Your answer is pretty good. I liked how it was to-the-point yet informative. It is pretty awesome, just shy of how awesome mine is. -Virgil Hsieh
I like your examples and your consideration of all cases of input signals x(t) (including non-bounded ones). Your definitions get the point across, though saying $ |x(t)| < \epsilon $ isn't technically correct, assuming you mean $ \epsilon $ to be a real constant. (One should say $ \forall t \in \mathbb{R}, |x(t)| < \epsilon $.) -Brian Thomas
Very clear answer, I had no problem understanding the wording. As far as I know it was correct. -Collin Phillips
The answers are short and effective. It is also very well laid out. I also enjoyed the examples. They bring real world situations into play. --Justin Kietzman
Your explanation is concise along with practical examples that help illustrate the point. -Hang Zhang