Step 1: Assign variable for the unknown
Let us try to identify the cost involved in each package. Let x be the number of people and y be the number of months.
Step 2: Identify expression for the given information
We need to write an expression to denote the total cost involved to join the gym and utilize the swimming pool for ' x ' number of people for 'y' number of months.
Statement 1: Package A has a one-time enrollment fee of $205.59 per person and a monthly fee of $39.63. There is also an optional $15.48 monthly fee for full access to the swimming pool.
So based on the statement 1
Cost for Package A = [205.59 + (39.63+15.48)y]x
Statement 2: Package B has a one-time enrollment fee of $185.64 per person and a monthly fee of $59.25. There is also an optional $22.38 monthly fee for full access to the swimming pool.
So based on the statement 2
Cost for Package B = [185.64 + (59.25+22.38)y]x
Step 3: Simplifying each expression
Package A = [205.59 + (39.63+15.48)y]x =[205.59+55.11y]x
Package B = [185.64 + (59.25+22.38)y]x = [185.64+81.63y]x
Step 4: Evaluate each expression
For a couple, Number of people (x) = 2, and for 5 years, Number of months (y) = 5 years × (12 month/year) = 60
We need to substitute 2 for x and 60 for y in the expression and see which package cost is lower to give the correct recommendation.
Package A: [205.59+55.11y]x = [205.59+55.11(60)]×2=$7024.38
Package B: [185.64+81.63y]x = [185.64+81.63(60)]×2=$10166.88
Conclusion:
Package A is cheaper than Package B. So we can conclude Package A is best for a couple who wants to join the gym and utilize the pool for five year.