a) \( f(x)=\frac{|x|}{2 x^{10}} \)

Did you know that the function \( f(x) = \frac{|x|}{2x^{10}} \) has a singular behavior at \( x = 0 \)? In fact, if we consider values of \( x \) approaching zero, the function effectively blows up since the denominator reduces to zero, making \( f(x) \) undefined at that point. For any other non-zero value of \( x \), the function demonstrates how the absolute value impacts the outcome, showcasing a fascinating case of combining piecewise behavior with polynomial terms! Moreover, let's take a minute to explore the real-world applications of such functions. While this specific function may not appear in everyday scenarios, similar forms can model concepts like physical forces or rates of change where directionality (positive or negative values) matters, especially in physics. The quirkiness of how functions behave around critical points helps in engineering designs, ensuring structures can handle stress without failure.