2.計(jì)算
(1)$\sqrt{8}$+$\sqrt{32}$-$\sqrt{2}$
(2)$\frac{\sqrt{50}+\sqrt{32}}{\sqrt{2}}$-4
(3)(2$\sqrt{3}$-1)2+|1-$\sqrt{3}$|
分析 (1)首先對(duì)二次根式進(jìn)行化簡(jiǎn),然后合并同類二次根式即可�����;
(2)首先對(duì)二次根式進(jìn)行化簡(jiǎn)���,然后合并同類二次根式即可��;
(3)首先利用完全平方公式計(jì)算�����、去掉絕對(duì)值符號(hào)���,最后合并同類二次根式即可求解.
解答 解:(1)原式=2$\sqrt{2}$+4$\sqrt{2}$-$\sqrt{2}$
=5$\sqrt{2}$����;
(2)原式=$\frac{5\sqrt{2}+4\sqrt{2}}{\sqrt{2}}$-4
=9-4
=5�;
(3)原式=12+1-4$\sqrt{3}$+($\sqrt{3}$-1)
=12-3$\sqrt{3}$.
點(diǎn)評(píng) 本題考查了二次根式的化簡(jiǎn)求值,正確理解完全平方公式的結(jié)構(gòu)以及絕對(duì)值的性質(zhì)是關(guān)鍵.
