A baseball bat and baseballs cost $163.25. The bat costs \$106.45. . What is the cost of one baseball 163.25-8c=106.45;\$33.71 8c+106.45=163.25:\$7.10 8c+163.25=106.45:\$7.10 8c-106.45=163.25:\$3.71
If there are 8 baseballs, then
8c + 106.45 = 163.25
8c = 56.8
Now just divide by 8 to get c.
To solve this math problem, let's use algebra.
Let's assume the cost of one baseball is represented by the variable "c."
First, we know that the total cost of the baseball bat and baseballs is $163.25. So, we can write the equation:
106.45 + c = 163.25
Next, we can subtract 106.45 from both sides of the equation to isolate the variable c:
c = 163.25 - 106.45
Simplifying the equation:
c = 56.80
Therefore, the cost of one baseball is $56.80.