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Theatlasroom · Answer 1 · 2021-11-23T21:54:09+0000

Answer:

$f = \log_(4)\left(\sqrt{(m\cdot n)/(19)}\right)$ is equivalent to
$f = 0.5\cdot \log_(4) m + 0.5\cdot \log_(4)n -0.5\cdot \log_(4)19$ .

Explanation:

Let be
$f = \log_(4)\left(\sqrt{(m\cdot n)/(19)}\right)$ , we transform this into an equivalent expression with sums and differences of logarithms by applying logarithm properties:

1)
$\log_(4)\left(\sqrt{(m\cdot n)/(19)}\right)$ Given.

2)
$\log_(4)\left[\left((m\cdot n)/(19) \right)^(0.5)\right]$ Definition of square root.

3)
$0.5\cdot \log_(4)\left((m\cdot n)/(19) \right)$
$\log_(a) b^(c) = c\cdot \log_(a) b$

4)
$0.5\cdot (\log_(4)m\cdot n -\log_(4) 19)$
$\log_(a) (b)/(c) = \log_(a) b - \log_(a) c$

5)
$0.5\cdot \log_(4) m\cdot n -0.5\cdot \log_(4) 19$ Distributive property.

6)
$0.5\cdot (\log_(4)m + \log_(4)n)-0.5\cdot \log_(4)19$
$\log_(a) b\cdot c = \log_(a)b +\log_(a) c$

7)
$0.5\cdot \log_(4) m + 0.5\cdot \log_(4)n -0.5\cdot \log_(4)19$ Distributive property/Result.

$f = \log_(4)\left(\sqrt{(m\cdot n)/(19)}\right)$ is equivalent to
$f = 0.5\cdot \log_(4) m + 0.5\cdot \log_(4)n -0.5\cdot \log_(4)19$ .

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