The seventh-grade band is going to sell baked goods at the craft show. The cost to rent a booth at the craft show is $60. The band plans to charge $1.50 per baked good.

We can start by setting up an equation to represent the situation:

Total Profit = Total Revenue - Total Cost

Let's use the variable "x" to represent the number of baked goods sold.

Total Revenue = 1.5x (since each baked good is sold for $1.50)

Total Cost = 60 (since that's the cost to rent the booth)

Now we can plug these into the equation:

Total Profit = 1.5x - 60

We want to know how many baked goods must be sold to make a profit of at least $200, so we can set up this inequality:

1.5x - 60 ≥ 200

Let's solve for x:

1.5x ≥ 260

x ≥ 173.333

Since we can't sell a fractional number of baked goods, we'll round up to the nearest whole number:

x = 174

Therefore, the answer is D. The band must sell at least 174 baked goods to make a profit of at least $200.