Millie wants to take swimming lessons. She can purchase two different swim lesson packages. Package A is 20 lessons for $230. Package B is 15 lessons for $180. If Millie wants the better buy, which package should she choose? Show your work and explain why your choice is the better buy.(4 points)%0D%0ABoldItalicUnderlineIncrease indentDecrease indentFormula keypad
To determine which package is the better buy, we need to calculate the cost per lesson for each package.
For Package A:
Cost = $230
Number of lessons = 20
Cost per lesson = Cost / Number of lessons = $230 / 20 = $11.5 per lesson
For Package B:
Cost = $180
Number of lessons = 15
Cost per lesson = Cost / Number of lessons = $180 / 15 = $12 per lesson
Comparing the cost per lesson, we can see that Package A is the better buy as it has a lower cost per lesson ($11.5) compared to Package B ($12).
To determine which package is the better buy, we need to compare the cost per lesson for each package.
For Package A:
Cost = $230
Number of lessons = 20
Cost per lesson = Cost / Number of lessons
= $230 / 20
= $11.50 per lesson
For Package B:
Cost = $180
Number of lessons = 15
Cost per lesson = Cost / Number of lessons
= $180 / 15
= $12.00 per lesson
Based on the calculations, Package A has a lower cost per lesson ($11.50) compared to Package B ($12.00). Therefore, Millie should choose Package A as it offers a better buy in terms of cost per lesson.
To determine which package is the better buy, we need to calculate the cost per lesson for each package.
For Package A, Millie is purchasing 20 lessons for $230. To find the cost per lesson, we divide the total cost by the number of lessons: $230 divided by 20 = $11.50 per lesson.
For Package B, Millie is purchasing 15 lessons for $180. Again, we divide the total cost by the number of lessons: $180 divided by 15 = $12.00 per lesson.
Therefore, Package A is the better buy because it has a lower cost per lesson ($11.50) compared to Package B ($12.00).
By choosing Package A, Millie can save $0.50 per lesson compared to Package B, which can add up to a significant amount over the course of 20 lessons.