A lawn care company charges a $10 trip fee plus $0.15 per square foot of x square feet of lawn for fertilization.
Which equation represents the relationship?
(1 point)
•x = 0.10y + 15
•y =0.15x + 10
•y= 10x + 0.15
• × = 10y + 0.15
The correct equation that represents the relationship is:
y = 0.15x + 10
The equation that represents the relationship is:
y = 0.15x + 10
In this equation, y represents the total cost of fertilization and x represents the square footage of the lawn. The $10 trip fee is represented by the constant term 10, and the $0.15 per square foot charge is represented by the coefficient 0.15.
To determine the equation that represents the relationship between the cost of fertilization and the square footage of the lawn, you need to understand the given information.
The lawn care company charges a $10 trip fee, which means that regardless of the size of the lawn (x), every customer will pay this fixed amount.
On top of that, they charge an additional fee of $0.15 per square foot. This means that for each square foot of lawn (x), there will be an additional cost of $0.15.
Combining the trip fee and the additional cost per square foot, we can write the equation:
y = 0.15x + 10
In this equation, y represents the cost of fertilization and x represents the square footage of the lawn. The trip fee of $10 is represented by the constant term of 10, and the cost per square foot of $0.15 is multiplied by x, the variable representing the square footage.
Therefore, the correct equation that represents the given relationship is:
y = 0.15x + 10
So, the answer is the second option: y = 0.15x + 10.