A skaing rink offers a 6 month pass for $30. what is the least number of times you would have to go there in 6 months to make the pass a better deal than paying $2 a visit

2x > 32

x > 16

2x = 32

x = 16

To determine the least number of times you would have to go to the skating rink to make the pass a better deal than paying $2 per visit, we need to compare the total cost of each option.

First, let's calculate the cost of paying $2 per visit:
The total number of visits, represented by 'x', multiplied by the cost per visit ($2), should be less than the cost of the pass ($30).
2x < 30

Next, let's calculate the cost of the pass:
Since the pass covers 6 months, it allows for unlimited visits during that time. Thus, the cost of the pass is fixed at $30.

Now, we can solve the inequality to find the least number of visits:
2x < 30

Divide both sides of the inequality by 2:
x < 15

Therefore, you would need to visit the skating rink less than 15 times in 6 months to make the pass a better deal than paying $2 per visit. To make it exactly equal, you will need to visit the skating rink 14 times or less.