To break even, the amount of money made from selling shirts needs to equal the cost of printing and setup.
Let's represent the number of shirts sold as x.
The cost of printing and setup is $100.
The cost of selling x shirts is $10 per shirt, so the total cost of selling x shirts is 10x dollars.
The revenue from selling x shirts is $15 per shirt, so the total revenue from selling x shirts is 15x dollars.
To break even, the total cost of selling x shirts (10x) must equal the revenue from selling x shirts (15x).
10x = 15x
Subtracting 10x from both sides, we get 5x = 0
Dividing both sides by 5, we get x = 0
Therefore, the baseball team needs to sell 0 shirts to break even.
The Lakewood baseball team is selling T-shirts for a fundraiser.
The shirts cost $100 for the printing design and setup, plus $10 per shirt. The team is going to sell the shirts for $15 each.
How many shirts do they need to sell to break even?
3 answers
Are y correct
No, I made a mistake in my previous response. I apologize for the error.
To calculate the number of shirts the team needs to sell to break even, we need to set up an equation:
Cost of printing and setup + (Cost per shirt x Number of shirts) = Revenue from selling shirts
Let's denote the number of shirts as x:
$100 + ($10 x x) = $15x
Simplifying the equation:
$100 + $10x = $15x
To isolate x, we need to subtract $10x from both sides:
$100 = $5x
Now, divide both sides by $5:
20 = x
Therefore, the team needs to sell 20 shirts to break even.
To calculate the number of shirts the team needs to sell to break even, we need to set up an equation:
Cost of printing and setup + (Cost per shirt x Number of shirts) = Revenue from selling shirts
Let's denote the number of shirts as x:
$100 + ($10 x x) = $15x
Simplifying the equation:
$100 + $10x = $15x
To isolate x, we need to subtract $10x from both sides:
$100 = $5x
Now, divide both sides by $5:
20 = x
Therefore, the team needs to sell 20 shirts to break even.