Use $v$ for the number of visits. How can you combine the fixed signup fee and the per-visit charge into a single expression that represents Paula's total cost for the month?

When a word problem says someone can spend "at most" a certain amount, what inequality symbol should you use, and how should Paula's total cost be related to 100 dollars?

In Desmos, type y = 25 + 10x to represent Paula's total cost (y) when she makes $x$ visits in a month.

On a new line, type y = 100 to represent Paula's maximum allowed spending as a horizontal line.

Look at where the line $y = 25 + 10x$ is at or below the line $y = 100$; those $x$-values show the number of visits that keep the cost within the budget. Now write an inequality that says the total cost expression $25+10v$ is not more than 100 dollars.

There is a fixed signup fee of 25 dollars that Paula pays no matter what, and she also pays 10 dollars for each visit. If $v$ is the number of visits, then the total cost is the fixed fee plus the per-visit cost: $25+10v$.

The words "at most" mean the quantity can be less than or equal to a number, but not more. So if Paula can spend at most 100 dollars, her total cost must satisfy "total cost $\le 100$".

Substitute the expression for total cost into the inequality from step 2: since the total cost is $25+10v$ and it must be at most 100, we get $25+10v\le 100$. This matches choice B, so the correct inequality is $25+10v\le 100$.