1gWRD\/qxN\/NAhjQuz+9CMkNGFC4+iYq2gUG\/8QAvSFF+sKdRhQX\/Bs\/WFHdiCtodxXFEcgS0Sti6h43UDF\/EQp0F5WsLcOoAm0SwhdLfblaIoDg8Ek\/So\/2gaHQjUYTJgwwxnCnagwpaAvMJzHAI2FCAyoHT5\/D9B1fmH8wbasJV\/LeByUeBJc0AOyMVpeO9yDD4sSfzbDfPIvH7u5IoOknuPk6Un\/gFWvnCaVWZkaeGkqAht0z\/4pXbz3+7ZlyP22Q+ksnqmN0Im7WMtllHtYAUkfuC3YgBRfV4c15oIzTwxqRoH8ZY2yjO9jN0DJYEjkhRDNZNX\/\/ruHhwNy3pppv5UTQuwRUMLmBgYuScidOOW0MlCmgvX7HudE2z0ZgOUSgwEiDxgnnvpqbBms03KvfDH4C2B75pClTMh1pXC2UuCqL3MhgMVDAp+LDZe\/CTImwyIvwKInlE6aki0q+CSUMlRBDE4kOEO4DaWEEm3C2yQkirZTUY7hTbo3XIN+x+3lQJRkDZBlLOxPJAWTmkWwkXnEeB1oL5W96F5jv9zi3sETC3qWSwyCRFtyoZ1H39Lw4lKmVp+ZbjfnhFIbYIgioRykmSLHTCPeJEPV05FFKTsgC3D1FIRSUYTwq\/TXM4j0DOMWcSA+QIkUsaL4\/KUQaECqepNhEpbs5kgp0SMh0iGHj9F\/bb8g7kWy+Yv\/gdYMxSqQkfzf1+Dx7UoTUC41pG3w4R2GoRBpGK\/RSZQK2QARojgQ+ycxThh45QEIVVwJSigKNdESIw4kDLKcRYxD8cW20Uf6vGJWMw4IJYIzVwHKrB6Q+kLaK\/hNVGZUBxXbjBFQu61abMY6kGiesRt5MruSSuDoaTgWDL0iWrzoUPMdD9fMB7FacopswoOSX4KRDag0OgXGw4Agy26gEehUqGTqTjjU24C4sXNl2ia5bPphQldR5HIAkALr7P8MAhzaOivnWDHmSQUcYXGSDI1i4Q65mA+YBsMuTrgz70AyLpAymEjH0BwR0+xyibpCLaQ3sP7UEyHFAJ9wuAowGnAFoKpUqBOYyD9g\/kuvk+t\/\/hanl3H0DDX8SGcR1E+XWCCOFCgKt6ly5dczpKR44K3pNKZ3sDgD3UOABHwnD3MWRzIyfSVOlvLMctenlEghGSAO82jbGEtjqxGOl3vXHabDHFKJhI+g2RaZu11TF792RE3gjXP7TBHpGgD3nyERtMg3frI77SgBX\/3uh4MZrMWSVcA5NYBRCzApsYGtPymXZ8jniKhTds3jUdjXZAduFSbBJlpsDz9RQ0pihVaYPn\/W95lJsizQF\/lGWSwOBi1wS4Br4y2Gfo+zBgicpMoMg1SavIb8zzOVxxu9E2tO7FLSAbgCxF0CbQX3JxGL9ePwugIFgzARs6mGhoIydieixOWCHcUaF1isg7fmpsxYo1p5nWeBroAUW2cCjEgq1jX3Y7ivKMAhf\/3g6jRD3qHvS8RPHmZhyoj4B74Dt4OC1vyamMFe4wHaHqCAto4QfZ2UQqiv0HvWgQfURKmzYnjbKKRJeKCCfxjLuFvHjWIrUtDxGSKGmTgRwo0k9QuVBwqFv48VlFb\/27gpjLu3b9hukWOaAwdHqptXozbzQpXWgIXx04xSD2BhhhnE0H1i3a7fIsOtULoWUfj8jy87lR7hpztAap5wYdeQQBiNVKRDg2n83w2IkXZAH5XBI9Pahgs8TKQnVibg8LMhCpcJPXF\/BFTevYLYR3s4S0cHAObofb+zZs2jWFepTgt4O8n7sBC97YiesZiltTrVTvXBHQ38SbN9DUZNDvPcD5iEG5kKzS8cb6H+QDLVu+\/izdsFHEi3\/QUGg+4D8cBHC4Y0aZVQ7Zon+7bDpuEA3ZokAZ5gL2Eur5iAw1dTAXoUdtRGJ0mluI\/vPzObUzrtG7y9I8gYOIbDJBbilTVUDBONUHmICfSeiO7vEFwexDWVc3u0pOCf23uwe4Gpjvk7Qv4PrkYLhMVqrU2ZMs27OH1SdNZ0dE3of94pAvJpkzxbCf+KwZa005fiS9rO0Zx4fklpXSHT3sEZIDfLODdtrudLY8rPqzIM8yArQJHuZ4cxj9dnuVae+YbAstgJVTfrGoz\/gko42Vzxl4hSgEEVrLjMKOk1QP+PzheB1OAEN\/H5JAiUrObd3tHlxlYG5B2XkK2EHBHnHYxfR6SDIDPP+Ly+3RPT1apShVYLojBE6QHSgzlcImtB448wZBa0q+TmkzRXSDGC2BkSSHWCT2DaI8w36tgjLNJ4MNAUqUF+bypUTKnP7l5rlJiVNU34tCKLTlhdKG4Q6DPYuUqypHUSdATVLczbxvl82+ciAlbfGUgGv88+wDGcu4TlNj24juLk5heQBfP+Lq2IsLNmFsqYitBGFyMzN9NsEijMd1fopvjkcJXUfAH4iAbajLt2TJusuuPnXGa0f6jjC+WNOuphGYAaIXz68BX+oPoWCYJ9xdaJHLTELdiWneEOsIOSnkNFGUHwXIKHCUcL5XFfRohMVTeKrwAJTzkY6VpuxRfOet9JUjcPbfSo\/tPktbJ6tq70zUmnYVN6D6T8HRmcXABmWlANkg55kCCQ6MdMoEeqAgCMhO2XMXQkvwoCIEhwo2sZbRwYPrnGy+CwX9YdyK8NvQSX6sdxtQDB16wws7HSqFB1G4sVj6b3Ii4AAQvIP2b5q1xVoDbuDyLAThwslZFllXd66ypZU3VIoP5lvrLV6me9L4uA4k7YeMA\/QO1jSackfyKEs6zuuK85rynCcZtRS9pjToPnrwyAQz4HUCY9azbWvrBIr9wA3j8BiOoSfOfcokyUSAQQEyqoVw33EvvBNzxQR0hzIoRGWMAivmRz0azSsFe5cfLEAGHAP6LjkTvbsXN9ix\/+Cx\/ZhbRItM8HsNm4LPH8aeRuxsXjgTmK9c\/xMkjOYUzZuSINzAFfVTEbDnEUV1IADaZMxLBRg2nzdqL1jcdem0ayt+dySii\/gp0sbYa0v1k+++Z+2lry7befH2XZ2TxtWN3jZ76qhFq9c6d02fKqw8kmsey7mNhu29577nPspyNf6Z08e8jGvNO9z13hxGv9k6omC11lBanQIYHBvIw2jFxyvqCUkh46MbeMI9w1Wlqwp\/bTqcAIb+PmAJDFhRDPiKr9+JAxqrGw0oRctLERTS\/u4HDSdZNIZ+SkYwsN1wgtgL0Q0KZUcINhB5Du1rIQ+QrYffEkpn7HMm7TGahsaW2FODQZYJSwfmbWGzK0tXbDzfsFSvhE66FMWjqDH4hHhTHBo\/b1fOfxLOvyRUN11u5GDc4+I2MSQgbe9RNEMREa4uZBWk7EUH3Xa4XnTwRAJZ52Ri0+qiyDkkIBUEKGoTjVEcLQseICWCUSLfIJexbBK0mKjDOtRBSteNxLuGBbH+2IQtRsYil7OjG9Y1z8EJTx5wDdgggbAHURP3gUr+jMv6wXcW993tn6EttoEvcZNTNN60PJ6FC9ef3245SrXEvaQBH0sWJ87q6smGvBF0hASJCNHF0fhp06GIKC9gpNGgWM0tTnSLJEt+iYS0tQ56O3LQ6upiTQFQl79OBv+An2noxLeeBFDsLz\/wxK6zwXHPuxLxRn3cE98f\/kD\/3qvrOG6e1\/cgnIAMlkiYe2QDc8BdW9AXIT8UABl7DlolcaA9seCSEUprsGApctxSxZCWzdgBiqTC9irkcmk54PVZqs\/nzeeoAIDId9y6o71gPtK7RSOtyDy212rE6VimlOVDbw4QD3h9K1fvPDthOZui0iHrYdxoxREcpSixG9IpWv4waOGiQ9eGZNkj2DB8fT2GIyOSamY05sWSLlCfPhILcfsMQP9zFbH\/sOgXXQkWqSlj3cEBZSAHNcp\/+F0L49u2nY1p78jVCmK0OG0ILoOHgZIjKmgu7CLEh\/QfP\/BT5NTP0IVwJGk7UQAPLehxVlHmJJLJTo8g+ATVA8Y1Q0KPLAo6FeeD20SC5gvZ8ShN8ViGlsQJku1VvIKlmzK+C2MejD5UTI5NmWd8oXBpVtLO5Y7CzfrKgPUQ7bRNcFjsBQayE1QXF1D8nldfXXr5x6697PdHMF34qYvXOlN+8pM7f7Jh057p2YIHsaBwYXXnxmkbVq+c\/tQT5rtenZ99\/9lnBl490usezfmbtqam\/P3eV26NN7MRl150ylTQqr94OMKVE97od+xtYZZ\/cpxtdlZzU4wii5xQvpjCJ4VB7xz\/VlAARG28LbOtmjntIx2zdbUg177diuYGtJiPZoK95b7DbWxesAX9XYKEEGiM+NhhxCF627Sno\/rBhxd9Yt264CmynMoDpU0mL+gkvV4YfSJw7rSVHU40+29EfHNCulxQBcXyq1bu7DPHPpnQnaei2GT6XiwLurrXFq8+XxAComNhP+fwEeAZ4f2SMtsn89v7xb0bvYyCPL\/fw1JgTnCsDBs3oWJzfU1kt5MroLwUyCWFqBYskLIRZQcVrvHCP+Lb42Mmucge1dTNAOqhfE4iJVUsWb7tNKRuFW+IePz3XV77PqhLseZeh+wE1BVASRcMSqITA7NHXLJkw3loAPeUT903kwK4p1FdW97C1oAVhyfe6f2U9vQ+iCD+tZLISk6cu\/FQziKXR8pAirCmpuy4\/z6uXddpOv+qJI9pAMfaXU79l7\/70C2KHFMKBhkBPjCHRZiWJbgSOKfNLCKixJBEz+NSd5YKm3n9AWeoQFQKY1QVKz9p4qh1gAsdt9qQATzy8TjlsIvnCAd1REbfEV77hD0dEGd1\/vxVF1i2CrJMOKP7JSb3\/rOkG4qwHcqiUVE8FpwHMApTT2HNptioEd7GcWNHrxOcNMw33YKhX2o+XUwgcCMNjbbLCx6Pr9DTWagO+MM5NPxTLCTvRCVoP\/v80otU7ygUFRUj0yXpcViP21PDhRFSgpGMSILKUfSf6mTI6KeVT+vO63t5\/poLrr5q1F38C4c+juD9u4ESdwwEL6I1i7A+\/hvNAJFNFcK3\/2nR\/zXUBHY6YKwJBORMJpcJIOOJB4f6pBUuGJRi7RuCHOj9oQ0NqyIqt191yWn34Vrr+30sepnURIfrOPpQqIicMPLp+oTHX4eZiXor8c\/3ts1Npu2IAGgnNVp090liY6MNjGRVpLXr+9TF90uy9BK3PiA6qmwgs1zIn3v2tGfTibIgUqUgBIRqVhGpdfcfon\/C0xYJQ4r7D\/j1QfxUATSY7Hj8Me35F1dcbItRL+BBagDdem3AVnu3Xy4PGp+r3nnNBn5lgHFKROqKitFFwM2oY3ouJ6gbNjeeBOQrha0SAxVfR9bxfvtbz39j7cY9p86ePf2lL37+3Z8vK2ddyTgr++tfXvrSiy+8+s7f\/uk\/32xLONcCuZQv9x9ZkGmg4yidt3hp20XdPZEGNO1E\/4H2k9EHphJ\/az\/UdU54o58JHXVMbB5jO6lyN0Pobvwct8tfMqUZKUVInhyQgZgDlhmPMaF9NHO6ynHyAdCBIxXs0PlvOgkMVPEW08glhUo6lZS\/S49GaV6fr5Jt3NA1ddO6TRMcljagRARCt1gWypB82JAYGnrzCDk\/BnLfUpjajW5oOVYRtjtraryNV5xb88T+kkaUybt+c+NUW6iluBrgIpSKxiCo4VXxtu7m6a6OUiSNczhzoxPc+wZcFURZ6ur83e99zyW\/ueodkX+iNtdAHxwbrJtkfVPQphfdxPdat2YLOHZOxoGKXx7AZi8tZOfs3PnLezu7W2sUyMamiM8hpgePOBJsiorAsEnIuCD1C6DoogAqoM2b9pyUR8YEl9inS60C47iqItQmsD3gAzFQ1sVBSHtD6PSqirY7d9r2Mf73DsgkylApxDK5fOyXv7rnR1NP+sjyDsvZWtVPVqXvY2xtdyruuX\/jh15ZsPbCUPl41pOh9I7IQpEIS0CzesG9aYIGVYShxGVfhD2U+j24s4HYKHQYUzCqRF0bM6p6I\/UTe9OtpqEBn\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\/\/ Sostituisci con il tuo Base64\r\n    pdf.addImage(logoBase64, 'PNG', 10, 15, 50, 15); \/\/ (x, y, larghezza, altezza)\r\n\r\n    \/\/ Aggiungi il titolo in blu leggermente pi\u00f9 in basso\r\n    pdf.setFontSize(18);\r\n    pdf.setTextColor(3, 58, 143); \/\/ Colore blu per il titolo\r\n    pdf.text(\"Calcolo Pressione di Collaudo\", 10, 45); \/\/ Titolo spostato pi\u00f9 in basso\r\n\r\n    \/\/ Aggiungi i risultati\r\n    pdf.setFontSize(14);\r\n    pdf.setTextColor(0, 0, 0); \/\/ Colore nero per il testo\r\n    pdf.text(\"Risultati:\", 10, 55); \/\/ Sposta il testo sotto il titolo\r\n    pdf.setFontSize(12);\r\n\r\n    let currentY = 65; \/\/ Posizione iniziale per i risultati sotto il titolo\r\n\r\n    const risultati = (document.getElementById('result').innerText || '').trim();\r\n    const risultati1 = (document.getElementById('result1').innerText || '').trim();\r\n\r\n    if (risultati) {\r\n        pdf.text(risultati, 10, currentY);\r\n        currentY += 10; \/\/ Sposta 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align: 'center' });\r\n\r\n    \r\n    \/\/ Disegna l'asse X e Y\r\n    pdf.setDrawColor(0);\r\n    pdf.line(startX, startY, startX, startY + chartHeight); \/\/ Asse Y\r\npdf.setFontSize(10);\r\npdf.text(\"Acqua spillata (l)\", startX - 25, startY + chartHeight \/ 2, { angle: 90 });\r\n\r\n\r\n    pdf.line(startX, startY + chartHeight, startX + chartWidth, startY + chartHeight); \/\/ Asse X\r\n\r\n    \/\/ Disegna i dati del grafico\r\n    pdf.setDrawColor(0, 0, 255); \/\/ Colore blu per il grafico\r\n    pdf.setLineWidth(1);\r\n    for (let i = 0; i < chartData.length - 1; i++) {\r\n        const x1 = startX + (chartWidth \/ (chartData.length - 1)) * i;\r\n        const y1 = startY + chartHeight - chartData[i] * scaleY;\r\n        const x2 = startX + (chartWidth \/ (chartData.length - 1)) * (i + 1);\r\n        const y2 = startY + chartHeight - chartData[i + 1] * scaleY;\r\n        pdf.line(x1, y1, x2, y2);\r\n    }\r\n\r\n    \/\/ Aggiungi le etichette dell'asse X con capo dopo la virgola\r\n    pdf.setFontSize(8);\r\n    const labelStep = Math.ceil(chartLabels.length \/ 10); \/\/ Mostra alcune etichette per evitare sovrapposizione\r\n    for (let i = 0; i < chartLabels.length; i += labelStep) {\r\n        const x = startX + (chartWidth \/ (chartLabels.length - 1)) * i;\r\n        const label = chartLabels[i].toString();\r\n        const formattedLabel = label.replace(',', ',\\n'); \/\/ Aggiungi un capo dopo la virgola\r\n        pdf.text(formattedLabel, x, startY + chartHeight + 5, { align: 'center' });\r\n    }\r\n\r\n    \/\/ Aggiungi le etichette dell'asse Y\r\n    const numYLabels = 5;\r\n    for (let i = 0; i <= numYLabels; i++) {\r\n        const value = (maxData \/ numYLabels) * i;\r\n        const y = startY + chartHeight - (chartHeight \/ numYLabels) * i;\r\n        pdf.text(value.toFixed(2), startX - 10, y, { align: 'right' });\r\n    }\r\n\r\n    \/\/ Aggiungi la barra gialla in basso\r\n    pdf.setFillColor(255, 237, 0); \/\/ Colore giallo 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data-widget_type=\"spacer.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t<div class=\"elementor-spacer\">\n\t\t\t<div class=\"elementor-spacer-inner\"><\/div>\n\t\t<\/div>\n\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-5ec57d0 e-con-full e-flex e-con e-parent\" data-id=\"5ec57d0\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t<div class=\"elementor-element elementor-element-6d23717 elementor-widget elementor-widget-shortcode\" data-id=\"6d23717\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"shortcode.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t<div class=\"elementor-shortcode\">\t\t<div data-elementor-type=\"section\" data-elementor-id=\"7405\" class=\"elementor elementor-7405\" data-elementor-post-type=\"elementor_library\">\n\t\t\t<div class=\"elementor-element elementor-element-316fc6b e-con-full e-flex e-con e-parent\" data-id=\"316fc6b\" data-element_type=\"container\" data-e-type=\"container\" data-settings=\"{&quot;background_background&quot;:&quot;classic&quot;}\">\n\t\t<div class=\"elementor-element elementor-element-54284f5 e-flex e-con-boxed e-con e-child\" data-id=\"54284f5\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t<div class=\"elementor-element elementor-element-b40ffc6 e-con-full e-flex e-con e-child\" data-id=\"b40ffc6\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t<div class=\"elementor-element elementor-element-8c1a68e elementor-widget elementor-widget-text-editor\" data-id=\"8c1a68e\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\tI calcoli eseguiti dai nostri strumenti si basano su ricerche condotte da Plastitalia, tali ricerche sono disponibili su richiesta.\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-6910163 e-flex e-con-boxed e-con e-child\" data-id=\"6910163\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-81fdeff next-button e-transform elementor-widget elementor-widget-button\" data-id=\"81fdeff\" data-element_type=\"widget\" data-e-type=\"widget\" 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class=\"elementor-button elementor-button-link elementor-size-sm\" href=\"https:\/\/www.plastitaliaspa.com\/it\/contatti\/\">\n\t\t\t\t\t\t<span class=\"elementor-button-content-wrapper\">\n\t\t\t\t\t\t\t\t\t<span class=\"elementor-button-text\">Contattaci <span class=\"next-arrow\"><\/span><\/span>\n\t\t\t\t\t<\/span>\n\t\t\t\t\t<\/a>\n\t\t\t\t<\/div>\n\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t","protected":false},"excerpt":{"rendered":"<p>Calcolatore Pressione di Collaudo Il Calcolatore di Pressione di Collaudo permette di calcolare la pressione di collaudo per impianti realizzati con tubazioni in polietilene. Calcola anche la relazione tra pressione e quantit\u00e0 di acqua da spillare per la verifica della presenza di aria nella tubazione. Suggerisce la massima quantit\u00e0 di acqua da immettere nel sistema [&hellip;]<\/p>\n","protected":false},"author":22,"featured_media":0,"parent":0,"menu_order":0,"comment_status":"closed","ping_status":"closed","template":"","meta":{"_acf_changed":false,"footnotes":""},"class_list":["post-15042","page","type-page","status-publish","hentry"],"acf":[],"yoast_head":"<!-- This site is optimized with the Yoast SEO plugin v27.2 - https:\/\/yoast.com\/product\/yoast-seo-wordpress\/ -->\n<title>Calcolatore Pressione di Collaudo per Impianti in Polietilene | Plastitalia<\/title>\n<meta name=\"description\" content=\"Calcola la pressione di collaudo per impianti con tubazioni in polietilene e la verifica della presenza di aria nella tubazione.\" \/>\n<meta name=\"robots\" content=\"index, follow, max-snippet:-1, max-image-preview:large, max-video-preview:-1\" \/>\n<link rel=\"canonical\" href=\"https:\/\/www.plastitaliaspa.com\/it\/calcolatore-pressione-collaudo\/\" \/>\n<meta property=\"og:locale\" content=\"it_IT\" \/>\n<meta property=\"og:type\" content=\"article\" \/>\n<meta property=\"og:title\" content=\"Calcolatore Pressione di Collaudo per Impianti in Polietilene | Plastitalia\" \/>\n<meta property=\"og:description\" content=\"Calcola la pressione di collaudo per impianti con tubazioni in polietilene e la verifica della presenza di aria nella tubazione.\" \/>\n<meta property=\"og:url\" content=\"https:\/\/www.plastitaliaspa.com\/it\/calcolatore-pressione-collaudo\/\" \/>\n<meta property=\"og:site_name\" content=\"Plastitalia\" \/>\n<meta property=\"article:modified_time\" content=\"2024-11-29T08:33:12+00:00\" \/>\n<meta name=\"twitter:card\" content=\"summary_large_image\" \/>\n<meta name=\"twitter:label1\" content=\"Tempo di lettura stimato\" \/>\n\t<meta name=\"twitter:data1\" content=\"1 minuto\" \/>\n<script type=\"application\/ld+json\" class=\"yoast-schema-graph\">{\"@context\":\"https:\/\/schema.org\",\"@graph\":[{\"@type\":\"WebPage\",\"@id\":\"https:\/\/www.plastitaliaspa.com\/it\/calcolatore-pressione-collaudo\/\",\"url\":\"https:\/\/www.plastitaliaspa.com\/it\/calcolatore-pressione-collaudo\/\",\"name\":\"Calcolatore Pressione di Collaudo per Impianti in Polietilene | Plastitalia\",\"isPartOf\":{\"@id\":\"https:\/\/www.plastitaliaspa.com\/it\/#website\"},\"datePublished\":\"2024-11-07T11:42:47+00:00\",\"dateModified\":\"2024-11-29T08:33:12+00:00\",\"description\":\"Calcola la pressione di collaudo per impianti con tubazioni in polietilene e la verifica della presenza di aria nella tubazione.\",\"breadcrumb\":{\"@id\":\"https:\/\/www.plastitaliaspa.com\/it\/calcolatore-pressione-collaudo\/#breadcrumb\"},\"inLanguage\":\"it-IT\",\"potentialAction\":[{\"@type\":\"ReadAction\",\"target\":[\"https:\/\/www.plastitaliaspa.com\/it\/calcolatore-pressione-collaudo\/\"]}]},{\"@type\":\"BreadcrumbList\",\"@id\":\"https:\/\/www.plastitaliaspa.com\/it\/calcolatore-pressione-collaudo\/#breadcrumb\",\"itemListElement\":[{\"@type\":\"ListItem\",\"position\":1,\"name\":\"Home\",\"item\":\"https:\/\/www.plastitaliaspa.com\/it\/\"},{\"@type\":\"ListItem\",\"position\":2,\"name\":\"Calcolatore Pressione di Collaudo\"}]},{\"@type\":\"WebSite\",\"@id\":\"https:\/\/www.plastitaliaspa.com\/it\/#website\",\"url\":\"https:\/\/www.plastitaliaspa.com\/it\/\",\"name\":\"Plastitalia\",\"description\":\"Leader europeo nella produzione di raccordi in polietilene. 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