{"id":30764,"date":"2019-06-24T17:46:37","date_gmt":"2019-06-24T12:16:37","guid":{"rendered":"https:\/\/cracku.in\/blog\/?p=30764"},"modified":"2019-06-24T17:46:37","modified_gmt":"2019-06-24T12:16:37","slug":"simplification-questions-for-ssc-mts","status":"publish","type":"post","link":"https:\/\/cracku.in\/blog\/simplification-questions-for-ssc-mts\/","title":{"rendered":"Simplification Questions For SSC MTS"},"content":{"rendered":"<h1>Simplification Questions For SSC MTS<\/h1>\n<p>Download Top-20 SSC MTS Simplification Questions PDF. Simplification questions based on asked questions in previous year exam papers very important for the SSC MTS exam.<\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/downloads\/5076\" target=\"_blank\" class=\"btn btn-danger  download\">Download Simplification Questions For SSC MTS<\/a><\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/ssc-mts-mock-test\" target=\"_blank\" class=\"btn btn-primary \">Take a free mock test for SSC MTS<\/a><\/p>\n<p><a href=\"https:\/\/cracku.in\/ssc-mts-previous-papers\">SSC MTS Previous Papers<\/a> (Download PDF)<\/p>\n<p><b>Question 1:\u00a0<\/b>Which of the following statements(S) is\/are <strong>TRUE ?<br \/>\n<\/strong><br \/>\nI. $\\sqrt[3]{512}\\times\\sqrt{256}&gt;\\sqrt[3]{343}\\times\\sqrt{289}$<br \/>\nII. $\\sqrt{121}+\\sqrt[3]{1331}&gt;\\sqrt[3]{125}\\times\\sqrt{25}$<\/p>\n<p>a)\u00a0Only I<\/p>\n<p>b)\u00a0Only II<\/p>\n<p>c)\u00a0Neither I nor II<\/p>\n<p>d)\u00a0Both I and II<\/p>\n<p><b>Question 2:\u00a0<\/b>Which of the following is the largest number among $\\sqrt{2},\\sqrt[3]{2},\\sqrt{4},\\sqrt[3]{5}$<\/p>\n<p>a)\u00a0$\\sqrt{2}$<\/p>\n<p>b)\u00a0$\\sqrt[3]{3}$<\/p>\n<p>c)\u00a0$\\sqrt{4}$<\/p>\n<p>d)\u00a0$\\sqrt[3]{5}$<\/p>\n<p><b>Question 3:\u00a0<\/b>What is the value of\u00a0$\\sqrt{{2^{6}}+15^2}$<\/p>\n<p>a)\u00a017<\/p>\n<p>b)\u00a019<\/p>\n<p>c)\u00a015<\/p>\n<p>d)\u00a021<\/p>\n<p><b>Question 4:\u00a0<\/b>Rohit buys a ball for Rs 450 and sells it. Rohit gives two successive discount of 20% and 5% to the customer. What will be the selling price (in Rs) of the ball?<\/p>\n<p>a)\u00a0342<\/p>\n<p>b)\u00a0354<\/p>\n<p>c)\u00a0334<\/p>\n<p>d)\u00a0362<\/p>\n<p><b>Question 5:\u00a0<\/b>$(4\\sqrt{y^{8}})=225$<\/p>\n<p>a)\u00a010<\/p>\n<p>b)\u00a012<\/p>\n<p>c)\u00a015<\/p>\n<p>d)\u00a018<\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/ssc-mts-previous-papers\" target=\"_blank\" class=\"btn btn-danger \">SSC MTS Previous Papers PDF<\/a><\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/ssc-mts-mock-test\" target=\"_blank\" class=\"btn btn-primary \">Take a free mock test for SSC MTS<\/a><\/p>\n<p><b>Question 6:\u00a0<\/b>What is the value of $\\sqrt[3]{729}\\times\\sqrt{16}+\\sqrt{676}+\\sqrt{169} ?$<\/p>\n<p>a)\u00a075<\/p>\n<p>b)\u00a064<\/p>\n<p>c)\u00a035<\/p>\n<p>d)\u00a060<\/p>\n<p><b>Question 7:\u00a0<\/b>Manoj walks 12 metres towards north. Then turns right and walk another 12 metres. Then turn right and walks for 7 metres to reach college R. He again turns to his right and walks for 12 metres. What is the straight line distance (in metres) between the starting point and college R?<\/p>\n<p>a)\u00a0$12\\sqrt2$<\/p>\n<p>b)\u00a0$13$<\/p>\n<p>c)\u00a0$14$<\/p>\n<p>d)\u00a0$14\\sqrt3$<\/p>\n<p><b>Question 8:\u00a0<\/b>Which of the following statement(s) is\/are <strong>TRUE <\/strong>?<\/p>\n<p>I. $\\sqrt{324}+\\sqrt{3.24}+\\sqrt{0.0324} = 19.98$<br \/>\nII. $\\sqrt{129+\\sqrt{121}+\\sqrt{361}+\\sqrt{100}}=13$<\/p>\n<p>a)\u00a0Only I<\/p>\n<p>b)\u00a0Only II<\/p>\n<p>c)\u00a0Neither I nor II<\/p>\n<p>d)\u00a0Both I and II<\/p>\n<p><b>Question 9:\u00a0<\/b>What is the simplified value of $2\\sqrt[3]{243}+3\\sqrt[3]{9}-\\sqrt[3]{1125}$ ?<\/p>\n<p>a)\u00a0$5\\sqrt[3]{9}$<\/p>\n<p>b)\u00a0$4\\sqrt[3]{9}$<\/p>\n<p>c)\u00a0$7\\sqrt[3]{9}$<\/p>\n<p>d)\u00a0$11\\sqrt[3]{9}$<\/p>\n<p><b>Question 10:\u00a0<\/b>If $x=\\frac{\\sqrt{5}+1}{\\sqrt{5}-1}$ and $y=\\frac{\\sqrt{5}-1}{\\sqrt{5}+1}$, then what is the value of x-y ?<\/p>\n<p>a)\u00a0$3$<\/p>\n<p>b)\u00a0$\\sqrt5$<\/p>\n<p>c)\u00a0$2\\sqrt5$<\/p>\n<p>d)\u00a0$6$<\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/ssc-study-material\" target=\"_blank\" class=\"btn btn-danger \">SSC Study Material (18000 Solved Questions)<\/a><\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/blog\/general-science-questions-answers-competitive-exams-pdf-mcq-quiz\/\" target=\"_blank\" class=\"btn btn-info \">General Science Notes for SSC Exams<\/a><\/p>\n<p><b>Question 11:\u00a0<\/b>If $x = 4 + \\sqrt{15}$, then what is the value of $[x^2 + (\\frac{1}{x^2})]$ ?<\/p>\n<p>a)\u00a062<\/p>\n<p>b)\u00a064<\/p>\n<p>c)\u00a034<\/p>\n<p>d)\u00a036<\/p>\n<p><b>Question 12:\u00a0<\/b>If $p=\\sqrt{72-\\sqrt{72-\\sqrt{72-\\sqrt{72-&#8230;&#8230;\\infty}}}}$, then find the value of $2p^2+1$.<\/p>\n<p>a)\u00a0-129<\/p>\n<p>b)\u00a0-163<\/p>\n<p>c)\u00a0129<\/p>\n<p>d)\u00a0163<\/p>\n<p><b>Question 13:\u00a0<\/b>If $4^x= \\sqrt[7]{1024}$, then what is the value of X ?<\/p>\n<p>a)\u00a0$\\frac{5}{7}$<\/p>\n<p>b)\u00a0$\\frac{4}{7}$<\/p>\n<p>c)\u00a0$\\frac{3}{7}$<\/p>\n<p>d)\u00a0$\\frac{6}{7}$<\/p>\n<p><b>Question 14:\u00a0<\/b>What is the value of $\\sqrt[3]{512}+\\sqrt{169}+\\sqrt[3]{216}+\\sqrt{225}$ ?<\/p>\n<p>a)\u00a048<\/p>\n<p>b)\u00a032<\/p>\n<p>c)\u00a042<\/p>\n<p>d)\u00a036<\/p>\n<p><b>Question 15:\u00a0<\/b>If $x=\\frac{4}{2\\sqrt{3}+3\\sqrt{2}}$,then find the value of\u00a0 $(x+\\frac{1}{x})$<\/p>\n<p>a)\u00a0$\\frac{(10\\sqrt3+15\\sqrt2)}{12}$<\/p>\n<p>b)\u00a0$\\frac{(10\\sqrt3-15\\sqrt2)}{12}$<\/p>\n<p>c)\u00a0$\\frac{-(10\\sqrt3-33\\sqrt2)}{12}$<\/p>\n<p>d)\u00a0$\\frac{(10\\sqrt3+33\\sqrt2)}{12}$<\/p>\n<p><b>Question 16:\u00a0<\/b>Which of the following statement(s) is\/are <strong>CORRECT <\/strong>?<br \/>\nI. $(\\sqrt{11}+\\sqrt{2})&gt;(\\sqrt{8}+\\sqrt{5})$<br \/>\nII. $(\\sqrt{10}+\\sqrt{3})&gt;(\\sqrt{7}+\\sqrt{6})$<\/p>\n<p>a)\u00a0Only I<\/p>\n<p>b)\u00a0Only II<\/p>\n<p>c)\u00a0Neither I nor II<\/p>\n<p>d)\u00a0Both I and II<\/p>\n<p><b>Question 17:\u00a0<\/b>If $p+\\frac{1}{p}=\\sqrt{10}$, then find the value of $p^4+\\frac{1}{p^4}$<\/p>\n<p>a)\u00a052<\/p>\n<p>b)\u00a0<del><\/del>60<\/p>\n<p>c)\u00a062<\/p>\n<p>d)\u00a065<\/p>\n<p><b>Question 18:\u00a0<\/b>If $z=6-2\\sqrt3$, then find the value of $(\\sqrt{z}-\\frac{1}{\\sqrt{z}})^2$<\/p>\n<p>a)\u00a0$\\frac{102-46\\sqrt3}{4}$<\/p>\n<p>b)\u00a0$\\frac{102-46\\sqrt3}{2}$<\/p>\n<p>c)\u00a0$\\frac{102-46\\sqrt3}{24}$<\/p>\n<p>d)\u00a0$\\frac{12-46\\sqrt3}{24}$<\/p>\n<p><b>Question 19:\u00a0<\/b>What is the positive square root of $[25+4\\sqrt{39}]$ ?<\/p>\n<p>a)\u00a0$\\sqrt{13}+2\\sqrt3$<\/p>\n<p>b)\u00a0$\\sqrt{13}+3\\sqrt2$<\/p>\n<p>c)\u00a0$\\sqrt{11}+2\\sqrt3$<\/p>\n<p>d)\u00a0$11+3\\sqrt2$<\/p>\n<p><b>Question 20:\u00a0<\/b>If $x=\\sqrt{15\\sqrt{15\\sqrt{15\\sqrt{15\\sqrt{15&#8230;.\\infty}}}}}$ and x&gt;0, then find the value of $x^2+4$<\/p>\n<p>a)\u00a0125<\/p>\n<p>b)\u00a0179<\/p>\n<p>c)\u00a0200<\/p>\n<p>d)\u00a0229<\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/ssc-practice-set\" target=\"_blank\" class=\"btn btn-danger \">200+ SSC Important Practice Sets<\/a><\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/blog\/general-knowledge-questions-and-answers-for-competitive-exams-pdf\/\" target=\"_blank\" class=\"btn btn-info \">General Knowledge Q&amp;A for Competitive Exams (Download PDF)<\/a><\/p>\n<p><span style=\"text-decoration: underline;\"><strong>Answers &amp; Solutions:<\/strong><\/span><\/p>\n<p><strong>1)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>I\u00a0:\u00a0$\\sqrt[3]{512}\\times\\sqrt{256}&gt;\\sqrt[3]{343}\\times\\sqrt{289}$<\/p>\n<p>L.H.S. = $8\\times16=128$<\/p>\n<p>R.H.S. = $7\\times17=119$<\/p>\n<p>Thus, $128&gt;119$, which is correct.<\/p>\n<p>II\u00a0: $\\sqrt{121}+\\sqrt[3]{1331}&gt;\\sqrt[3]{125}\\times\\sqrt{25}$<\/p>\n<p>L.H.S. = $11+11=22$<\/p>\n<p>R.H.S. = $5\\times5=25$<\/p>\n<p>Thus, $22&lt;25$<\/p>\n<p>$\\therefore$ Only I is correct.<\/p>\n<p>=&gt; Ans &#8211; (A)<\/p>\n<p><strong>2)\u00a0Answer\u00a0(C)<\/strong><\/p>\n<p>Terms\u00a0:\u00a0$\\sqrt{2},\\sqrt[3]{2},\\sqrt{4},\\sqrt[3]{5}$<\/p>\n<p>Here, $\\sqrt2&lt;2$ , $\\sqrt[3]2&lt;2$ and $\\sqrt[3]5&lt;2$<\/p>\n<p>But, $\\sqrt4=2$<\/p>\n<p>Thus, $\\sqrt4$ is the largest.<\/p>\n<p>=&gt; Ans &#8211; (C)<\/p>\n<p><strong>3)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>Expression\u00a0:\u00a0$\\sqrt{{2^{6}}+15^2}$<\/p>\n<p>= $\\sqrt{64+225}$<\/p>\n<p>= $\\sqrt{289}=17$<\/p>\n<p>=&gt; Ans &#8211; (A)<\/p>\n<p><strong>4)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>Cost price of watch = Rs. 450<\/p>\n<p>Price after 1st discount of 20% = $450-(\\frac{20}{100}\\times450)=Rs.$ $360$<\/p>\n<p>Selling\u00a0Price after 2nd discount of 5% = $360-(\\frac{5}{100}\\times360)=Rs.$ $342$<\/p>\n<p>=&gt; Ans &#8211; (A)<\/p>\n<p><strong>5)\u00a0Answer\u00a0(C)<\/strong><\/p>\n<p><strong>6)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>Expression\u00a0:\u00a0$\\sqrt[3]{729}\\times\\sqrt{16}+\\sqrt{676}+\\sqrt{169}$<\/p>\n<p>= $(9\\times4)+26+13$<\/p>\n<p>= $36+39=75$<\/p>\n<p>=&gt; Ans &#8211; (A)<\/p>\n<p><strong>7)\u00a0Answer\u00a0(B)<\/strong><\/p>\n<figure><img decoding=\"async\" class=\"img-responsive\" src=\"https:\/\/cracku.in\/media\/uploads\/blob_i4KJe1L\" data-image=\"blob\" \/><\/figure>\n<p>Let Manoj start from point O and walks 12 metres towards north to reach P. Then turns right and walk another 12 metres eastwards to reach\u00a0Q. Then turn right and walks for 7 metres southwards to reach college R. He again turns to his right and walks for 12 metres.<\/p>\n<p>Thus, $(OR)^2=(OS)^2+(SR)^2$<\/p>\n<p>=&gt;\u00a0$(OR)^2=(5)^2+(12)^2$<\/p>\n<p>=&gt; $(OR)^2=25+144=169$<\/p>\n<p>=&gt; $OR=\\sqrt{169}=13$ m<\/p>\n<p>=&gt; Ans &#8211; (B)<\/p>\n<p><strong>8)\u00a0Answer\u00a0(D)<\/strong><\/p>\n<p>I\u00a0: $\\sqrt{324}+\\sqrt{3.24}+\\sqrt{0.0324} = 19.98$<\/p>\n<p>L.H.S. = $18+1.8+0.18=19.98=$ R.H.S.<\/p>\n<p>II\u00a0: $\\sqrt{129+\\sqrt{121}+\\sqrt{361}+\\sqrt{100}}=13$<\/p>\n<p>L.H.S. = $\\sqrt{129+11+19+10}=\\sqrt{169}=13=$ R.H.S.<\/p>\n<p>Thus, both I and II are correct.<\/p>\n<p>=&gt; Ans &#8211; (D)<\/p>\n<p><strong>9)\u00a0Answer\u00a0(B)<\/strong><\/p>\n<p>Expression\u00a0:\u00a0$2\\sqrt[3]{243}+3\\sqrt[3]{9}-\\sqrt[3]{1125}$<\/p>\n<p>= $2\\sqrt[3]{27\\times9}+3\\sqrt[3]{9}-\\sqrt[3]{125\\times9}$<\/p>\n<p>= $6\\sqrt[3]9+3\\sqrt[3]9-5\\sqrt[3]9$<\/p>\n<p>= $4\\sqrt[3]9$<\/p>\n<p>=&gt; Ans &#8211; (B)<\/p>\n<p><strong>10)\u00a0Answer\u00a0(B)<\/strong><\/p>\n<p>Given\u00a0:\u00a0$x=\\frac{\\sqrt{5}+1}{\\sqrt{5}-1}$ and $y=\\frac{\\sqrt{5}-1}{\\sqrt{5}+1}$<\/p>\n<p>To find\u00a0: $x-y=?$<\/p>\n<p>Solution =\u00a0$(\\frac{\\sqrt{5}+1}{\\sqrt{5}-1})-(\\frac{\\sqrt{5}-1}{\\sqrt{5}+1})$<\/p>\n<p>= $\\frac{(\\sqrt5+1)^2-(\\sqrt5-1)^2}{(\\sqrt5-1)(\\sqrt5+1)}$<\/p>\n<p>= $\\frac{(6+2\\sqrt5)-(6-2\\sqrt5)}{(5-1)}$<\/p>\n<p>= $\\frac{4\\sqrt5}{4}=\\sqrt5$<\/p>\n<p>=&gt; Ans &#8211; (B)<\/p>\n<p><strong>11)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>Given\u00a0:\u00a0$x = 4 + \\sqrt{15}$ &#8212;&#8212;&#8212;&#8212;-(i)<\/p>\n<p>=&gt;\u00a0$\\frac{1}{x} = \\frac{1}{4 + \\sqrt{15}}$<\/p>\n<p>=&gt;\u00a0$\\frac{1}{x} = \\frac{1}{4 + \\sqrt{15}}\\times(\\frac{4-\\sqrt{15}}{4-\\sqrt{15}})$<\/p>\n<p>=&gt; $\\frac{1}{x}=\\frac{4-\\sqrt{15}}{(16-15)}=4-\\sqrt{15}$ &#8212;&#8212;&#8212;&#8212;-(ii)<\/p>\n<p>To find\u00a0:\u00a0$[x^2 + (\\frac{1}{x^2})]$<\/p>\n<p>= $(x+\\frac{1}{x})^2-2(x)(\\frac{1}{x})$<\/p>\n<p>Substituting values from equations (i) and (ii), we get\u00a0:<\/p>\n<p>= $[(4+\\sqrt{15})+(4-\\sqrt{15})]^2-2$<\/p>\n<p>= $(8)^2-2=64-2=62$<\/p>\n<p>=&gt; Ans &#8211; (A)<\/p>\n<p><strong>12)\u00a0Answer\u00a0(C)<\/strong><\/p>\n<p>Expression\u00a0:\u00a0$p=\\sqrt{72-\\sqrt{72-\\sqrt{72-\\sqrt{72-&#8230;&#8230;\\infty}}}}$<\/p>\n<p>=&gt; $p=\\sqrt{72-p}$<\/p>\n<p>Squaring both sides, we get :<\/p>\n<p>=&gt; $p^2=72-p$<\/p>\n<p>=&gt; $p^2+p-72=0$<\/p>\n<p>=&gt; $p^2+9p-8p-72=0$<\/p>\n<p>=&gt; $p(p+9)-8(p+9)=0$<\/p>\n<p>=&gt; $(p+9)(p-8)=0$<\/p>\n<p>=&gt; $p=-9,8$<\/p>\n<p>But $p$ cannot be negative, thus $p=8$<\/p>\n<p>To find\u00a0:\u00a0$2p^2+1$<\/p>\n<p>= $2(8)^2+1=128+1=129$<\/p>\n<p>=&gt; Ans &#8211; (C)<\/p>\n<p><strong>13)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>Expression\u00a0:\u00a0$4^x= \\sqrt[7]{1024}$<\/p>\n<p>=&gt; $4^x=\\sqrt[7]{2^{10}}$<\/p>\n<p>=&gt; $4^x=\\sqrt[7]{4^5}$<\/p>\n<p>=&gt; $4^x=4^{\\frac{5}{7}}$<\/p>\n<p>=&gt; $x=\\frac{5}{7}$<\/p>\n<p>=&gt; Ans &#8211; (A)<\/p>\n<p><strong>14)\u00a0Answer\u00a0(C)<\/strong><\/p>\n<p>Expression :\u00a0$\\sqrt[3]{512}+\\sqrt{169}+\\sqrt[3]{216}+\\sqrt{225}$<\/p>\n<p>= $\\sqrt[3]{8\\times8\\times8}+13+\\sqrt[3]{6\\times6\\times6}+15$<\/p>\n<p>= $8+13+6+15=42$<\/p>\n<p>=&gt; Ans &#8211; (C)<\/p>\n<p><strong>15)\u00a0Answer\u00a0(C)<\/strong><\/p>\n<p>Given\u00a0:\u00a0$x=\\frac{4}{2\\sqrt{3}+3\\sqrt{2}}$<\/p>\n<p>Rationalizing the denominator, we get\u00a0:<\/p>\n<p>=&gt;\u00a0$x=\\frac{4}{2\\sqrt{3}+3\\sqrt{2}}\\times\\frac{(2\\sqrt3-3\\sqrt2)}{(2\\sqrt3-3\\sqrt2)}$<\/p>\n<p>=&gt; $x=\\frac{4(2\\sqrt3-3\\sqrt2)}{(12-18)}=\\frac{2(3\\sqrt2-2\\sqrt3)}{3}$ &#8212;&#8212;&#8212;(i)<\/p>\n<p>Now, $\\frac{1}{x}=\\frac{3}{2(3\\sqrt2-2\\sqrt3)}\\times\\frac{(3\\sqrt2+2\\sqrt3)}{(3\\sqrt2+2\\sqrt3)}$<\/p>\n<p>=&gt; $\\frac{1}{x}=\\frac{3(3\\sqrt2+2\\sqrt3)}{2(18-12)}$<\/p>\n<p>=&gt; $\\frac{1}{x}=\\frac{3\\sqrt2+2\\sqrt3}{4}$ &#8212;&#8212;&#8212;&#8212;-(ii)<\/p>\n<p>Adding equations (i) and (ii), we get\u00a0:<\/p>\n<p>=&gt; $x+\\frac{1}{x}=(\\frac{2(3\\sqrt2-2\\sqrt3)}{3})+(\\frac{3\\sqrt2+2\\sqrt3}{4})$<\/p>\n<p>= $\\frac{8(3\\sqrt2-2\\sqrt3)+3(3\\sqrt2+2\\sqrt3)}{12}$<\/p>\n<p>= $\\frac{24\\sqrt2-16\\sqrt3+9\\sqrt2+6\\sqrt3}{12}$<\/p>\n<p>= $\\frac{33\\sqrt2-10\\sqrt3}{12}$<\/p>\n<p>=\u00a0$\\frac{-(10\\sqrt3-33\\sqrt2)}{12}$<\/p>\n<p>=&gt; Ans &#8211; (C)<\/p>\n<p><strong>16)\u00a0Answer\u00a0(C)<\/strong><\/p>\n<p>I\u00a0: $(\\sqrt{11}+\\sqrt{2})&gt;(\\sqrt{8}+\\sqrt{5})$<\/p>\n<p>Squaring both sides, we get :<\/p>\n<p>L.H.S. = $(\\sqrt{11}+\\sqrt2)^2=(11+2+2\\sqrt{22})=13+2\\sqrt{22}$<\/p>\n<p>R.H.S. =\u00a0$(\\sqrt{8}+\\sqrt5)^2=(8+5+2\\sqrt{40})=13+2\\sqrt{40}$<\/p>\n<p>$\\because$ $\\sqrt{22}&lt;\\sqrt{40}$, then L.H.S.\u00a0&lt; R.H.S.<\/p>\n<p>II\u00a0: $(\\sqrt{10}+\\sqrt{3})&gt;(\\sqrt{7}+\\sqrt{6})$<\/p>\n<p>Squaring both sides, we get :<\/p>\n<p>L.H.S. = $(\\sqrt{10}+\\sqrt3)^2=(10+3+2\\sqrt{30})=13+2\\sqrt{30}$<\/p>\n<p>R.H.S. =\u00a0$(\\sqrt{7}+\\sqrt6)^2=(7+6+2\\sqrt{42})=13+2\\sqrt{42}$<\/p>\n<p>$\\because$ $\\sqrt{30}&lt;\\sqrt{42}$, then L.H.S.\u00a0&lt; R.H.S.<\/p>\n<p>Thus, neither I nor II is correct.<\/p>\n<p>=&gt; Ans &#8211; (C)<\/p>\n<p><strong>17)\u00a0Answer\u00a0(C)<\/strong><\/p>\n<p>Given\u00a0:\u00a0$p+\\frac{1}{p}=\\sqrt{10}$<\/p>\n<p>Squaring both sides, we get\u00a0:<\/p>\n<p>=&gt;\u00a0$(p+\\frac{1}{p})^2=(\\sqrt{10})^2$<\/p>\n<p>=&gt; $p^2+\\frac{1}{p^2}+2(p)(\\frac{1}{p})=10$<\/p>\n<p>=&gt; $p^2+\\frac{1}{p^2}=10-2=8$<\/p>\n<p>Again squaring both sides, we get\u00a0:<\/p>\n<p>=&gt;\u00a0$(p^2+\\frac{1}{p^2})^2=(8)^2$<\/p>\n<p>=&gt; $p^4+\\frac{1}{p^4}+2(p^2)(\\frac{1}{p^2})=64$<\/p>\n<p>=&gt; $p^4+\\frac{1}{p^4}=64-2=62$<\/p>\n<p>=&gt; Ans &#8211; (C)<\/p>\n<p><strong>18)\u00a0Answer\u00a0(C)<\/strong><\/p>\n<p>Given\u00a0:\u00a0$z=6-2\\sqrt3$ &#8212;&#8212;&#8212;&#8212;&#8212;&#8211;(i)<\/p>\n<p>To find\u00a0:\u00a0$(\\sqrt{z}-\\frac{1}{\\sqrt{z}})^2$<\/p>\n<p>= $(\\frac{z-1}{\\sqrt{z}})^2=\\frac{(z-1)^2}{z}$ &#8212;&#8212;&#8212;&#8212;(ii)<\/p>\n<p>From equation (i), =&gt; $z-1=5-2\\sqrt3$<\/p>\n<p>Squaring both sides, we get\u00a0:<\/p>\n<p>=&gt; $(z-1)^2=(5-2\\sqrt3)^2$<\/p>\n<p>=&gt;\u00a0$(z-1)^2=25+12-20\\sqrt3=(37-20\\sqrt3)$ &#8212;&#8212;&#8212;-(iii)<\/p>\n<p>Substituting values from equations (i) and (iii) in equation (ii),<\/p>\n<p>=&gt; $\\frac{(z-1)^2}{z}=\\frac{37-20\\sqrt3}{6-2\\sqrt3}$<\/p>\n<p>Rationalizing the denominator, we get\u00a0:<\/p>\n<p>= $\\frac{37-20\\sqrt3}{6-2\\sqrt3}\\times\\frac{(6+2\\sqrt3)}{(6+2\\sqrt3)}$<\/p>\n<p>= $\\frac{37(6+2\\sqrt3)-20\\sqrt3(6+2\\sqrt3)}{36-12}$<\/p>\n<p>= $\\frac{222+74\\sqrt3-120\\sqrt3-120}{24}$<\/p>\n<p>= $\\frac{102-46\\sqrt3}{24}$<\/p>\n<p>=&gt; Ans &#8211; (C)<\/p>\n<p><strong>19)\u00a0Answer\u00a0(A)<\/strong><\/p>\n<p>Expression\u00a0:\u00a0$[25+4\\sqrt{39}]$<\/p>\n<p>= $[25+2\\sqrt{4\\times39}]=[25+2\\sqrt{156}]$<\/p>\n<p>= $13+12+2\\sqrt{13\\times12}$<\/p>\n<p>= $(13)^2+(12)^2+2\\sqrt{13\\times12}$<\/p>\n<p>Now, we know that $a^2+b^2+2ab=(a+b)^2$<\/p>\n<p>= $(\\sqrt{13}+\\sqrt{12})^2$<\/p>\n<p>Thus, square root is = $\\sqrt{13}+\\sqrt{12}$<\/p>\n<p>=\u00a0$\\sqrt13+2\\sqrt3$<\/p>\n<p>=&gt; Ans &#8211; (A)<\/p>\n<p><strong>20)\u00a0Answer\u00a0(D)<\/strong><\/p>\n<p>Expression :\u00a0$x=\\sqrt{15\\sqrt{15\\sqrt{15\\sqrt{15\\sqrt{15&#8230;.\\infty}}}}}$<\/p>\n<p>=&gt; $x=\\sqrt{15x}$<\/p>\n<p>Squaring both sides, we get\u00a0:<\/p>\n<p>=&gt; $x^2=15x$<\/p>\n<p>=&gt; $x=15$<\/p>\n<p>To find\u00a0:\u00a0$x^2+4$<\/p>\n<p>= $(15)^2+4=225+4=229$<\/p>\n<p>=&gt; Ans &#8211; (D)<\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/ssc-mts-previous-papers\" target=\"_blank\" class=\"btn btn-danger \">SSC MTS Previous Papers PDF<\/a><\/p>\n<p class=\"text-center\"><a href=\"https:\/\/cracku.in\/app\" target=\"_blank\" class=\"btn btn-info \">SSC MTS Free Preparation App<\/a><\/p>\n","protected":false},"excerpt":{"rendered":"<p>Simplification Questions For SSC MTS Download Top-20 SSC MTS Simplification Questions PDF. Simplification questions based on asked questions in previous year exam papers very important for the SSC MTS exam. SSC MTS Previous Papers (Download PDF) Question 1:\u00a0Which of the following statements(S) is\/are TRUE ? I. $\\sqrt[3]{512}\\times\\sqrt{256}&gt;\\sqrt[3]{343}\\times\\sqrt{289}$ II. $\\sqrt{121}+\\sqrt[3]{1331}&gt;\\sqrt[3]{125}\\times\\sqrt{25}$ a)\u00a0Only I b)\u00a0Only II c)\u00a0Neither I [&hellip;]<\/p>\n","protected":false},"author":32,"featured_media":30767,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"om_disable_all_campaigns":false,"_mi_skip_tracking":false,"footnotes":""},"categories":[9,1741],"tags":[1847],"class_list":{"0":"post-30764","1":"post","2":"type-post","3":"status-publish","4":"format-standard","5":"has-post-thumbnail","7":"category-ssc","8":"category-ssc-mts","9":"tag-ssc-mts"},"better_featured_image":{"id":30767,"alt_text":"simplification questions for ssc mts","caption":"simplification questions for ssc mts","description":"simplification questions for ssc 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