a) \( \displaystyle{{\sqrt 5 - \sqrt 3 } \over {\sqrt 2 }}\) \( \displaystyle = {{(\sqrt 5 - \sqrt 3 )\sqrt 2 } \over {{{(\sqrt 2 )}^2}}} = {{\sqrt {10} - \sqrt 6 } \over 2}\)
b) \( \displaystyle{{26} \over {5 - 2\sqrt 3 }}\) \( \displaystyle = {{26(5 + 2\sqrt 3 )} \over {(5 - 2\sqrt 3 )(5 + 2\sqrt 3 )}}\) \( \displaystyle = {{26(5 + 2\sqrt 3 )} \over {25 - 12}}\)
\( \displaystyle = {{26(5 + 2\sqrt 3 )} \over {13}}\) \( \displaystyle = 2(5 + 2\sqrt 3 ) = 10 + 4\sqrt 3 \)
c) \( \displaystyle{{2\sqrt {10} - 5} \over {4 - \sqrt {10} }}\) \( \displaystyle = {{2\sqrt {2.5} - \sqrt {{5^2}} } \over {2\sqrt {{2^2}} - \sqrt {2.5} }}\)
\( \displaystyle = {{\sqrt 5 (2\sqrt 2 - \sqrt 5 )} \over {\sqrt 2 (2\sqrt 2 - \sqrt 5 )}} = {{\sqrt 5 } \over {\sqrt 2 }} = {{\sqrt 5 .\sqrt 2 } \over {{{(\sqrt 2 )}^2}}}\) \( \displaystyle = {{\sqrt {10} } \over 2}\)
d) \( \displaystyle{{9 - 2\sqrt 3 } \over {3\sqrt 6 - 2\sqrt 2 }}\) \( \displaystyle= {{3\sqrt {{3^2}} - 2\sqrt 3 } \over {3\sqrt {3.2} - 2\sqrt 2 }}\)
\( \displaystyle = {{\sqrt 3 (3\sqrt 3 - 2)} \over {\sqrt 2 (3\sqrt 3 - 2)}} = {{\sqrt 3 } \over {\sqrt 2 }} = {{\sqrt {3.} \sqrt 2 } \over {{{(\sqrt 2 )}^2}}}\) \( \displaystyle= {{\sqrt 6 } \over 2}\)
