A diner makes vanilla milkshakes and chocolate milkshakes. The vanilla milkshake machine has a 300-cup capacity, and sells 15 cups per day. The chocolate milkshake machine has a 280-cup capacity, and sells 20 cups per day. Write an equation to show when the two machines will have the same amount of milkshake left. Use x as your variable.(1 point)

To model the situation where both the vanilla milkshake machine and the chocolate milkshake machine will have the same amount of milkshake left, we can create an equation.

Let \( x \) represent the number of days that have passed.

For the vanilla milkshake machine:

• Capacity = 300 cups
• Sells 15 cups per day

The amount of vanilla milkshake left after \( x \) days is given by: \[ 300 - 15x \]

For the chocolate milkshake machine:

• Capacity = 280 cups
• Sells 20 cups per day

The amount of chocolate milkshake left after \( x \) days is given by: \[ 280 - 20x \]

To find when the two machines will have the same amount of milkshake left, we set the two expressions equal to each other: \[ 300 - 15x = 280 - 20x \]

This is the equation that shows when the two machines will have the same amount of milkshake left.