{"version":"1.0","provider_name":"ResearchWithFawad","provider_url":"https:\/\/researchwithfawad.com","title":"Scales of Measurement - ResearchWithFawad","type":"rich","width":600,"height":338,"html":"<blockquote class=\"wp-embedded-content\" data-secret=\"qKdhw9ihnR\"><a href=\"https:\/\/researchwithfawad.com\/index.php\/lp-courses\/list-research-methodology\/scales-of-measurement\/\">Scales of Measurement<\/a><\/blockquote><iframe sandbox=\"allow-scripts\" security=\"restricted\" src=\"https:\/\/researchwithfawad.com\/index.php\/lp-courses\/list-research-methodology\/scales-of-measurement\/embed\/#?secret=qKdhw9ihnR\" width=\"600\" height=\"338\" title=\"&#8220;Scales of Measurement&#8221; &#8212; ResearchWithFawad\" data-secret=\"qKdhw9ihnR\" frameborder=\"0\" marginwidth=\"0\" marginheight=\"0\" scrolling=\"no\" class=\"wp-embedded-content\"><\/iframe><script>\n\/*! This file is auto-generated *\/\n!function(d,l){\"use strict\";l.querySelector&&d.addEventListener&&\"undefined\"!=typeof URL&&(d.wp=d.wp||{},d.wp.receiveEmbedMessage||(d.wp.receiveEmbedMessage=function(e){var t=e.data;if((t||t.secret||t.message||t.value)&&!\/[^a-zA-Z0-9]\/.test(t.secret)){for(var s,r,n,a=l.querySelectorAll('iframe[data-secret=\"'+t.secret+'\"]'),o=l.querySelectorAll('blockquote[data-secret=\"'+t.secret+'\"]'),c=new RegExp(\"^https?:$\",\"i\"),i=0;i<o.length;i++)o[i].style.display=\"none\";for(i=0;i<a.length;i++)s=a[i],e.source===s.contentWindow&&(s.removeAttribute(\"style\"),\"height\"===t.message?(1e3<(r=parseInt(t.value,10))?r=1e3:~~r<200&&(r=200),s.height=r):\"link\"===t.message&&(r=new URL(s.getAttribute(\"src\")),n=new URL(t.value),c.test(n.protocol))&&n.host===r.host&&l.activeElement===s&&(d.top.location.href=t.value))}},d.addEventListener(\"message\",d.wp.receiveEmbedMessage,!1),l.addEventListener(\"DOMContentLoaded\",function(){for(var e,t,s=l.querySelectorAll(\"iframe.wp-embedded-content\"),r=0;r<s.length;r++)(t=(e=s[r]).getAttribute(\"data-secret\"))||(t=Math.random().toString(36).substring(2,12),e.src+=\"#?secret=\"+t,e.setAttribute(\"data-secret\",t)),e.contentWindow.postMessage({message:\"ready\",secret:t},\"*\")},!1)))}(window,document);\n\/\/# sourceURL=https:\/\/researchwithfawad.com\/wp-includes\/js\/wp-embed.min.js\n<\/script>\n","description":"The tutorial discusses in detail the 4 scales of measurement with examples including Nominal, Ordinal, Interval, and Ratio Scale","thumbnail_url":"data:image\/png;base64,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"}