How do you solve $1/ sqrt 8 = 4^(m – 2)$ ?

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How do you solve $1/ sqrt 8 = 4^(m – 2)$ ?

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Answer 1 · 2016-02-14T09:52:41

The answer is $m=1 1/4$

Explanation:

When solving exponential equations (or inequalities) first you have to find a suitable common base. In this case it would be $2$ because $8=2^3$ and $4=2^2$ .

Now you have to write the equation using calculated base:

$1/sqrt(2^3)=2^(2*(m-2))$

Now you can use the property of powers which says that $root(n)(a)=a^(1/n)$

$1/2^(3/2)=2^(2m-4)$

Next property to use is: $1/(a^x)=a^(-x)$

$2^(-3/2)=2^(2m-4)$

Now since we have the equality of 2 powers with equal base we can write it as the equality of exponents:

$-3/2=2m-4$

$2m=4-3/2$

$2m=2 1/2$

$2m=5/2$

$m=5/4=1 1/4$

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How do you solve $1/ sqrt 8 = 4^(m – 2)$ ?

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How do you solve 1/ sqrt 8 = 4^(m – 2)1/ sqrt 8 = 4^(m – 2)?

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How do you solve $1/ sqrt 8 = 4^(m – 2)$ ?