Problem

$b$ varies inversely as $c$. If $b=4$ when $c=8$, find $b$ when $c$ is 5 .
\[
b=
\]

Answer

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Answer

Final Answer: \(\boxed{6.4}\)

Steps

Step 1 :The problem states that $b$ varies inversely as $c$. This means that the product of $b$ and $c$ is a constant. We can write this relationship as $bc=k$, where $k$ is the constant of variation.

Step 2 :We can find the value of $k$ using the given values of $b$ and $c$. Given that $b=4$ when $c=8$, we can substitute these values into the equation $bc=k$ to get $k=4*8=32$.

Step 3 :Now that we have $k$, we can find the value of $b$ when $c$ is 5. We substitute $k=32$ and $c=5$ into the equation $bc=k$ to get $b=\frac{k}{c}=\frac{32}{5}=6.4$.

Step 4 :Final Answer: \(\boxed{6.4}\)

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