1 Answer

MikeN · Answer 1 · 2021-06-18T13:14:22+0000

Answer:

$((32)/(243))^{-(4)/(5)}=39.0625$

Explanation:

Given

$((32)/(243))^{-(4)/(5)}$

Required

Solve

$((32)/(243))^{-(4)/(5)}$

Express 32 as 2^5 and 243 as 3^5

$((2^5)/(3^5))^{-(4)/(5)}$

The exponent can be expressed as 1\5 * -4

So we have:

$((2^5)/(3^5))^{(1)/(5) * -4}$

Apply law of indices:

((2^(5*1/5))/(5^(5*1/5)))^(-4)

((2)/(5))^(-4)

In indices:

((a)/(b))^(-c) = ((b)/(a))^(c)

So, the expression becomes

((5)/(2))^(4)

((5^(4))/(2^(4)))

(625)/(16)

39.0625

Hence:

$((32)/(243))^{-(4)/(5)}=39.0625$

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