{"id":27902,"date":"2019-10-18T16:44:38","date_gmt":"2019-10-18T11:14:38","guid":{"rendered":"http:\/\/mycbseguide.com\/blog\/?p=27902"},"modified":"2019-10-25T11:49:11","modified_gmt":"2019-10-25T06:19:11","slug":"continuity-and-differentiability-class-12-mathematics-extra-question","status":"publish","type":"post","link":"https:\/\/mycbseguide.com\/blog\/continuity-and-differentiability-class-12-mathematics-extra-question\/","title":{"rendered":"Continuity and Differentiability Class 12 Mathematics Extra Question"},"content":{"rendered":"<p><strong>Continuity and Differentiability Class 12 Mathematics Extra Question. <\/strong>myCBSEguide has just released Chapter Wise Question Answers for class 12 Maths. There chapter wise Practice Questions with complete solutions are available for download in\u00a0<strong><a href=\"https:\/\/mycbseguide.com\/\">myCBSEguide<\/a>\u00a0<\/strong>website and mobile app. These Questions with solution are prepared by our team of expert teachers who are teaching grade in CBSE schools for years. There are around 4-5 set of solved Chapter 5 Continuity and Differentiability Mathematics Extra Questions from each and every chapter. The students will not miss any concept in these Chapter wise question that are specially designed to tackle Board Exam. We have taken care of every single concept given in <strong><a href=\"https:\/\/mycbseguide.com\/course\/cbse-class-12-mathematics\/1284\/\">CBSE Class 12 Mathematics syllabus<\/a><\/strong>\u00a0and questions are framed as per the latest marking scheme and blue print issued by CBSE for class 12.<\/p>\n<p style=\"text-align: center;\"><strong>Class 12 Chapter 5 Maths Extra Questions<\/strong><\/p>\n<p style=\"text-align: center;\"><strong><a class=\"button\" href=\"https:\/\/mycbseguide.com\/dashboard\/category\/1289\/type\/4\">Download as PDF<\/a><\/strong><\/p>\n<h2>CBSE Continuity and Differentiability Class 12 Maths<\/h2>\n<p style=\"text-align: center;\"><strong>Chapter 5 Continuity and Differentiability<\/strong><\/p>\n<hr \/>\n<ol style=\"padding-left: 20px;\" start=\"1\">\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>Let f (x + y) = f(x) + f(y) <span class=\"math-tex\">{tex}\\forall {\/tex}<\/span> x, y <span class=\"math-tex\">{tex} \\in {\\mathbf{R}}{\/tex}<\/span>. Suppose that f (6) = 5 and f \u2018 (0) = 1, then f \u2018 (6) is equal to<\/p>\n<\/div>\n<\/div>\n<div>\n<div>\n<div>\n<ol style=\"list-style-type: lower-alpha;\" start=\"1\">\n<li>1<\/li>\n<li>30<\/li>\n<li>None of these<\/li>\n<li>25<\/li>\n<\/ol>\n<\/div>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>Derivative of log|x| w.r.t. |x| is<\/p>\n<\/div>\n<\/div>\n<div>\n<div>\n<div>\n<ol style=\"list-style-type: lower-alpha;\" start=\"1\">\n<li>None of these<\/li>\n<li><span class=\"math-tex\">{tex}\\frac{1}{x}{\/tex}<\/span><\/li>\n<li><span class=\"math-tex\">{tex} \\pm \\frac{1}{x}{\/tex}<\/span><\/li>\n<li><span class=\"math-tex\">{tex}\\frac{1}{{\\left| x \\right|}}{\/tex}<\/span><\/li>\n<\/ol>\n<\/div>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>The function f (x) = 1 + |sin x| is<\/p>\n<\/div>\n<\/div>\n<div>\n<div>\n<div>\n<ol style=\"list-style-type: lower-alpha;\" start=\"1\">\n<li>differentiable everywhere<\/li>\n<li>continuous everywhere<\/li>\n<li>differentiable nowhere<\/li>\n<li>continuous nowhere<\/li>\n<\/ol>\n<\/div>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p><span class=\"math-tex\">{tex}\\mathop {Lt}\\limits_{x \\to 0} \\;\\;\\frac{{1 &#8211; \\cos x}}{{x\\sin x}}{\/tex}<\/span> is equal to<\/p>\n<\/div>\n<\/div>\n<div>\n<div>\n<div>\n<ol style=\"list-style-type: lower-alpha;\" start=\"1\">\n<li>1<\/li>\n<li>2<\/li>\n<li>0<\/li>\n<li><span class=\"math-tex\">{tex}\\frac{1}{2}{\/tex}<\/span><\/li>\n<\/ol>\n<\/div>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p><span class=\"math-tex\">{tex}\\mathop {Lt}\\limits_{x \\to \\pi \/4} \\;\\;\\;\\frac{{\\cos x &#8211; \\sin x}}{{x &#8211; \\frac{\\pi }{4}}}{\/tex}<\/span> is equal to<\/p>\n<\/div>\n<\/div>\n<div>\n<div>\n<div>\n<ol style=\"list-style-type: lower-alpha;\" start=\"1\">\n<li><span class=\"math-tex\">{tex} &#8211; \\frac{2}{{\\sqrt 2 }}{\/tex}<\/span><\/li>\n<li>-1<\/li>\n<li><span class=\"math-tex\">{tex} &#8211; \\frac{1}{{\\sqrt 2 }}{\/tex}<\/span><\/li>\n<li><span class=\"math-tex\">{tex}\\frac{2}{{\\sqrt 2 }}{\/tex}<\/span><\/li>\n<\/ol>\n<\/div>\n<\/div>\n<\/div>\n<\/li>\n<li>The value of c in Mean value theorem for the function f(x) = x(x &#8211; 2), x <span class=\"math-tex\">{tex}\\in{\/tex}<\/span>[1, 2] is ________.<\/li>\n<li>The set of points where the function f given by f(x) = |2x &#8211; 1| sin x is differentiable is ________.<\/li>\n<li>Differential coefficient of sec (tan<sup>-1<\/sup>x) w.r.t. x is ________.<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>Discuss the continuity of the function <span class=\"math-tex\">{tex}f(x) = \\sin x.\\cos x{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>Determine the value of &#8216;k&#8217; for which the following function is continuous at x = 3 : f(x) = <span class=\"math-tex\">{tex}\\left\\{ \\begin{array} { l } { \\frac { ( x + 3 ) ^ { 2 } &#8211; 36 } { x &#8211; 3 } , x \\neq 3 } \\\\ { k \\quad , x = 3 } \\end{array} \\right.{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>Determine the value of the constant &#8216;k&#8217; so that the function f(x) = <span class=\"math-tex\">{tex}\\left\\{ \\begin{array} { l l } { \\frac { k x } { | x | } , } &amp; { \\text { if } x &lt; 0 } \\\\ { 3 , } &amp; { \\text { if } x \\geq 0 } \\end{array} \\right.{\/tex}<\/span> is continuous at x= 0.<\/p>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>Find <span class=\"math-tex\">{tex}\\frac{{dy}}{{dx}},{\/tex}<\/span> <span class=\"math-tex\">{tex}y = {\\cos ^{ &#8211; 1}}\\left( {\\frac{{1 &#8211; {x^2}}}{{1 + {x^2}}}} \\right),0 &lt; x &lt; 1{\/tex}<\/span><\/p>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>Show that the function defined by <span class=\"math-tex\">{tex}f\\left( x \\right) = \\cos \\left( {{x^2}} \\right){\/tex}<\/span> is a continuous function.<\/p>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>Determine if f defined by <span class=\"math-tex\">{tex}f\\left( x \\right) = \\left\\{ \\begin{gathered} {x^2}\\sin \\frac{1}{x},if\\,x \\ne 0 \\hfill \\\\ 0,\\,if\\,\\,x = 0 \\hfill \\\\ \\end{gathered} \\right.{\/tex}<\/span> is a continuous function.<\/p>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>Find the value of k so that the following function is continuous at x = 2.<br \/>\nf(x) = <span class=\"math-tex\">{tex} \\left\\{ {\\begin{array}{*{20}{c}} {\\frac{{{x^3} + {x^2} &#8211; 16x + 20}}{{{{(x &#8211; 2)}^2}}},}&amp;{x \\ne 2} \\\\ {k,}&amp;{x = 2} \\end{array}} \\right\\}{\/tex}<\/span><\/p>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>If x<sup>y<\/sup> + y<sup>x<\/sup> = a<sup>b<\/sup>, then find <span class=\"math-tex\">{tex}\\frac { dy } { d x }{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>If e<sup>y<\/sup>(x + 1) = 1, then show that <span class=\"math-tex\">{tex}\\frac { d ^ { 2 } y } { d x ^ { 2 } } = \\left( \\frac { d y } { d x } \\right) ^ { 2 }{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/li>\n<li class=\"question-list\" style=\"clear: both;\">\n<div class=\"question-container\">\n<div class=\"question-text\">\n<p>Find <span class=\"math-tex\">{tex}\\frac{{dy}}{{dx}}{\/tex}<\/span> if <span class=\"math-tex\">{tex}{y^x} + {x^y} + {x^x} = {a^b}{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/li>\n<\/ol>\n<p style=\"page-break-before: always; text-align: center;\"><strong>Chapter 5 Continuity and Differentiability<\/strong><\/p>\n<hr \/>\n<p class=\"center\" style=\"clear: both; text-align: center;\"><b>Solution<\/b><\/p>\n<ol style=\"padding-left: 20px;\">\n<li class=\"question-list\" style=\"clear: both;\">\n<ol style=\"margin-top: 5px; padding-left: 15px;\" type=\"a\">\n<li>1<br \/>\n<strong>Explanation:<\/strong> <span class=\"math-tex\">{tex}\\begin{gathered} f'(6) = \\mathop {\\lim }\\limits_{h \\to 0} \\frac{{f(6 + h) &#8211; f(6)}}{h}\\end{gathered} {\/tex}<\/span> = <span class=\"math-tex\">{tex}\\mathop {\\lim }\\limits_{h \\to 0} \\frac{{f(6 + h) &#8211; f(6 + 0)}}{h}{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex} = \\mathop {\\lim }\\limits_{h \\to 0} \\frac{{f(6) + f(h) &#8211; \\left\\{ {f(6) + f(0)} \\right\\}}}{h}{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex} = \\mathop {\\lim }\\limits_{h \\to 0} \\frac{{f(h) &#8211; f(0)}}{h} = f'(0) = 1{\/tex}<\/span><\/li>\n<\/ol>\n<ol style=\"margin-top: 5px; padding-left: 15px; list-style-type: lower-alpha;\" start=\"4\" type=\"a\">\n<li><span class=\"math-tex\">{tex}\\frac{1}{{\\left| x \\right|}}{\/tex}<\/span><br \/>\n<strong>Explanation:<\/strong> <span class=\"math-tex\">{tex}\\frac{d}{{d\\left| x \\right|}}\\left( {\\log \\left| x \\right|} \\right) = \\frac{1}{{\\left| x \\right|}}{\/tex}<\/span><\/li>\n<\/ol>\n<ol style=\"margin-top: 5px; padding-left: 15px; list-style-type: lower-alpha;\" start=\"2\" type=\"a\">\n<li>continuous everywhere<br \/>\n<strong>Explanation:<\/strong> f(x) = 1 + |sinx| is not derivable at those x for which x for which sinx = 0, however, 1 + |sinx| is continuous everywhere (being the sum of two continuous functions)<\/li>\n<\/ol>\n<ol style=\"margin-top: 5px; padding-left: 15px; list-style-type: lower-alpha;\" start=\"4\" type=\"a\">\n<li><span class=\"math-tex\">{tex}\\frac{1}{2}{\/tex}<\/span><br \/>\n<strong>Explanation:<\/strong> <span class=\"math-tex\">{tex}\\mathop {\\lim }\\limits_{x \\to 0} \\frac{{1 &#8211; \\cos x}}{{x\\sin x}} {\/tex}<\/span><span class=\"math-tex\">{tex} = \\mathop {\\lim }\\limits_{x \\to 0} \\frac{{1 &#8211; {{\\cos }^2}x}}{{x\\sin x(1 + \\cos x)}}\\mathop {\\lim }\\limits_{x \\to 0} \\frac{{\\sin x}}{x}.\\frac{1}{{1 + \\cos x}} = 1.\\frac{1}{{1 + 1}} = \\frac{1}{2}{\/tex}<\/span><\/li>\n<\/ol>\n<ol style=\"margin-top: 5px; padding-left: 15px;\" type=\"a\">\n<li><span class=\"math-tex\">{tex} &#8211; \\frac{2}{{\\sqrt 2 }}{\/tex}<\/span><br \/>\n<strong>Explanation:<\/strong> <span class=\"math-tex\">{tex}\\mathop {\\lim }\\limits_{x \\to \\frac{\\pi }{4}} \\frac{{\\cos x &#8211; \\sin x}}{{x &#8211; \\frac{\\pi }{4}}}{\/tex}<\/span> <span class=\"math-tex\">{tex} = \\mathop {\\lim }\\limits_{x \\to \\frac{\\pi }{4}} \\frac{{ &#8211; \\sin x &#8211; \\cos x}}{1}= &#8211; \\sin \\frac{\\pi }{4} &#8211; \\cos \\frac{\\pi }{4}= &#8211; \\frac{2}{{\\sqrt 2 }} = &#8211; \\sqrt 2 {\/tex}<\/span><\/li>\n<\/ol>\n<\/li>\n<li><span class=\"math-tex\">{tex}\\frac{3}{2}{\/tex}<\/span><\/li>\n<li>R &#8211; <span class=\"math-tex\">{tex}\\left\\{\\frac12\\right\\}{\/tex}<\/span><\/li>\n<li><span class=\"math-tex\">{tex}\\frac x{\\sqrt{1+x^2}}{\/tex}<\/span><\/li>\n<li class=\"question-list\" style=\"clear: both;\">Since sin x and cos x are continuous functions and product of two continuous function is a continuous function, therefore <span class=\"math-tex\">{tex}f(x) = \\sin x.\\cos x{\/tex}<\/span> is a continuous function.<\/li>\n<li class=\"question-list\" style=\"clear: both;\">Given, f(x) = <span class=\"math-tex\">{tex}\\left\\{ \\begin{array} { l l } { \\frac { ( x + 3 ) ^ { 2 } &#8211; 36 } { x &#8211; 3 } , } &amp; { x \\neq 3 } \\\\ { x , } &amp; { x = 3 } \\end{array} \\right.{\/tex}<\/span><br \/>\nWe shall use definition of continuity to find the value of k.<br \/>\nIf f(x) is continuous at x = 3,<br \/>\nThen, we have <span class=\"math-tex\">{tex}\\mathop {\\lim }\\limits_{x \\to 3} f ( x ) = f ( 3 ){\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\mathop {\\lim }\\limits_{x \\to 3} \\frac { ( x + 3 ) ^ { 2 } &#8211; 36 } { x &#8211; 3 } = k{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\mathop {\\lim }\\limits_{x \\to 3} \\frac { ( x + 3 ) ^ { 2 } &#8211; 6 ^ { 2 } } { x &#8211; 3 } = k{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\mathop {\\lim }\\limits_{x \\to 3} \\frac { ( x + 3 &#8211; 6 ) ( x + 3 + 6 ) } { x &#8211; 3 } = k{\/tex}<\/span> [ <span class=\"math-tex\">{tex}\\because{\/tex}<\/span> a<sup>2<\/sup> &#8211; b<sup>2<\/sup> = (a &#8211; b)(a + b)]\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\mathop {\\lim }\\limits_{x \\to 3} \\frac { ( x &#8211; 3 ) ( x + 9 ) } { ( x &#8211; 3 ) } = k{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\mathop {\\lim }\\limits_{x \\to 3} ( x + 9 ) = k{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow{\/tex}<\/span> 3 + 9 = k <span class=\"math-tex\">{tex}\\Rightarrow{\/tex}<\/span> k = 12<\/li>\n<li class=\"question-list\" style=\"clear: both;\">Let f(x) =<span class=\"math-tex\">{tex}\\left\\{ \\begin{array} { l l } { \\frac { k x } { | x | } , } &amp; { \\text { if } x &lt; 0 } \\\\ { 3 , } &amp; { \\text { if } x \\geq 0 } \\end{array} \\right.{\/tex}<\/span> be continuous at x = 0<br \/>\nThen,<span class=\"math-tex\">{tex}\\mathop {\\lim }\\limits_{ x \\rightarrow 0 ^ { + } } f ( x ) = \\mathop {\\lim }\\limits_{ x \\rightarrow 0 ^ { &#8211; } } f ( x ) = f ( 0 ){\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\mathop {\\lim }\\limits_{ h \\rightarrow 0 } f ( 0 + h ) = \\mathop {\\lim }\\limits_{ h \\rightarrow 0 } f ( 0 &#8211; h ) = f ( 0 ){\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad 3 = \\mathop {\\lim }\\limits_{ h \\rightarrow 0 } \\frac { k ( &#8211; h ) } { |- h | } = 3{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\mathop {\\lim }\\limits_{ h \\rightarrow 0 } \\left( \\frac { &#8211; k h } { h } \\right) = 3{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\mathop {\\lim }\\limits_{ h \\rightarrow 0 } ( &#8211; k ) = 3{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\therefore{\/tex}<\/span> k = &#8211; 3<\/li>\n<li class=\"question-list\" style=\"clear: both;\">Given: <span class=\"math-tex\">{tex}y = {\\cos ^{ &#8211; 1}}\\left( {\\frac{{1 &#8211; {x^2}}}{{1 + {x^2}}}} \\right),0 &lt; x &lt; 1{\/tex}<\/span><br \/>\nPutting <span class=\"math-tex\">{tex}x = \\tan \\theta{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}y = {\\cos ^{ &#8211; 1}}\\left( {\\frac{{1 &#8211; {{\\tan }^2}\\theta }}{{1 + {{\\tan }^2}\\theta }}} \\right){\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}= {\\cos ^{ &#8211; 1}}\\left( {\\cos 2\\theta } \\right) = 2\\theta = 2{\\tan ^{ &#8211; 1}}x{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\therefore \\frac{{dy}}{{dx}} = 2.\\frac{1}{{1 + {x^2}}} = \\frac{2}{{1 + {x^2}}}{\/tex}<\/span><\/li>\n<li class=\"question-list\" style=\"clear: both;\">Let <span class=\"math-tex\">{tex}f\\left( x \\right) = {x^2}{\/tex}<\/span> and <span class=\"math-tex\">{tex}g\\left( x \\right) = \\cos x{\/tex}<\/span>, then<br \/>\n<span class=\"math-tex\">{tex}\\left( {gof} \\right)\\left( x \\right) = g\\left[ {f\\left( x \\right)} \\right] = g\\left( {{x^2}} \\right) = \\cos {x^2}{\/tex}<\/span><br \/>\nNow f and g being continuous it follows that their composite (gof) is continuous.<br \/>\nHence <span class=\"math-tex\">{tex}\\cos {x^2}{\/tex}<\/span> is continuous function.<\/li>\n<li class=\"question-list\" style=\"clear: both;\">Here, <span class=\"math-tex\">{tex}\\mathop {\\lim }\\limits_{x \\to 0} f(x) = \\mathop {\\lim }\\limits_{x \\to 0} {x^2}\\sin \\frac{1}{x} = 0{\/tex}<\/span> x a finite quantity = 0<br \/>\n<span class=\"math-tex\">{tex}\\left[ {\\because \\sin \\frac{1}{x}{\\text{lies between &#8211; 1 and 1}}} \\right]{\/tex}<\/span><br \/>\nAlso f(0) = 0<br \/>\nSince, <span class=\"math-tex\">{tex}\\mathop {\\lim }\\limits_{x \\to 0} f\\left( x \\right) = f\\left( 0 \\right){\/tex}<\/span> therefore, the function f is continuous at x = 0.<br \/>\nAlso,when <span class=\"math-tex\">{tex}x\\ne0{\/tex}<\/span> ,then f(x) is the product of two continuous functions and hence Continuous.Hence,f(x) is continuous everywhere.<\/li>\n<li class=\"question-list\" style=\"clear: both;\">According to the question, f(x) = <span class=\"math-tex\">{tex} \\left\\{ {\\begin{array}{*{20}{c}} {\\frac{{{x^3} + {x^2} &#8211; 16x + 20}}{{{{(x &#8211; 2)}^2}}},}&amp;{x \\ne 2} \\\\ {k,}&amp;{x = 2} \\end{array}} \\right\\}{\/tex}<\/span> is continuous at <span class=\"math-tex\">{tex}x = 2.{\/tex}<\/span><br \/>\nNow, we have f(2) = k<br \/>\n<span class=\"math-tex\">{tex} \\mathop {\\lim }\\limits_{ x \\rightarrow 2 } f ( x ) = \\mathop {\\lim }\\limits_{ x \\rightarrow 2 } \\frac { x ^ { 3 } + x ^ { 2 } &#8211; 16 x + 20 } { ( x &#8211; 2 ) ^ { 2 } }{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex} = \\mathop {\\lim }\\limits_{ x \\rightarrow 2 } \\frac { ( x &#8211; 2 ) \\left( x ^ { 2 } + 3 x &#8211; 10 \\right) } { ( x &#8211; 2 ) ^ { 2 } }{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex} = \\mathop {\\lim }\\limits_{ x \\rightarrow 2 } \\frac { ( x &#8211; 2 ) ( x + 5 ) ( x &#8211; 2 ) } { ( x &#8211; 2 ) ^ { 2 } }{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex} = \\mathop {\\lim }\\limits_{ x \\rightarrow 2 } ( x + 5 ){\/tex}<\/span> = 2+ 5 = 7<br \/>\nf(x) is continuous at x = 2.<br \/>\n<span class=\"math-tex\">{tex} \\therefore \\mathop {\\lim }\\limits_{ x \\rightarrow 2 } f ( x ){\/tex}<\/span>= f(2) <span class=\"math-tex\">{tex} \\Rightarrow{\/tex}<\/span> 7 = k<span class=\"math-tex\">{tex} \\Rightarrow{\/tex}<\/span>k = 7<\/li>\n<li class=\"question-list\" style=\"clear: both;\">We have, x<sup>y<\/sup> + y<sup>x<\/sup> = a<sup>b<\/sup>&#8230;&#8230;&#8230;(i)<br \/>\nLet x<sup>y<\/sup> = v and y<sup>x<\/sup> = u&#8230;&#8230;(ii)<br \/>\nTherefore,on putting these values in Eq. (i), we get,<br \/>\nv + u = a<sup>b<\/sup><br \/>\nTherefore,on differentiating both sides w.r.t. x, we get,<br \/>\n<span class=\"math-tex\">{tex}\\frac { d v } { d x } + \\frac { d u } { d x } = 0{\/tex}<\/span>&#8230;&#8230;..(iii)<br \/>\nNow consider, x<sup>y<\/sup> = v [ from Eq.(ii)]\nTherefore,on taking log both sides, we get,<br \/>\nlog x<sup>y<\/sup> = logv<br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow{\/tex}<\/span> y log x = log v<br \/>\nTherefore,on differentiating both sides w.r.t. x, we get,<br \/>\n<span class=\"math-tex\">{tex}y \\cdot \\frac { 1 } { x } + \\log x \\cdot \\frac { d y } { d x } = \\frac { 1 } { v } \\frac { d v } { d x }{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow v \\left( \\frac { y } { x } + \\log x \\cdot \\frac { d y } { d x } \\right) = \\frac { d v } { d x }{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\frac { d v } { d x } = x ^ { y } \\left( \\frac { y } { x } + \\log x \\frac { d y } { d x } \\right){\/tex}<\/span>&#8230;&#8230;&#8230;(iv) [ From Eq.(ii)]\nAlso, y<sup>x<\/sup> = u [From Eq(ii)]\nTherefore,on taking log both sides, we get,<br \/>\nlog y<sup>x<\/sup> = log u <span class=\"math-tex\">{tex}\\Rightarrow{\/tex}<\/span> x log y = log u<br \/>\nTherefore,on differentiating both sides w.r.t. &#8216;x&#8217;, we get,<br \/>\n<span class=\"math-tex\">{tex}x \\cdot \\frac { 1 } { y } \\frac { d y } { d x } + 1 \\cdot \\log y = \\frac { 1 } { u } \\frac { d u } { d x }{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\frac { x } { y } \\frac { d y } { d x } + \\log y = \\frac { 1 } { u } \\frac { d u } { d x }{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad u \\left[ \\frac { x } { y } \\frac { d y } { d x } + \\log y \\right] = \\frac { d y } { d x }{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad y ^ { x } \\left[ \\frac { x } { y } \\frac { d y } { d x } + \\log y \\right] = \\frac { d u } { d x }{\/tex}<\/span>&#8230;&#8230;..(v) [ From Eq(ii)]\nTherefore,on substituting the values of <span class=\"math-tex\">{tex}\\frac { d v } { d x } \\text { and } \\frac { d u } { d x }{\/tex}<\/span> from Eqs. (iv) and (v) respectively in Eq. (iii), we get<br \/>\n<span class=\"math-tex\">{tex}x ^ { y } \\left( \\frac { y } { x } + \\log x \\cdot \\frac { d y } { d x } \\right) + y ^ { x } \\left( \\frac { x } { y } \\frac { d y } { d x } + \\log y \\right) = 0{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow x ^ { y } \\frac { y } { x } + x ^ { y } \\log x \\cdot \\frac { d y } { d x } {\/tex}<\/span><span class=\"math-tex\">{tex}+ y ^ { x } \\cdot \\frac { x } { y } \\frac { d y } { d x } + y ^ { x } \\log y = 0{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow x ^ { y } \\log x \\cdot \\frac { d y } { d x } + y ^ { x } \\frac { x } { y } \\cdot \\frac { d y } { d x }{\/tex}<\/span><span class=\"math-tex\">{tex}= &#8211; x ^ { y } \\frac { y } { x } &#8211; y ^ { x } \\log y{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\frac { d y } { d x } \\left[ x ^ { y } \\log x + y ^ { x } \\cdot \\frac { x } { y } \\right]{\/tex}<\/span><span class=\"math-tex\">{tex}= &#8211; x ^ { y } \\cdot \\frac { y } { x } &#8211; y ^ { x } \\log y{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\therefore \\quad \\frac { d y } { d x } = \\frac { &#8211; x ^ { y &#8211; 1 } \\cdot y &#8211; y ^ { x } \\log y } { x ^ { y } \\log x + y ^ { x &#8211; 1 } \\cdot x }{\/tex}<\/span><\/li>\n<li class=\"question-list\" style=\"clear: both;\">According to the question, <span class=\"math-tex\">{tex}e^y\u00a0(x + 1) = 1{\/tex}<\/span><br \/>\nTaking log both sides,<br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow log [e^y\u00a0(x + 1) ]= log 1{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow log e^y\u00a0+ log(x + 1) = log 1{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow{\/tex}<\/span> <span class=\"math-tex\">{tex}y + log(x + 1) = log1{\/tex}<\/span> [<span class=\"math-tex\">{tex}\\because{\/tex}<\/span> log e<sup>y<\/sup> = y]\ndifferentiating both sides w.r.t. x,<br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow\\frac { d y } { d x } + \\frac { 1 } { x + 1 } = 0{\/tex}<\/span>&#8230;&#8230;&#8230;(i)<br \/>\nDifferentiating both sides w.r.t. &#8216;x&#8217;,<br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\frac { d ^ { 2 } y } { d x ^ { 2 } } &#8211; \\frac { 1 } { ( x + 1 ) ^ { 2 } } = 0{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\frac { d ^ { 2 } y } { d x ^ { 2 } } &#8211; \\left( &#8211; \\frac { d y } { d x } \\right) ^ { 2 } = 0{\/tex}<\/span> [ From Equation(i)]\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\frac { d ^ { 2 } y } { d x ^ { 2 } } &#8211; \\left( \\frac { d y } { d x } \\right) ^ { 2 } = 0{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\Rightarrow \\quad \\frac { d ^ { 2 } y } { d x ^ { 2 } } = \\left( \\frac { d y } { d x } \\right) ^ { 2 }{\/tex}<\/span><\/li>\n<li class=\"question-list\" style=\"clear: both;\">Let <span class=\"math-tex\">{tex}u = {y^x},v = {x^y},w = {x^x}{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}u + v + w = {a^b}{\/tex}<\/span><br \/>\nTherefore <span class=\"math-tex\">{tex}\\frac{{du}}{{dx}} + \\frac{{dw}}{{dx}} + \\frac{{dv}}{{dx}} = 0{\/tex}<\/span> &#8230;.(1)<br \/>\n<span class=\"math-tex\">{tex}u = {y^x}{\/tex}<\/span><br \/>\nTaking log both side<br \/>\n<span class=\"math-tex\">{tex}\\log u = \\log {y^x}{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\log u = x.\\log y{\/tex}<\/span><br \/>\nDifferentiate both side w.r.t. to x<br \/>\n<span class=\"math-tex\">{tex}\\frac{1}{u}.\\frac{{du}}{{dx}} = x.\\frac{1}{y}.\\frac{{dy}}{{dx}} + \\log y.1{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\frac{{du}}{{dx}} = u\\left[ {\\frac{x}{y}.\\frac{{dy}}{{dx}} + \\log y} \\right]{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\frac{{du}}{{dx}} = {y^x}\\left[ {\\frac{x}{y}.\\frac{{dy}}{{dx}} + \\log y} \\right]{\/tex}<\/span>&#8230;. (2)<br \/>\n<span class=\"math-tex\">{tex}v = {x^y}{\/tex}<\/span><br \/>\nTaking log both side<br \/>\n<span class=\"math-tex\">{tex}\\log v = \\log {x^y}{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\log v = y.\\log x{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\frac{1}{v}.\\frac{{dv}}{{dx}} = y.\\frac{1}{x} + \\log x.\\frac{{dy}}{{dx}}{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\frac{{dv}}{{dx}} = v\\left[ {\\frac{y}{x} + \\log x.\\frac{{dy}}{{dx}}} \\right]{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\frac{{dv}}{{dx}} = {x^y}\\left[ {\\frac{y}{x} + \\log x.\\frac{{dy}}{{dx}}} \\right]{\/tex}<\/span>&#8230;. (3)<br \/>\n<span class=\"math-tex\">{tex}w = {x^x}{\/tex}<\/span><br \/>\nTaking log both side<br \/>\n<span class=\"math-tex\">{tex}\\log w = \\log {x^x}{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\log w = x\\log x{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\frac{1}{w}.\\frac{{dw}}{{dx}} = x.\\frac{1}{x} + \\log x.1{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\frac{1}{w}.\\frac{{dw}}{{dx}} = 1 + \\log x{\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\frac{{dw}}{{dx}} = w(1 + \\log x){\/tex}<\/span><br \/>\n<span class=\"math-tex\">{tex}\\frac{{dw}}{{dx}} = {x^x}(1 + \\log x){\/tex}<\/span>&#8230;. (4)<br \/>\n<span class=\"math-tex\">{tex}\\frac{{dy}}{{dx}} = \\frac{{ &#8211; {x^x}(1 + \\log x) &#8211; y.{x^{y &#8211; 1}} &#8211; {y^x}\\log y}}{{x.{y^{x &#8211; 1}} + {x^y}\\log x.}}{\/tex}<\/span> (by putting 2,3 and 4 in 1)<\/li>\n<\/ol>\n<h2>Chapter Wise Important Questions Class 12 Maths Part I and Part II<\/h2>\n<ol>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/relations-and-functions-extra-questions-for-class-12-mathematics\/\">Relations and Functions<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/class-12-maths-inverse-trigonometric-functions-important-questions\/\">Inverse Trigonometric Functions<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/cbse-class-12-chapter-3-matrices-extra-questions\/\">Matrices<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/cbse-important-questions-class-12-mathematics-determinants\/\">Determinants<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/continuity-and-differentiability-class-12-mathematics-extra-question\/\">Continuity and Differentiability<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/class-12-maths-application-of-derivatives-extra-questions\/\">Application of Derivatives<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/integrals-class-12-mathematics-chapter-7-important-question\/\">Integrals<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/cbse-class-12-maths-important-questions-application-of-integrals\/\">Application of Integrals<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/differential-equations-class-12-mathematics-extra-questions\/\">Differential Equations<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/cbse-class-12-mathematics-vector-algebra-extra-questions\/\">Vector Algebra<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/three-dimensional-geometry-class-12-maths-important-questions\/\">Three Dimensional Geometry<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/linear-programming-class-12-mathematics-important-questions\/\">Linear Programming<\/a><\/li>\n<li><a href=\"https:\/\/mycbseguide.com\/blog\/chapter-12-probability-class-12-mathematics-important-questions\/\">Probability<\/a><\/li>\n<\/ol>\n","protected":false},"excerpt":{"rendered":"<p>Continuity and Differentiability Class 12 Mathematics Extra Question. myCBSEguide has just released Chapter Wise Question Answers for class 12 Maths. There chapter wise Practice Questions with complete solutions are available for download in\u00a0myCBSEguide\u00a0website and mobile app. These Questions with solution are prepared by our team of expert teachers who are teaching grade in CBSE schools &#8230; <a title=\"Continuity and Differentiability Class 12 Mathematics Extra Question\" class=\"read-more\" href=\"https:\/\/mycbseguide.com\/blog\/continuity-and-differentiability-class-12-mathematics-extra-question\/\" aria-label=\"More on Continuity and Differentiability Class 12 Mathematics Extra Question\">Read more<\/a><\/p>\n","protected":false},"author":2,"featured_media":0,"comment_status":"open","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[1346,1432],"tags":[1867,1839,1838,1833,1832,1854],"class_list":["post-27902","post","type-post","status-publish","format-standard","hentry","category-cbse","category-mathematics-cbse-class-12","tag-cbse-class-12-mathematics","tag-extra-questions","tag-important-questions","tag-latest-exam-questions","tag-practice-questions","tag-practice-test"],"yoast_head":"<!-- This site is optimized with the Yoast SEO plugin v26.0 - https:\/\/yoast.com\/wordpress\/plugins\/seo\/ -->\n<title>Continuity and Differentiability Class 12 Mathematics Extra Question<\/title>\n<meta name=\"description\" content=\"Continuity and Differentiability Class 12 Mathematics Extra Question myCBSEguide has just released Chapter Wise Question Answers for class 12\" \/>\n<meta name=\"robots\" content=\"index, follow, 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