2 Answers

Brianpeiris · Answer 1 · 2022-03-26T03:02:50+0000

Answer:

x = y = - 2

Explanation:

Using the rule of radicals/ exponents

$a^{(m)/(n) }$ =
$\sqrt[n]{a^(m) }$ ,
a^(-m) =
(1)/(a^(m) ) ,
(a^m)^(n) =
a^(mn)

Given

$\sqrt[x]{4}$ =
(1)/(2) , then

$\sqrt[x]{2^(2) }$ =
(1)/(2)

$2^{(2)/(x) }$ =
2^(-1)

Since the bases on both sides are equal, both 2 , then equate exponents

(2)/(x) = - 1 ( multiply both sides by x )

2 = - x , that is

x = - 2

Similarly

$\sqrt[y]{9}$ =
(1)/(3) , then

$\sqrt[y]{3^(2) }$ =
(1)/(3)

$3^{(2)/(y) }$ =
3^(-1)

Equating the exponents gives

(2)/(y) = - 1 ⇒ - y = 2 ⇒ y = - 2

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