Final answer:
To answer the question about P($100), specific details about the provided problem or scenario are needed, as the current information is too fragmented. P(~$0) suggests the probability of not having $0, but context is crucial for a precise calculation.
Step-by-step explanation:
To find P($100), we must understand the context. It seems like we're dealing with a situation where we need to calculate a probability or solve an equation related to money. Unfortunately, the given information is fragmented and does not provide a clear scenario or formula for P($100). However, in probability, finding P(~$0) usually refers to the probability of not having $0. To assist further, we'd need specific details about the problem's context, such as a description of a random event or a financial model we are analyzing.
Regarding the other pieces of information provided, they seem irrelevant to the calculation of P($100) without further context. For example, in a binomial probability case, P(x = 2) would refer to the probability of exactly 2 successes in a given number of trials, but again, this isn't applicable without additional information.