{{3√ 2 } over {√ 6 + √ 3 }} - {{4√ 3 } over {√ 6 + √ 2 }} + {{√ 6 } over {√ 3 + √

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Basic of Logarithms

easy

${{3\sqrt 2 } \over {\sqrt 6 + \sqrt 3 }} - {{4\sqrt 3 } \over {\sqrt 6 + \sqrt 2 }} + {{\sqrt 6 } \over {\sqrt 3 + \sqrt 2 }} = $

$5\sqrt 2 $

$3\sqrt 2 $

$2\sqrt 3 $

$0$

Solution

(d) ${{3\sqrt 2 } \over {\sqrt 6 + \sqrt 3 }} – {{4\sqrt 3 } \over {\sqrt 6 + \sqrt 2 }} + {{\sqrt 6 } \over {\sqrt 3 + \sqrt 2 }}$

$ = {{3\sqrt 2 (\sqrt 6 – \sqrt 3 )} \over {6 – 3}} – {{4\sqrt 3 \,(\sqrt 6 – \sqrt 2 )} \over {6 – 2}} + {{\sqrt 6 (\sqrt 3 – \sqrt 2 )} \over {3 – 2}}$

$ = \sqrt 2 \,(\sqrt 6 – \sqrt 3 ) – \sqrt 3 \,(\sqrt 6 – \sqrt 2 ) + \sqrt 6 (\sqrt 3 – \sqrt 2 )= 0.$

Standard 11

Mathematics

${{\sqrt {6 + 2\sqrt 3 + 2\sqrt 2 + 2\sqrt 6 } – 1} \over {\sqrt {5 + 2\sqrt 6 } }}$

medium

If ${x^{x\root 3 \of x }} = {(x\,.\,\root 3 \of x )^x},$ then $x =$

medium

The value of $\sqrt {[12 – \sqrt {(68 + 48\sqrt 2 )} ]} = $

medium

The square root of $\sqrt {(50)} + \sqrt {(48)} $ is

medium

${{\sqrt 2 } \over {\sqrt {(2 + \sqrt 3 )} – \sqrt {(2 – \sqrt 3 } )}} = $

easy

${{3\sqrt 2 } \over {\sqrt 6 + \sqrt 3 }} - {{4\sqrt 3 } \over {\sqrt 6 + \sqrt 2 }} + {{\sqrt 6 } \over {\sqrt 3 + \sqrt 2 }} = $

Solution

Similar Questions

${{\sqrt {6 + 2\sqrt 3 + 2\sqrt 2 + 2\sqrt 6 } – 1} \over {\sqrt {5 + 2\sqrt 6 } }}$

If ${x^{x\root 3 \of x }} = {(x\,.\,\root 3 \of x )^x},$ then $x =$

The value of $\sqrt {[12 – \sqrt {(68 + 48\sqrt 2 )} ]} = $

The square root of $\sqrt {(50)} + \sqrt {(48)} $ is

${{\sqrt 2 } \over {\sqrt {(2 + \sqrt 3 )} – \sqrt {(2 – \sqrt 3 } )}} = $

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