QUESTION \( 4 \cdot 1 \) POINT Suppose that the]piecewise define function \( f \) is defined by \[ f(x)=\left\{\begin{array}{ll}1-2 x, & x \leq 3 \\ -2 x^{2}+4 x+1, & x>3\end{array}\right. \]

Did you know that piecewise functions like this can often be graphed in a fun way? Essentially, you break the function into its segments and plot each one based on where it applies. For \( f(x) \), when \( x \leq 3 \), you have a linear function with a negative slope, and when \( x > 3 \), it transforms into a quadratic function. This means at the boundary, you'll often see a sharp turn or a smooth transition, depending on how the segments connect! In real-world terms, piecewise functions can represent scenarios where things change under different conditions. For example, think of a toll road: the cost might be one price if you travel under 20 miles (say, $2) and a different price if you travel over 20 miles (perhaps $10 for longer distances). It reflects real-life situations where outcomes hinge on certain thresholds, making them vital in fields from economics to engineering!