8. 若把$x\sqrt{-\frac{1}{x}}$中根号外的因式移入根号内,则转化后的结果是 ( )
A. $\sqrt{x}$
B. $\sqrt{-x}$
C. $-\sqrt{x}$
D. $-\sqrt{-x}$
A. $\sqrt{x}$
B. $\sqrt{-x}$
C. $-\sqrt{x}$
D. $-\sqrt{-x}$
答案
8.D
9. 若$\frac{\sqrt{y + 2}}{\sqrt{2x - 1}}=\sqrt{\frac{y + 2}{2x - 1}}$,且$x + y = 5$,则$x$的取值范围是____________.
答案
9.$\frac{1}{2} < x \leq 7$
10. 如果$\sqrt{5}=a$,$\sqrt{17}=b$,那么$\sqrt{0.85}$用含$a$、$b$的代数式可以表示为_______.
答案
10.答案不唯一,如$\frac{ab}{10}$ 解析:$\sqrt{0.85} = \sqrt{\frac{85}{100}} = \frac{\sqrt{85}}{\sqrt{100}} = \frac{\sqrt{5 \times 17}}{\sqrt{10^{2}}} = \frac{\sqrt{5} \times \sqrt{17}}{\sqrt{10^{2}}} = \frac{ab}{10}$。
11. 计算:
(1)$\sqrt{\frac{1}{m^{2}}-\frac{1}{n^{2}}}(n > m > 0)$; (2)$\frac{\sqrt{3a^{3}}\cdot\sqrt{6b^{3}}}{\sqrt{2ab}}(a > 0,b > 0)$;
(3)$4\sqrt{5}\div(-5\sqrt{1\frac{4}{5}})$; (4)$\frac{3}{5}\sqrt{xy^{5}}\div(-\frac{4}{15}\sqrt{\frac{y}{x}})\times(-\frac{5}{6}\sqrt{x^{3}y})$.
(1)$\sqrt{\frac{1}{m^{2}}-\frac{1}{n^{2}}}(n > m > 0)$; (2)$\frac{\sqrt{3a^{3}}\cdot\sqrt{6b^{3}}}{\sqrt{2ab}}(a > 0,b > 0)$;
(3)$4\sqrt{5}\div(-5\sqrt{1\frac{4}{5}})$; (4)$\frac{3}{5}\sqrt{xy^{5}}\div(-\frac{4}{15}\sqrt{\frac{y}{x}})\times(-\frac{5}{6}\sqrt{x^{3}y})$.
答案
11.(1)$\frac{\sqrt{n^{2}-m^{2}}}{mn}$ (2)$3ab$ (3)$-\frac{4}{3}$ (4)$\frac{15}{8}x^{2}y^{2}\sqrt{xy}$
12. (2023·乐山)如图,在$Rt\triangle ABC$中,$\angle C = 90^{\circ}$,$D$为边$AB$上任意一点(不与点$A$、$B$重合),过点$D$作$DE// BC$,$DF// AC$,分别交$AC$、$BC$于点$E$、$F$,连接$EF$.
(1)求证:四边形$ECFD$是矩形;
(2)若$CF = 2$,$CE = 4$,求点$C$到$EF$的距离.
(1)求证:四边形$ECFD$是矩形;
(2)若$CF = 2$,$CE = 4$,求点$C$到$EF$的距离.
答案
12.(1)∵DF//AC,DE//BC,∴四边形ECFD是平行四边形.∵∠C = 90°,∴四边形ECFD是矩形。(2)过点C作CH⊥EF于点H,则点C到EF的距离即为CH的长。∵在Rt△ECF中,CF = 2,CE = 4,∴EF = $\sqrt{CE^{2}+CF^{2}} = \sqrt{20} = 2\sqrt{5}$。∵$S_{\triangle ECF} = \frac{1}{2}CF \cdot CE = \frac{1}{2}EF \cdot CH$,∴$CH = \frac{CF \cdot CE}{EF} = \frac{2 \times 4}{2\sqrt{5}} = \frac{4\sqrt{5}}{5}$。∴点C到EF的距离为$\frac{4\sqrt{5}}{5}$。
