A piecewise defined function is a function that is written with multiple equations over different intervals of the domain.
Your task is to complete the maze, from start to finish without touching or passing through any characters or images, twice. The first time you go through the maze, you should use absolute value functions with restricted domains. Remember, an absolute value function has the equation \(f\left(x\right)=a\left|x-h\right|+k\). In order to restrict the domain, us squiggly brackets after the equation. For example: \(y=2\left|x-1\right|+4\left\{-1<x<3\right\}\). After you've completed the maze with absolute value functions, go back and complete the same path only using linear functions to create the segments, or pieces, of your path. By creating segments in place of absolute value functions, you are practicing writing piecewise functions.
Your task is to complete the maze, from start to finish without touching or passing through any characters or images, twice. The first time you go through the maze, you should use absolute value functions with restricted domains. Remember, an absolute value function has the equation \(f\left(x\right)=a\left|x-h\right|+k\). In order to restrict the domain, us squiggly brackets after the equation. For example: \(y=2\left|x-1\right|+4\left\{-1<x<3\right\}\). After you've completed the maze with absolute value functions, go back and complete the same path only using linear functions to create the segments, or pieces, of your path. By creating segments in place of absolute value functions, you are practicing writing piecewise functions.