Question

What is p(t)=-log_10(t)^.5 in exponential form

asked Aug 24, 2020 99.4k views

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Matthew Murdoch · Answer 1 · 2020-08-31T11:43:45+0000

Answer:

$10^(-p\left(t\right))=t^(\left(0.5\right))$

Explanation:

Given equation is
$p\left(t\right)=-\log_(10)t^\left(0.5\right)$

Now question says to write that in exponential form.

So we can use the following conversion formula:

$\log_ca=b\ \Rightarrow c^b=a$

$p\left(t\right)=-\log_(10)t^\left(0.5\right)$

$-p\left(t\right)=\log_(10)t^\left(0.5\right)$

$\log_(10)t^\left(0.5\right)=-p\left(t\right)$

Apply conversion formula

$p\left(t\right)=-\log_(10)t^\left(0.5\right)\ \Rightarrow 10^(-p\left(t\right))=t^(\left(0.5\right))$

$10^(-p\left(t\right))=t^(\left(0.5\right))$

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