How do you write #2 |x-2| +5# as a piecewise function? Algebra Linear Inequalities and Absolute Value Graphs of Absolute Value Equations 1 Answer Binayaka C. Aug 17, 2017 #f(x) = -2x+9 | x <2 # #f(x) = 2x+1 | x >=2 # Explanation: #f(x) = 2 abs ( x-2) +5 # , Critical point is #x-2=0 or x =2# Written as piecewise function, #f(x) = -2(x-2) +5 | x <2 # #f(x) = 2(x-2) +5 | x >=2 # OR #f(x) = -2x+9 | x <2 # #f(x) = 2x+1 | x >=2 # [Ans] Answer link Related questions How do you graph absolute value equations on a coordinate plane? How do you create a table of values for an absolute value equation? How do you know which x values to choose when creating a table of values for an absolute value equation? What is the shape of an absolute value graph? How do you find a vertex by looking at an absolute value equation? How do you graph the equation #y=|x+2|+3#? Which x values do you choose to create a #(x, y)# table for #y=|x+5| #? How do you graph #y=4|x|-2#? Where is the vertex for #y= |x/3-4 |#? How do you graph #f(x)=abs(x-3)+4#? See all questions in Graphs of Absolute Value Equations Impact of this question 1316 views around the world You can reuse this answer Creative Commons License