1. 化简:$\sqrt{16}=$______;$-\sqrt{49}=$______;$\sqrt{\frac{1}{4}}=$______.
答案
$4;-7;\frac{1}{2}$
2. 二次根式$\sqrt{(-2)^{2}}$可化简成( ).
A. -2
B. 4
C. -4
D. 2
A. -2
B. 4
C. -4
D. 2
答案
D
3. 若$\sqrt{x^{2}} = x$,则$x$的取值范围是( ).
A. $x \geqslant 0$
B. $x > 0$
C. $x < 0$
D. $x \leqslant 0$
A. $x \geqslant 0$
B. $x > 0$
C. $x < 0$
D. $x \leqslant 0$
答案
A
4. 判断下列各式,若正确,在括号内打“√”;若错误,在括号内打“×”并在后面的横线上改正.
(1)$\sqrt{(-5)^{2}}=-5$ ( )______________________________;
(2)$\sqrt{(3 - 7)^{2}}=3 - 7$ ( )______________________________;
(3)$\sqrt{6^{2}×11^{2}}=6×11$ ( )______________________________.
(1)$\sqrt{(-5)^{2}}=-5$ ( )______________________________;
(2)$\sqrt{(3 - 7)^{2}}=3 - 7$ ( )______________________________;
(3)$\sqrt{6^{2}×11^{2}}=6×11$ ( )______________________________.
答案
(1) $\times,5$; (2) $\times,4$; (3) $\checkmark$
5. 计算:
(1)$\sqrt{64}$;
(2)$\sqrt{(-2.5)^{2}}$;
(3)$\sqrt{(x - 4)^{2}}(x \geqslant 4)$;
(4)$\sqrt{(x - 3)^{2}}(x \leqslant 3)$.
(1)$\sqrt{64}$;
(2)$\sqrt{(-2.5)^{2}}$;
(3)$\sqrt{(x - 4)^{2}}(x \geqslant 4)$;
(4)$\sqrt{(x - 3)^{2}}(x \leqslant 3)$.
答案
(1) 8; (2) 2.5; (3) $x - 4$; (4) $3 - x$
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