2b:["$","$L2f",null,{"questions":[{"id":907193,"slug":"simplify-sqrt32sqrt2_334744","question":"Simplify: $\\sqrt{3+2\\sqrt2}.$","mcq":[null,null,null,null],"answer":"","solution":"We are asked to simplify $\\sqrt{3+2\\sqrt2}.$ It can be written in the form $(\\text{a}+\\text{b})^2=\\text{a}^2+\\text{b}^2+2\\text{ab}$ as $\\sqrt{3+2\\sqrt2}=\\sqrt{2+1+2\\times1\\times\\sqrt2}$
\r\n$=\\sqrt{\\big(\\sqrt2\\big)^2+(1)^2+2\\times1\\times\\sqrt2}$
\r\n$=\\sqrt{\\big(\\sqrt2+1\\big)^2}$
\r\n$=\\sqrt2+1$ Hence the value of given expression is $\\sqrt2+1.$","marks":2},{"id":907192,"slug":"write-the-rationalisation-factor-of-7-3sqrt5_334745","question":"Write the rationalisation factor of $7-3\\sqrt5.$","mcq":[null,null,null,null],"answer":"","solution":"The rationalizing factor of $\\text{a}+\\sqrt{\\text{b}}$ is $\\text{a}-\\sqrt{\\text{b}}.$
\r\nHence the rationalizing factor of $7-3\\sqrt5$ is $7+3\\sqrt5.$","marks":2},{"id":907191,"slug":"retionalise-the-denominator-of-each-of-the-following-sqrt2sqrt5sqrt3_334746","question":"Retionalise the denominator of each of the following: $\\frac{\\sqrt2+\\sqrt5}{\\sqrt3}$","mcq":[null,null,null,null],"answer":"","solution":"We know that rationalization factor for $\\frac{1}{\\sqrt{\\text{a}}}$ is $\\sqrt{\\text{a}}.$ we will multiply numerator and denominator of the given expression $\\frac{\\sqrt2+\\sqrt5}{\\sqrt3}$ by $\\sqrt{3},$ to get $\\frac{\\sqrt2+\\sqrt5}{\\sqrt3}\\times\\frac{\\sqrt{3}}{\\sqrt{3}}=\\frac{\\sqrt{2}\\times\\sqrt3+\\sqrt5\\times\\sqrt3}{\\sqrt{3}\\times\\sqrt{3}}$ $=\\frac{\\sqrt{6}+\\sqrt{15}}{3}$ Hence the given expression is simplified to $\\frac{\\sqrt{6}+\\sqrt{15}}{3}.$","marks":2},{"id":907190,"slug":"find-the-value-to-three-place-of-decimals-of-each-of-the-following-it-is-given-that-sqrt21_334747","question":"Find the value to three place of decimals of each of the following. It is given that $\\sqrt2=1.414,\\ \\sqrt3=1.732,\\ \\sqrt5=2.236,\\ \\sqrt10=3.162.$ $\\frac{\\sqrt{2}-1}{\\sqrt5}$","mcq":[null,null,null,null],"answer":"","solution":"Given, $\\sqrt2=1.414,\\ \\sqrt3=1.732,\\ \\sqrt5=2.236,\\ \\sqrt10=3.162.$ $\\frac{\\sqrt{2}-1}{\\sqrt5}$ Rationalizing the denominator by multiplying both numerator and denominator with $\\sqrt5$ $=\\frac{(\\sqrt2\\times\\sqrt5)-\\sqrt5}{\\sqrt5\\times\\sqrt5}$ $=\\frac{\\sqrt{10}+\\sqrt5}{5}$ $=\\frac{3.162-2.236}{5}$ $=\\frac{0.926}{5}=0.1852$","marks":2},{"id":907189,"slug":"find-the-value-to-three-place-of-decimals-of-each-of-the-following-it-is-given-that-sqrt21_334748","question":"Find the value to three place of decimals of each of the following. It is given that $\\sqrt2=1.414,\\ \\sqrt3=1.732,\\ \\sqrt5=2.236,\\ \\sqrt10=3.162.$ $\\frac{2+\\sqrt{3}}{3}$","mcq":[null,null,null,null],"answer":"","solution":"Given, $\\sqrt2=1.414,\\ \\sqrt3=1.732,\\ \\sqrt5=2.236,\\ \\sqrt10=3.162.$
\r\n$\\frac{2+\\sqrt{3}}{3}$
\r\n$=\\frac{2+1.732}{3}$
\r\n$=\\frac{3.732}{3}$
\r\n$=1.244$","marks":2},{"id":907188,"slug":"simplify-sqrt3-2sqrt2_334749","question":"\t\t\t\t\t\t\t\t\t\t\t\tSimplify: $\\sqrt{3-2\\sqrt2}.$
\t\t\t\t\t\t\t\t\t\t\t","mcq":[null,null,null,null],"answer":"","solution":"$30","marks":2},{"id":907187,"slug":"simplify-the-following-expression-4sqrt73sqrt2_334750","question":"Simplify the following expression:$(4+\\sqrt{7})(3+\\sqrt{2})$","mcq":[null,null,null,null],"answer":"","solution":"$$(4+\\sqrt{7})(3+\\sqrt{2})$
\r\n$=12+4\\sqrt{2}+3\\sqrt{7}+\\sqrt{7\\times2}$
\r\n$=12+4\\sqrt{2}+3\\sqrt{7}+\\sqrt{14}$","marks":2},{"id":907186,"slug":"find-the-value-to-three-place-of-decimals-of-each-of-the-following-it-is-given-that-sqrt21_334751","question":"Find the value to three place of decimals of each of the following. It is given that $\\sqrt2=1.414,\\ \\sqrt3=1.732,\\ \\sqrt5=2.236,\\ \\sqrt10=3.162.$ $\\frac{2}{\\sqrt3}$","mcq":[null,null,null,null],"answer":"","solution":"Given, $\\sqrt2=1.414,\\ \\sqrt3=1.732,\\ \\sqrt5=2.236,\\ \\sqrt10=3.162.$
\r\n$\\frac{2}{\\sqrt3}$ Rationalizing the denominator by multiplying both numerator and denominator with $=\\frac{2\\sqrt3}{\\sqrt3\\times\\sqrt3}$
\r\n$=\\frac{2\\sqrt3}{\\sqrt{3\\times3}}$
\r\n$=\\frac{2\\sqrt3}{3}$
\r\n$=\\frac{2\\times1.732}{3}$
\r\n$=\\frac{3.464}{3}=1.154666666$","marks":2},{"id":907185,"slug":"simplify-the-following-expression-sqrt8-sqrt2sqrt8sqrt2_334752","question":"Simplify the following expression:$(\\sqrt{8}-\\sqrt{2})(\\sqrt{8}+\\sqrt{2})$","mcq":[null,null,null,null],"answer":"","solution":"$$(\\sqrt{8}-\\sqrt{2})(\\sqrt{8}+\\sqrt{2})$
\r\nAs we know, $(a+b)(a-b)=\\left(a^2-b^2\\right)$
\r\n$\\sqrt{8\\times8}-\\sqrt{2\\times2}=8-2$
\r\n$=6$","marks":2},{"id":907184,"slug":"simplify-the-following-sqrt41250sqrt42_334753","question":"Simplify the following:$\\frac{\\sqrt[4]{1250}}{\\sqrt[4]{2}}$","mcq":[null,null,null,null],"answer":"","solution":"We know that $\\frac{\\sqrt[\\text{n}]{\\text{a}}}{{\\sqrt[\\text{n}]{\\text{b}}}}=\\sqrt[\\text{n}]{\\frac{\\text{a}}{\\text{b}}}.$
\r\nWe will use this property to simplify the expression $\\frac{\\sqrt[4]{1250}}{\\sqrt[4]{2}}.$
\r\n$\\therefore\\ \\frac{\\sqrt[4]{1250}}{\\sqrt[4]{2}}=\\sqrt[4]{625}$
\r\n$=\\sqrt[4]{5^4}$
\r\n$=(5^4)^\\frac{1}{4}$
\r\n$=(5)^1$
\r\n$=5$ Hence the value of the given expression is $5.$","marks":2},{"id":907183,"slug":"write-the-rationalisation-factor-of-sqrt5-2_334754","question":"\t\t\t\t\t\t\t\t\t\t\t\tWrite the rationalisation factor of $\\sqrt5-2.$
\t\t\t\t\t\t\t\t\t\t\t","mcq":[null,null,null,null],"answer":"","solution":"$31","marks":2},{"id":907182,"slug":"express-each-one-of-the-following-with-rational-denominator-13sqrt2_334755","question":"\t\t\t\t\t\t\t\t\t\t\t\tExpress each one of the following with rational denominator:
$\\frac{1}{3+\\sqrt2}$
\t\t\t\t\t\t\t\t\t\t\t","mcq":[null,null,null,null],"answer":"","solution":"\t\t\t\t\t\t\t\t\t\t\t\t$\\frac{1}{3+\\sqrt2}$
Rationalizing the denominator by multiplying both numerator and denominator with the rationalizing factor $3-\\sqrt2$
$=\\frac{3-\\sqrt2}{(3+\\sqrt2)(3-\\sqrt2)}$
As we know,
$(\\text{a}+\\text{b})(\\text{a}-\\text{b})=(\\text{a}^2-\\text{b}^2)=\\frac{3-\\sqrt2}{9-2}=\\frac{3-\\sqrt2}{7}$
\t\t\t\t\t\t\t\t\t\t\t","marks":2},{"id":907181,"slug":"simplify-the-following-sqrt34timessqrt316_334756","question":"Simplify the following:$\\sqrt[3]{4}\\times\\sqrt[3]{16}$","mcq":[null,null,null,null],"answer":"","solution":"We know that $\\sqrt[\\text{n}]{\\text{a}}\\times\\sqrt[\\text{n}]{\\text{b}}=\\sqrt[\\text{n}]{\\text{ab}}.$ We will use this property to simplify the expression $\\sqrt[3]{4}\\times\\sqrt[3]{16.}$ $\\therefore\\ \\sqrt[3]{4}\\times\\sqrt[3]{16.}=\\sqrt[3]{64}$ $=\\sqrt[3]{4^3}$ $=(4^3)^\\frac{1}{3}$ $=(4)^1$ $=4$ Hence the value of the given expression is $4.$","marks":2},{"id":907180,"slug":"simplify-the-following-expression-3sqrt33-sqrt3_334757","question":"Simplify the following expression:
\r\n$(3+\\sqrt{3})(3-\\sqrt{3})$","mcq":[null,null,null,null],"answer":"","solution":"$$(3+\\sqrt{3})(3-\\sqrt{3})$
\r\nAs we know, $(a+b)(a-b)=\\left(a^2-b^2\\right)$
\r\n$=9-\\sqrt{3\\times3}$
\r\n$=6$","marks":2},{"id":907179,"slug":"simplify-the-following-expression-5sqrt75-sqrt7_334758","question":"Simplify the following expression:
\r\n$(5+\\sqrt{7})(5-\\sqrt{7})$","mcq":[null,null,null,null],"answer":"","solution":"$$(5+\\sqrt{7})(5-\\sqrt{7})$
\r\nAs we know, $(\\mathrm{a}+\\mathrm{b})(\\mathrm{a}-\\mathrm{b})=\\left(\\mathrm{a}^2-\\mathrm{b}^2\\right)$
\r\nSo, $5^2-7$
\r\n$25-7=18$","marks":2},{"id":907178,"slug":"simplify-the-following-expression-3sqrt35-sqrt2_334759","question":"Simplify the following expression:$(3+\\sqrt{3})(5-\\sqrt{2})$","mcq":[null,null,null,null],"answer":"","solution":"$$(3+\\sqrt{3})(5-\\sqrt{2})$
\r\n$=\\sqrt{15}-3\\sqrt{2}+5\\sqrt{3}-\\sqrt{3\\times2}$
\r\n$=\\sqrt{15}-3\\sqrt{2}+5\\sqrt{3}-\\sqrt{6}$","marks":2},{"id":907177,"slug":"retionalise-the-denominator-of-each-of-the-following-32sqrt5_334760","question":"Retionalise the denominator of each of the following: $\\frac{3}{2\\sqrt5}$","mcq":[null,null,null,null],"answer":"","solution":"We know that rationalization factor for $\\frac{1}{\\sqrt{\\text{a}}}$ is $\\sqrt{\\text{a}}.$
\r\nwe will multiply numerator of the given expression $\\frac{3}{2\\sqrt5}$ by $\\sqrt5,$ to get $\\frac{3}{2\\sqrt5}\\times\\frac{\\sqrt5}{\\sqrt5}=\\frac{3\\sqrt5}{2\\sqrt5\\times\\sqrt5}$
\r\n$=\\frac{3\\sqrt5}{2\\times5}$
\r\n$=\\frac{3\\sqrt5}{10}$ Hence the given expression is simplified to $\\frac{3\\sqrt5}{10}.$","marks":2},{"id":907176,"slug":"express-each-one-of-the-following-with-rational-denominator-12sqrt5-sqrt3_334761","question":"Express each one of the following with rational denominator: $\\frac{1}{2\\sqrt{5}-\\sqrt3}$","mcq":[null,null,null,null],"answer":"","solution":"$$\\frac{1}{2\\sqrt{5}-\\sqrt3}$ Rationalizing the denominator by multiplying both numerator and denominator with the rationalizing factor $2\\sqrt{5}+\\sqrt3$
\r\n$=\\frac{2\\sqrt5+\\sqrt3}{(2\\sqrt{5}-\\sqrt3)(2\\sqrt{5}+\\sqrt3)}$ As
\r\nwe know, $(\\text{a}+\\text{b})(\\text{a}-\\text{b})=(\\text{a}^2-\\text{b}^2)$
\r\n$=\\frac{2\\sqrt5+\\sqrt3}{20-3}=\\frac{2\\sqrt5+\\sqrt3}{17}$","marks":2},{"id":907175,"slug":"simplify-the-following-expression-11sqrt1111-sqrt11_334762","question":"Simplify the following expression:
\r\n$(11+\\sqrt{11})(11-\\sqrt{11})$","mcq":[null,null,null,null],"answer":"","solution":"$$(11+\\sqrt{11})(11-\\sqrt{11})$
\r\nAs we know, $(\\mathrm{a}+\\mathrm{b})(\\mathrm{a}-\\mathrm{b})=\\left(\\mathrm{a}^2-\\mathrm{b}^2\\right)$
\r\nSo, $11^2-11$
\r\n$121-11=110$","marks":2},{"id":907174,"slug":"retionalise-the-denominator-of-each-of-the-following-sqrt2sqrt5_334763","question":"Retionalise the denominator of each of the following: $\\frac{\\sqrt2}{\\sqrt5}$","mcq":[null,null,null,null],"answer":"","solution":"We know that rationalization factor for $\\frac{1}{\\sqrt{\\text{a}}}$ is $\\sqrt{\\text{a}}.$ we will multiply numerator and denominator of the given expression $\\frac{\\sqrt2}{\\sqrt5}$ by $\\sqrt{5},$ to get $\\frac{\\sqrt2}{\\sqrt{5}}\\times\\frac{\\sqrt{5}}{\\sqrt{5}}=\\frac{\\sqrt{2}\\times\\sqrt5}{\\sqrt{5}\\times\\sqrt{5}}$
\r\n$=\\frac{\\sqrt{10}}{5}$ Hence the given expression is simplified to $\\frac{\\sqrt10}{5}.$","marks":2},{"id":907173,"slug":"simplify-the-following-expression-sqrt5-sqrt2sqrt5sqrt2_334764","question":"Simplify the following expression:
\r\n$(\\sqrt{5}-\\sqrt{2})(\\sqrt{5}+\\sqrt{2})$","mcq":[null,null,null,null],"answer":"","solution":"$$(\\sqrt{5}-\\sqrt{2})(\\sqrt{5}+\\sqrt{2})$
\r\nAs we know, $(a+b)(a-b)=\\left(a^2-b^2\\right)$
\r\n$=\\sqrt{5 \\times 5}-\\sqrt{2 \\times 2}$
\r\n$=5-2$
\r\n$=3$","marks":2},{"id":907172,"slug":"find-the-value-to-three-place-of-decimals-of-each-of-the-following-it-is-given-that-sqrt21_334765","question":"Find the value to three place of decimals of each of the following. It is given that $\\sqrt2=1.414,\\ \\sqrt3=1.732,\\ \\sqrt5=2.236,\\ \\sqrt10=3.162.$ $\\frac{3}{\\sqrt{10}}$","mcq":[null,null,null,null],"answer":"","solution":"Given, $\\sqrt2=1.414,\\ \\sqrt3=1.732,\\ \\sqrt5=2.236,\\ \\sqrt10=3.162.$ $\\frac{3}{\\sqrt{10}}$ Rationalizing the denominator by multiplying both numerator and denominator with $\\sqrt{10}$ $=\\frac{3\\sqrt{10}}{\\sqrt{10}\\times\\sqrt{10}}$ $=\\frac{3\\sqrt{10}}{\\sqrt{10\\times10}}$ $=\\frac{3\\sqrt10}{10}$ $=\\frac{9.486}{10}=0.9486$","marks":2},{"id":907171,"slug":"simplify-the-following-expression-2sqrt53sqrt22_334766","question":"Simplify the following expression:
\r\n$(2\\sqrt{5}+3\\sqrt{2})^2$","mcq":[null,null,null,null],"answer":"","solution":"$$(2\\sqrt{5}+3\\sqrt{2})^2$
\r\nAs we know, $(a+b)^2=\\left(a^2+2 \\times b+b^2\\right)$
\r\n$=4\\sqrt{5\\times5}+2\\times2\\sqrt{5}\\times3\\sqrt{2}+9\\sqrt{2\\times2}$
\r\n$=20+12\\sqrt{10}+18$
\r\n$=38+12\\sqrt{10}$","marks":2},{"id":907170,"slug":"retionalise-the-denominator-of-each-of-the-following-sqrt312_334767","question":"Retionalise the denominator of each of the following: $\\frac{\\sqrt3+1}{2}$","mcq":[null,null,null,null],"answer":"","solution":"We know that rationalization factor for $\\frac{1}{\\sqrt{\\text{a}}}$ is $\\sqrt{\\text{a}}.$ we will multiply numerator and denominator of the given expression $\\frac{\\sqrt3+1}{2}$ by $\\sqrt{2},$ to get $\\frac{\\sqrt3+1}{2}\\times\\frac{\\sqrt{2}}{\\sqrt{2}}=\\frac{\\sqrt{2}\\times\\sqrt3+\\sqrt2}{\\sqrt{2}\\times\\sqrt{2}}$ $=\\frac{\\sqrt{6}+\\sqrt2}{2}$ Hence the given expression is simplified to $\\frac{\\sqrt{6}+\\sqrt2}{2}.$","marks":2},{"id":907169,"slug":"if-textx32sqrt2-than-find-the-value-of-sqrttextx-1sqrttextx_334768","question":"If $\\text{x}=3+2\\sqrt2,$ than find the value of $\\sqrt{\\text{x}}-\\frac{1}{\\sqrt{\\text{x}}}.$","mcq":[null,null,null,null],"answer":"","solution":"We are asked to simplify $\\text{x}=3+2\\sqrt2.$ It can be written in the form $(\\text{a}+\\text{b})^2=\\text{a}^2+\\text{b}^2+2\\text{ab}$ as $\\sqrt{\\text{x}}=\\sqrt{3+2\\sqrt2}$
\r\n$=\\sqrt{2+1+2\\times1\\times\\sqrt2}$
\r\n$=\\sqrt{\\big(\\sqrt2\\big)^2+(1)^2+2\\times1\\times\\sqrt2}$
\r\n$=\\sqrt{\\big(\\sqrt2+1\\big)^2}$
\r\n$=\\sqrt2+1$ Therefore, $\\frac{1}{\\sqrt{\\text{x}}}=\\frac{1}{\\sqrt2+1}$
\r\nWe know that rationalization factor for $\\sqrt2+1$ is $\\sqrt2-1.$
\r\nWe will multiply numerator and denominator of the given expression $\\frac{1}{\\sqrt2+1}$ by $\\sqrt2-1,$ to get $\\frac{1}{\\sqrt2+1}\\times\\frac{\\sqrt2-1}{\\sqrt2-1}=\\frac{\\sqrt2-1}{\\big(\\sqrt2\\big)^2-(1)^2}$
\r\n$=\\frac{\\sqrt2-1}{2-1}$
\r\n$=\\sqrt2-1$ Hence, $\\sqrt{\\text{x}}-\\frac{1}{\\sqrt{\\text{x}}}=\\sqrt2+1-\\big(\\sqrt2-1\\big)$
\r\n$\\sqrt2+1-\\sqrt2+1$
\r\n$=2$ Therefore, value of given expression is 2.","marks":2},{"id":907168,"slug":"simplify-the-following-expression-sqrt5-2sqrt3-sqrt5_334769","question":"Simplify the following expression:$(\\sqrt{5}-2)(\\sqrt{3}-\\sqrt{5})$","mcq":[null,null,null,null],"answer":"","solution":"$$(\\sqrt{5}-2)(\\sqrt{3}-\\sqrt{5})$
\r\n$=\\sqrt{15}-\\sqrt{25}-2\\sqrt{3}+2\\sqrt{5}$
\r\n$=\\sqrt{15}-\\sqrt{5\\times5}-2\\sqrt{3}+2\\sqrt{5}$
\r\n$=\\sqrt{15}-5-2\\sqrt{3}+2\\sqrt{5}$","marks":2},{"id":907167,"slug":"express-each-one-of-the-following-with-rational-denominator-1sqrt6-sqrt5_334770","question":"Express each one of the following with rational denominator: $\\frac{1}{\\sqrt6-\\sqrt5}$","mcq":[null,null,null,null],"answer":"","solution":"We have $\\frac{1}{\\sqrt6-\\sqrt5}.$ Rationalisation factor for $\\frac{1}{\\sqrt6-\\sqrt5}$ is $\\sqrt6+\\sqrt5$
\r\n$\\Rightarrow\\frac{1}{\\sqrt6-\\sqrt5}=\\frac{1}{\\sqrt6-\\sqrt5}\\times\\frac{\\sqrt6+\\sqrt5}{\\sqrt6+\\sqrt5}$
\r\n$=\\frac{\\sqrt6+\\sqrt5}{(\\sqrt6-\\sqrt5)(\\sqrt6+\\sqrt5)}$
\r\n$=\\frac{\\sqrt6+\\sqrt5}{(\\sqrt6)^2-(\\sqrt5)^2}$
\r\n$[\\because(\\text{a}+\\text{b})(\\text{a}-\\text{b})=\\text{a}^2-\\text{b}^2]$
\r\n$=\\frac{\\sqrt6+\\sqrt5}{6-5}$
\r\n$=\\frac{\\sqrt6+\\sqrt5}{1}=\\sqrt6+\\sqrt5$
\r\n$\\therefore\\frac{1}{\\sqrt6-\\sqrt5}=\\sqrt6+\\sqrt5$","marks":2},{"id":907166,"slug":"retionalise-the-denominator-of-each-of-the-following-3sqrt2sqrt5_334771","question":"Retionalise the denominator of each of the following: $\\frac{3\\sqrt2}{\\sqrt5}$","mcq":[null,null,null,null],"answer":"","solution":"We know that rationalization factor for $\\frac{1}{\\sqrt{\\text{a}}}$ is $\\sqrt{\\text{a}}.$
\r\nwe will multiply numerator and denominator of the given expression $\\frac{3\\sqrt2}{\\sqrt5}$ by $\\sqrt{5},$ to
\r\nget $\\frac{3\\sqrt2}{\\sqrt5}\\times\\frac{\\sqrt{5}}{\\sqrt{5}}=\\frac{3\\sqrt{2}\\times\\sqrt5}{\\sqrt{5}\\times\\sqrt{5}}$
\r\n$=\\frac{3\\sqrt{10}}{5}$ Hence the given expression is simplified to $\\frac{3\\sqrt{10}}{5}.$","marks":2},{"id":907165,"slug":"express-each-one-of-the-following-with-rational-denominator-sqrt312sqrt2-sqrt3_334772","question":"Express each one of the following with rational denominator: $\\frac{\\sqrt3+1}{2\\sqrt{2}-\\sqrt3}$","mcq":[null,null,null,null],"answer":"","solution":"$$\\frac{\\sqrt3+1}{2\\sqrt{2}-\\sqrt3}$ Rationalizing the denominator by multiplying both numerator and denominator with the rationalizing factor $2\\sqrt{2}+\\sqrt3$
\r\n$=\\frac{(\\sqrt3+1)(2\\sqrt2+\\sqrt3)}{(2\\sqrt{2}+\\sqrt3)(2\\sqrt{2}-\\sqrt3)}$ As
\r\nwe know, $(\\text{a}+\\text{b})(\\text{a}-\\text{b})=(\\text{a}^2-\\text{b}^2)$
\r\n$=\\frac{(2\\sqrt6+3+2\\sqrt2+\\sqrt3)}{8-3}$
\r\n$=\\frac{(2\\sqrt6+3+2\\sqrt2+\\sqrt3)}{5}$","marks":2},{"id":907164,"slug":"write-the-reciprocal-5sqrt2_334773","question":"Write the reciprocal $5+\\sqrt2.$","mcq":[null,null,null,null],"answer":"","solution":"Given that $5+\\sqrt2,$ it's reciprocal is given as $\\frac{1}{5+\\sqrt2}$ It can be simplified by rationalizing the denominator.
\r\nThe rationalizing factor of $5+\\sqrt2$ is $5-\\sqrt2,$
\r\nwe will multiply numerator and denominator of the given expression $\\frac{1}{5+\\sqrt2}$ by $5-\\sqrt2,$ to get $\\frac{1}{5+\\sqrt2}\\times\\frac{5-\\sqrt2}{5-\\sqrt2}=\\frac{5-\\sqrt2}{(5)^2\\big(\\sqrt2\\big)^2}$
\r\n$=\\frac{5-\\sqrt2}{25-2}$
\r\n$=\\frac{5-\\sqrt2}{23}$
\r\nHence reciprocal of the given expression is $\\frac{5-\\sqrt2}{23}.$","marks":2},{"id":907163,"slug":"simplify-the-following-expression-sqrt5-sqrt32_334774","question":"Simplify the following expression:
\r\n$(\\sqrt{5}-\\sqrt{3})^2$","mcq":[null,null,null,null],"answer":"","solution":"$$(\\sqrt{5}-\\sqrt{3})^2$
\r\nAs we know, $(a-b)^2=\\left(a^2-2 \\times a \\times b+b^2\\right)$
\r\n$=(\\sqrt{5})^2-2\\times\\sqrt{5\\times3}+(\\sqrt{3})^2$
\r\n$=5-2\\sqrt{15}+3$
\r\n$=8-2\\sqrt{15}$","marks":2},{"id":907162,"slug":"simplify-the-following-expression-sqrt3sqrt72_334775","question":"Simplify the following expression:
\r\n$(\\sqrt{3}+\\sqrt{7})^2$","mcq":[null,null,null,null],"answer":"","solution":"$$(\\sqrt{3}+\\sqrt{7})^2$
\r\nAs we know, $(a+b)^2=\\left(a^2+2 \\times a \\times b+b^2\\right)$
\r\n$=\\sqrt{3^2}+2\\times\\sqrt{3}\\times\\sqrt{7}+\\sqrt{7^2}$
\r\n$=3+2\\times\\sqrt{3\\times7}+7$
\r\n$=10+2\\times\\sqrt{21}$","marks":2},{"id":907161,"slug":"find-the-value-to-three-place-of-decimals-of-each-of-the-following-it-is-given-that-sqrt21_334776","question":"Find the value to three place of decimals of each of the following. It is given that $\\sqrt2=1.414,\\ \\sqrt3=1.732,\\ \\sqrt5=2.236,\\ \\sqrt10=3.162.$ $\\frac{\\sqrt5+1}{\\sqrt{2}}$","mcq":[null,null,null,null],"answer":"","solution":"Given, $\\sqrt2=1.414,\\ \\sqrt3=1.732,\\ \\sqrt5=2.236,\\ \\sqrt10=3.162.$
\r\n$\\frac{\\sqrt5+1}{\\sqrt{2}}$ Rationalizing the denominator by multiplying both numerator and denominator with $\\sqrt2$
\r\n$=\\frac{(\\sqrt{5}\\times\\sqrt2)+\\sqrt2}{\\sqrt{2}\\times\\sqrt{2}}$
\r\n$=\\frac{\\sqrt{10}+\\sqrt2}{2}$
\r\n$=\\frac{4.576}{2}=2.288$","marks":2},{"id":907160,"slug":"retionalise-the-denominator-of-each-of-the-following-1sqrt12_334777","question":"Retionalise the denominator of each of the following: $\\frac{1}{\\sqrt12}$","mcq":[null,null,null,null],"answer":"","solution":"We know that rationalization factor for $\\frac{1}{\\sqrt{\\text{a}}}$ is $\\sqrt{\\text{a}}.$ we will multiply numerator and denominator of the given expression $\\frac{1}{\\sqrt{12}}$ by $\\sqrt{12},$ to get $\\frac{1}{\\sqrt{12}}\\times\\frac{\\sqrt{12}}{\\sqrt{12}}=\\frac{\\sqrt{12}}{\\sqrt{12}\\times\\sqrt{12}}$ $=\\frac{\\sqrt{12}}{12}$ $=\\frac{\\sqrt{4}\\times\\sqrt3}{12}$ $=\\frac{2\\times\\sqrt3}{12}$ $=\\frac{\\sqrt3}{6}$ Hence the given expression is simplified to $\\frac{\\sqrt3}{6}.$","marks":2},{"id":907159,"slug":"write-the-value-of-big2sqrt32-sqrt3big_334778","question":"Write the value of $\\big(2+\\sqrt3)(2-\\sqrt3\\big).$","mcq":[null,null,null,null],"answer":"","solution":"Given that:
\r\n$\\big(2+\\sqrt3)(2-\\sqrt3\\big)$
\r\nIt can be simplified as
\r\n$\\big(2+\\sqrt3)(2-\\sqrt3\\big)=2\\times2-2\\times\\sqrt3+2\\times\\sqrt3-\\big(\\sqrt3\\big)^2$
\r\n$=4-2\\sqrt3+2\\sqrt3-3$
\r\n$=4-3$
\r\n$=1$
\r\nHence the value of the given expression is $1.$","marks":2}],"topicId":2439,"topicName":"2 Marks Questions"}]

Maths 2 Marks Questions

2 Marks Questions

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