{"id":6278,"date":"2022-07-09T02:27:20","date_gmt":"2022-07-09T02:27:20","guid":{"rendered":"https:\/\/physics.educour.in\/isc-physics\/?p=6278"},"modified":"2022-08-03T06:36:54","modified_gmt":"2022-08-03T06:36:54","slug":"calculus-for-physics-class-11-isc","status":"publish","type":"post","link":"https:\/\/physics.educour.in\/isc-physics\/calculus-for-physics-class-11-isc\/","title":{"rendered":"Calculus for Physics Class 11 ISC"},"content":{"rendered":"\t\t<div data-elementor-type=\"wp-post\" data-elementor-id=\"6278\" class=\"elementor elementor-6278\">\n\t\t\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-7dd3d47 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"7dd3d47\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-876387b\" data-id=\"876387b\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-c41e922 elementor-widget elementor-widget-text-editor\" data-id=\"c41e922\" data-element_type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t<style>\/*! elementor - v3.20.0 - 20-03-2024 *\/\n.elementor-widget-text-editor.elementor-drop-cap-view-stacked .elementor-drop-cap{background-color:#69727d;color:#fff}.elementor-widget-text-editor.elementor-drop-cap-view-framed .elementor-drop-cap{color:#69727d;border:3px solid;background-color:transparent}.elementor-widget-text-editor:not(.elementor-drop-cap-view-default) .elementor-drop-cap{margin-top:8px}.elementor-widget-text-editor:not(.elementor-drop-cap-view-default) .elementor-drop-cap-letter{width:1em;height:1em}.elementor-widget-text-editor .elementor-drop-cap{float:left;text-align:center;line-height:1;font-size:50px}.elementor-widget-text-editor .elementor-drop-cap-letter{display:inline-block}<\/style>\t\t\t\t<h1 style=\"text-align: center;\"><span style=\"color: #000080;\"><strong>Calculus for Physics<\/strong><\/span><\/h1>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-63f1de0 elementor-widget elementor-widget-text-editor\" data-id=\"63f1de0\" data-element_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<h2 style=\"text-align: center;\"><span style=\"color: #000080; font-family: 'comic sans ms', sans-serif;\"><strong>Differentiation<\/strong><\/span><\/h2>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-9386fe9 elementor-widget elementor-widget-menu-anchor\" data-id=\"9386fe9\" data-element_type=\"widget\" data-widget_type=\"menu-anchor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t<style>\/*! elementor - v3.20.0 - 20-03-2024 *\/\nbody.elementor-page .elementor-widget-menu-anchor{margin-bottom:0}<\/style>\t\t<div id=\"1\" class=\"elementor-menu-anchor\"><\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-498e31d elementor-widget elementor-widget-text-editor\" data-id=\"498e31d\" data-element_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<h2><span style=\"color: #008000; font-family: 'comic sans ms', sans-serif;\">Function:<\/span><\/h2>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-b9498ce elementor-widget elementor-widget-text-editor\" data-id=\"b9498ce\" data-element_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<p><span style=\"font-size: 14pt;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 If the value of a variable quantity (y) depends on another variable quantity (x) through some relation, such that there exists only one finite value of y for each value of x then \u2018y\u2019 is called a function of \u2018x\u2019. It is denoted as<\/span><\/p><p>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0<img 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alt=\"\" \/><span style=\"font-size: 14pt;\"><br \/><\/span><\/p>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ea03703 elementor-widget elementor-widget-text-editor\" data-id=\"ea03703\" data-element_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<h4><span style=\"font-size: 18pt; color: #008000;\">Type of elementary functions<\/span><\/h4><ul><li><span style=\"font-size: 14pt; color: #008000;\">Constant function y = C.<\/span><\/li><li><span style=\"font-size: 14pt; color: #008000;\">Linear function y = ax + b<\/span><\/li><li><span style=\"font-size: 14pt; color: #008000;\">Quadratic Function y = ax<sup>2<\/sup> + bx + c<\/span><\/li><li><span style=\"font-size: 14pt; color: #008000;\">Power function: y = A.x<sup>n<\/sup><\/span><\/li><\/ul><p><span style=\"font-size: 14pt;\">Where n is a constant real number. For n = 0 power function is a constant quantity y = A<\/span><\/p><ul><li><span style=\"font-size: 14pt; color: #008000;\">Trigonometric function : y = sin Ax, y = cos<sup>2<\/sup> x\u00a0 etc.<\/span><\/li><li><span style=\"font-size: 14pt; color: #008000;\">Exponential function: y = a<sup>x<\/sup><\/span><\/li><li><span style=\"font-size: 14pt; color: #008000;\">Logarithmic function: y = log x<sup>2<\/sup><\/span><\/li><\/ul>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<section class=\"elementor-section elementor-inner-section elementor-element elementor-element-07cd42a elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"07cd42a\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-inner-column elementor-element elementor-element-39d57bb\" data-id=\"39d57bb\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-e023d67 elementor-widget elementor-widget-text-editor\" data-id=\"e023d67\" data-element_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<h3 style=\"text-align: center;\"><span style=\"color: #000080;\">What is Function? <span style=\"color: #ff6600;\">(Optional)<\/span><\/span><\/h3><h5 style=\"text-align: center;\"><strong><span style=\"color: #ff6600;\">(In Hindi + English Mix)<\/span><\/strong><\/h5>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-597d730 elementor-widget elementor-widget-video\" data-id=\"597d730\" data-element_type=\"widget\" data-settings=\"{&quot;video_type&quot;:&quot;vimeo&quot;}\" data-widget_type=\"video.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t<style>\/*! elementor - v3.20.0 - 20-03-2024 *\/\n.elementor-widget-video .elementor-widget-container{overflow:hidden;transform:translateZ(0)}.elementor-widget-video .elementor-wrapper{aspect-ratio:var(--video-aspect-ratio)}.elementor-widget-video .elementor-wrapper iframe,.elementor-widget-video .elementor-wrapper video{height:100%;width:100%;display:flex;border:none;background-color:#000}@supports not (aspect-ratio:1\/1){.elementor-widget-video .elementor-wrapper{position:relative;overflow:hidden;height:0;padding-bottom:calc(100% \/ var(--video-aspect-ratio))}.elementor-widget-video .elementor-wrapper iframe,.elementor-widget-video .elementor-wrapper video{position:absolute;top:0;right:0;bottom:0;left:0}}.elementor-widget-video .elementor-open-inline .elementor-custom-embed-image-overlay{position:absolute;top:0;right:0;bottom:0;left:0;background-size:cover;background-position:50%}.elementor-widget-video .elementor-custom-embed-image-overlay{cursor:pointer;text-align:center}.elementor-widget-video .elementor-custom-embed-image-overlay:hover .elementor-custom-embed-play i{opacity:1}.elementor-widget-video .elementor-custom-embed-image-overlay img{display:block;width:100%;aspect-ratio:var(--video-aspect-ratio);-o-object-fit:cover;object-fit:cover;-o-object-position:center center;object-position:center center}@supports not (aspect-ratio:1\/1){.elementor-widget-video .elementor-custom-embed-image-overlay{position:relative;overflow:hidden;height:0;padding-bottom:calc(100% \/ var(--video-aspect-ratio))}.elementor-widget-video .elementor-custom-embed-image-overlay img{position:absolute;top:0;right:0;bottom:0;left:0}}.elementor-widget-video .e-hosted-video .elementor-video{-o-object-fit:cover;object-fit:cover}.e-con-inner>.elementor-widget-video,.e-con>.elementor-widget-video{width:var(--container-widget-width);--flex-grow:var(--container-widget-flex-grow)}<\/style>\t\t<div class=\"elementor-wrapper elementor-open-inline\">\n\t\t\t<iframe class=\"elementor-video-iframe\" allowfullscreen allow=\"clipboard-write\" title=\"vimeo Video Player\" src=\"https:\/\/player.vimeo.com\/video\/549571910?color&amp;autopause=0&amp;loop=0&amp;muted=0&amp;title=0&amp;portrait=0&amp;byline=0#t=\"><\/iframe>\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<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<div class=\"elementor-element elementor-element-193a8ca elementor-widget elementor-widget-menu-anchor\" data-id=\"193a8ca\" data-element_type=\"widget\" data-widget_type=\"menu-anchor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div id=\"2\" class=\"elementor-menu-anchor\"><\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-18109f9 elementor-widget elementor-widget-text-editor\" data-id=\"18109f9\" data-element_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<h2 style=\"text-align: center;\"><span style=\"color: #000080;\">DIFFERENTIATION:<\/span><\/h2>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-da38e09 elementor-widget elementor-widget-text-editor\" data-id=\"da38e09\" data-element_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<p><span style=\"font-size: 14pt; color: #000080;\">In simple words,<\/span><\/p>\n<p><strong><span style=\"font-size: 14pt; color: #000080;\">\u201cif y is a function of x i.e. if ,&nbsp;<\/span><\/strong><img 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\" alt=\"\" style=\"font-style: inherit; font-weight: inherit;\"><strong style=\"font-size: 15px;\"><span style=\"font-size: 14pt; color: #000080;\">&nbsp;, then the rate of change of y (dependent variable) with respect to x (the dependent variable), for small change in x, is called derivative (differentiation) of y with respect to x\u201d.<\/span><\/strong><\/p>\n<p><span style=\"font-size: 14pt; color: #000080;\">So, derivative of y w.r.t. x is<\/span><\/p>\n<p><span style=\"font-size: 14pt; color: #000080;\">&nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp;&nbsp;<\/span><img 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\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\" alt=\"\" style=\"font-style: inherit; font-weight: inherit;\"><span style=\"color: rgb(0, 0, 128); font-size: 14pt;\">&nbsp;&nbsp; ,<\/span><\/p>\n<p><span style=\"font-size: 14pt; color: #000080;\">Where,&nbsp;&nbsp;<\/span><img src=\"data:image\/png;base64,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\" alt=\"\" style=\"font-style: inherit; font-weight: inherit;\"><span style=\"color: rgb(0, 0, 128); font-size: 14pt;\">is the change in the value of y when the value x is changed from x to&nbsp;<\/span><img src=\"data:image\/png;base64,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\" alt=\"\" style=\"font-style: inherit; font-weight: inherit;\"><span style=\"color: rgb(0, 0, 128); font-size: 14pt;\">&nbsp;.<\/span><\/p>\n<p><strong><span style=\"font-size: 14pt; color: #000080;\">Graphically,&nbsp;<\/span><\/strong><img src=\"data:image\/png;base64,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\" alt=\"\" style=\"font-style: inherit; font-weight: inherit;\">&nbsp;<strong style=\"font-size: 15px;\"><span style=\"font-size: 14pt; color: #000080;\">represents the slope of the curve y, for a given value of x.<\/span><\/strong><\/p>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<section class=\"elementor-section elementor-inner-section elementor-element elementor-element-daf5b83 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"daf5b83\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-inner-column elementor-element elementor-element-384c514\" data-id=\"384c514\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-088d554 elementor-widget elementor-widget-text-editor\" data-id=\"088d554\" data-element_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<h3 style=\"text-align: center;\"><span style=\"color: #000080;\">Differential Calculus [Introduction]<\/span><\/h3><h4 style=\"text-align: center;\"><span style=\"color: #ff6600;\">( In Hindi + English Mix)<\/span><\/h4>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-96f59d4 elementor-widget elementor-widget-video\" data-id=\"96f59d4\" data-element_type=\"widget\" data-settings=\"{&quot;video_type&quot;:&quot;vimeo&quot;}\" data-widget_type=\"video.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elementor-wrapper elementor-open-inline\">\n\t\t\t<iframe class=\"elementor-video-iframe\" allowfullscreen allow=\"clipboard-write\" title=\"vimeo Video Player\" src=\"https:\/\/player.vimeo.com\/video\/728319810?color&amp;autopause=0&amp;loop=0&amp;muted=0&amp;title=0&amp;portrait=0&amp;byline=0#t=\"><\/iframe>\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<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<div class=\"elementor-element elementor-element-34d6d62 elementor-widget elementor-widget-menu-anchor\" data-id=\"34d6d62\" data-element_type=\"widget\" data-widget_type=\"menu-anchor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div id=\"3\" class=\"elementor-menu-anchor\"><\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-4903b8b elementor-widget elementor-widget-text-editor\" data-id=\"4903b8b\" data-element_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<h2 style=\"text-align: center;\"><span style=\"color: #000080; font-size: 24pt;\">Derivatives of Standard Functions<\/span><\/h2>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-f70b747 elementor-widget elementor-widget-text-editor\" data-id=\"f70b747\" data-element_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<p><a href=\"https:\/\/physics.educour.in\/isc-physics\/wp-content\/uploads\/2022\/07\/Formula-for-differentiation-1.pdf\" class=\"pdfemb-viewer\" style=\"\" data-width=\"max\" data-height=\"max\"  data-toolbar=\"bottom\" data-toolbar-fixed=\"off\">Formula for differentiation-1<br\/><\/a> <a href=\"https:\/\/physics.educour.in\/isc-physics\/wp-content\/uploads\/2022\/07\/Formula-for-differentiation-2.pdf\" class=\"pdfemb-viewer\" style=\"\" data-width=\"max\" data-height=\"max\"  data-toolbar=\"bottom\" data-toolbar-fixed=\"off\">Formula for differentiation-2<br\/><\/a><\/p>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<section class=\"elementor-section elementor-inner-section elementor-element elementor-element-344bceb elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"344bceb\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-inner-column elementor-element elementor-element-16608c0\" data-id=\"16608c0\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-15220a4 elementor-widget elementor-widget-text-editor\" data-id=\"15220a4\" data-element_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<h3 style=\"text-align: center;\"><span style=\"color: #000080;\">Differentiation [part 2]<\/span><\/h3><h4 style=\"text-align: center;\"><span style=\"color: #ff6600;\">(In Hindi + English Mix)<\/span><\/h4>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-7e5b6af elementor-widget elementor-widget-video\" data-id=\"7e5b6af\" data-element_type=\"widget\" data-settings=\"{&quot;video_type&quot;:&quot;vimeo&quot;}\" data-widget_type=\"video.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elementor-wrapper elementor-open-inline\">\n\t\t\t<iframe class=\"elementor-video-iframe\" allowfullscreen allow=\"clipboard-write\" title=\"vimeo Video Player\" src=\"https:\/\/player.vimeo.com\/video\/549577417?color&amp;autopause=0&amp;loop=0&amp;muted=0&amp;title=0&amp;portrait=0&amp;byline=0#t=\"><\/iframe>\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<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<div class=\"elementor-element elementor-element-35a467c elementor-widget elementor-widget-menu-anchor\" data-id=\"35a467c\" data-element_type=\"widget\" data-widget_type=\"menu-anchor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div id=\"4\" class=\"elementor-menu-anchor\"><\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-349ec51 elementor-widget elementor-widget-text-editor\" data-id=\"349ec51\" data-element_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<h3 style=\"text-align: center;\"><span style=\"color: #000080;\">Maximum and Minimum<\/span><\/h3>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-5a012b3 elementor-widget elementor-widget-text-editor\" data-id=\"5a012b3\" data-element_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<p><span style=\"font-size: 14pt;\">If a quantity y depends on another quantity x in a manner shown in fig. it becomes maximum at x<sub>1<\/sub> and minimum at x<sub>2<\/sub>.<\/span><\/p><p><span style=\"font-size: 14pt;\">\u00a0\u00a0\u00a0\u00a0\u00a0 At these points the tangent to the curve is parallel to x axis and hence its slope is zero at these points. Since, slope of the curve equals the rate of change\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" src=\"data:image\/png;base64,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\" alt=\"\" \/><span style=\"font-size: 14pt;\">. Thus, at a position of maximum or minimum\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" src=\"data:image\/png;base64,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\" alt=\"\" \/><span style=\"font-size: 14pt;\">.<\/span><\/p><p><span style=\"font-size: 14pt;\">\u00a0\u00a0\u00a0\u00a0\u00a0 Just before the maximum the slope is positive, at the maximum it is zero and just after the maximum it is negative. Thus dy\/dx decreases at a maximum and hence the rate of change of\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" src=\"data:image\/png;base64,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\" alt=\"\" \/><span style=\"font-size: 14pt;\">\u00a0is negative at a point of maximum i.e., at x = x<\/span><sub>1\u00a0<\/sub><img style=\"font-style: inherit; font-weight: inherit;\" 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\" alt=\"\" \/><span style=\"font-size: 14pt;\">,\u00a0 \u00a0 \u00a0\u00a0<\/span><\/p><p><span style=\"font-size: 14pt;\">Conversely, at the position of minima (x = x<sub>2<\/sub>),\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" src=\"data:image\/png;base64,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\" alt=\"\" \/><span style=\"font-size: 14pt;\">\u00a0and\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" 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alt=\"\" \/><span style=\"font-size: 14pt;\">.<\/span><\/p>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<section class=\"elementor-section elementor-inner-section elementor-element elementor-element-3ed7530 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"3ed7530\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-inner-column elementor-element elementor-element-1c7b932\" data-id=\"1c7b932\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-e8057c8 elementor-widget elementor-widget-text-editor\" data-id=\"e8057c8\" data-element_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<h3 style=\"text-align: center;\"><span style=\"color: #000080;\">Differentiation [part 3]<\/span><\/h3><h4 style=\"text-align: center;\"><span style=\"color: #ff6600;\">(In Hindi + English Mix)<\/span><\/h4>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-8efa2ef elementor-widget elementor-widget-video\" data-id=\"8efa2ef\" data-element_type=\"widget\" data-settings=\"{&quot;video_type&quot;:&quot;vimeo&quot;}\" data-widget_type=\"video.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elementor-wrapper elementor-open-inline\">\n\t\t\t<iframe class=\"elementor-video-iframe\" allowfullscreen allow=\"clipboard-write\" title=\"vimeo Video Player\" src=\"https:\/\/player.vimeo.com\/video\/549589040?color&amp;autopause=0&amp;loop=0&amp;muted=0&amp;title=0&amp;portrait=0&amp;byline=0#t=\"><\/iframe>\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<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-inner-section elementor-element elementor-element-94597b9 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"94597b9\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-inner-column elementor-element elementor-element-31de095\" data-id=\"31de095\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-afd361c elementor-widget elementor-widget-menu-anchor\" data-id=\"afd361c\" data-element_type=\"widget\" data-widget_type=\"menu-anchor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div id=\"5\" class=\"elementor-menu-anchor\"><\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-7668f6f elementor-widget elementor-widget-text-editor\" data-id=\"7668f6f\" data-element_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<h1 style=\"text-align: center;\"><span style=\"color: #000080;\">Integration<\/span><\/h1>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-999fd3f elementor-widget elementor-widget-text-editor\" data-id=\"999fd3f\" data-element_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<p><span style=\"font-size: 14pt; color: #000080;\">Mathematically, <strong><span style=\"color: #008000;\">\u201cThe process of finding a function, whose differential coefficient is known (given), is called integration.\u201d<\/span><\/strong><\/span><\/p><p><span style=\"font-size: 14pt; color: #000080;\">Hence, integration is the inverse process of differentiation. Integration and differentiation are two operations which are inverse to each other.<\/span><\/p>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-8a0dba4 elementor-widget elementor-widget-text-editor\" data-id=\"8a0dba4\" data-element_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<p><span style=\"font-size: 14pt; color: #000080;\">Let\u00a0\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" 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\" alt=\"\" \/><span style=\"color: #000080; font-size: 14pt;\">. Then, by definition, integration of\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAC8AAAAfCAYAAAB3XZQBAAALwUlEQVRYCWWYC5BWZRnHX65Ki4gshBiQBuioSBnmMOg40+TgLZEgywxrGLmUGlNjWRleRnRKyoFKJxQ1AQUvKJqXFG+ToKWCgCGy2OoiCC0su\/vtft+5n\/Nr\/s97vl2dYM75zjnv+zzP\/7k\/7zpIgRwK\/JX3\/mZACES2HkESklPYViNLgDiHPCcmJ9IrEKSi6qZIu3rYZ7ZahST3m0iISahmhbEKswBIIMshzcjyyHZoNStS0jgzfIX2lJhd\/aEHfF2JAgQ+ICPIxTiCQvByYfUApHcGaRgR5xlBlpWsRRmRZ6HZRbpnpBTiIRpdJPZNj0FakBVSOzHgMpKeBTTPbXMJXHTCENi789xLa9eBf+ZVxBFBdLgklObeU3mekxXyRUlguLwlo7hXqJalji7ba\/u1npMX5bdClk3Js4jUvBBR5JEXlUKkq8jIEI7D5FGGE0Hd6j2MBc4E6BaRphX7zbIqpJ2meZKFZsDuXDYtkcWQJbKwN64iyoPOe8D3KiADeDlRVBrE\/FY1\/jJBkvYwoCjEMyflMAUdyFGOLDHwcpocIuYmWu7KxbRKklW8IHs\/xP5PtjH13LNwA\/sxcepUnn9to3eghWNOHqa88OpWblyy3HjGpJYTxttrU9orJZFJLURzkqSTmxbO5rmH77NckxqxgKXyihRNCfKahZvs+3\/gvbOVOAnIbQQEQRvIlVnAvfctxfV3rHpiFTVSrv7FdUw6cwq17qpXIIIbfrmYr045n7d2tFgCKzGV9MZbt7TXIyQ+EatxzWR17d3GN885nUU3\/55qVoZaJihaF58MlQ0PXhqVcSejyDU+7QRelzgEEO5l+6tP4QYM5qe3L6Mz6yTNO7nk4pnM+eFcoEKcVfjrqqeZc+UiDraGZTgqJ1IkWpeZ3OM1H5NKk5QkS82iWdFJlhzmW9Mu5LYbllALTVfyVFUuISShuwjso\/Mc6pkk6\/j\/tqp8UPikVej4gInHDcUdM45tFRUbxYg9lLF2kE3\/+jvu6HHs2u9z2speprBILXzkx3py13+J5FHxglpalx1BpZVTRo\/mwbUb6NJyAUlaQwU0kOwMnJjECiwB1UKupdI0YpqpVnewftkdNLh+XH3rcvaWlZI8tOpm1ksPcPzoocxffBcHlDtiJ766FLOmbEqaxqRZYbllJTdV2YuI45RUEWDZLm8cYO39Szlx0tdpVZUWfhlRdtGLYj6V21SyMtnFa271QzsEPm3ntSfXcNKwUTT0H85\/KnCobF6msHkmYuszjzFsUH\/Wb2825cSftKzbajwKvdphH4oFFs+STFElD9otN4Qg7JbmalTN7G1+naOHTeCBtRstX9ToVFEFXP+cWaRQQ\/Deb+8u63kW8sjyPzLcORqcw7lBuCNG4foMY\/nKJ30iKh\/yCoTtzLtwFo0DhtFUi9gno0uA0smbDLpbCT7cwW0\/uooxQxp5efNWzI5ZB4+uXoE75nhmLbjJA7M6v4c8\/IgJnz+ZSy64kvaioMvneukGgS8UUCpTmXeN6musNq5uWIXqAdatuBN3xEgW3nKPxa4KhKxm1qWNonMvJ42YwORJ57I3Dmmrl1zV5kyxkFBp2cmJDY5RztHoHNMum0078NCqu+kn4\/Rv5NzvXUMUanwQzINAG1dMm87oIWPY2XrY2pN5q7S+04u85EujFLFlj0zlKWjiivMn444cy9+2dpi1RGt5GKhp7efQB29z9LBxfGPmArNOFW+IuoZFou4VQ9hBuPN1Ths5GNcwnA3bP+KyOfOpRnFZUr33lRfWXbNuFv94NoOd45V3m2itG0xRqJhXnAmMgY+6bMjSa2wLEXRv5dSRDnfMeLZ1yxaletYzVEI\/5N2NT+L6jmDKzKtNOWVOKAaFilVZh+WmvApRM+vvux03YDhjJl\/EwQhqGWicSPPE9O3xahbx+2suZ0Rfx4Yt\/+a\/SvsyHLXHVcsBzKpCFHmV1APMJQHNG1cxxDnOnvV9S8R9aVmvxaTWCsludrz5LK7faKbMvFYjk6\/HmdqJd6BSg6SAuB2KZvbt\/gdDRpzETxatMGU1htX3BllEiHqywqfKH+b9gHH9+\/Dy1q1WxSyfZYcCXJ2QyAYTA19ICU2QURuLrvo2g\/o67n78OfYUWJyKxpqXkrX4iJZdrzN4+Klc8J3rfNXIAxOvidTKmiWtiNSFP2ZP0xscO+J4Tpl0HvtrWKhJ6VCDnnlWHtCXgN\/Nnc\/YPgN5afPblgWarDQxWNiEKvHiaw1JI2wKQSfk+62rjvviWPod0ciLb+wyKymaamnok9vGhzbzwPjGCZz9lWm0VQO6iKmSY7vEPNawpnxSQwp58K5lXL9gDo2fa6CpLTFQqnEC5ctgQkIHadbO7PNmMNQNZn9Xl1oiXaqihlfVRi82m4k0wKyu6TFqYttrD+P6DGb8GdOpKKIKCFM\/h3srKXaqkFVZ+rNfM8wNormtYlVB9SK3TtgNWUWzqQ1bG1\/dwnubNrPr5XUc5RzLH3vKwmHLnoO0h0oSKAIFh9r0QSaMmcis6fNMMXk8UKdVWFuHFWaVtKLmDwuyVFiDuJl199yKG9DI7atf8tomECd+BLaUkLcyVaR2tjzzuFnyqe0f0lJPapXaaCe\/vf5yvnTWFDa838rSZet9nEQtnDbGMe3SGax+5Z\/c\/8SLdIudhYG8tJuW9zcwaNA4HnrkHXSQim0UVDnwmJ3ttnEzMtcGsTI4ha5mZp93Jm7EBLZXILIs1w2injovM+l4WIHkMN+dcSHzbvkTnygmBaLWDmkTa1b8BtfQwNyb7zIQZsZqM4t\/fil9jxrAn9c+YSFpsSw6DevBdtatvI3TvzaDltZ6Qoc2NEa5j3VnljP3+g8Wd0VK57aNTBgykAWL7jAwlqRF77FOtTnTWCFaKdCxn7dfeoGBQ4+judMOfH6eUVLH7ejQoqnS2ru5rQOyg1TzxL5Xc2w69smkgvExJ45t4IHVz1Gzg4gU0MktRgch7XPkqtx+xLR4s1vI+nv+wsgjj2JfVYcuHcRzIh2ozQM+yTXERtahU4g1pCWsvPcBxk\/8Mu2xrxfq3AbInO3HbxvUUqmiGdEnqumjmypOdzuzLjqHmxddazOfDNqtkLU88vVIQBzso0jaGXnsRB5c\/SwUFQg+4QvHnsBDa55H3borkyV1GvIzUFjzpy8VNkWgLEKQ+UxKq6xZuYITJp3Bpp0tlqRWLqWcnU\/l+tICdnaASq0cG\/OcA7t3cNnFFzB3\/jzfPNXj1MTMgCoYGYXCJk88+Kb33uS4USez+c3d7Gl6h+nnT2XRjUuMQHrqUsvpzpXU\/l8UWCAR5j58DI\/OnN2HIA94YdNb\/GrJnRYSNhGrpCUhRZGZBdPcjxCmmFiqiUUht1x7Dc+uW+tlylFxUP5pxeLDJ6vueSTwFcJaK9cvXMhA15dTJ03m0fVP2ygiQHKVtDa3WpLrzVtemnjlZMmysal7lLW4Tmfqqn9k\/i8Nnpee5UmLFS\/AHj0fy1sRlg+SIyzqvNYzigSX56qpivkaOtVogy6zpDp66S6zuN0EqXRzD3gR6FChJuRp9SMsPXR6kI7lqGPJZztkCJ3W6gR6UCboym2k1lityxuqbHhFqpFYQELLYi32CMulS+\/xzaxnJVVMJcDvlXKis9FahxcxKAV58Lp7bxh4f3wyGs\/FHxP9Wh2AvgmXr+mSYbhMaq9iTuOAEkDusE29uWQUEmBCDJSCsL7Bg9aagRcoXT2W9d97QkP0Rqo9SvKSTh+NpyErb+LVC16+9uDFoI5I1Ua0hc6Uqh3lYKTE09nTrFQnFN\/Sgp8CaDp9Wm655r\/XBfk\/RBkCyTckWis9ZYp4+cZK6+U+PfYqWtKajNwfwOuCwrhqfO29LEc9AusAS6Z1ZQuT4hc9n7qy2ugTUnt69umzLrOgQsCDk+dtDNaHzzDyBJ5H75renYwcmgG8MHFWOQtSKVL+1VYypP6nLF5POFULyTJABkrbBFbffQ8oST0oVSNdtser4POmV8E6dtPMXrRf\/Hxk1Pn9D9Hx8nqHr5wnAAAAAElFTkSuQmCC\" alt=\"\" \/><span style=\"color: #000080; font-size: 14pt;\">\u00a0with respect \u00a0to x is\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" src=\"data:image\/png;base64,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\" alt=\"\" \/><span style=\"color: #000080; font-size: 14pt;\">. We shall use the notation\u00a0 \u00a0\u00a0<\/span><\/p><p><span style=\"font-size: 14pt; color: #000080;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" 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\" alt=\"\" \/><span style=\"color: #000080; font-size: 14pt;\">\u00a0 \u00a0\u2026\u2026\u2026\u2026.[1]<\/span><\/p><ul><li><span style=\"font-size: 14pt; color: #000080;\">The symbol\u00a0<img src=\"data:image\/png;base64,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\" alt=\"\" \/>\u00a0is called the symbol of integration.<\/span><\/li><li><span style=\"font-size: 14pt; color: #000080;\"><img src=\"data:image\/png;base64,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\" alt=\"\" \/>\u00a0is called the notation of integration\u00a0<img src=\"data:image\/png;base64,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\" alt=\"\" \/>of with respect to x.<\/span><\/li><li><span style=\"font-size: 14pt; color: #000080;\">x is called the variable of integration (independent variable).<\/span><\/li><\/ul>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-9f0a1b1 elementor-widget elementor-widget-text-editor\" data-id=\"9f0a1b1\" data-element_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<h3><span style=\"color: #000080;\">Physical Meaning of Integration<\/span><\/h3>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-bf5ad95 elementor-widget elementor-widget-text-editor\" data-id=\"bf5ad95\" data-element_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<p><span style=\"font-size: 14pt; color: #000080;\">Physically, \u00a0since\u00a0\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" 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alt=\"\" \/><\/p><p><span style=\"font-size: 14pt; color: #000080;\">Or\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" 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\" alt=\"\" \/><span style=\"color: #000080; font-size: 14pt;\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0<\/span><\/p><p><span style=\"color: #000080; font-size: 14pt;\">Taking summation of all the differentials, we have\u00a0 \u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" src=\"data:image\/png;base64,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alt=\"\" \/><span style=\"color: #000080; font-size: 14pt;\">\u00a0 \u00a0 \u00a0 \u00a0<\/span><\/p><p><span style=\"font-size: 14pt; color: #000080;\">Or\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" 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\" alt=\"\" \/><span style=\"color: #000080; font-size: 14pt;\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u2026\u2026\u2026\u2026\u2026\u2026\u2026\u2026.[2]<\/span><\/p><p><span style=\"font-size: 14pt; color: #000080;\">When dx approaches to zero, the summation is replaced by integration\u00a0\u00a0 and we write\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 <\/span><img style=\"font-style: inherit; font-weight: inherit;\" 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\" alt=\"\" \/><span style=\"color: #000080; font-size: 14pt;\">\u00a0\u00a0\u00a0\u00a0\u2026\u2026\u2026\u2026\u2026\u2026..[3]<\/span><\/p><p><span style=\"font-size: 14pt; color: #000080;\">It means, <span style=\"color: #008000;\"><strong>physically, the method of integration is used to sum up the effect of a continuous varying function.<\/strong><\/span><\/span><\/p><p><span style=\"font-size: 14pt; color: #000080;\">It is important to note that the sign\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" 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alt=\"\" \/><span style=\"font-size: 14pt; color: #000080;\">\u00a0\u00a0is used for summation of discrete values, while sign\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" src=\"data:image\/png;base64,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\" alt=\"\" \/><span style=\"font-size: 15px;\">\u00a0\u00a0<\/span><span style=\"color: #000080; font-size: 14pt;\">is used for summation of continuous function.<\/span><\/p>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<section class=\"elementor-section elementor-inner-section elementor-element elementor-element-2221520 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"2221520\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-inner-column elementor-element elementor-element-7b2fbd8\" data-id=\"7b2fbd8\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-77e9ad2 elementor-widget elementor-widget-text-editor\" data-id=\"77e9ad2\" data-element_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<h3 style=\"text-align: center;\"><span style=\"color: #000080;\">How to use integration in physics?<\/span><\/h3><h5 style=\"text-align: center;\"><span style=\"color: #ff6600;\">(In Hindi + English Mix)<\/span><\/h5>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-d1b545b elementor-widget elementor-widget-video\" data-id=\"d1b545b\" data-element_type=\"widget\" data-settings=\"{&quot;video_type&quot;:&quot;vimeo&quot;}\" data-widget_type=\"video.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elementor-wrapper elementor-open-inline\">\n\t\t\t<iframe class=\"elementor-video-iframe\" allowfullscreen allow=\"clipboard-write\" title=\"vimeo Video Player\" src=\"https:\/\/player.vimeo.com\/video\/549208980?color&amp;autopause=0&amp;loop=0&amp;muted=0&amp;title=0&amp;portrait=0&amp;byline=0#t=\"><\/iframe>\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<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<div class=\"elementor-element elementor-element-360e5da elementor-widget elementor-widget-text-editor\" data-id=\"360e5da\" data-element_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<h3 style=\"text-align: center;\"><span style=\"color: #000080;\">Indefinite Integration<\/span><\/h3>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-e75cffc elementor-widget elementor-widget-text-editor\" data-id=\"e75cffc\" data-element_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<p><span style=\"font-size: 14pt; color: #000080;\">Since,<\/span><span style=\"color: #000080; font-size: 14pt;\">\u00a0differentiation of a constant factor is zero i.e.\u00a0 \u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" src=\"data:image\/png;base64,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\" alt=\"\" \/><span style=\"color: #000080; font-size: 14pt;\">\u00a0 \u00a0<\/span><\/p><p><span style=\"font-size: 14pt; color: #000080;\">We get,\u00a0 \u00a0\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" 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a6YwssbDqCYbwzfrlBFFdwuYEFZc8xPCphNoiHqMxWnyGU1oIxhJpy37n9Wi9E8QmpNWo56MUJ99XeP7RoRJiD4z\/VHT11kkI0r\/7he3rEEwxjLq0ic2IfBnGDbseQcvuOPOWxxAn8OkGLC2bjztvuBEn9R+Aw\/sdJuFDxo44s4bJsRQGHKFZzGybrXJc4qhQiFWVf4jWXbph7yN+LwtLnrOBYgpDu0ysLTZf7w5gpHAC4Wb8jVaum7TkJQojbpFjT3xRzpuhadaI3wvKe1FaI6xr+lGTL642XP4klSnbVzdpS1Pi5HSLr+R8zQPugIktxASu9hd2wb0vTLE8O54Q6ZjMbGsOzk0k+\/b93tm2azJqh2lZexoTeTCJSIzCw81lFqbRIOWc1I4Kr\/Sp4BviFNQGH6cZ63G7mRKeqeCSFtOMcqK6cmSLGCcpD4dQu6bIKRhdEfeZRjRGHrf22Ra\/8i\/HEmPDJk2toAkxko4MoL90A+a8+yw6FQboveu+KI8DC5euwj03DUHt7LexRfsAF1x3N4Y8PN65ZLkIN2x55jDscbWT\/XD1czEWzn4f7Tpvg0MGXKCNwiQcEWHAcpBRmftkKjIHGS6dMcYzQSNWR4ruhh8sJTeFExmJ3EpE1jdoTGZkOSGSBSxnJcwmgJDOI2Mo2BONyMSpWQy22ohZe2JqUk79UlPFwERP\/vRN2ziISeKCI+PLcRE\/QiHG+tYf65DG9pdGIs6lFGa+JxCNR3SSjfUplhEjqbhrT32m1gGJ2RjzyLUIOmyDW57+SEKsSf++i3\/nk407K8yEj3OjmZ2fXIYvJ7+KoLA9eu\/ZTydSzJ09HffcchOWLJgnS+zqq6\/GA6MeQz1pybPntDvchHtdxI5ryuLKTQbC5yyxJRWT0bJbLxx20mAJihCdFDzcEZCJWUK2BJiFRUxWOoZoZCzX8M5e62N1WkCga9WQiNmxQYZWWXH8yqOEOGxuidIXXmwixGqRYQCEvMJ77CplS1gxCuFYHIgnkMgY\/6iAhNgCjBt2I4IOm+OWZ99xO11cH+J1w8u\/Q55vLcuBOPazPc3OXec14sXxUKMz0GTk6JhxjjGmgxzkbgNYnUwKZjaZjFNqWBPEN9EgBSN+MXzHGwyRvKQ\/uhvpNJLRBhP2iCGRonvpPJAI8w3NAiQaCZ4jXa4QM6Hl+zHmzGp\/+brJeiC5CldfdDqC4vbYbNffYuSTz2glqm7BJ9i0bYBBpw\/G0oTZRy70ZNiQgMzaEMKQc5kykdUAKlFVMQ2tOvfFwcddLiEoM56iOpNGKs58bhdTcBYJJ7dHAt1Es00jiEXJjBZH4n0yHH+rMNtJNeCf732Ca+98yBDMeyzgCCqD1wl01icRqHFUILkCN158El585SW5urxOREfitCD4l0A6QY1BfGbdBsfrrgw74v2spcfufRnfFQubm+JmTpzCmUKsQZvpNSZWSgKNERrcSobRJ+cQAUtHqSjqgehcjH30FgRttsLtL07XeMwVDwetbv+9N06ypFwwwmLjp8tYK55IxRtw8VVXImjbAZtusxOeeGqMhPPKRfPQuX17\/PGPp2F1Y0SWtqwd8mgqgVQqq4WNKIQxV4jRnajCkvKpKOi0JQ4YcIEJcxoKcT\/ZOZEISwSIRUA0kFaEM0ZFQGA5sxiiyAD0NmgRKowgm8qNJ5LBh+9OxvV3PmT3qWhixhWcyBavs3YNd\/QMTIBSiA699Dy8NPEZbdZjbFc043BIe3oQtF7StUB0PiaOuAVByx6hJRZJereJsPhx5VLo+9Au245QIfoZnsOJYMMEH5mhP1pKyRogXYPZi2Zir357IigI8Iv\/6Yu3vqw0D4zzlaGRBPP90njpnSm44o5hxtskCd1N5ypKGCWjSHGcRAzJwXuI4IrBp+CVlwxv5Hi6+ZrfzpVVbNPxnCwxA9CkPttiM57IucHvVLwOYKZ+2iYMiWLjox\/HwTVIq671FoUEMhGjFH+TtGEdR0hNZLppFVhc9gmC9ltj76MvFsM06Dz2NBKNvB9BJlGLPl06QgHqvFYICtsiKGqlBYC8IEDbFnlokRegFc+nKuiKDz9dYhqA210SSfngZLBrrv4Ltt1hT3wxp8qYiuP19BMynIChC+keasFxJmK0xJahpmwK9t1vTwy9\/R7Uc3LQZRDKjADJWI1r0PDoeEF45XfDsCkNTzyPd93nm3vZpnrnnki7s+1aRJDCq5Pex1H9jkRpm3bIKypGUJSHgacMwKwFs7BgwXLce9djNlcoxBq\/wsRRjFFtipvHT5UTblB\/34lgx+0Ifrr9sqrrkdZCA0NAtuJGRhSv6KDERmlcYoLXQn5LZMw9dS52aO044tg+TOLGC7FpKO60DfY\/erCjM9uiWKHbkkC8cRW269oGnfICBEF7BHkdUVDYEuQV7hpgojbPMmO6UF7HrfDy5AWChThPc9NwGrjmqhux0677YsrsReJJHkbL66l0FAkwBG2x0pBupBFfUmIRrKiYjkMP2Q1X3DxEC1Sy\/jlgeiAUsAw5UIg1zsXEUbfJnbxz3AdaGLPYqOehH0aIeVYTv3k8O2FLmvKS5K0GXQ\/Ea\/D8iLsQFAcYNm4kgDW47LJz0Wu3w7AkTUXAFnk4agzXXPJnbPebQ\/D27EowNuh5mis4UrJCGmcO8eXddiK3HmuWzEK\/A\/bAkJtuRK3kiAOKuHPrD43urDqlWGheudGwjAkmdmomHoMCcQYmvTBKpRBJWgC8kRaQBkiNVycrgCXjHmixBe1RCjIzoZu0L01YCyTmoWLeByjuuhP2P\/4qEZGmaoari2R86lFOkIYVuPfavyBo3RXnDb1fB+0JF3yLcY9eGS4ffAK23f0YLK4DouQabnuhGZypx8gnRuGkM8\/F6tq0guWq64hFgWJuKsfOPs1V5UQUAYgcUTSCVGwNjjj8YNx4492oZzAZQHXdGtP+NIVJFKLG4ZUfhhJetNC74T3XZbB21A1vqi7tB1oUcWSiVCDVePP1sdjzoEPQe5c9MXLMOKxpiMhl4YT4+LWnsUn7IgRBV4wY86GC5sZUc\/HS8GsRFHXEvRMmO\/xaF6KfgPnub25Yhi\/FsYg7LngQb97NtxiI15oaFxFM11x45DIJn79gboLNIdZnED8TxlJsJrF99kq8OCFW9hmKO\/4SBw34s8JbjK9SgFGwJMirtAhjVbj9wjMQ5HfB5TeO1oIu26MSSBEL8Xm45s+no8cO\/TQJyS5yV+P1eHbYcJx49uVYFBUGTeFxEHEmffBcPIsZ85JRztHSSCxhRtcyiRUYMODXuHbopVgXt7aEPwow8haFWHwhxo24WQsh90ycLIEp8e8Q3cQS88gXwtT5f\/7mUGoKzfG5PADjDR8hUbwquhYL3npNK91D7rkNa4nt2FIcdci+OOGPNmcZ3kFmHZ4dPhpnn3YRlkUzWn0mF7MrxkYlHEOIGcTPhn\/STHbmA2KScSmS447cH7cP\/YtippQbfk4xxONBV7Kr2nMTjgWzQoYzj0jmFWOuNP1dunM5OYmqL2FjQkpyw09g1eMkzAoxDkh\/iiuwoXVAxlYn80r74jfH\/iW7usn6EijUcA1AbAkmDucqW0c89OJHmox+MGYFLMDSiik47oyhoEgTg9F6jK\/E1EmvIL+0M+ZV0593froAIfNlhYkJD47X3AXqQFVgsDJFt5Gw1CPTuBZbbLolnnvuJURcYiafMxBJNqhfL9+zvEZobCGC34z5s31zHNnrjuqcsKk6ucB0g58aNQyFxQX45a\/2RlUj9xuaMtEwknVAshLjHr0LQYutMKfaNlWnMnQnZ+GNUUMR5LfBAxPfF268e\/W9hBhZhLTWIJNKZWAskPzC2CSFOV8cF5lX3gbHqaA7hZxz9XmTL6XEmBAzHnFtc2J5DcP9mHQnKcRKd8CBA\/+s9kmXWJpPSKIQo0Zi6s9cvD7qDgT53XHfc5MldEnORjmOVG4LsbJqOgb86Wqs9ItAyRrMemcSOrcoxYLVSR0RRJ6mmys+5qd6MSFsdDR6Sc42ISSxXI14\/Qxss0U7jB73tiwyLb57vmZMLDofLz1uq5MM7JOuFFziRfc9\/C2GJ9KFeKHpe72pPY7JBIOEjBNkHJtSLNLVQONybN+tK0pbtkP5ujrbsM8dPamIpg\/XSiiQp737Mtq37IplK9IaBxf52I5fAGM+ID0cdsuXF0z8kUhw5Fyf5M0UUF+B7Xu2xpPP\/y1cxWY51vPhqsCxkF1lcDVtuS1iNvqhMo39AHMmugOAAxYOHESeF8NrEkIM9DKgaSeLMdAe3ldH9UBqIVaUTUF+p22xz3F\/tviD2uYqY8wYmNtY1s3EWYfugqDTNpi2NkerqX+a5sbcE14xRqBcl+CIrcQvupfgwhvuFlNSw2jSEFtElsQhNXPUzEjGetLOkvCDFM8kkGRskJZEPIYxI0Zh5+13Qk3CBAbD0ba+Ykv9MpvpJmliU0txH2q9uctkG\/XPhs0FiqRsEzUzF4yHifu1QKIKE4bfpVyoPrscirXxNBq5QkOLj0JCK7j0dSpRVfk5djvgFCxpdAKOiZTRr\/DK8CEIitri7omTxIBu9dqN308K+6TACHPyiCpnujsyi378TtRwBcoLMcbwuHzOP64um5CSGjDGc3V8ed7X5GQT5EriVVaamnC5fGmFAxSXZTnFZipRVf45ijvviH0HXCYPIM5DCjgR\/aoe458103DG4TshKNkan65z6Rdxrf+6LMg1WDDvU\/ztlfdMwCWWA7EV6L3ZrrjquseluySyNKaECV\/CJyFMJReTyyxakSXoDRF0wkniKgbEEEAZnnnmbvTa8VAs46MFNAHUcmiJjR95C4Kirrh7wkfiD87N0PgUnqg8HcHJs+Jbw9O\/eg+t2g0WcrRzuPfWpYjlDBWdIxidjxeGDRX\/XHTDMOGbQxOt6E2RBxppZKzCjj1LccmQu6QoOf94MKpcY3pT6QakGnnokhk8xj+a6IKOwXzauEKPYmUrMHbknej7P3tjJacPDSimScmqMznSxBJjGgXnlGBjkywppjJk+7ls11kgy5zWK6s4phQULMO6BJ4WVRr+CTaqnSSRKFaZRFiOFWWfIL9TH+x73KVCkrqnVmV+Cv901M907N4lwOZ7HIG5TLERmEksXrIUd91xp1lrKXteIRHIVwYRfPbKi+he1AJvfLpA219M0ntrjL9qkIovA5L059NaTfMWI2NhzDBRzFGwuAdcpJJYM3cGenZog1ETXgWXJ7zWITNLPnMQ5BMJc+YaleOFZ4dj32NOBp1PMTxdoEwUkQwfFuuWjgmShD0t2FVo\/Oo9bN2+GEGrPnjls9UKUquAIwo\/0sLaUkTjq3HPiAmKT1rOFJlrLl5+5DoExaW4c8JH0pCkjP0ZIzPlIsGlbtLQu3MUr8mkcoGMHm7Z3MsczyZpizl6+vuyJqSEbXVFOG3M7NOE3DcJMbZhvGY11IAa5qSpROWCacgr2RZ7H3ORU3rsh3zGyc7m64G6adijVz567nkUviQNWT8NfDlvHm6+7w6kZBm7bGYF0svw8aTxCFpsjTen2sN7nR1hypR2CRWdMuzplFoqqNg8pJlNXMGvAVO4LsTc+e+jVWlfPPPCDAk7jZszju5kYiE2JMS0DUuWB\/MAaYE6nNgAQzp5eq3\/SZxRGeUqpNzvhigyqymP9YVYioYDVuGLfzyILToECEp7YzYzQgiHs3FMRtAQqcbc115ASRDg3RkVMhaYgG6CmO0zprbaLQ7woHrzS6ivk0xOTmd3LEgpU1mll2Hp3I9RWtILz45\/TxlSRCnpKPwyxSIcoLtCn7UhxgOkKfHYMaEwwcTKKqY3Y3zPZ2GLQi7v+T9jLMa2Guq5NGtMrFUIAqIRUogtkhDjatP+gy42l1arkBaqVWuxdVj8xij0DAKcf\/0wVJl4lBU14q9P49G\/TtDzWYlcTsYkIojSlE\/X4JSjTkDHwk2wpEZ2jdw\/jodTlrZTOrYYdYun4Y5zTsfm7Urx2mfzJZTSidV46elHUdKlL\/5wxjXGz4mYrSpR+MaWYKuOxdjn2D8JHpKc7UqC0QtNZJyVxPOzVgDReXhh9F3Y85hTsZzJvHx6hgsO04qjJbreA4cAACAASURBVKPJ7XEvsViDW8\/7A9oEAS64caTq1TKcIsYzJiVeSSVZiUhi7Zq4Yn4mPriqPB\/jHr0JQfFmuGOC5YkhE7eVIaTR2EAz3mjKJET\/J+vH0Z0roOyHr4ZG4xEa6\/xTXEP17T5zsfQgZd+QU26+vvX1DULMCXKWZWexqNnTEqbKcWA+0hKsqPwCLTtvh337mxDjWGPMl6NLSsBia1Hx9qNKzr7ozlG2w0R+IfDkhBcwcuxYxcZEVFoi8TVAbBZO6f8rBG03x6zVNsk4BWwVM2GWYTqFmuULceF5p6Pjpn3x9pQv7cHAyVr8\/YnH0aV9Fxx+ygXmbhE\/EgRVSGVWok\/P7XH0YWeiXkFw8goFyDcLMaJAC0oyL2x3iqUwpJ1LHiJ4g19sftktfs8VYJ62RgsKWnPjKFQM90mMGXWX+K5tIR\/+EyAo7Ikg6IPHnnoLXChU7Fs8SwNgKU49\/EiUFLTDkkhKQoxtiS3YYJQexQo0zPsYV593Onr26I03P1siQ4QC8KXR96Jl+01xwtlDnKKjYFwMpNdgm659cPShf1DZcJVXQAI6Y99n2UajUZPsDh0csJfsEmPekmVlZ85SBtHikEGlNzNzfT2v2bl0zj9VJWFki3ohxpjZYiwrn6Yl898OutB8YvIOXUkhicu2dXhj5I1Ktn3qH5NRqRhGLV57\/Xl033pHvPVxuZOQ7IluGW2jZWhoXIrNuu+InXc8CmtpDElMWJiLqykMAq9aOlOaZrMgQNcgwH4nnqMl46eeGoEWXM0KSnD4MWchzexeOePk7HqgfjZ+f9juyN90h9C91cSmo5\/hJDWQFLBMrwLiczHmwaE48OSLNamkhZLMlyZcDHombRFFiKISWYPqRZ9hk3at0bplJ7zx2VKs4JOA2L1Dpi1L20+t6HH4vG\/hS4MzNR9jtDq5Be4Y\/7kpCcaWtAuCD601M8IEWFrbRzyNculGWnP4\/DQXlosnHIXV8fQ1ACxFxyxSxlvsZFfjF05fjtY+TeK6hYEMFwacJcvOnWWor+qAm8srsHjBx2jVeRvs3\/9CF2mk22sWhWJXyVr8Y9SNaBsEGDnhTZ2gQbz8828vobjLpnj9i9nODU0gXc94YjVQ8wm27hrgF\/sejTkRs\/SFZ7pLxGkKWFw2H907BI4v2mLQ8Wcpt+mJkXehdRCgIMjHoaecj1UsT9QkKPBpo9fjlMN\/h+5tuqC8ukFCTpM8881CzMeL+HDhhNxlNsoX6cVwgnkzfr6t\/ymc5byFRou7RnTqT4mmWSVlvEVLiCntlXj2iVtQUBjgyuuGo5GKhTzoElrNFFiMRP089O6yOXbftR+WNEYtrscOOAlEtxjqKmZg8+JA+2Y5rw484UKsSAITH3tQ8zrIa4cDBvxJxW1GrAYSq3DKIUdik9Y9Ub42mT0JRQtETHa1dGInoT2C0tKsvn8\/EW3Aroz98CgwIIVcf8nKsZiydiWQbG+VT9vg5LMsbDq7SxXjKOq4JQ469kIniY1YCvYxqJ+qx0mH\/VZL4kHLLggK26BFiwB5+QF673SIViOlNRnXo+up4VZgafk0tOnUFwcffakh1CHf1rKYGU5rr1FaIjn7HezcpRWC1j3x6swVOO70C5xt5FxPgpTgyhaQjFJVz8JdV\/wBQXFXTPy8WgQWGsh9KTIvg8xxBw81\/Ty8NPpu7Hn0WRJiWj5WigajK2nY\/kzHp9GIUiMmjL4OQUELbL1nf6xudPv\/KPQYSSU8nPtu7yTbqFMCMZChT0sCcGU2+RXGPXq9UizudBn75uInMeLhB9CiuFCpB0w\/4KuoqAj5+fkoKChAICGej7z8Qlx73fVqMuRLzwfukwFrsRRhc+kpsgbDsATVof3RneLOPFkjgtMEPyen5zmWlPsmIemkstI4KrG07GMUd+iFg44dLKsgW4dr8GuByEocf8R+xi9FHREEbWVVtCsO0Gu3\/VCe9OEIh+9ELeJz\/oYtSwPsffwF4aGedpS2K0N8cyzRFagum45f9eyNjnlt8PbU6Tj+kotR1VijJ947g8+iKW49gAO\/7pyTUJoXYNKX8yw2ywHSzdqgO+kcfiGMWORvUzgjhz2IwgIq129\/DR06FPX1nA8+D0tfta3K01EelxSv5xnCRdVaBcQW4I+\/OxQtgtZ4+YN5mlXME+Z4LLbHchWomvcBSrtvj9\/2P18WE2krq5h7qBX8ZZCNC1W1iMx+H7tvVoq8dj3w+tRynH36paB7xIRgnlqieezc6HSyBkPPORUd8\/PxxuQ5irVpYUSCPA072ZWEccjRUkGaWyQsuEbw+CIK5fkpG577BxmsdtekWslgidAio9aV5pVLaOgXwrwaDzmZV2kbLUdlxXQUl\/bBwQOdECOzsGcu2zYuQ+WXH6NjaVf87rjTUMNdI0RSejGeefYhHHTcYA1OMCYZbCXUPJBvPqZ\/+IKW2H9z9EUmxJgcmnA5PmlLUrX4RI2SQv\/BpNDCzui1c38sZlYHcaDAPAmQVGCRUMsSS87F7Vf8HkGrbnh56grLrudNLskJaxEkMusUl0NqDRAt1+rhAcdfILeQUBJmfpLxI1z+5yZaDp2xl8Qs3HhpfwTFHbHXyVdqsnKNxFg6Q4\/QxsQ9fXwKu9IHuJJGi9hNPB1M6IRYUXfcM26qxRxpTStWyS1SbDGtZFN+euvOux9syr9IQlFNFlg2Q5sWKFsRbiTELcbKa+pH+yzJIxRbFO\/kELPGZHoRZm4Xc6dtsB75jPD4lxQghViyXKvQhR03w6EnXiJDznnXtsKVWok1i6ajQ0lH\/G7QHxVcFsNGl+Ovj96LfQedae68o5K6WLcSZW+OQMe8AL8aeD4q3HIP4YmROGQ3AWWr00jU4I3779RRQ332OhxfpiHB1Ig0ahrc2jiRxVCWUza3X3gCOhcEeOPzL7HCza3vIsQSyUZEY3VGH3lBBIQvTV5x47e9EZdZFzJLT2JYfyKwt2TZNC2xci2W9em2Bdq174OyOgvHkL1T3JLELGUaGInFmPrOSwiKemDvgRdZmIYCy\/OXlJXrs2E1EKvACw9dj6CgLfrsfhRW1nAPJkfEuBjr2dA4Qs6OWwf\/CV2LAvz9g5kSoraLxQRuoLQeuYMplzmbRrqBMYgkgsICBIXFCApaIsgrRn6QhyI9GDdAXl6BruUFRbpOf5lJg\/lBge7ROrJXMYKgBYKCIgTFxSgIArQpKpK2V8xNqdoUYitRvmgmiku3xqEDz7eJQFRIctOSWIZZH78l4XLJLaO1V87Eywp8NecT3Pjw83IemZlNDMhMp\/iJl2HelL8rJeM3\/QfbaiB9+SSnjyGBIHBrCDe4IzUfq+e8i84dt8XFQx6XSewXfRkElrvFoloepxswB9deOBBBu66YNH2VLRiRGFKiaTz+2D0oyGfybYBWLQLl2LSi9mzRHUFBLx1dxFM7gtadsd+AE8JYILgtg8nFkRm4ZnB\/BG03w+4nXIk1lmCOmDa3cyeD5+OEDhR0zpkEjs06LgxUawP4c4\/dhKCwO+4fO0VMJivYMZkBblreBJoXIPZJ\/o4nbHM0v0eTbocCF2saIyhqydMkWiAIClFU1CJr1eUZP+Q7\/hD\/cPzkH1p5hXnCDXmrMMgDyzEJVfd4P49WYQFisYhZ7QKEq30VqCz7EEGXTbDv8ecb01MTUIJy8qWW4KN\/Po+goAQX3GQZ40yzQaZSqRlD7h+jcAEVlFiG9Eo2oHLKczpN4oBBl8lSpijSsdnsV5EESrOYW4lrQOSzN7FV23ycf9toLHCP0Yn6FWbNxIR2CLA6txvdccEf0DkvwDszZn8nS8yHerxJp\/2ush6YzuIkqyb6ht8otNhGrvDSDGHOpneRXQqMzRlKarcsyRXYeAU+f3Mcgrxu2HfQn6XQ1zTWSdGY6nXZ+fFazPjgfQQFXXDACRfaNjAOmukscSbHM6cujST5TZ5BBaoXTEHLdptjyF1jsMbtmCAMcYY4SMckXVZ+SeC2C85Ep\/wAb86ZL7pJUZJwGcbEnCC32BU1DNWsxbWoKckXshY4clHCX3E\/w+tOgrM9lTM9y69URuxP0lP3nMnK76EQWy4h1rKkDw7v74WYWXdalYxXYMgFf0TQYVu8NHW1MR4tjEwNysu\/wpN\/f1sxBg3OEUUqMFWFpbM\/QkmnLXHkcRdJSBAOwsNFDLMunSDgilNyMZbN+RCbdNoc2+14KKqY1UHmzCSU\/6Wx0UpWC9xeMx83X\/57BEUleHXqUguXEX3UVFK\/DENySbkBschKILkCz428H\/sOtOcsKjOCGtw9KMPyh0gDLs+z\/Qo8P\/o2CeF9jxssC8rnXTVJEg0pZegXD2g1i9q0GkiV4TlmhBd1xf3j3N5JWdBJl1BM+rGWqUDv8ovhaTUpP87aJu5YUqkVGmMa3MwgngoXa1jT8YJozh9smzQlb1h5tqPbfJP7YO4lr\/t7FnNjHS+xKXoqUVE2GUH3LbHnseda0x4wplY0zsPNl52GoPXmeHFGtWx9ZBgjrUJV5Uw88\/fJYQoA+xFo8VrUzX8dvToE2G\/AZXSkRHuGu5luw0I8zUFj4FCi9YjOfQtblATosdvRmJVwKS1UolrpZ4yTsdmIVp9pldx69hnoXpCPf342YwNCjAsvXbV6zBG6dU\/hheECYYz45uZol05igAvTX3sL0e7u+HhZWJAFjNzCLIWMrRS7CcvtWZGFuHnwqQiKt8Tt477QgoTGr+N1GhUykdJINGDF\/Plo02lzHDLwdKOd6Gl0Zr6A7YSkjOE8W4plZZ+jfdse2H6Xg7EsbrjmXCOm1YAIQ76M4YZzz0RJfh5enTVTQkw5mEYSC+yHg+KIHDPxGr96ZrIyHDFrqhtjvhw+tf2L4W2zdMQ+nEhWkO2xdohgTiSVWYKKyk\/RtsPmOPIYL8SIZEpuLil+jh02bY2g\/S8wizyq9vwGcsaSzC5Tw64v62k1MpGV2LZjH+y700FYFalDjTu6h8qXlouWriW8OROjeHL4\/bjinNPQrl0bzK7JiNl87IrjSMQsx0WrSvWzcNoReyDovB2mrHJMzHw7F77R2JgYS5eYq1CReRg74lb8+vgL5K5wShBmflo6CH8TQ2yAdWqwdO4X6N6xK0pLumPR0pWO4WwZ3zOhc3oxZcoMTHyRK0cWNhcOGB+MVWD8iNt0ntjdE96TyLMVmSQeHzUcxQUBivIYlLaYmKzHMN7Cs90KERS2wNVDbwx5wriA72Q0J7iFU3eNCpCWIwW6AmWkPheLXGqNZzLHc\/wwFen4jBdCWvKOS2DRBvAqLKr4DPndtsOvjznPcST7pRZfA6ychl9v0g5B2+3xGfmFcDH2BB5XxLxD21sbQqoumZIxFTv0LkT3\/xmAOUwZZD236Z6pPqEwYwPpeowbeTXO\/dPRCEq2x8x1Bj\/zIQk3FUECDUigDknUI5NswB8POgpd80pQsS62nhCbi\/GMWbboittfsBQYRQaJVwIpXPgQQQqjH30IBQVGKx+z5Pl72Vchgjyj2\/U33IT6Bgva6zQam8x2Mg3hpMebYYTYxdx4ygT7pCewbga271mMoMN2mPhFAxpIQi5Y5exv1aIdtx1GqtGney\/sstNeqEuZuPegq7zy92jpmRR44rFhuPzMU9GxZTEWra2RqueKPdW+6K7K5N01OK5fP5S074T569bKDWcLJind6qQb0zd8kLrf\/OJqEB\/BJckoRpCKFmLUkQxQ24dGQshcdDQxwrBbupOLsXjRJ2jboReO6H9+jqDjZF6D+rn\/RM9WgYK43KOlyZ8zEP6myao2hWjeJBuw7Qjuv\/hqdA1aoLx6hZBFF9GCktysK7Sp7geTPsGMKR9h9rtj0DII8OCLr0kjT1+4BjwYQQNwMSEJjjUzsHuvEuw58DwFguvcqhpBYHqFdjvoUCQK3HVAxDKzf3X8BVjoBBdhztq3hJuIJENRAjA1I4KhF16ola+Bxx6HhowdgUQai5AsjggqyufhttseClMr4koaJLBMBanAC4\/chqBFKe6cOMnwx9iUO+cqHiEOqDDkVwkGm7CGUs6hSIKC0bpscHE5RrRsB4MDOyfaxTqc67W1AlD0aIxyDdbSQsQkVB687bS20dFo14TthKGvC7GCTtth\/0GX627UPYGLeXWZma9hu9YB+v3+apQ7BUdYG3iOFTuTe8CtZ26hQQNcC8RnYsh5x6Bw019jFh8bwetRRrksemd7KnmCSAwfT3sfn30yAV9MfwdBfg889PSHYo+ysgrUr63TZGWOYopbjzJ8NHA9tijZEicfcw7WJm2ycj7IvUp8sxDTAjJ5ibCIp0iFmHtYtbiAreiPRfjydPKfukYDS0fj+NJWmFkJRkduSPenRVCh16Ps\/TFaDOmx6+FYyDAMqzp6xeK5CzBcMV6L2y8bjNKCfCxYuUZ5kMogYue0vvSyeffGex9i8kfvYda7ExRieebFlxUO+mLFGq1WalQMktVXAJEl2LrXNuh3xEmSJpq7xABzPJgnljOcf\/srTU8Onh0yX0QP2mXUmZPWuVMWvjXLheUsmdOZKYRBcFDQLMLSik\/QqrQX+g240AQMB48IEnUVOOXQnVCSH+CqW0dKCDGwr9uqb3vYKAh0UaY\/f9lSfSaWULLrJi3z8d6nM5XsakKQ\/vwi3DjkTPTdYz+89+Vy3P3wE0CUKnU2dtkkwH7HHo9R787GyIkfab+oqJhMuf1ejYhVTJOvPnz8OzJzBUNWSTjB4EUuYwxLMPaxu7H3oDMUc\/Hlmwh3IYXYSiDDUw6YntLYiBOPOlqxpO122wMzFyzWcUUsunxJFUYMux9nnvEnRQO8a0fa6E9CrAwTR9Bd6Yy7J3wQCjETlqQHmZYH1ZEWrGfEoRCia0SBrInAOZ20\/W8s5eFWP6xCNzjNCW8OtzJrqHTiZgHJLWU5ynfepBnAl7tGTBlOXGiDneol08bGI7uqUqdY5LffCvsPvESqin3KWostx+AjdlfA\/cKrhykVx6K8thoa7oVVn2nwFFhOduEgVYY5H7+s2OHLH1ah3vEZx9oQqcc1l5+LX+24NeYsWIib77kTKdRg7brF2HqLndD\/6LMx8dWP8NiYiQLZcBtDkvlnWIGlZTPRvsNW+Ouz75tIjluunSz0+HyMH3mDWWITbbeJVDAfzuNwoy8eH17J6aZDi0fVekKM9CINWdX\/+QUbHhjJdjmXtT9a9CAvcDvROoy7\/yaUFgZ4aOJb8hzEUQzHxLkAYyEThmXkUKUTmPH6U+jRMsDk2fM1z4h3gVhXjr+cPQA77bk3PplThTvufsg8jbp52H2bTjjwqBPxzBufY+TzL4o3qzVlqPjLsOqrt9G+pDcefXqSTT\/lVzqafV8hRugicQb50pZBS2RTk6fq9IRnj28yCAfPT670yPJyjMtJYr\/Lsax8Clp27IWDBw4OhdgVl52jfJzOhYEsoyCvBEGHrbBopR23owngAvnSEuqUvXEyGqLVeaIGfzjqQFx+7a2KcxBHce7TSi\/FU9xb16Ijzr3uIZtAHEP9l7jtsgHIL22L+ye8jtU85sUThJNPKRy1GPPI7dj\/V7tgddJWbehGGlNYzEiWDpMs\/ApuYjVGD7sTh598loSxmMLhh\/ALHfokMl2ckcmn3C6QSuPNt97B3gcejKCIRzJzo3ch9t7zN\/hyxkx2rAZs9dDFN3iNQiw+HxM5SbitZfwUMYoC+7RWY0weZV\/eCksqWdgzOptQ7q2Dz2v3uqidhCu8qx9afRRMjAOZEGOTNCapzLg1W+Pzg2Qd\/vG3m6jEcSjE5Ec5nOS4q+YcVliKRWkfHDDwIo2HQvuSS86UxcqHk3QpyENQ1B1Bx75YuLxaljqh4L49NwO1FY7fBYKWN1fr2QCH9fsdht4yLAxTcOsM6fH0yHvQOj\/AkKuHCs6YsvsacO3FV6BdfkeMeubv4i\/SNck9hdwBQks\/tRzPjX4Y2+9xJBZz+5MG7vCtZFcKMSqZ7rhzwhRZHLIYCZgT+Dq2x\/22FR22IsDUmkcli3gasYTNOzfkFBNefXHPI0k01tvxRLb6S4rWAInVOOWIw9CmsA3mVMdkKbEtbjFiG1yZ9ODQQNRcjC\/EyUfugstvuEOWGG1n8x6X4dXn7kNQUIiLb7jLlAbPnUsvw5UXnIygqBMeefoN4ZS9m9pnkHEuXnnqTmy74\/5YyeQA16G8P7Opv58lZpRPIBmxs6\/ZORmJLpwJqywyhWshjyxKAWNmvCQ4f3MjbtlHYJ7YgcdeGgoxLT8LoeskIEkUr63FCBwUhahNeUcddmQMIiHJn+tWYurbr6F1h06oXBdVG6rPyZWIKYxBBAnhQhRPjFiFaLJapyIQao6PzEzmpGbNRMvQd\/Mu+OvjT6DOBXWVmuAC1wJNJ7zanlExgHbpx1DHHCVHEOKR9whPziXbwsWJpf13DMYxFmH2FcuqPdZxcBN2EzxJt5rnZieFmHdXCi3FghpSdrTbZmSTIZv06tmc4\/ErWx42CknSjTB4vIi+vCHa0u+WNM8ygPP0JctZz7kifsyy4DL2TAcJMQowWdRZnPg+JcQyFVixcDI6dO0rpUeeYFuW\/V5jSbxR2y5Wx2277n6EE4clORgikGPRoQaszbRno8T0t19F1zat8OXKqCwK8alox2kZCReruHlGy19MN3GPmKtxDzCXm804HmO6jcuwZc\/ueOyZN8GQA7ffGa4o4SkwFmLcSC68dJeSMfpYGpPiiRodcZqWFaSVfU+knE9Po9xPksXnauYUNeMDcR0rpOa9bBdVl6Fy3mRs2nkLXH3NA6h2OXWNCXdooeM58h7PcCP2ZFmnl2DmBxNQ3LIzFq2xp1gpfq0z5mokF0JaERjm86VqxcP05tbFSAPDnAR14xJsu0kHjHr6Bbng4jMqRpHPZMj3cicleRkoYqJlPK0JvjpjJytQEzPLmJ3pjaPkS\/lbjBOYGyrmYAA7tQAryz5AUcc++O2xl4vprDLPEatx6pzJsrbJliuMkv6ufRuUdWWE4qzhNg0yiRMEqTRGPfFXbLnjjqiJ2U7DBho4rMD555ma1rRcIk6neqQytdLevM1XMk2vfCkGHrUrhl53lcAke6kdTT6eOc5p4wirh03YtGaciRaQb0s4dHEZfy33U+3QapV5ZflblpxrY+XxwWJYMhOH6vPZiGwiV+NiXpXLEyvsjvvGTpWFQXXjA9V2VDU1rNhRsPtcMf3gFHcuCfvjpCCcprg8\/shUtMCcAKMMJVAM6lBY0gJKW9Y+McuJmq1v9DIl6GEg8PbHPnmV5RUyzpRh9YL30ab9ZjjomPMUcOZ9iVWe6KrNq0Z6IoguleEtiUikQQ+14HXl2bEb1knHHF44wBo8Pexu9N3zQFR5HmEeZGqd5aE5\/WD5iLTM7QBKxob92DgWLirxrL2jD9oXQ4dcp9Qg7rYg7kyIMfRSrR0I40beITf2vnF+A7itnluuHKd23LngqmxpQfY1fBcvuCnH745tbA3HlTLvh3i0SJ8wS0XpYp6yoWOVGPvX+1BQ3A0Vy2xMUfKuaGtSxCt8rh6LZ5UOsUar4Y8Oeww773YwFtXaia9awaSLmrDnGpCO3rpl3DhluVFaaItxJwkZN5HEwH6H4LYbbhDdiVdGK8gI\/rkJHFL2kW0hGvxIczBBbKz3Z5eSmPrhq858L0SbolK8Pme+HiDCveh6MgwZhB37manTAGzjLC9\/XYhtnRVitBWcqxPn+dp0G2NGWN9cFiwzjT0RbWazc9OcMhCkgBN47LnR2GqHXTBt1gIxnASQgCFmyVR0hyzXjMvCRKrGS6qlIqhdvgBHHrYXTjv9BA2LAtWjiMfrmmtGC4lXCYNpKg+zUhN03bmLcpuyQXNfjp\/8S+hIYzsFhG2xVVlITvgRh\/Q2jTl5PpMF6S1IS9xT0czH2FE36LDIB563M9w5LTzcobXlEiINdmMWB0aTD1p8dmCkC+zL3c1O4HDoYnrugavB9Hde0uZgroAGHbbAK1MrhX+Ok+gXLPI9bQM\/GV0XKcSJByf4KHx5dNPa+e+itHQzHNL\/bDF5o45FTkLniulYF8d3zIeSPE\/pSG9OXjXNjilQoklkFNC1p0Upf5D7L9MJPD56JLb55Xb4bM4isZCNMLtQRcjp5tGwMlzaWfBMWuaK39qquTjxyANx3pnnK4NFeX0uz5Cb\/iXIKMSSlRg78m4EBd3xwNiP5CkYpQkpv9EgiGlVkE8VIit62mkw3\/DmBZbGS8Gbc4FxMlM3aaTWLMQ23dvgyWfGixbJ+hXou0U3PD7uVeVKagq7AKelYxm\/WUjCcs7smaHMRGBcPIaRw4aj7x6\/xUdflYPJukqKpXJ3FitHL0HGgZDuqVrnxcWwonwhjjviaJz1p4shI1eWv7mvflN82lbmvq8QIwpWSvJeecZFKGnTGzNqEnqAiD12icR2QVubyxYzo0bzGbwagLmTiomV9MFBA90GcKLTL88LtcwoN+RRw6y\/wdhPcBFX7fLUUSZG0tIzhmXWM5fY3\/xgMq6\/7T6T8O4YaTUuZEe04krJ77fFSNhyDI3rcPWFZ+D1v0\/UPj0S1zSKs7pcrpXfg+iZhuCwDYLBl2YPBbqCRiZBWcbfF9O4OsafnIguGVV9WFY+2Zv1lMFAQrsjYnhEt0QDYab7myqzvZMFnfHQ8x\/I4vBCzMe+PKzG8FQWbNkYP7dMeF3CmZDSdKXSMsFPC8vHLmTq8EElKVobfKpPJa4efBaC0l\/gCx6j5cYcWmScKFpBNHEhPEmIWdaUOYOUSBUSYu3bd8UR\/c8OU1p4\/A8h4vlu\/DSEMmXABADxy\/ikUg1EFCOFFA9PAJYdSQuVAyfO6\/HBu6\/ixruHyaVifT31R6uELMM5ILFqbr2EIVdAKRCjuPrSc\/HK2DEWwhIt2ACtUVrjgtTiT6kqjBl5L4L8rnj4eUuBIW2prGyu2I4Mw4fxklFHJPrGtxyZpTKkXUhLo5z6qK74X3bRpQAAFlRJREFUCH175OPDj6aiYkkNDtrvNxh63RAJMOZuyethrJh4dWfoEy49rpDjIDDhi5PTvKeX35mMa+8dbkimoOKKo8vTJO1JdzVHbww1yGTqEIutxVWDz8FrL7ws5cAyNlYe82SCTAJMNPqOlhj9b6+pPbYoxU2LLEGmthybb\/5L9Dv6XAUkCZxJS5qZDP7y0H8bqKwKN1ghQ99tQ6\/O2O\/QW5pVpqOQ5JFDBPI4kiwBzbTlSMJRhni0L7xHJjN9YwWtPKEnC1mGu1lKQpSEigWlZQmwrotxqU1WotWhILDpSrbl\/wzZ\/MV+HGy6ad\/d0N09Nmbt+7JZuGz+NS3v2\/SfWb5hPeub9zheYpCTl0xDIVaF5x7loXslePCZ1y2uyK1jHr1hfT+Sb\/r0fdvYNQKPEz1ApU7PDozKhaOgJSw8z4yLCzVAzWz8zyatsddx2W09bCmM2XAgMpxsIYA\/bCIbvRhH1DiTlVg5bxJKS3vg4MNPcWO3Mhw5eVAeCsF1iw2ko8dvODqPAFcmPIqGBaSAacnbg2UY6fNC14Sjox8B9mgRcFQPLM1DF50vyqIsI64jTqxCRvtAGfhfhedGPqDtcQ89\/U9Nbm3pEV0o8ihgOTKzKimc1hdQ4Zi+4xeC6naOAY3zMeTiQSgM8rHTDntj7ISXBYPw6HSBYHf0IRxylwWTW0HlkNz4LWxkj1JkGxouLQ\/nSbAZ\/1IV8Sy9GOKM3pDFzcVarG+F9KGvUjCGi+\/kTvogIgVZrhQ3Ii3E8gUfoEXnbTF87FQLyHu1qrwwnqJquTkODsS5hOcGnGgw941ndTOTuqRzbwR5pQjyC7X95NrrbzE\/OENX0nKMqBV49Es2gzs7yCz9DGE2ak0T8+cJhI1dSFw\/BcQAy7p\/IgbjJUoZ8cQgBSiUieIQv+qKhLFxuv49QCy7Xnnry5HJuUyszyu+HbZlL47Bj6lp27zvGcIKswUyfAyVZQvRs2MHbaXRaRz5bTB64ltaWPh6Hx7Yf\/Xp++anWaEabyMFpWlTLoZ4eOhuyCqkQIjXIz1nErZoHeCB8W+5sIMXdPb4OU1OtZy0gDPHlkMvPr5PYd9EFWoWzwAtsYJW3dzDlgNcc9MdeugHIRF1hByz7qQEnfZXF14g+jIZqlsTVMIjBRD3BXK7mbvu43gWbMpRQB4tohdLU\/i5R4wRGbykcfi4klWoLJ+Dnp1bij7MS+RpKU9MeNc97UtQOkvM0lY88xJk4d2K\/GfvThBa\/JZpIKsUhyKcnMJ8ChXxYdOZ8FIgW0BPKJNACgfmAGI5r\/gt9UnGAIvJjqFyIg5sAJ7extu05j0f0X02q5roE+s7elldNmjKIBRiTRDCH+6lFQcC6wK+3MPGp2pbQ3xy0FeYMPpWBAVb4aWPXayAuWJ8NmkjEU+BkERj0gX\/3Fq9FmdcH4lGxnAawONqeJtAEzyCqQEQeBeo5W8+BNXueo3maJgDt61vOA0pN45xOApMz0yeCYh0Z9Z6xnBun24QqXIzrIzVZ7skVA4Tu7qETzCrsrVtjOfKixoheh11SF2bqb6+4VeNqEviMRyTK2t37d3XM2I7RiIR6HoysK79avWhdiVjheen5zb0rd\/ZdvZF5vNWtpZ4xfYW6E7WRfXQWMVyGEFPRfDyo3fryJUPpi9SiomsCeWi8fwOW8Wtz1FyiveF7EgnjeKJGrsemYY6KRdygwVXbdJQ89cbCA7RFEa2wMOymlSsk8Mv5j9ydZQuMenLyUq6kMeyljkntfXHMvzmcCGrLdukrE\/Bmi3CosSXYm764fiIhzcyzSLZqLYJP1tWKkjIV7QiXX8ObvHI+vTyY\/Jw+c\/wetMKCnHIhSfCmMNgiwdcJSQcfrwmZMhHXkBl5yZbDPmTvElcOIuLuBa++Jbi2KkQchb8nGAK5wxhcVusOF6z9hwOGZJ2+DAJsQEhJqT4weqHAeNXrhrcwXmcTIbgeqB2Fk45Yh9sueeJWESIaSbxkWUkGJkzHpVGNeLZMTIikLuvActCYWIqG7BzqQgsYxf8THBDoeOVhpgJQ6JmgxtgWU6IcZaL+03kyRznuNw1Iyd\/GKIJlx++kKqyRjh+9fetEAfgrStrg2VYjy9+tz\/e23BZljHm4H1XzNUPAXFj8QS1tlx5duA68v1mx2aTTzBQY3BVKOksCiekszA6UL\/ThxuPIwi3bPnMfla31WCudLmzyjJ8GK0d2s0nog847Ejss8c+WLWW1xy\/pGzbmOJdCnZTafKBweYNG5zsl8zPgzXd8eAuPqqHUEUsWkYOqnNb\/\/x5Z2pMk88sbJaxv6Z4JC0owCRk5AbaWNk\/YSX9WVdw+8kq4NiOa8sj1fEGf+qS7rM995dbjxu59SSxiDwZuuLsw3jD6vO34PL9+HZ9e\/4z7LApnUJ+8uXcJ0crniIu+YBJCV66rlkrjOPW6LXoYsqA3bCM5zfjTyfyHIy+TFiO5xPmzkPhIDs+\/STeSCsJQULnrDY3HLal9mTmOCHmL7IBa8R98UjPpO3xVSJhEuUV83HAwfvK1dtth21ROfldbNulCw458WztBVu1tAKXnH4qNtn0f\/DmpFnkUmnNp0YMR2lJVxx75hVKBhQglLhc2s2k0Rjl0qs7+tdJcR\/EI2Bx5kI4qW3H4lDY2SCIS4cPQ6rjJxssR28SnQjRXzhYTwUiivfsRTj4TfWJB2oW9u3r5X6qwVyGMVhY12BiXbbmy\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S48W8YaJ0AAAAASUVORK5CYII=\" alt=\"\" \/><\/p><p><span style=\"font-size: 14pt; color: #000080;\">So, by Eq [1], we get\u00a0 \u00a0 \u00a0\u00a0<\/span><\/p><p><span style=\"font-family: var( --e-global-typography-text-font-family ), Sans-serif; font-weight: var( --e-global-typography-text-font-weight ); font-size: 14pt; color: #000080;\">\u00a0\u00a0<\/span><img style=\"color: var( --e-global-color-text ); font-family: var( --e-global-typography-text-font-family ), Sans-serif; font-weight: inherit; font-style: inherit;\" 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\" alt=\"\" \/><span style=\"font-family: var( --e-global-typography-text-font-family ), Sans-serif; font-weight: var( --e-global-typography-text-font-weight ); color: #000080; font-size: 14pt;\">\u00a0\u00a0\u00a0\u00a0\u2026\u2026\u2026\u2026\u2026..[4]<\/span><\/p><p><span style=\"font-size: 14pt; color: #000080;\">Where, C is constant independent of x. The value of constant C can be determined using some limiting conditions.<\/span><\/p>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-7913e44 elementor-widget elementor-widget-menu-anchor\" data-id=\"7913e44\" data-element_type=\"widget\" data-widget_type=\"menu-anchor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div id=\"6\" class=\"elementor-menu-anchor\"><\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-2c2fa3f elementor-widget elementor-widget-text-editor\" data-id=\"2c2fa3f\" data-element_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<a href=\"https:\/\/physics.educour.in\/wp-content\/uploads\/2021\/05\/Formulae-of-Integration-1.pdf\" class=\"pdfemb-viewer\" style=\"\" data-width=\"max\" data-height=\"max\"  data-toolbar=\"bottom\" data-toolbar-fixed=\"off\">Formulae of Integration<br\/><\/a>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ce81c00 elementor-widget elementor-widget-text-editor\" data-id=\"ce81c00\" data-element_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<h3 style=\"text-align: center;\"><span style=\"color: #000080;\">Definite Integration<\/span><\/h3>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-5cb45f7 elementor-widget elementor-widget-text-editor\" data-id=\"5cb45f7\" data-element_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<p><span style=\"font-size: 14pt;\">When a function is integrated between definite limits, the integral is called definite integral. Usually, these limits are the initial and final value of the independent variable x. In this case no constant is used and we write eq [4] as<\/span><\/p><p><img style=\"font-style: inherit; font-weight: inherit;\" 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\" alt=\"\" \/><span style=\"font-size: 14pt;\">\u00a0\u00a0\u00a0 \u00a0\u2026\u2026\u2026\u2026\u2026\u2026. [5]\u00a0\u00a0<\/span><\/p><p><span style=\"font-size: 14pt;\">Thus, physically\u00a0\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" 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\" alt=\"\" \/><span style=\"font-size: 14pt;\">\u00a0gives the change in the value of\u00a0<\/span><img style=\"font-style: inherit; font-weight: inherit;\" src=\"data:image\/png;base64,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\" alt=\"\" \/><span style=\"font-size: 14pt;\">\u00a0for\u00a0 \u00a0 \u00a0 x = a to x = b.<\/span><\/p>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<section class=\"elementor-section elementor-inner-section elementor-element elementor-element-2fa5f77 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"2fa5f77\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-inner-column elementor-element elementor-element-8c72ad2\" data-id=\"8c72ad2\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-fb62ecd elementor-widget elementor-widget-menu-anchor\" data-id=\"fb62ecd\" data-element_type=\"widget\" data-widget_type=\"menu-anchor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div id=\"7\" class=\"elementor-menu-anchor\"><\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-3fc2a70 elementor-widget elementor-widget-text-editor\" data-id=\"3fc2a70\" data-element_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<h3 style=\"text-align: center;\"><span style=\"color: #000080;\">Derivation of equations of Motion in one dimension<\/span><\/h3><h5 style=\"text-align: center;\"><span style=\"color: #ff6600;\">(In Hindi + English Mix)<\/span><\/h5>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-02843b6 elementor-widget elementor-widget-video\" data-id=\"02843b6\" data-element_type=\"widget\" data-settings=\"{&quot;video_type&quot;:&quot;vimeo&quot;}\" data-widget_type=\"video.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elementor-wrapper elementor-open-inline\">\n\t\t\t<iframe class=\"elementor-video-iframe\" allowfullscreen allow=\"clipboard-write\" title=\"vimeo Video Player\" src=\"https:\/\/player.vimeo.com\/video\/549589040?color&amp;autopause=0&amp;loop=0&amp;muted=0&amp;title=0&amp;portrait=0&amp;byline=0#t=\"><\/iframe>\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<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<div class=\"elementor-element elementor-element-0b32900 elementor-widget elementor-widget-text-editor\" data-id=\"0b32900\" data-element_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<p><a href=\"https:\/\/physics.educour.in\/isc-physics\/wp-content\/uploads\/2022\/07\/Calculus-derivation-of-equations-1.pdf\" class=\"pdfemb-viewer\" style=\"\" data-width=\"max\" data-height=\"max\"  data-toolbar=\"bottom\" data-toolbar-fixed=\"off\">Calculus derivation of equations-1<br\/><\/a> <a href=\"https:\/\/physics.educour.in\/isc-physics\/wp-content\/uploads\/2022\/07\/Calculus-derivation-of-equations-2.pdf\" class=\"pdfemb-viewer\" style=\"\" data-width=\"max\" data-height=\"max\"  data-toolbar=\"bottom\" data-toolbar-fixed=\"off\">Calculus derivation of equations-2<br\/><\/a><a href=\"https:\/\/physics.educour.in\/isc-physics\/wp-content\/uploads\/2022\/07\/Calculus-derivation-of-equations-3.pdf\" class=\"pdfemb-viewer\" style=\"\" data-width=\"max\" data-height=\"max\"  data-toolbar=\"bottom\" data-toolbar-fixed=\"off\">Calculus derivation of equations-3<br\/><\/a>\u00a0<\/p>\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<\/div>\n\t\t","protected":false},"excerpt":{"rendered":"<p>Calculus for Physics Differentiation Function: \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 If the value of a variable quantity (y) depends on another variable quantity (x) through some relation, such that there exists only one finite value of y for each value of x then \u2018y\u2019 is called a &#8230; <a title=\"Calculus for Physics Class 11 ISC\" class=\"read-more\" href=\"https:\/\/physics.educour.in\/isc-physics\/calculus-for-physics-class-11-isc\/\" aria-label=\"More on Calculus for Physics Class 11 ISC\">Read more<\/a><\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":[],"categories":[4],"tags":[],"post_folder":[47],"_links":{"self":[{"href":"https:\/\/physics.educour.in\/isc-physics\/wp-json\/wp\/v2\/posts\/6278"}],"collection":[{"href":"https:\/\/physics.educour.in\/isc-physics\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/physics.educour.in\/isc-physics\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/physics.educour.in\/isc-physics\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/physics.educour.in\/isc-physics\/wp-json\/wp\/v2\/comments?post=6278"}],"version-history":[{"count":140,"href":"https:\/\/physics.educour.in\/isc-physics\/wp-json\/wp\/v2\/posts\/6278\/revisions"}],"predecessor-version":[{"id":7742,"href":"https:\/\/physics.educour.in\/isc-physics\/wp-json\/wp\/v2\/posts\/6278\/revisions\/7742"}],"wp:attachment":[{"href":"https:\/\/physics.educour.in\/isc-physics\/wp-json\/wp\/v2\/media?parent=6278"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/physics.educour.in\/isc-physics\/wp-json\/wp\/v2\/categories?post=6278"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/physics.educour.in\/isc-physics\/wp-json\/wp\/v2\/tags?post=6278"},{"taxonomy":"post_folder","embeddable":true,"href":"https:\/\/physics.educour.in\/isc-physics\/wp-json\/wp\/v2\/post_folder?post=6278"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}