A gym membership costs $20 per month plus $3 per visit. How many visits could you make in one month if you only had a budget of $45?
45 = 20 + 3x
Solve for x to find how many visits.
without algebra...
thing about subtracting 20 from 45 to get 25 then divided by 3 to get the number of visits.
Well, if a gym membership costs $20 per month plus $3 per visit, and you only have a budget of $45, we can do some quick math.
Let's say you make "x" visits in one month. Your total expense would be $20 (for the membership) plus $3 multiplied by "x" (for each visit).
So, our equation would be: $20 + $3x = $45.
To find out how many visits you can make, we need to solve for "x." Well, I'm not particularly fond of math, so let's make it fun.
If we imagine each visit to the gym as receiving a mini donut—I mean, a doughnut—then this equation represents finding out how many mini doughnuts you can have before emptying your wallet.
So, let's dig in! $20 (for the membership) + $3x (the cost of each visit) = $45 (our budget).
If we subtract $20 from both sides, we get $3x = $25.
Finally, if we divide both sides by $3, we find out that you can have x = 8.3333333333 visits, or rounded to the nearest whole number, 8 visits.
So, according to my whimsical calculations, you can have 8 mini doughnuts—uh, I mean gym visits—for $45. Enjoy your workouts, and may your abs be as chiseled as my wit!
To determine the number of visits you can make in one month with a budget of $45, you need to calculate the maximum number of visits that stays within your budget.
Let's denote the number of visits as "x".
From the given information, we know that the cost of a gym membership is $20 per month and $3 per visit.
So, the total cost of visiting the gym "x" times in one month can be calculated as:
Total cost = Cost of membership + (Cost per visit × Number of visits)
Total cost = $20 + ($3 × x)
We want to find the maximum number of visits within the budget of $45. So, we can set up an equation:
$45 = $20 + ($3 × x)
We can now solve this equation to find the value of "x".
First, subtract $20 from both sides of the equation:
$45 - $20 = $3 × x
$25 = $3 × x
To isolate "x", divide both sides of the equation by $3:
x = $25 ÷ $3
x ≈ 8.33
Since you cannot have a fraction of a visit, you will need to round down to the nearest whole number.
Therefore, you can make a maximum of 8 visits to the gym within a budget of $45.
To find the answer, we need to determine the maximum number of visits you can make within the given budget. Let's break down the costs:
The monthly fee for the gym membership is $20.
The cost per visit is an additional $3.
Let's assume you can make 'x' visits in one month.
The total cost for the gym membership in a month is the sum of the monthly fee and the cost per visit multiplied by the number of visits:
Total cost = $20 + ($3 * x)
We know that the total cost should not exceed your budget of $45:
$20 + ($3 * x) <= $45
To find the maximum number of visits within the budget, we can solve this inequality:
$3 * x <= $45 - $20
$3 * x <= $25
Dividing both sides of the inequality by $3, we get:
x <= $25 / $3
x <= 8.3333
Since you can't have a fraction of a visit, the maximum number of visits you can make within the budget is 8 visits.
Therefore, you can make a maximum of 8 visits in one month with a budget of $45.