Answer:
Hence, utilizing linear depreciation gives us 17222.22.
Step-by-step explanation:
The boat's initial value is noted to be $250,000.
The straight-line depreciation method for calculating a boat is as follows:
Cost of the boat is $250,000.
Deep Blue anticipates selling it for $95,000 after 9 years.
Employing the formula, we calculate:
(250000-95000)/9=155000/9=17222.22
Thus, the outcome using linear depreciation is 17222.22.
<span><span>Center coordinates: (x0, y0, z0)</span></span> and radius r.
<span>The equation of the sphere is:</span>
<span>(x - x0)^2 + (y - y0)^2 + (z - z0)^2 = r^2</span>
Conclusion:
Please refer to the explanation provided.
Detailed explanation:
Starting with these facts:
Total revenue = $250
Fee charged = $70 per car
Tips received = $50
Equation 1 representing the above:
(Fee per car × number of cars) + tips = total revenue
Let the number of cars be c.
Thus, we have:
$70c + $50 = $250
Part B:
Total revenue = $250
Fee charged = $75 per car
Tips received = $35
Supplies cost per car washed = $5
Equation 2:
(Fee per car × number of cars) + tips - (supplies cost × number of cars) = total revenue
$75c + $35 - $5c = $250
$70c + $35 = $250
Part C:
Equation 1 does not factor in costs associated with washing the car, while equation 2 does incorporate costs, which are deducted from the amount charged per car. Additionally, tips in equation 1 total $50 compared to a $35 fee in equation 2.
It is option A. Step-by-step explanation: I just completed the task successfully.
