A yoga studio has two participation plans. The first plan costs $10 per visit. The second plan costs $30 per month, and $4 per visit. How many visits would make the cost of both plans the same
Let's assume that the number of visits is represented by "x".
For the first plan, the cost is simply $10 per visit.
For the second plan, the cost is $30 per month plus $4 per visit. So the total cost for "x" visits would be:
Total cost = $30 + $4x
To find out when the cost of both plans is the same, we need to set the two equations equal to each other and solve for "x":
$10x = $30 + $4x
Subtracting $4x from both sides, we get:
$6x = $30
Dividing both sides by 6, we get:
x = 5
Therefore, 5 visits would make the cost of both plans the same.
This is correct!
To find the number of visits that would make the cost of both plans the same, we can set up an equation.
Let's assume the number of visits is represented by 'x'.
For the first plan, the cost per visit is $10, so the total cost would be 10x.
For the second plan, the cost per visit is $4, and the monthly cost is $30. So, the total cost would be 4x + 30.
To make the costs of both plans equal, we can set up the equation:
10x = 4x + 30
Now, let's solve the equation to find the value of x.
10x - 4x = 30
6x = 30
x = 30/6
x = 5
Therefore, 5 visits would make the cost of both plans the same.
To find how many visits would make the cost of both plans the same, we can set up an equation.
Let's assume the number of visits is denoted by "x".
For the first plan, the cost per visit is $10. So, the cost of x visits under the first plan is 10x dollars.
For the second plan, there is a fixed monthly cost of $30 regardless of the number of visits. In addition, there is a charge of $4 per visit. So, the total cost of x visits under the second plan is 30 + 4x dollars.
To determine when the cost of both plans is the same, we can equate the two expressions:
10x = 30 + 4x
Now, let's solve this equation:
10x - 4x = 30
6x = 30
Dividing both sides of the equation by 6:
x = 30 / 6
x = 5
Therefore, when you attend 5 visits, the cost under both plans will be the same.