Question

Calcule ( não consegui digitar tudo)

Answer 1

Oie, tudo bom?

a)

$= \sqrt[3]{3375} \\ = \sqrt[3]{15 {}^{3} } \\ \boxed{ = 15}$

b)

$= \sqrt[4]{4096} \\ = \sqrt[4]{8 {}^{4} } \\ \boxed{ = 8}$

c)

$= 5 \sqrt{196} \\ = 5 \: . \: \sqrt{14 {}^{2} } \\ = 5 \: . \: 14 \\ \boxed{ = 70}$

d)

$= - 3 \sqrt{324} \\ = - 3 \: . \: \sqrt{18 {}^{2} } \\ = - 3 \: . \: 18 \\ \boxed{ = - 54}$

e)

$= 4 \sqrt[3]{216} \\ = 4 \: . \: \sqrt[3]{6 {}^{3} } \\ = 4 \: . \: 6 \\ \boxed{ = 24}$

f)

$= \sqrt[3]{2 {}^{6} \: . \: 3 {}^{6} \: . \: 5 {}^{3} } \\ = \sqrt[3]{2 {}^{6} } \sqrt[3]{3 {}^{6} } \sqrt[3]{5 {}^{3} } \\ = 2 {}^{2} \: . \: 3 {}^{2} \: . \: 5 \\ = 4 \: . \: 9 \: . \: 5 \\ = 20 \: . \: 9 \\ \boxed{ = 180}$

Att. NLE Top Shotta

Answer 2

Explicação passo-a-passo:

A

$\sqrt[3]{3375}$

$\sqrt[3]{15 {}^{3} }$

$15$

B

$\sqrt[4]{4096}$

$\sqrt[4]{8 {}^{4} }$

$8$

C

$5 \sqrt{196}$

$5 \sqrt{14 {}^{2} }$

$5 \times 14$

$70$

D

$- 3 \sqrt{324}$

$- 3 \sqrt{18 {}^{2} }$

$- 3 \times 18$

$- 54$

E

$4 \sqrt[3]{216}$

$4 \sqrt[3]{6 {}^{3} }$

$4 \times 6$

$24$

F

$\sqrt[3]{2 {}^{6} \times 3 {}^{6} \times 5 {}^{3} }$

$2 {}^{2} \times 3 {}^{2} \times 5$

$4 \times 9 \times 5$

$36 \times 5$

$180$