1. The problem asks for the range of the function $A(m)$ given certain options. 2. The range of a function is the set of all possible output values it can produce. 3. Since the options mention numbers from 0 to 7,200 with different conditions, we need to understand the nature of $A(m)$ to determine which set matches its outputs. 4. Without an explicit formula for $A(m)$, but given the options, we analyze each: - All whole numbers from 0 to 7,200 means every integer in that interval. - All real numbers from 0 to 7,200 means any number including decimals in that interval. - All multiples of 36 from 0 to 7,200 means numbers like $0, 36, 72, ..., 7200$. - All multiples of 200 from 0 to 7,200 means numbers like $0, 200, 400, ..., 7200$. 5. Since 7200 is divisible by both 36 and 200, the multiples sets are valid ranges if $A(m)$ outputs only those multiples. 6. Without more information, the best choice is the set of all multiples of 36 from 0 to 7,200, as it is a common divisor and fits the range. Final answer: The range of $A(m)$ is all multiples of 36 from 0 to 7,200.