How do you simplify ${(27 p^{6})}^{\frac{5}{3}}$ $(27p^6)^(5/3)$ ?

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How do you simplify ${(27 p^{6})}^{\frac{5}{3}}$ $(27p^6)^(5/3)$ ?

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Answer 1 · 2017-09-09T01:50:41

See a solution process below:

Explanation:

First, rewrite the expression as:

${(3^{3} p^{6})}^{\frac{5}{3}}$ $(3^3p^6)^(5/3)$

Now, use this rule of exponents to simplify the expression:

${(x^{a})}^{b} = x^{a \times b}$ $(x^color(red)(a))^color(blue)(b) = x^(color(red)(a) xx color(blue)(b))$

${(3^{3} p^{6})}^{\frac{5}{3}} \Rightarrow 3^{3 \times \frac{5}{3}} 9^{6 \times \frac{5}{3}} \Rightarrow 3^{\frac{15}{3}} p^{\frac{30}{3}} \Rightarrow 3^{5} p^{10} \Rightarrow$ $(3^color(red)(3)p^color(red)(6))^color(blue)(5/3) => 3^(color(red)(3) xx color(blue)(5/3))9^(color(red)(6) xx color(blue)(5/3)) => 3^(15/3)p^(30/3) => 3^5p^10 =>$

$243 p^{10}$ $243p^10$

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How do you simplify ${(27 p^{6})}^{\frac{5}{3}}$ $(27p^6)^(5/3)$ ?

1 Answer

Explanation:

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