Final answer:
To determine the total expenses and receipts for Trevor's Bakery to break even, the equations are expenses E = 98 + 8x and receipts R = 22x. Solving the equation 22x = 98 + 8x for x, we find that it takes 7 hours for the bakery to make back its investment, where both total expenses and receipts equal $154.
Step-by-step explanation:
To solve the problem presented, we will first establish two equations to represent the total expenses and receipts for Trevor's Bakery as a function of the number of hours the bakery operates. Let 'x' represent the number of hours the bakery operates.
Equation for Total Expenses:
The total expenses (E) consist of a one-time investment of $98 for new equipment and the hourly operating costs of $8. Hence, the equation for total expenses is:
E = 98 + 8x
Equation for Total Receipts:
The total receipts (R) are given by the hourly receipts of $22 times the number of hours the bakery operates:
R = 22x
To find when the bakery will make back its investment, we set the total receipts equal to the total expenses:
22x = 98 + 8x
Subtract 8x from both sides of the equation to solve for x:
22x - 8x = 98
14x = 98
Divide both sides by 14 to find x:
x = 7
It will take 7 hours for the total expenses and receipts to be equal. At that point, they both will equal:
Total Expenses = Total Receipts = 22 * 7 = $154