\displaystyle-{3}\sqrt{{{3}}}-{5}\sqrt{{{5}}} Explanation: Given: \displaystyle\ \text{ }\ -\sqrt{{{27}}}-{3}\sqrt{{45}}-\sqrt{{20}}+{2}\sqrt{{45}} First note that amongst this we have: \displaystyle\ \text{ }\ -{3}\sqrt{{{45}}}+{2}\sqrt{{{45}}}\to-\sqrt{{{45}}} ...

-3 \displaystyle\sqrt{{19}} + 8 \displaystyle\sqrt{{7}} + \displaystyle\sqrt{{73}} Explanation: 5 \displaystyle\sqrt{{19}} - 8 \displaystyle\sqrt{{19}} + 4 \displaystyle\sqrt{{{4}{X}{7}}} ...

\displaystyle={8}\sqrt{{{3}{d}}}-{7}\sqrt{{{5}{d}}} Explanation: Write each radicand as the product of its factors and try to find squares wherever possible: \displaystyle\sqrt{{{20}{d}}}+{4}\sqrt{{{12}{d}}}-{3}\sqrt{{{45}{d}}} ...

\displaystyle-{3}\sqrt{{5}}-{2}\sqrt{{7}} Explanation: We can rewrite this as \displaystyle{\left(\sqrt{{5}}-{4}\sqrt{{5}}\right)}+{\left({3}\sqrt{{7}}-{5}\sqrt{{7}}\right)} We can factor ...

\displaystyle=-{60}-{7}\sqrt{{2}} Explanation: \displaystyle{\left(\sqrt{{50}}\sqrt{{-{72}}}-{\left(\sqrt{{162}}-\sqrt{{-{8}}}\right)}\right.} \displaystyle=\sqrt{{{\left({25}\right)}{\left({2}\right)}}}\sqrt{{-{\left({36}\right)}{\left({2}\right)}}}-\sqrt{{{\left({81}\right)}{\left({2}\right)}}}+\sqrt{{-{\left({4}\right)}{\left({2}\right)}}} ...

\displaystyle{11}\sqrt{{2}}-{2} Explanation: Before we begin tackling this problem, separate it into small chunks so that it is easier for us to handle. \displaystyle\sqrt{-}{4} does not ...