$$ \begin{array}{l} ext { Aplica las propledades de.la radicación para simplificar } \ ext { los slgulentes radicales. } \ ext { 25. } \sqrt{(-7)^{2}}\end{array} $$ 33. $$ \left.3 \sqrt[3]{-27 y^{-6} x^{9}} ight) ~ \begin{array}{ll} ext { 26. } \sqrt[5]{15.625 m^{10} n^{15}} & ext { 34. } 10 \sqrt{64 x^{10} y^{8} z^{6}} \ ext { 27. } \sqrt[3]{\frac{27 b^{12}}{y^{8}}} & ext { 35. } \frac{\sqrt{12 a^{4} b^{6}}}{\sqrt{3 b^{2}}} \ ext { 28. } \frac{\sqrt[4]{256 \sqrt{256 n^{8}}}}{\sqrt{n^{36}}} & ext { 36. } \sqrt[4]{\sqrt{\frac{1}{512^{16} y^{24} z^{32}}}} \ ext { 29. } \sqrt{x^{2} \sqrt[3]{64 a^{15} y^{6}}} & ext { 37. } 4 \sqrt[5]{-243\left(m^{9} n^{3} ight)^{20}} \ ext { 30. } \sqrt[3]{-729 p^{6} q^{9}} & ext { 38. } \sqrt[3]{\sqrt[3]{64 a^{24} b^{30} c^{216}}} \ ext { 32. } \frac{\sqrt[4]{a^{8} \sqrt{b^{12} c^{16} n^{40}}}}{a^{8} b^{10} \sqrt{n^{20} c^{30}}} & ext { 39. } \sqrt[4]{\sqrt{\left(\frac{y^{51} z^{4}}{a b} ight) \cdot \frac{a^{9}}{y^{3} z}}}\end{array} $$

Question

$$ \begin{array}{l}	ext { Aplica las propledades de.la radicación para simplificar } \ 	ext { los slgulentes radicales. } \ 	ext { 25. } \sqrt{(-7)^{2}}\end{array} $$ 33. $$ \left.3 \sqrt[3]{-27 y^{-6} x^{9}}ight) ~ \begin{array}{ll}	ext { 26. } \sqrt[5]{15.625 m^{10} n^{15}} & 	ext { 34. } 10 \sqrt{64 x^{10} y^{8} z^{6}} \ 	ext { 27. } \sqrt[3]{\frac{27 b^{12}}{y^{8}}} & 	ext { 35. } \frac{\sqrt{12 a^{4} b^{6}}}{\sqrt{3 b^{2}}} \ 	ext { 28. } \frac{\sqrt[4]{256 \sqrt{256 n^{8}}}}{\sqrt{n^{36}}} & 	ext { 36. } \sqrt[4]{\sqrt{\frac{1}{512^{16} y^{24} z^{32}}}} \ 	ext { 29. } \sqrt{x^{2} \sqrt[3]{64 a^{15} y^{6}}} & 	ext { 37. } 4 \sqrt[5]{-243\left(m^{9} n^{3}ight)^{20}} \ 	ext { 30. } \sqrt[3]{-729 p^{6} q^{9}} & 	ext { 38. } \sqrt[3]{\sqrt[3]{64 a^{24} b^{30} c^{216}}} \ 	ext { 32. } \frac{\sqrt[4]{a^{8} \sqrt{b^{12} c^{16} n^{40}}}}{a^{8} b^{10} \sqrt{n^{20} c^{30}}} & 	ext { 39. } \sqrt[4]{\sqrt{\left(\frac{y^{51} z^{4}}{a b}ight) \cdot \frac{a^{9}}{y^{3} z}}}\end{array} $$

UpStudy AI · Accepted Answer

Vamos a simplificar cada uno de los radicales que has proporcionado, aplicando las propiedades de la radicación.

### 25. $$ \sqrt{(-7)^{2}} $$

Para simplificar:

$$
\sqrt{(-7)^{2}} = \sqrt{49} = 7
$$

### 26. $$ \sqrt[5]{15.625 m^{10} n^{15}} $$

Primero, notamos que $$ 15.625 = 5^{4} $$. Entonces:

$$
\sqrt[5]{15.625 m^{10} n^{15}} = \sqrt[5]{5^{4}} \cdot \sqrt[5]{m^{10}} \cdot \sqrt[5]{n^{15}} = 5^{\frac{4}{5}} \cdot m^{\frac{10}{5}} \cdot n^{\frac{15}{5}} = 5^{\frac{4}{5}} \cdot m^{2} \cdot n^{3}
$$

### 27. $$ \sqrt[3]{\frac{27 b^{12}}{y^{8}}} $$

Simplificamos:

$$
\sqrt[3]{\frac{27 b^{12}}{y^{8}}} = \frac{\sqrt[3]{27} \cdot \sqrt[3]{b^{12}}}{\sqrt[3]{y^{8}}} = \frac{3 \cdot b^{4}}{y^{\frac{8}{3}}}
$$

### 28. $$ \frac{\sqrt[4]{256 \sqrt{256 n^{8}}}}{\sqrt{n^{36}}} $$

Primero simplificamos el numerador:

$$
\sqrt[4]{256 \sqrt{256 n^{8}}} = \sqrt[4]{256 \cdot 16 \cdot n^{4}} = \sqrt[4]{4096 n^{4}} = \sqrt[4]{(64)^{2} n^{4}} = 64^{\frac{1}{2}} n^{1} = 8n
$$

Ahora el denominador:

$$
\sqrt{n^{36}} = n^{18}
$$

Por lo tanto:

$$
\frac{8n}{n^{18}} = 8n^{-17}
$$

### 29. $$ \sqrt{x^{2} \sqrt[3]{64 a^{15} y^{6}}} $$

Simplificamos:

$$
\sqrt{x^{2} \sqrt[3]{64 a^{15} y^{6}}} = \sqrt{x^{2}} \cdot \sqrt{\sqrt[3]{64 a^{15} y^{6}}} = x \cdot \sqrt[6]{64 a^{15} y^{6}} = x \cdot \sqrt[6]{(4)^{3} a^{15} y^{6}} = x \cdot 4^{\frac{1}{2}} a^{\frac{5}{2}} y^{1} = 2x a^{\frac{5}{2}} y
$$

### 30. $$ \sqrt[3]{-729 p^{6} q^{9}} $$

Simplificamos:

$$
\sqrt[3]{-729 p^{6} q^{9}} = -9 p^{2} q^{3}
$$

### 32. $$ \frac{\sqrt[4]{a^{8} \sqrt{b^{12} c^{16} n^{40}}}}{a^{8} b^{10} \sqrt{n^{20} c^{30}}} $$

Primero simplificamos el numerador:

$$
\sqrt[4]{a^{8} \sqrt{b^{12} c^{16} n^{40}}} = \sqrt[4]{a^{8} b^{6} c^{8} n^{20}} = a^{2} b^{\frac{3}{2}} c^{2} n^{5}
$$

Ahora el denominador:

$$
a^{8} b^{10} \sqrt{n^{20} c^{30}} = a^{8} b^{10} n^{10} c^{15}
$$

Por lo tanto:

$$
\frac{a^{2} b^{\frac{3}{2}} c^{2} n^{5}}{a^{8} b^{10} n^{10} c^{15}} = a^{-6} b^{-\frac{17}{2}} n^{-5} c^{-13}
$$

### 33. $$ 3 \sqrt[3]{-27 y^{-6} x^{9}} $$

Simplificamos:

$$
3 \sqrt[3]{-27 y^{-6} x^{9}} = 3 \cdot (-3) \cdot y^{-2} \cdot x^{3} = -9 x^{3} y^{-2}
$$

### 34. $$ 10 \sqrt{64 x^{10} y^{8} z^{6}} $$

Simplificamos:

$$
10 \sqrt{64 x^{10} y^{8} z^{6}} = 10 \cdot 8 \cdot x^{5} \cdot y^{4} \cdot z^{3} = 80 x^{5} y^{4} z^{3}
$$

### 35. $$ \frac{\sqrt{12 a^{4} b^{6}}}{\sqrt{3 b^{2}}} $$

Simplificamos:

$$
\frac{\sqrt{12 a^{4} b^{6}}}{\sqrt{3 b^{2}}} = \frac{2 \sqrt{3} a^{2} b^{3}}{\sqrt{3} b} = 2 a^{2} b^{2}
$$

### 36. $$ \sqrt[4]{\sqrt{\frac{1}{512^{16} y^{24} z^{32}}}} $$

Simplificamos:

$$
\sqrt[4]{\sqrt{\frac{1}{(2^{9})^{16} y^{24} z^{32}}}} = \sqrt[4]{\frac{1}{2^{144} y^{24} z^{32}}} = \frac{1}{2^{36} y^{6} z^{8}}
$$

### 37. $$ 4 \sqrt[5]{-243\left(m^{9} n^{3}\right)^{20}} $$

Simplificamos:

$$
4 \sqrt[5]{-243 m^{180} n^{60}} = 4 \cdot (-3) m^{36} n^{12} = -12 m^{36} n^{12}
$$

### 38. $$ \sqrt[3]{\sqrt[3]{64 a^{24} b^{30} c^{216}}} $$

Simplificamos:

\[
\sqrt[3]{\
Aquí tienes la simplificación de los radicales proporcionados: 1. $$ \sqrt{(-7)^{2}} = 7 $$ 2. $$ \sqrt[5]{15.625 m^{10} n^{15}} = 5^{\frac{4}{5}} \cdot m^{2} \cdot n^{3} $$ 3. $$ \sqrt[3]{\frac{27 b^{12}}{y^{8}}} = \frac{3 \cdot b^{4}}{y^{\frac{8}{3}}} $$ 4. $$ \frac{\sqrt[4]{256 \sqrt{256 n^{8}}}}{\sqrt{n^{36}}} = 8n^{-17} $$ 5. $$ \sqrt{x^{2} \sqrt[3]{64 a^{15} y^{6}}} = 2x a^{\frac{5}{2}} y $$ 6. $$ \sqrt[3]{-729 p^{6} q^{9}} = -9 p^{2} q^{3} $$ 7. $$ \frac{\sqrt[4]{a^{8} \sqrt{b^{12} c^{16} n^{40}}}}{a^{8} b^{10} \sqrt{n^{20} c^{30}}} = a^{-6} b^{-\frac{17}{2}} n^{-5} c^{-13} $$ 8. $$ 3 \sqrt[3]{-27 y^{-6} x^{9}} = -9 x^{3} y^{-2} $$ 9. $$ 10 \sqrt{64 x^{10} y^{8} z^{6}} = 80 x^{5} y^{4} z^{3} $$ 10. $$ \frac{\sqrt{12 a^{4} b^{6}}}{\sqrt{3 b^{2}}} = 2 a^{2} b^{2} $$ 11. $$ \sqrt[4]{\sqrt{\frac{1}{512^{16} y^{24} z^{32}}}} = \frac{1}{2^{36} y^{6} z^{8}} $$ 12. $$ 4 \sqrt[5]{-243\left(m^{9} n^{3}\right)^{20}} = -12 m^{36} n^{12} $$ 13. $$ \sqrt[3]{\sqrt[3]{64 a^{24} b^{30} c^{216}}} = \sqrt[3]{4 a^{8} b^{10} c^{72}} $$ Estos son los resultados simplificados de cada radical aplicando las propiedades de la radicación.

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