Can you explain why lim x → ∞ A(t) exists for one of the functions but not the other?
Question
Can you explain why exists for one of the functions but not the other?
Solution
Sure, I'd be happy to help explain this, but I need more information. Specifically, I need to know which functions you're referring to. The limit as x approaches infinity for a function A(t) depends on the specific form of the function. For example, if A(t) = 1/t, then the limit as t approaches infinity is 0, because as t gets larger and larger, 1/t gets closer and closer to 0. However, if A(t) = t, then the limit as t approaches infinity does not exist, because t can become arbitrarily large. So, could you please provide the specific functions you're asking about?
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