Create an equation to show Sakeem's profit when laying sod, where [tex]y[/tex] is the profit and [tex]x[/tex] is the number of square feet of sod. Recall that profit is the difference between the amount earned and the amount spent.

Sakeem is a landscape architect. His supplier charges [tex]\$0.43[/tex] per square foot for sod. Sakeem charges his customers [tex]\$2.00[/tex] per square foot to lay the sod.

Drag each label to the correct location in the equation:

[tex]
\begin{array}{lllllll}
x^2 & y^2 & 2.00 & 0.43 & y & x & 1.57
\end{array}
[/tex]

Equation: [tex]y = 1.57x[/tex]

Where [tex]1.57 = 2.00 - 0.43[/tex], representing the profit per square foot.

To find the equation for Sakeem's profit when laying sod, let's break down the problem step by step:

1. Understand the Scenario:
- Sakeem's supplier charges [tex]$0.43 per square foot for sod.
- Sakeem charges his customers $[/tex]2.00 per square foot to lay the sod.

2. Define the Terms:
- Profit is defined as the difference between the amount earned and the amount spent.
- Let [tex]$ y $[/tex] be the profit.
- Let [tex]$ x $[/tex] be the number of square feet of sod.

3. Calculate the Profit per Square Foot:
- The amount Sakeem earns per square foot is [tex]$2.00.
- The amount Sakeem spends per square foot is $[/tex]0.43.
- The profit per square foot is calculated as:
[tex]\[
\text{Profit per square foot} = 2.00 - 0.43 = 1.57
\][/tex]

4. Create the Equation:
- Since profit varies directly with the number of square feet ([tex]$ x $[/tex]), you can express the total profit, [tex]$ y $[/tex], as:
[tex]\[
y = 1.57 \times x
\][/tex]

This equation [tex]$ y = 1.57x $[/tex] represents Sakeem's total profit when laying sod, where [tex]$ y $[/tex] is the profit and [tex]$ x $[/tex] is the number of square feet of sod laid. Each square foot of sod laid contributes $1.57 to the profit.