How do you use the vertical line test to show #x=absy# is a function? Algebra Expressions, Equations, and Functions Vertical Line Test 1 Answer George C. Jun 5, 2015 #y# is not a function of #x#. For example, the vertical line #x = 1# intersects the relation #x = abs(y)# at two points: #(1, 1)# and #(1, -1)# So #y# is not uniquely determined by #x#. Answer link Related questions What is Vertical Line Test? What is an example of a graph that fails the vertical line test? How do you use the vertical line test? When is a relation a function? How do you determine if the following sets of points is a function: #{(2,3), (-1, 3), (4, 7), (-1, 5)}#? Why does the vertical line test work? Does a linear graph pass the vertical line test? Does a vertical line pass the vertical line test? What is the vertical and horizontal line tests for 1-1 function? Is {(–2, 4), (5, 8), (3, 6), (5, 9)} a function? See all questions in Vertical Line Test Impact of this question 2058 views around the world You can reuse this answer Creative Commons License