Evaluate the piecewise function when \( x=-8 \) and \( x=-3 \) \( f(x)=\left\{\begin{array}{l}3 x-7 \text {, if } x<-3 \\ -2 x, \text { if } x \geq-3\end{array}\right. \) The value of \( f \) is \( \square \) when \( x=-8 \). The value of \( f \) is \( \square \) when \( x=-3 \).

To evaluate the piecewise function \( f(x) \) at \( x = -8 \) and \( x = -3 \), we will check which part of the function applies to each value. 1. When \( x = -8 \): Since \( -8 < -3 \), we use the first part of the function: \[ f(-8) = 3(-8) - 7 = -24 - 7 = -31 \] So, the value of \( f \) is \( -31 \) when \( x = -8 \). 2. When \( x = -3 \): Since \( -3 \geq -3 \), we use the second part of the function: \[ f(-3) = -2(-3) = 6 \] So, the value of \( f \) is \( 6 \) when \( x = -3 \). Final answers: The value of \( f \) is \( -31 \) when \( x = -8 \). The value of \( f \) is \( 6 \) when \( x = -3 \).