Asked by Sunshine

To find the contractor with the lowest hourly rate, we need to analyze each equation given for the total cost, which is structured as:

\[ \text{Total Cost} = \text{Hourly Rate} \times \text{Hours Worked} + \text{Base Fee} \]

In this case, the structure of the equations for the four contractors is as follows:

A. Econo-Heights: \( 469.50 = 3x + 175 \)

B. Landscaping to the Heights: \( 469.50 = 6x + 75 \)

C. Mile High Landscaping: \( 469.50 = 4x + 150 \)

D. Mountain Air Yard Service: (not provided; we'll need to use only A, B, and C for comparison).

Let's solve for \( x \) (the hourly rate) in each case:

### A. Econo-Heights
1. Start with:
\( 469.50 = 3x + 175 \)
2. Subtract 175 from both sides:
\( 469.50 - 175 = 3x \)
\( 294.50 = 3x \)
3. Divide by 3:
\( x = \frac{294.50}{3} \)
\( x = 98.17 \) (approximately)

### B. Landscaping to the Heights
1. Start with:
\( 469.50 = 6x + 75 \)
2. Subtract 75 from both sides:
\( 469.50 - 75 = 6x \)
\( 394.50 = 6x \)
3. Divide by 6:
\( x = \frac{394.50}{6} \)
\( x = 65.75 \) (approximately)

### C. Mile High Landscaping
1. Start with:
\( 469.50 = 4x + 150 \)
2. Subtract 150 from both sides:
\( 469.50 - 150 = 4x \)
\( 319.50 = 4x \)
3. Divide by 4:
\( x = \frac{319.50}{4} \)
\( x = 79.875 \) (approximately)

### Summary of Hourly Rates
- Econo-Heights: \( x \approx 98.17 \)
- Landscaping to the Heights: \( x \approx 65.75 \)
- Mile High Landscaping: \( x \approx 79.875 \)

### Conclusion
Landscaping to the Heights has the lowest hourly rate at approximately \( 65.75 \) dollars per hour.

The contractor with the lowest hourly rate is **Landscaping to the Heights**, with an approximate hourly rate of **$65.75**.