Tonisha has a lemonade stand. She has $36 in expenses and wants to make at least $55 per day. If x represents the amount of revenue from selling lemonade, an inequality to represent the amount of revenue she would need to generate would be, then solve the inequality.
The inequality to represent the amount of revenue she would need to generate is:
x ≥ 36 + 55
To solve the inequality, we need to subtract 36 from both sides:
x - 36 ≥ 36 + 55 - 36
x - 36 ≥ 55
Simplifying further, we have:
x ≥ 91
So, Tonisha would need to generate at least $91 in revenue.
To represent an inequality for the amount of revenue Tonisha would need to generate, we can use the equation:
x - $36 ≥ $55
To solve this inequality, we will isolate the variable x by adding $36 to both sides:
x - $36 + $36 ≥ $55 + $36
x ≥ $91
Therefore, Tonisha would need to generate at least $91 in revenue from selling lemonade.
To represent the amount of revenue Tonisha would need to generate, we can set up an inequality. Let's use the variable x to represent the amount of revenue from selling lemonade.
Since she wants to make at least $55 per day, the inequality can be written as:
x ≥ 55
This inequality states that her revenue, represented by x, must be greater than or equal to $55.
To solve this inequality, we simply need to isolate the variable x. However, since we are dealing with real-world quantities, we must also consider additional constraints, such as the expenses.
Given that Tonisha has $36 in expenses, her revenue must not only be greater than or equal to $55, but also enough to cover the expenses. Therefore, the inequality can be written as:
x - 36 ≥ 55
To solve this inequality, we will isolate x:
x ≥ 55 + 36
x ≥ 91
Therefore, Tonisha would need to generate at least $91 in revenue to cover her expenses ($36) and make at least $55.