Decide which of the two given prices is better and explain why. Storage locker A rents for \( \frac{\$ 32}{y d^{2}} \) per month. Storage locker B rents for \( \frac{\$ 2.13}{f t^{2}} \) per week. (Assume 1 month \( =4 \) weeks.) Click here to view the USCS measurements. Click here to view the USCS to Metric conversions.

To determine which storage locker is better, we need to compare the prices of both lockers. Storage locker A rents for \( \frac{\$ 32}{y d^{2}} \) per month. Storage locker B rents for \( \frac{\$ 2.13}{f t^{2}} \) per week. First, let's convert the prices to a common unit for comparison. Since we are comparing monthly prices, we will convert the weekly price of storage locker B to a monthly price. Given that 1 month = 4 weeks, the monthly price of storage locker B can be calculated as: \[ \text{Monthly price of B} = \frac{\$ 2.13}{f t^{2}} \times 4 \] Now, we can compare the prices of both storage lockers to determine which one is better. Calculate the value by following steps: - step0: Calculate: \(2.13\times 4\) - step1: Multiply the numbers: \(8.52\) The monthly price of storage locker B is \( \$8.52 \) per month. Now, we can compare the prices of both storage lockers: - Storage locker A rents for \( \frac{\$ 32}{y d^{2}} \) per month. - Storage locker B rents for \( \$8.52 \) per month. Since \( \$8.52 \) is less than \( \$32 \), storage locker B is the better option.