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The following formula is used in economics to find a factory's unit labor cost
U, where
O is the hourly output per worker and
W is the hourly compensation per worker.

U=(W)/(O)
Rearrange the formula to highlight the hourly output per worker.

O=◻

The following formula is used in economics to find a factory's unit labor cost $U$ , where $O$ is the hourly output per worker and $W$ is the hourly compensation per worker. $\newline$ $U=\frac{W}{O}$ $\newline$ Rearrange the formula to highlight the hourly output per worker. $\newline$ $O=\square$

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Write exponential functions: word problems

Full solution

Q. The following formula is used in economics to find a factory's unit labor cost

U

, where

O

is the hourly output per worker and

W

is the hourly compensation per worker.

\newline

U=\frac{W}{O}

\newline

Rearrange the formula to highlight the hourly output per worker.

\newline

O=\square

Rearrange formula for $O$ : To isolate $O$ , we need to rearrange the formula $U = \frac{W}{O}$ . We want to solve for $O$ , which means we need to get $O$ on one side of the equation by itself.
Multiply both sides: Multiply both sides of the equation by $O$ to get rid of the division by $O$ on the right side. This gives us $U \times O = W$ .
Divide by $U$ to isolate $O$ : Now, divide both sides of the equation by $U$ to isolate $O$ . This gives us $O = \frac{W}{U}$ .

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