Assignment
\( 1 \frac{1}{(2-3 \sqrt{3})^{2}}=\frac{2+3 \sqrt{3 /}}{2+3 / \sqrt{3}} \)
\( 2 \operatorname{Simplify} \frac{1}{(1-\sqrt{3})^{2}} \)
3 simplify \( \frac{1}{2 \sqrt{3}+\sqrt{3}} \)
4 simplify \( \frac{2 \sqrt{2}-3}{2 \sqrt{2}+1} \)
5 Simplify \( (2+3 \sqrt{5})^{2}-(2-3 \sqrt{5})^{2} \)
6. Simplity \( \frac{\sqrt{76}-3}{\sqrt{3}-1} a+b \sqrt{c} \) leaving your answer in the foun \( \sqrt{3}-1 \quad a+b \sqrt{c} \) where \( a, b \) and \( c \) as rational number
1. Express \( \frac{3-2 \sqrt{10}}{3 \sqrt{5}+\sqrt{2}} \) in the form \( m \sqrt{2}+n \sqrt{2} \)