Tonisha has a lemonade stand. She has $30 in expenses and wants to make at least $65 per day. If x represents the amount of revenue from selling lemonade, write and solve an inequality to represent the amount of revenue she would need to generate.

Her revenue needs to be at least $65 per day, so the inequality is:
x - 30 ≥ 65
Adding 30 to both sides of the inequality, we get:
x ≥ 95
So she would need to generate at least $95 in revenue to meet her goal. Answer: \boxed{95}.

answer?

The answer is $95. Tonisha would need to generate at least $95 in revenue.

Lamont has purchased 25 trading cards and wants to have at most 60 trading cards. Write and solve an inequality to find the number of trading cards Lamont needs.

Letting x represent the number of additional trading cards Lamont needs, the inequality is:

25 + x ≤ 60

Subtracting 25 from both sides of the inequality, we get:

x ≤ 35

So Lamont needs at most 35 additional trading cards.

answer

Lamont needs at most 35 additional trading cards.

as an equation

25 + x = 60

A bounce house rental company A charges a fixed amount of $30 plus $5 per hour for renting a bounce house. Company B charges a fixed amount of $10 plus $15 per hour for renting a bounce house. Write and solve an inequality representing the number of hours where Option A will be the cheaper rental company. Let x represent the number of hours.

For Company A, the cost per hour is $5x, where x is the number of hours.
For Company B, the cost per hour is $15x.

We want to find the number of hours where Company A will be the cheaper rental company. This means the cost for Company A should be less than the cost for Company B.

The inequality representing this is:
30 + 5x < 10 + 15x

Now, let's solve the inequality:

30 + 5x < 10 + 15x

Subtract 5x from both sides:
30 < 10 + 10x

Subtract 10 from both sides:
20 < 10x

Divide by 10:
2 < x

So, the number of hours where Company A will be the cheaper rental company is when x is greater than 2.