Evaluate the function for the given values of \( x \). \[ f(x)=\left\{\begin{array}{cl} -3|x|+6 & \text { for } x \leq-2 \\ 4 x+2 & \text { for }-2

Ask by Carlson Franklin. in the United States

Mar 10,2025

To evaluate the function \( f(x) \) for the given values of \( x \), we will use the piecewise definition of the function. **Part 1 of 5** To find \( f(-3) \), since \(-3 \leq -2\), we use the first piece of the function: \[ f(-3) = -3|-3| + 6 = -3(3) + 6 = -9 + 6 = -3 \] So, \( f(-3) = -3 \). **Part 2 of 5** For \( f(5) \), since \( 5 \geq 5\), we use the third piece of the function: \[ f(5) = 6 \] So, \( f(5) = 6 \). **Part 3 of 5** For \( f(-2) \), since \(-2 \leq -2\), we use the first piece of the function: \[ f(-2) = -3|-2| + 6 = -3(2) + 6 = -6 + 6 = 0 \] So, \( f(-2) = 0 \). **Part 4 of 5** For \( f(0) \), since \(-2 < 0 < 5\), we use the second piece of the function: \[ f(0) = 4(0) + 2 = 0 + 2 = 2 \] So, \( f(0) = 2 \). **Part 5 of 5** For \( f(6) \), since \( 6 \geq 5 \), we use the third piece of the function: \[ f(6) = 6 \] So, \( f(6) = 6 \). To summarize: - \( f(-3) = -3 \) - \( f(5) = 6 \) - \( f(-2) = 0 \) - \( f(0) = 2 \) - \( f(6) = 6 \)