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?(1 point)
Let's assume that the number of visits that would make the cost of both plans the same is x.
For the first plan, the cost per visit is $10, so the total cost for x visits would be 10x.
For the second plan, the monthly cost is $30, and the cost per visit is $4, so the total cost for x visits would be 30 + 4x.
To find the number of visits that would make the cost of both plans the same, we equate the total costs for both plans: 10x = 30 + 4x.
Simplifying the equation, we get: 6x = 30.
Dividing both sides of the equation by 6, we find: x = 5.
Therefore, 5 visits would make the cost of both plans the same. Answer: \boxed{5}.
A yoga studio has two participation plans. For the first plan, the cost is $8 per visit. For the second plan, the cost is $40 per month, and $2 per visit. Write an equation to show the number of visits per month that it would take for the two plans to be equal. Use x as your variable
Let's assume that the number of visits per month that would make the cost of both plans equal is x.
For the first plan, the cost is $8 per visit, so the total cost for x visits would be 8x.
For the second plan, the monthly cost is $40 and the cost per visit is $2, so the total cost for x visits would be 40 + 2x.
To find the number of visits per month that would make the cost of both plans equal, we equate the total costs for both plans:
8x = 40 + 2x.
Simplifying the equation, we get:
6x = 40.
Dividing both sides of the equation by 6, we find:
x = 40/6.
Therefore, the equation that represents the number of visits per month that would make the cost of both plans equal is:
x = 40/6.
To determine the number of visits that would make the cost of both plans the same, we need to set up an equation.
Let's assume "x" represents the number of visits.
For the first plan, the cost per visit is $10.
Therefore, the cost for "x" visits on the first plan would be 10x dollars.
For the second plan, there is a monthly fee of $30, and an additional cost of $4 per visit.
So the cost for "x" visits on the second plan would be 30 dollars plus 4x dollars.
To find the number of visits that would make the costs the same, we can set up the equation:
10x = 30 + 4x
Now, let's solve for "x":
10x - 4x = 30
6x = 30
Divide both sides of the equation by 6:
x = 30 / 6
x = 5
Therefore, 5 visits would make the cost of both plans the same.
To find out how many visits would make the cost of both plans the same, we need to set up an equation and solve for the number of visits.
Let's assume the number of visits is represented by the variable "x".
For the first plan which costs $10 per visit, the total cost would be 10x.
For the second plan which costs $30 per month plus $4 per visit, the total cost would be 30 + 4x.
To find the number of visits that make the cost of both plans the same, we need to set up the equation:
10x = 30 + 4x
Now, we can solve for x:
10x - 4x = 30
6x = 30
Divide both sides of the equation by 6:
x = 30/6
Simplifying, we get:
x = 5
Therefore, 5 visits would make the cost of both plans the same.