If #y=166# when #x=83#, what is #y# when #x=23#? Algebra Graphs of Linear Equations and Functions Direct Variation 1 Answer Paramecium · Stefan V. May 19, 2017 #y# is #46#. Explanation: Use proportions: #(y_1 / x_1) = (y_2 / x_2)# #(166 / 83) = (y_2 / 23)# Multiply by #23# on both sides: #(166 / 83) * 23 = y_2# #46 = y_2# Answer link Related questions What is Direct Variation? What does direct variation look like on a graph? What are examples of direct variation? How do you determine if a function is a direct variation when given a table? How do you write direct variation equations? What is the constant of proportionality "k"? Why is #y=2x-1# not a direct variation? How do you graph the direct variation equation #y=-\frac{1}{6}x#? What is the direct variation equation if y varies directly with x, and #y=7.5# when #x=2.5#? What is the direct variation equation if y varies directly with x, and #y=2# when #x=4#? See all questions in Direct Variation Impact of this question 3739 views around the world You can reuse this answer Creative Commons License