Asked by dofjkppermgokwerpgm;e

Let's start by defining some variables. Let's use "m" to represent the monthly fee.

We know that it costs $100 to join the fitness center, so the total cost for one year of membership can be represented as:

Total cost = $100 (one-time fee to join) + 12 months x monthly fee
Total cost = $100 + 12m

We also know that the total cost for one year of membership was $700, so we can set up an equation:

$700 = $100 + 12m

To solve for "m", we can start by subtracting $100 from both sides:

$700 - $100 = $100 - $100 + 12m
$600 = 12m

Finally, we can solve for "m" by dividing both sides by 12:

$600 / 12 = 12m / 12
$50 = m

Therefore, the monthly fee for the fitness center is $50.

Let's use "m" to represent the monthly fee.

The total amount spent on the fitness center in a year would be the sum of the one-time joining fee and the monthly fees for 12 months.

So, the equation can be written as:

100 + 12m = 700

Subtracting 100 from both sides:

12m = 600

Dividing both sides by 12:

m = 50

Therefore, the monthly fee for the fitness center is $50.

A. Let x be the amount of money that you can spend more. Then, we can write:

$5 - $2.25 ≤ x

Simplifying this inequality, we get:

$2.75 ≤ x

Therefore, the inequality that represents how much more money you can spend is x ≥ $2.75.

B. We don't need to solve the inequality, as it is already solved in part A. The answer is x ≥ $2.75.