Answer:
The linear equation that models the monthly cost is [tex]y = 18.57+0.12366\cdot x[/tex], for [tex]0\,kWh \leq x \geq 500\,kWh[/tex].
Step-by-step explanation:
We notice that total fee is the sum of two components:
1) Fixed cost ([tex]C_{f}[/tex]) - Charge for billing, anti-litter, drainage and transportation.
2) Variable cost ([tex]C_{v}[/tex]) - Cost as a function of electricity consumption.
All costs are given in US dollars (USD). Mathematically, the formula is described below:
[tex]C_{T} = C_{f}+C_{v}[/tex]
Where [tex]C_{T}[/tex] is the total cost, measured in USD.
Now, we expand the formula as follows:
[tex]C_{T} = y[/tex]
[tex]C_{f} = 18.57\,USD[/tex]
[tex]C_{v} = \left(0.12366\,\frac{USD}{kWh} \right)\cdot x[/tex], for [tex]0\,kWh \leq x \geq 500\,kWh[/tex]
Where:
[tex]y[/tex] - Total bill for one month, measured in USD.
[tex]x[/tex] - Quantity of kWh used in one month, measured in kilowatt-hours.
Then,
[tex]y = 18.57+0.12366\cdot x[/tex], for [tex]0\,kWh \leq x \geq 500\,kWh[/tex].
The linear equation that models the monthly cost is [tex]y = 18.57+0.12366\cdot x[/tex], for [tex]0\,kWh \leq x \geq 500\,kWh[/tex].
