Final answer:
The Wildwood Country Club ordered 50 dozens of each brand of golf balls, with each Swinger ball costing $2.00 and each Par One ball costing $0.90, where the total cost difference was $660.00. To determine this, we set up an equation based on the cost per ball and the given total cost difference, solving for the number of balls ordered.
Step-by-step explanation:
The student has asked to calculate the number of dozens of each brand of golf balls ordered, given that Swinger balls cost $2.00 each, Par One balls cost $0.90 each, and an equal number of each brand was ordered. The total cost difference between the two types was $660.00 favoring Swinger balls. We need to set up an equation to represent this situation.
Step by Step Explanation
1. Let's denote the number of Swinger balls ordered as x and the number of Par One balls as x since the quantity is equal.
2. The total cost of Swinger balls is 2x dollars, and the total cost of Par One balls is 0.9x dollars.
3. According to the given information, 2x - 0.9x = 660.
4. Solve the equation: 1.1x = 660.
5. Dividing both sides by 1.1, we find x = 600. Thus, 600 Swinger balls and 600 Par One balls were ordered.
6. To convert the quantity to dozens, we divide by 12 since a dozen is equivalent to 12 items. Therefore, 600 / 12 = 50 dozens of each brand were ordered.
The pro shop at the Wildwood Country Club ordered 50 dozens of each brand of golf balls.