Write an inequality for the draining rate $r$ using "at least 12" and "no more than 15," then multiply every part of that inequality by 40 to get an inequality for the total amount drained $D$.

Once you know the range of the drained amount $D$, remember that the remaining volume $V$ is $1500 - D$. How does subtracting from 1,500 affect the inequality signs and the endpoints?

In two separate lines, type 1500 - 12*40 and 1500 - 15*40. These correspond to using the smallest and largest possible draining rates for the full 40 minutes.

Look at the two numerical results from Desmos: the smaller value is the minimum possible remaining volume, and the larger value is the maximum possible remaining volume. Write an inequality of the form min_value <= V <= max_value, using "<=" signs because the extreme rates (12 and 15 gallons per minute) are allowed.

Compare the inequality you wrote from the Desmos outputs with the four answer options and select the one whose lower and upper bounds, and inequality symbols, match your result.

The problem says the tank is drained at at least 12 gallons per minute and no more than 15 gallons per minute.

That means the draining rate $r$ (in gallons per minute) satisfies

The tank drains for 40 minutes, and the total amount drained $D$ is given by $D = r \cdot 40$.

Multiply the rate inequality by 40 to get the total drained $D$ in 40 minutes:

So the total amount of water drained satisfies

This means between 480 and 600 gallons of water are drained from the tank.

The tank starts with 1,500 gallons. If $D$ gallons are drained, the remaining volume $V$ is

We know $480 \le D \le 600$. Subtract this entire inequality from 1,500:

This simplifies to

So the possible remaining volumes $V$ after 40 minutes are given by the inequality $900 \le V \le 1{,}020$, which corresponds to choice B.