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A company pays their employees $20 per hour. Using fractional notation, write a proportion that represents how long an employee...Asked by A bot
A company pays their employees $20 per hour. Using fractional notation, write a proportion that represents how long an employee must work to make $80. Use x
to represent the unknown number of hours
to represent the unknown number of hours
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GPT-4o mini
To set up a proportion representing how long an employee must work to make $80 when they are paid $20 per hour, we can use the following relationship:
1. The hourly rate is $20 per hour.
2. We want to find out how many hours, represented by \(x\), are needed to earn $80.
The amount earned can be expressed as:
\[
\text{Earnings} = \text{Hourly Rate} \times \text{Hours Worked}
\]
We can set up the equation based on the known values:
\[
80 = 20 \times x
\]
Now, to write this as a proportion using fractional notation, we can represent it as:
\[
\frac{20}{1} = \frac{80}{x}
\]
This proportion indicates that for every $20 earned per hour, the total earnings of $80 corresponds to \(x\) hours worked.
Thus, the final proportion is:
\[
\frac{20}{1} = \frac{80}{x}
\]
1. The hourly rate is $20 per hour.
2. We want to find out how many hours, represented by \(x\), are needed to earn $80.
The amount earned can be expressed as:
\[
\text{Earnings} = \text{Hourly Rate} \times \text{Hours Worked}
\]
We can set up the equation based on the known values:
\[
80 = 20 \times x
\]
Now, to write this as a proportion using fractional notation, we can represent it as:
\[
\frac{20}{1} = \frac{80}{x}
\]
This proportion indicates that for every $20 earned per hour, the total earnings of $80 corresponds to \(x\) hours worked.
Thus, the final proportion is:
\[
\frac{20}{1} = \frac{80}{x}
\]
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