Question

resuelve aplicando propiedades de potenciación

$\sqrt{4 \times 16}$
$\sqrt[3]{27 \times {2}^{3} }$
$\sqrt{25 {a}^{2} }$
$\sqrt[4]{16 {m}^{4} }$
$\sqrt[3]{8 {n}^{3} }$
$\sqrt[5]{32 \times {m}^{10} }$
$\sqrt{36 \times {6}^{2} }$
$\sqrt[3]{25 \times 5}$
ayudenme​

Answer 1

Explicación paso a paso:

$\sqrt{4 \times 16}$

$\sqrt{4} \sqrt{16}$

$2 \times 4$

$8$

$\sqrt[3]{27 \times {2}^{3} }$

$\sqrt[3]{27} \times \sqrt[3]{ {2}^{3} }$

$3 \times 2$

$6$

$\sqrt{25a^{2} }$

$\sqrt{25} \sqrt{ {a}^{2} }$

$5a$

$\sqrt[4]{16 {m}^{4} }$

$\sqrt[4]{16} \sqrt[4]{ {m}^{4} }$

$2m$

$\sqrt[3]{8 {n}^{3} }$

$\sqrt[3]{8} \sqrt[3]{ {n}^{3} }$

$2n$

$\sqrt[5]{32 \times {m}^{10} }$

$\sqrt[5]{32} \sqrt[5]{ {m}^{10} }$

$2 {m}^{2}$

$\sqrt{36 \times {6}^{2} }$

$\sqrt{36} \sqrt{ {6}^{2} }$

$6 \times 6$

$36$

$\sqrt[3]{25 \times 5}$

$\sqrt[3]{125}$

$5$