model 1 find largest and smallest value Section-Wise Topic Notes With Detailed Explanation And Example Questions

Answer: (c)

$√2, √^3{3}, √^4{4}$

LCM of power of surds = 12

$√2=(2)^{1/2}=(2^6)^{1/12}$

=$√^12{2^6}=√^12{64}$

$√^3{3}=√^12{3^4}=√^12{81}$

$√^4{4}=√^12{4^3}=√^12{64}$

Since 81 is the largest, hence,

$√^3{3}$ is the largest number.

Answer: (c)

$√7-√5, √5-√3, √9-√7, √{11}-√9$

$1/{√7-√5}={√7+√5}/{(√7-√5)(√7+√5)}$

=${√7+√5}/{7-5}={√7+√5}/2$,

$1/{√5-√3}={√5+√3}/{(√5-√3)(√5+√3)}$

=${√5+√3}/{5-3}={√5+√3}/2$

Similarly,

$1/{√9-√7}={√9+√7}/2$

$1/{√{11}-√9}={√{11}+√9}/2$

Clearly,${√5+√3}/2$ is the smallest.

$1/{√5-√3}$ is the smallest.

∴ $√5-√3$ is the greatest.

Answer: (d)

0.9, $(0.9)^2, √{0.9}, 0.\ov{9}$

$(0.9)^2$ = 0.81;

$√{0.9}$ = 0.95

$0.\ov{9} = 9/9 = 1$

Answer: (b)

$√^3{4}, √^4{6}, √^6{15}$ and $√^12{245}$

$√^3{4} =√^12{256}, √^4{6}= √^12{216}$,

$√^6{15} =√^12{225}, √^12{245}$

Answer: (a)

$√5 , 3√7 , 4√13$

$√5$

$3√7 =√{9×7}=√63$

$√^4{13}=√{4×4×13}=√{208}$

Clearly,$√5<3√7<4√13$

Answer: (c)

$√2, √^3{9}, √^4{16}, √^5{32}$

$(16)^{1/4}=(2^4)^{1/4}=2$

$√^5{32}=(32)^{1/5}=(2^5)^{1/5}=2$

$√^3{9}>2,√2<2$