A yoga studio has two participation plans. The first plan costs $20 per visit. The second plan costs $30 per month and $ 4 per visit. How many visits woukd make the cost of both plans the same
Let's assume that the number of visits that would make the cost of both plans the same is represented by the variable "x".
For the first plan, the cost is $20 per visit. Therefore, the total cost for "x" visits is 20x.
For the second plan, the cost is $30 per month plus $4 per visit. Therefore, the total cost for "x" visits is 30 + 4x.
To find the number of visits that make the cost of both plans the same, we can set up an equation and solve for "x".
20x = 30 + 4x
Subtracting 4x from both sides of the equation:
16x = 30
Dividing both sides of the equation by 16:
x = 30 / 16
Simplifying:
x ≈ 1.875
Therefore, it would take approximately 1.875 visits to make the cost of both plans the same.
To find the number of visits that would make the cost of both plans the same, we need to equate the costs of both plans.
Let's denote the number of visits as 'x'.
Cost of the first plan = $20 per visit
Cost of the second plan = $30 per month + $4 per visit
Let's set up the equation:
20x = 30 + 4x
Simplifying the equation:
20x - 4x = 30
16x = 30
x = 30/16
x ≈ 1.875
Since we cannot have a fractional number of visits, we can conclude that you would need to make 2 visits to make the cost of both plans the same.
To find the number of visits that would make the cost of both plans the same, we need to set up an equation.
Let's assume the number of visits is 'x'.
For the first plan, the cost per visit is $20. So the cost of the first plan would be 20x.
For the second plan, there is a monthly fee of $30 and an additional cost of $4 per visit. So the cost of the second plan would be 30 + 4x.
Now we can set up the equation:
20x = 30 + 4x
To solve this equation, isolate the variable by subtracting 4x from both sides:
20x - 4x = 30
Combine like terms:
16x = 30
Now divide both sides by 16:
x = 30/16
Simplifying, we find:
x ≈ 1.875
Since we can't have a fraction of a visit, we can round up to the nearest whole number. Therefore, to make the cost of both plans the same, you would need to make 2 visits.